isabelle: src/HOL/Library/Euclidean_Space.thy@970bf4f594c9 (annotated)

29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1	(* Title: Library/Euclidean_Space
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2	ID: $Id:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3	Author: Amine Chaieb, University of Cambridge
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4	*)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	6	header {* (Real) Vectors in Euclidean space, and elementary linear algebra.*}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	7
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	8	theory Euclidean_Space
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	9	imports "~~/src/HOL/Decision_Procs/Dense_Linear_Order" Complex_Main
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	10	Finite_Cartesian_Product Glbs Infinite_Set Numeral_Type
30045 b8ddd7667eed real_inner class instance for vectors huffman parents: 30041 diff changeset	11	Inner_Product
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	12	uses ("normarith.ML")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	13	begin
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	14
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	15	text{* Some common special cases.*}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	16
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	17	lemma forall_1: "(\<forall>(i::'a::{order,one}). 1 <= i \<and> i <= 1 --> P i) \<longleftrightarrow> P 1"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	18	by (metis order_eq_iff)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	19	lemma forall_dimindex_1: "(\<forall>i \<in> {1..dimindex(UNIV:: 1 set)}. P i) \<longleftrightarrow> P 1"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	20	by (simp add: dimindex_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	21
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	22	lemma forall_2: "(\<forall>(i::nat). 1 <= i \<and> i <= 2 --> P i) \<longleftrightarrow> P 1 \<and> P 2"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	23	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	24	have "\<And>i::nat. 1 <= i \<and> i <= 2 \<longleftrightarrow> i = 1 \<or> i = 2" by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	25	thus ?thesis by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	26	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	27
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	28	lemma forall_3: "(\<forall>(i::nat). 1 <= i \<and> i <= 3 --> P i) \<longleftrightarrow> P 1 \<and> P 2 \<and> P 3"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	29	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	30	have "\<And>i::nat. 1 <= i \<and> i <= 3 \<longleftrightarrow> i = 1 \<or> i = 2 \<or> i = 3" by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	31	thus ?thesis by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	32	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	33
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	34	lemma setsum_singleton[simp]: "setsum f {x} = f x" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	35	lemma setsum_1: "setsum f {(1::'a::{order,one})..1} = f 1"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	36	by (simp add: atLeastAtMost_singleton)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	37
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	38	lemma setsum_2: "setsum f {1::nat..2} = f 1 + f 2"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	39	by (simp add: nat_number atLeastAtMostSuc_conv add_commute)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	40
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	41	lemma setsum_3: "setsum f {1::nat..3} = f 1 + f 2 + f 3"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	42	by (simp add: nat_number atLeastAtMostSuc_conv add_commute)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	43
29906 80369da39838 section -> subsection huffman parents: 29905 diff changeset	44	subsection{* Basic componentwise operations on vectors. *}
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	45
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	46	instantiation "^" :: (plus,type) plus
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	47	begin
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	48	definition vector_add_def : "op + \<equiv> (\<lambda> x y. (\<chi> i. (x$i) + (y$i)))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	49	instance ..
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	50	end
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	51
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	52	instantiation "^" :: (times,type) times
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	53	begin
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	54	definition vector_mult_def : "op * \<equiv> (\<lambda> x y. (\<chi> i. (x$i) * (y$i)))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	55	instance ..
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	56	end
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	57
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	58	instantiation "^" :: (minus,type) minus begin
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	59	definition vector_minus_def : "op - \<equiv> (\<lambda> x y. (\<chi> i. (x$i) - (y$i)))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	60	instance ..
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	61	end
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	62
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	63	instantiation "^" :: (uminus,type) uminus begin
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	64	definition vector_uminus_def : "uminus \<equiv> (\<lambda> x. (\<chi> i. - (x$i)))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	65	instance ..
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	66	end
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	67	instantiation "^" :: (zero,type) zero begin
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	68	definition vector_zero_def : "0 \<equiv> (\<chi> i. 0)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	69	instance ..
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	70	end
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	71
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	72	instantiation "^" :: (one,type) one begin
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	73	definition vector_one_def : "1 \<equiv> (\<chi> i. 1)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	74	instance ..
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	75	end
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	76
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	77	instantiation "^" :: (ord,type) ord
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	78	begin
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	79	definition vector_less_eq_def:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	80	"less_eq (x :: 'a ^'b) y = (ALL i : {1 .. dimindex (UNIV :: 'b set)}.
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	81	x$i <= y$i)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	82	definition vector_less_def: "less (x :: 'a ^'b) y = (ALL i : {1 ..
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	83	dimindex (UNIV :: 'b set)}. x$i < y$i)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	84
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	85	instance by (intro_classes)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	86	end
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	87
30039 7208c88df507 fix real_vector, real_algebra instances huffman parents: 29906 diff changeset	88	instantiation "^" :: (scaleR, type) scaleR
7208c88df507 fix real_vector, real_algebra instances huffman parents: 29906 diff changeset	89	begin
7208c88df507 fix real_vector, real_algebra instances huffman parents: 29906 diff changeset	90	definition vector_scaleR_def: "scaleR = (\<lambda> r x. (\<chi> i. scaleR r (x$i)))"
7208c88df507 fix real_vector, real_algebra instances huffman parents: 29906 diff changeset	91	instance ..
7208c88df507 fix real_vector, real_algebra instances huffman parents: 29906 diff changeset	92	end
7208c88df507 fix real_vector, real_algebra instances huffman parents: 29906 diff changeset	93
7208c88df507 fix real_vector, real_algebra instances huffman parents: 29906 diff changeset	94	text{* Also the scalar-vector multiplication. *}
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	95
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	96	definition vector_scalar_mult:: "'a::times \<Rightarrow> 'a ^'n \<Rightarrow> 'a ^ 'n" (infixr "*s" 75)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	97	where "c s x = (\<chi> i. c (x$i))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	98
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	99	text{* Constant Vectors *}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	100
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	101	definition "vec x = (\<chi> i. x)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	102
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	103	text{* Dot products. *}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	104
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	105	definition dot :: "'a::{comm_monoid_add, times} ^ 'n \<Rightarrow> 'a ^ 'n \<Rightarrow> 'a" (infix "\<bullet>" 70) where
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	106	"x \<bullet> y = setsum (\<lambda>i. x$i * y$i) {1 .. dimindex (UNIV:: 'n set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	107	lemma dot_1[simp]: "(x::'a::{comm_monoid_add, times}^1) \<bullet> y = (x$1) * (y$1)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	108	by (simp add: dot_def dimindex_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	109
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	110	lemma dot_2[simp]: "(x::'a::{comm_monoid_add, times}^2) \<bullet> y = (x$1) * (y$1) + (x$2) * (y$2)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	111	by (simp add: dot_def dimindex_def nat_number)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	112
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	113	lemma dot_3[simp]: "(x::'a::{comm_monoid_add, times}^3) \<bullet> y = (x$1) * (y$1) + (x$2) * (y$2) + (x$3) * (y$3)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	114	by (simp add: dot_def dimindex_def nat_number)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	115
29906 80369da39838 section -> subsection huffman parents: 29905 diff changeset	116	subsection {* A naive proof procedure to lift really trivial arithmetic stuff from the basis of the vector space. *}
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	117
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	118	lemmas Cart_lambda_beta' = Cart_lambda_beta[rule_format]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	119	method_setup vector = {*
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	120	let
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	121	val ss1 = HOL_basic_ss addsimps [@{thm dot_def}, @{thm setsum_addf} RS sym,
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	122	@{thm setsum_subtractf} RS sym, @{thm setsum_right_distrib},
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	123	@{thm setsum_left_distrib}, @{thm setsum_negf} RS sym]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	124	val ss2 = @{simpset} addsimps
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	125	[@{thm vector_add_def}, @{thm vector_mult_def},
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	126	@{thm vector_minus_def}, @{thm vector_uminus_def},
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	127	@{thm vector_one_def}, @{thm vector_zero_def}, @{thm vec_def},
30039 7208c88df507 fix real_vector, real_algebra instances huffman parents: 29906 diff changeset	128	@{thm vector_scaleR_def},
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	129	@{thm Cart_lambda_beta'}, @{thm vector_scalar_mult_def}]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	130	fun vector_arith_tac ths =
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	131	simp_tac ss1
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	132	THEN' (fn i => rtac @{thm setsum_cong2} i
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	133	ORELSE rtac @{thm setsum_0'} i
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	134	ORELSE simp_tac (HOL_basic_ss addsimps [@{thm "Cart_eq"}]) i)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	135	(* THEN' TRY o clarify_tac HOL_cs THEN' (TRY o rtac @{thm iffI}) *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	136	THEN' asm_full_simp_tac (ss2 addsimps ths)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	137	in
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	138	Method.thms_args (Method.SIMPLE_METHOD' o vector_arith_tac)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	139	end
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	140	*} "Lifts trivial vector statements to real arith statements"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	141
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	142	lemma vec_0[simp]: "vec 0 = 0" by (vector vector_zero_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	143	lemma vec_1[simp]: "vec 1 = 1" by (vector vector_one_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	144
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	145
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	146
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	147	text{* Obvious "component-pushing". *}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	148
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	149	lemma vec_component: " i \<in> {1 .. dimindex (UNIV :: 'n set)} \<Longrightarrow> (vec x :: 'a ^ 'n)$i = x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	150	by (vector vec_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	151
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	152	lemma vector_add_component:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	153	fixes x y :: "'a::{plus} ^ 'n" assumes i: "i \<in> {1 .. dimindex(UNIV:: 'n set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	154	shows "(x + y)$i = x$i + y$i"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	155	using i by vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	156
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	157	lemma vector_minus_component:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	158	fixes x y :: "'a::{minus} ^ 'n" assumes i: "i \<in> {1 .. dimindex(UNIV:: 'n set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	159	shows "(x - y)$i = x$i - y$i"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	160	using i by vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	161
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	162	lemma vector_mult_component:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	163	fixes x y :: "'a::{times} ^ 'n" assumes i: "i \<in> {1 .. dimindex(UNIV:: 'n set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	164	shows "(x * y)$i = x$i * y$i"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	165	using i by vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	166
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	167	lemma vector_smult_component:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	168	fixes y :: "'a::{times} ^ 'n" assumes i: "i \<in> {1 .. dimindex(UNIV:: 'n set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	169	shows "(c s y)$i = c (y$i)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	170	using i by vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	171
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	172	lemma vector_uminus_component:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	173	fixes x :: "'a::{uminus} ^ 'n" assumes i: "i \<in> {1 .. dimindex(UNIV:: 'n set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	174	shows "(- x)$i = - (x$i)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	175	using i by vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	176
30039 7208c88df507 fix real_vector, real_algebra instances huffman parents: 29906 diff changeset	177	lemma vector_scaleR_component:
7208c88df507 fix real_vector, real_algebra instances huffman parents: 29906 diff changeset	178	fixes x :: "'a::scaleR ^ 'n"
7208c88df507 fix real_vector, real_algebra instances huffman parents: 29906 diff changeset	179	assumes i: "i \<in> {1 .. dimindex(UNIV :: 'n set)}"
7208c88df507 fix real_vector, real_algebra instances huffman parents: 29906 diff changeset	180	shows "(scaleR r x)$i = scaleR r (x$i)"
7208c88df507 fix real_vector, real_algebra instances huffman parents: 29906 diff changeset	181	using i by vector
7208c88df507 fix real_vector, real_algebra instances huffman parents: 29906 diff changeset	182
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	183	lemma cond_component: "(if b then x else y)$i = (if b then x$i else y$i)" by vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	184
30039 7208c88df507 fix real_vector, real_algebra instances huffman parents: 29906 diff changeset	185	lemmas vector_component =
7208c88df507 fix real_vector, real_algebra instances huffman parents: 29906 diff changeset	186	vec_component vector_add_component vector_mult_component
7208c88df507 fix real_vector, real_algebra instances huffman parents: 29906 diff changeset	187	vector_smult_component vector_minus_component vector_uminus_component
7208c88df507 fix real_vector, real_algebra instances huffman parents: 29906 diff changeset	188	vector_scaleR_component cond_component
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	189
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	190	subsection {* Some frequently useful arithmetic lemmas over vectors. *}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	191
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	192	instance "^" :: (semigroup_add,type) semigroup_add
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	193	apply (intro_classes) by (vector add_assoc)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	194
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	195
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	196	instance "^" :: (monoid_add,type) monoid_add
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	197	apply (intro_classes) by vector+
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	198
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	199	instance "^" :: (group_add,type) group_add
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	200	apply (intro_classes) by (vector algebra_simps)+
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	201
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	202	instance "^" :: (ab_semigroup_add,type) ab_semigroup_add
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	203	apply (intro_classes) by (vector add_commute)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	204
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	205	instance "^" :: (comm_monoid_add,type) comm_monoid_add
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	206	apply (intro_classes) by vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	207
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	208	instance "^" :: (ab_group_add,type) ab_group_add
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	209	apply (intro_classes) by vector+
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	210
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	211	instance "^" :: (cancel_semigroup_add,type) cancel_semigroup_add
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	212	apply (intro_classes)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	213	by (vector Cart_eq)+
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	214
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	215	instance "^" :: (cancel_ab_semigroup_add,type) cancel_ab_semigroup_add
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	216	apply (intro_classes)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	217	by (vector Cart_eq)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	218
30039 7208c88df507 fix real_vector, real_algebra instances huffman parents: 29906 diff changeset	219	instance "^" :: (real_vector, type) real_vector
7208c88df507 fix real_vector, real_algebra instances huffman parents: 29906 diff changeset	220	by default (vector scaleR_left_distrib scaleR_right_distrib)+
7208c88df507 fix real_vector, real_algebra instances huffman parents: 29906 diff changeset	221
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	222	instance "^" :: (semigroup_mult,type) semigroup_mult
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	223	apply (intro_classes) by (vector mult_assoc)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	224
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	225	instance "^" :: (monoid_mult,type) monoid_mult
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	226	apply (intro_classes) by vector+
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	227
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	228	instance "^" :: (ab_semigroup_mult,type) ab_semigroup_mult
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	229	apply (intro_classes) by (vector mult_commute)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	230
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	231	instance "^" :: (ab_semigroup_idem_mult,type) ab_semigroup_idem_mult
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	232	apply (intro_classes) by (vector mult_idem)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	233
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	234	instance "^" :: (comm_monoid_mult,type) comm_monoid_mult
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	235	apply (intro_classes) by vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	236
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	237	fun vector_power :: "('a::{one,times} ^'n) \<Rightarrow> nat \<Rightarrow> 'a^'n" where
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	238	"vector_power x 0 = 1"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	239	\| "vector_power x (Suc n) = x * vector_power x n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	240
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	241	instantiation "^" :: (recpower,type) recpower
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	242	begin
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	243	definition vec_power_def: "op ^ \<equiv> vector_power"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	244	instance
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	245	apply (intro_classes) by (simp_all add: vec_power_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	246	end
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	247
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	248	instance "^" :: (semiring,type) semiring
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	249	apply (intro_classes) by (vector ring_simps)+
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	250
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	251	instance "^" :: (semiring_0,type) semiring_0
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	252	apply (intro_classes) by (vector ring_simps)+
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	253	instance "^" :: (semiring_1,type) semiring_1
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	254	apply (intro_classes) apply vector using dimindex_ge_1 by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	255	instance "^" :: (comm_semiring,type) comm_semiring
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	256	apply (intro_classes) by (vector ring_simps)+
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	257
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	258	instance "^" :: (comm_semiring_0,type) comm_semiring_0 by (intro_classes)
29905 26ee9656872a add instance for cancel_comm_monoid_add huffman parents: 29881 diff changeset	259	instance "^" :: (cancel_comm_monoid_add, type) cancel_comm_monoid_add ..
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	260	instance "^" :: (semiring_0_cancel,type) semiring_0_cancel by (intro_classes)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	261	instance "^" :: (comm_semiring_0_cancel,type) comm_semiring_0_cancel by (intro_classes)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	262	instance "^" :: (ring,type) ring by (intro_classes)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	263	instance "^" :: (semiring_1_cancel,type) semiring_1_cancel by (intro_classes)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	264	instance "^" :: (comm_semiring_1,type) comm_semiring_1 by (intro_classes)
30039 7208c88df507 fix real_vector, real_algebra instances huffman parents: 29906 diff changeset	265
7208c88df507 fix real_vector, real_algebra instances huffman parents: 29906 diff changeset	266	instance "^" :: (ring_1,type) ring_1 ..
7208c88df507 fix real_vector, real_algebra instances huffman parents: 29906 diff changeset	267
7208c88df507 fix real_vector, real_algebra instances huffman parents: 29906 diff changeset	268	instance "^" :: (real_algebra,type) real_algebra
7208c88df507 fix real_vector, real_algebra instances huffman parents: 29906 diff changeset	269	apply intro_classes
7208c88df507 fix real_vector, real_algebra instances huffman parents: 29906 diff changeset	270	apply (simp_all add: vector_scaleR_def ring_simps)
7208c88df507 fix real_vector, real_algebra instances huffman parents: 29906 diff changeset	271	apply vector
7208c88df507 fix real_vector, real_algebra instances huffman parents: 29906 diff changeset	272	apply vector
7208c88df507 fix real_vector, real_algebra instances huffman parents: 29906 diff changeset	273	done
7208c88df507 fix real_vector, real_algebra instances huffman parents: 29906 diff changeset	274
7208c88df507 fix real_vector, real_algebra instances huffman parents: 29906 diff changeset	275	instance "^" :: (real_algebra_1,type) real_algebra_1 ..
7208c88df507 fix real_vector, real_algebra instances huffman parents: 29906 diff changeset	276
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	277	lemma of_nat_index:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	278	"i\<in>{1 .. dimindex (UNIV :: 'n set)} \<Longrightarrow> (of_nat n :: 'a::semiring_1 ^'n)$i = of_nat n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	279	apply (induct n)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	280	apply vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	281	apply vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	282	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	283	lemma zero_index[simp]:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	284	"i\<in>{1 .. dimindex (UNIV :: 'n set)} \<Longrightarrow> (0 :: 'a::zero ^'n)$i = 0" by vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	285
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	286	lemma one_index[simp]:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	287	"i\<in>{1 .. dimindex (UNIV :: 'n set)} \<Longrightarrow> (1 :: 'a::one ^'n)$i = 1" by vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	288
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	289	lemma one_plus_of_nat_neq_0: "(1::'a::semiring_char_0) + of_nat n \<noteq> 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	290	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	291	have "(1::'a) + of_nat n = 0 \<longleftrightarrow> of_nat 1 + of_nat n = (of_nat 0 :: 'a)" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	292	also have "\<dots> \<longleftrightarrow> 1 + n = 0" by (simp only: of_nat_add[symmetric] of_nat_eq_iff)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	293	finally show ?thesis by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	294	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	295
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	296	instance "^" :: (semiring_char_0,type) semiring_char_0
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	297	proof (intro_classes)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	298	fix m n ::nat
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	299	show "(of_nat m :: 'a^'b) = of_nat n \<longleftrightarrow> m = n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	300	proof(induct m arbitrary: n)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	301	case 0 thus ?case apply vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	302	apply (induct n,auto simp add: ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	303	using dimindex_ge_1 apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	304	apply vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	305	by (auto simp add: of_nat_index one_plus_of_nat_neq_0)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	306	next
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	307	case (Suc n m)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	308	thus ?case apply vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	309	apply (induct m, auto simp add: ring_simps of_nat_index zero_index)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	310	using dimindex_ge_1 apply simp apply blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	311	apply (simp add: one_plus_of_nat_neq_0)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	312	using dimindex_ge_1 apply simp apply blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	313	apply (simp add: vector_component one_index of_nat_index)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	314	apply (simp only: of_nat.simps(2)[where ?'a = 'a, symmetric] of_nat_eq_iff)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	315	using dimindex_ge_1 apply simp apply blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	316	apply (simp add: vector_component one_index of_nat_index)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	317	apply (simp only: of_nat.simps(2)[where ?'a = 'a, symmetric] of_nat_eq_iff)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	318	using dimindex_ge_1 apply simp apply blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	319	apply (simp add: vector_component one_index of_nat_index)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	320	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	321	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	322	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	323
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	324	instance "^" :: (comm_ring_1,type) comm_ring_1 by intro_classes
30039 7208c88df507 fix real_vector, real_algebra instances huffman parents: 29906 diff changeset	325	instance "^" :: (ring_char_0,type) ring_char_0 by intro_classes
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	326
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	327	lemma vector_smult_assoc: "a s (b s x) = ((a::'a::semigroup_mult) * b) *s x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	328	by (vector mult_assoc)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	329	lemma vector_sadd_rdistrib: "((a::'a::semiring) + b) s x = a s x + b *s x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	330	by (vector ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	331	lemma vector_add_ldistrib: "(c::'a::semiring) s (x + y) = c s x + c *s y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	332	by (vector ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	333	lemma vector_smult_lzero[simp]: "(0::'a::mult_zero) *s x = 0" by vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	334	lemma vector_smult_lid[simp]: "(1::'a::monoid_mult) *s x = x" by vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	335	lemma vector_ssub_ldistrib: "(c::'a::ring) s (x - y) = c s x - c *s y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	336	by (vector ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	337	lemma vector_smult_rneg: "(c::'a::ring) s -x = -(c s x)" by vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	338	lemma vector_smult_lneg: "- (c::'a::ring) s x = -(c s x)" by vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	339	lemma vector_sneg_minus1: "-x = (- (1::'a::ring_1)) *s x" by vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	340	lemma vector_smult_rzero[simp]: "c *s 0 = (0::'a::mult_zero ^ 'n)" by vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	341	lemma vector_sub_rdistrib: "((a::'a::ring) - b) s x = a s x - b *s x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	342	by (vector ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	343
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	344	lemma vec_eq[simp]: "(vec m = vec n) \<longleftrightarrow> (m = n)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	345	apply (auto simp add: vec_def Cart_eq vec_component Cart_lambda_beta )
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	346	using dimindex_ge_1 apply auto done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	347
30040 e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	348	subsection {* Square root of sum of squares *}
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	349
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	350	definition
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	351	"setL2 f A = sqrt (\<Sum>i\<in>A. (f i)\<twosuperior>)"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	352
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	353	lemma setL2_cong:
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	354	"\<lbrakk>A = B; \<And>x. x \<in> B \<Longrightarrow> f x = g x\<rbrakk> \<Longrightarrow> setL2 f A = setL2 g B"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	355	unfolding setL2_def by simp
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	356
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	357	lemma strong_setL2_cong:
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	358	"\<lbrakk>A = B; \<And>x. x \<in> B =simp=> f x = g x\<rbrakk> \<Longrightarrow> setL2 f A = setL2 g B"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	359	unfolding setL2_def simp_implies_def by simp
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	360
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	361	lemma setL2_infinite [simp]: "\<not> finite A \<Longrightarrow> setL2 f A = 0"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	362	unfolding setL2_def by simp
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	363
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	364	lemma setL2_empty [simp]: "setL2 f {} = 0"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	365	unfolding setL2_def by simp
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	366
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	367	lemma setL2_insert [simp]:
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	368	"\<lbrakk>finite F; a \<notin> F\<rbrakk> \<Longrightarrow>
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	369	setL2 f (insert a F) = sqrt ((f a)\<twosuperior> + (setL2 f F)\<twosuperior>)"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	370	unfolding setL2_def by (simp add: setsum_nonneg)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	371
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	372	lemma setL2_nonneg [simp]: "0 \<le> setL2 f A"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	373	unfolding setL2_def by (simp add: setsum_nonneg)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	374
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	375	lemma setL2_0': "\<forall>a\<in>A. f a = 0 \<Longrightarrow> setL2 f A = 0"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	376	unfolding setL2_def by simp
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	377
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	378	lemma setL2_mono:
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	379	assumes "\<And>i. i \<in> K \<Longrightarrow> f i \<le> g i"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	380	assumes "\<And>i. i \<in> K \<Longrightarrow> 0 \<le> f i"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	381	shows "setL2 f K \<le> setL2 g K"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	382	unfolding setL2_def
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	383	by (simp add: setsum_nonneg setsum_mono power_mono prems)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	384
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	385	lemma setL2_right_distrib:
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	386	"0 \<le> r \<Longrightarrow> r * setL2 f A = setL2 (\<lambda>x. r * f x) A"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	387	unfolding setL2_def
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	388	apply (simp add: power_mult_distrib)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	389	apply (simp add: setsum_right_distrib [symmetric])
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	390	apply (simp add: real_sqrt_mult setsum_nonneg)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	391	done
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	392
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	393	lemma setL2_left_distrib:
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	394	"0 \<le> r \<Longrightarrow> setL2 f A * r = setL2 (\<lambda>x. f x * r) A"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	395	unfolding setL2_def
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	396	apply (simp add: power_mult_distrib)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	397	apply (simp add: setsum_left_distrib [symmetric])
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	398	apply (simp add: real_sqrt_mult setsum_nonneg)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	399	done
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	400
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	401	lemma setsum_nonneg_eq_0_iff:
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	402	fixes f :: "'a \<Rightarrow> 'b::pordered_ab_group_add"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	403	shows "\<lbrakk>finite A; \<forall>x\<in>A. 0 \<le> f x\<rbrakk> \<Longrightarrow> setsum f A = 0 \<longleftrightarrow> (\<forall>x\<in>A. f x = 0)"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	404	apply (induct set: finite, simp)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	405	apply (simp add: add_nonneg_eq_0_iff setsum_nonneg)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	406	done
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	407
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	408	lemma setL2_eq_0_iff: "finite A \<Longrightarrow> setL2 f A = 0 \<longleftrightarrow> (\<forall>x\<in>A. f x = 0)"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	409	unfolding setL2_def
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	410	by (simp add: setsum_nonneg setsum_nonneg_eq_0_iff)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	411
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	412	lemma setL2_triangle_ineq:
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	413	shows "setL2 (\<lambda>i. f i + g i) A \<le> setL2 f A + setL2 g A"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	414	proof (cases "finite A")
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	415	case False
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	416	thus ?thesis by simp
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	417	next
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	418	case True
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	419	thus ?thesis
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	420	proof (induct set: finite)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	421	case empty
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	422	show ?case by simp
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	423	next
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	424	case (insert x F)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	425	hence "sqrt ((f x + g x)\<twosuperior> + (setL2 (\<lambda>i. f i + g i) F)\<twosuperior>) \<le>
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	426	sqrt ((f x + g x)\<twosuperior> + (setL2 f F + setL2 g F)\<twosuperior>)"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	427	by (intro real_sqrt_le_mono add_left_mono power_mono insert
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	428	setL2_nonneg add_increasing zero_le_power2)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	429	also have
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	430	"\<dots> \<le> sqrt ((f x)\<twosuperior> + (setL2 f F)\<twosuperior>) + sqrt ((g x)\<twosuperior> + (setL2 g F)\<twosuperior>)"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	431	by (rule real_sqrt_sum_squares_triangle_ineq)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	432	finally show ?case
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	433	using insert by simp
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	434	qed
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	435	qed
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	436
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	437	lemma sqrt_sum_squares_le_sum:
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	438	"\<lbrakk>0 \<le> x; 0 \<le> y\<rbrakk> \<Longrightarrow> sqrt (x\<twosuperior> + y\<twosuperior>) \<le> x + y"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	439	apply (rule power2_le_imp_le)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	440	apply (simp add: power2_sum)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	441	apply (simp add: mult_nonneg_nonneg)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	442	apply (simp add: add_nonneg_nonneg)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	443	done
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	444
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	445	lemma setL2_le_setsum [rule_format]:
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	446	"(\<forall>i\<in>A. 0 \<le> f i) \<longrightarrow> setL2 f A \<le> setsum f A"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	447	apply (cases "finite A")
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	448	apply (induct set: finite)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	449	apply simp
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	450	apply clarsimp
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	451	apply (erule order_trans [OF sqrt_sum_squares_le_sum])
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	452	apply simp
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	453	apply simp
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	454	apply simp
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	455	done
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	456
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	457	lemma sqrt_sum_squares_le_sum_abs: "sqrt (x\<twosuperior> + y\<twosuperior>) \<le> \<bar>x\<bar> + \<bar>y\<bar>"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	458	apply (rule power2_le_imp_le)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	459	apply (simp add: power2_sum)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	460	apply (simp add: mult_nonneg_nonneg)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	461	apply (simp add: add_nonneg_nonneg)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	462	done
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	463
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	464	lemma setL2_le_setsum_abs: "setL2 f A \<le> (\<Sum>i\<in>A. \<bar>f i\<bar>)"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	465	apply (cases "finite A")
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	466	apply (induct set: finite)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	467	apply simp
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	468	apply simp
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	469	apply (rule order_trans [OF sqrt_sum_squares_le_sum_abs])
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	470	apply simp
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	471	apply simp
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	472	done
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	473
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	474	lemma setL2_mult_ineq_lemma:
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	475	fixes a b c d :: real
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	476	shows "2 * (a * c) * (b * d) \<le> a\<twosuperior> * d\<twosuperior> + b\<twosuperior> * c\<twosuperior>"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	477	proof -
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	478	have "0 \<le> (a * d - b * c)\<twosuperior>" by simp
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	479	also have "\<dots> = a\<twosuperior> * d\<twosuperior> + b\<twosuperior> * c\<twosuperior> - 2 * (a * d) * (b * c)"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	480	by (simp only: power2_diff power_mult_distrib)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	481	also have "\<dots> = a\<twosuperior> * d\<twosuperior> + b\<twosuperior> * c\<twosuperior> - 2 * (a * c) * (b * d)"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	482	by simp
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	483	finally show "2 * (a * c) * (b * d) \<le> a\<twosuperior> * d\<twosuperior> + b\<twosuperior> * c\<twosuperior>"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	484	by simp
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	485	qed
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	486
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	487	lemma setL2_mult_ineq: "(\<Sum>i\<in>A. \<bar>f i\<bar> * \<bar>g i\<bar>) \<le> setL2 f A * setL2 g A"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	488	apply (cases "finite A")
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	489	apply (induct set: finite)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	490	apply simp
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	491	apply (rule power2_le_imp_le, simp)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	492	apply (rule order_trans)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	493	apply (rule power_mono)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	494	apply (erule add_left_mono)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	495	apply (simp add: add_nonneg_nonneg mult_nonneg_nonneg setsum_nonneg)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	496	apply (simp add: power2_sum)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	497	apply (simp add: power_mult_distrib)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	498	apply (simp add: right_distrib left_distrib)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	499	apply (rule ord_le_eq_trans)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	500	apply (rule setL2_mult_ineq_lemma)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	501	apply simp
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	502	apply (intro mult_nonneg_nonneg setL2_nonneg)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	503	apply simp
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	504	done
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	505
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	506	lemma member_le_setL2: "\<lbrakk>finite A; i \<in> A\<rbrakk> \<Longrightarrow> f i \<le> setL2 f A"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	507	apply (rule_tac s="insert i (A - {i})" and t="A" in subst)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	508	apply fast
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	509	apply (subst setL2_insert)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	510	apply simp
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	511	apply simp
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	512	apply simp
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	513	done
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	514
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	515	subsection {* Norms *}
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	516
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	517	instantiation "^" :: (real_normed_vector, type) real_normed_vector
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	518	begin
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	519
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	520	definition vector_norm_def:
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	521	"norm (x::'a^'b) = setL2 (\<lambda>i. norm (x$i)) {1 .. dimindex (UNIV:: 'b set)}"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	522
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	523	definition vector_sgn_def:
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	524	"sgn (x::'a^'b) = scaleR (inverse (norm x)) x"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	525
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	526	instance proof
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	527	fix a :: real and x y :: "'a ^ 'b"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	528	show "0 \<le> norm x"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	529	unfolding vector_norm_def
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	530	by (rule setL2_nonneg)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	531	show "norm x = 0 \<longleftrightarrow> x = 0"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	532	unfolding vector_norm_def
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	533	by (simp add: setL2_eq_0_iff Cart_eq)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	534	show "norm (x + y) \<le> norm x + norm y"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	535	unfolding vector_norm_def
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	536	apply (rule order_trans [OF _ setL2_triangle_ineq])
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	537	apply (rule setL2_mono)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	538	apply (simp add: vector_component norm_triangle_ineq)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	539	apply simp
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	540	done
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	541	show "norm (scaleR a x) = \<bar>a\<bar> * norm x"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	542	unfolding vector_norm_def
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	543	by (simp add: vector_component norm_scaleR setL2_right_distrib
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	544	cong: strong_setL2_cong)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	545	show "sgn x = scaleR (inverse (norm x)) x"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	546	by (rule vector_sgn_def)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	547	qed
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	548
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	549	end
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	550
30045 b8ddd7667eed real_inner class instance for vectors huffman parents: 30041 diff changeset	551	subsection {* Inner products *}
b8ddd7667eed real_inner class instance for vectors huffman parents: 30041 diff changeset	552
b8ddd7667eed real_inner class instance for vectors huffman parents: 30041 diff changeset	553	instantiation "^" :: (real_inner, type) real_inner
b8ddd7667eed real_inner class instance for vectors huffman parents: 30041 diff changeset	554	begin
b8ddd7667eed real_inner class instance for vectors huffman parents: 30041 diff changeset	555
b8ddd7667eed real_inner class instance for vectors huffman parents: 30041 diff changeset	556	definition vector_inner_def:
b8ddd7667eed real_inner class instance for vectors huffman parents: 30041 diff changeset	557	"inner x y = setsum (\<lambda>i. inner (x$i) (y$i)) {1 .. dimindex(UNIV::'b set)}"
b8ddd7667eed real_inner class instance for vectors huffman parents: 30041 diff changeset	558
b8ddd7667eed real_inner class instance for vectors huffman parents: 30041 diff changeset	559	instance proof
b8ddd7667eed real_inner class instance for vectors huffman parents: 30041 diff changeset	560	fix r :: real and x y z :: "'a ^ 'b"
b8ddd7667eed real_inner class instance for vectors huffman parents: 30041 diff changeset	561	show "inner x y = inner y x"
b8ddd7667eed real_inner class instance for vectors huffman parents: 30041 diff changeset	562	unfolding vector_inner_def
b8ddd7667eed real_inner class instance for vectors huffman parents: 30041 diff changeset	563	by (simp add: inner_commute)
b8ddd7667eed real_inner class instance for vectors huffman parents: 30041 diff changeset	564	show "inner (x + y) z = inner x z + inner y z"
b8ddd7667eed real_inner class instance for vectors huffman parents: 30041 diff changeset	565	unfolding vector_inner_def
b8ddd7667eed real_inner class instance for vectors huffman parents: 30041 diff changeset	566	by (vector inner_left_distrib)
b8ddd7667eed real_inner class instance for vectors huffman parents: 30041 diff changeset	567	show "inner (scaleR r x) y = r * inner x y"
b8ddd7667eed real_inner class instance for vectors huffman parents: 30041 diff changeset	568	unfolding vector_inner_def
b8ddd7667eed real_inner class instance for vectors huffman parents: 30041 diff changeset	569	by (vector inner_scaleR_left)
b8ddd7667eed real_inner class instance for vectors huffman parents: 30041 diff changeset	570	show "0 \<le> inner x x"
b8ddd7667eed real_inner class instance for vectors huffman parents: 30041 diff changeset	571	unfolding vector_inner_def
b8ddd7667eed real_inner class instance for vectors huffman parents: 30041 diff changeset	572	by (simp add: setsum_nonneg)
b8ddd7667eed real_inner class instance for vectors huffman parents: 30041 diff changeset	573	show "inner x x = 0 \<longleftrightarrow> x = 0"
b8ddd7667eed real_inner class instance for vectors huffman parents: 30041 diff changeset	574	unfolding vector_inner_def
b8ddd7667eed real_inner class instance for vectors huffman parents: 30041 diff changeset	575	by (simp add: Cart_eq setsum_nonneg_eq_0_iff)
b8ddd7667eed real_inner class instance for vectors huffman parents: 30041 diff changeset	576	show "norm x = sqrt (inner x x)"
b8ddd7667eed real_inner class instance for vectors huffman parents: 30041 diff changeset	577	unfolding vector_inner_def vector_norm_def setL2_def
b8ddd7667eed real_inner class instance for vectors huffman parents: 30041 diff changeset	578	by (simp add: power2_norm_eq_inner)
b8ddd7667eed real_inner class instance for vectors huffman parents: 30041 diff changeset	579	qed
b8ddd7667eed real_inner class instance for vectors huffman parents: 30041 diff changeset	580
b8ddd7667eed real_inner class instance for vectors huffman parents: 30041 diff changeset	581	end
b8ddd7667eed real_inner class instance for vectors huffman parents: 30041 diff changeset	582
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	583	subsection{* Properties of the dot product. *}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	584
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	585	lemma dot_sym: "(x::'a:: {comm_monoid_add, ab_semigroup_mult} ^ 'n) \<bullet> y = y \<bullet> x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	586	by (vector mult_commute)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	587	lemma dot_ladd: "((x::'a::ring ^ 'n) + y) \<bullet> z = (x \<bullet> z) + (y \<bullet> z)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	588	by (vector ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	589	lemma dot_radd: "x \<bullet> (y + (z::'a::ring ^ 'n)) = (x \<bullet> y) + (x \<bullet> z)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	590	by (vector ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	591	lemma dot_lsub: "((x::'a::ring ^ 'n) - y) \<bullet> z = (x \<bullet> z) - (y \<bullet> z)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	592	by (vector ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	593	lemma dot_rsub: "(x::'a::ring ^ 'n) \<bullet> (y - z) = (x \<bullet> y) - (x \<bullet> z)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	594	by (vector ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	595	lemma dot_lmult: "(c s x) \<bullet> y = (c::'a::ring) (x \<bullet> y)" by (vector ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	596	lemma dot_rmult: "x \<bullet> (c s y) = (c::'a::comm_ring) (x \<bullet> y)" by (vector ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	597	lemma dot_lneg: "(-x) \<bullet> (y::'a::ring ^ 'n) = -(x \<bullet> y)" by vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	598	lemma dot_rneg: "(x::'a::ring ^ 'n) \<bullet> (-y) = -(x \<bullet> y)" by vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	599	lemma dot_lzero[simp]: "0 \<bullet> x = (0::'a::{comm_monoid_add, mult_zero})" by vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	600	lemma dot_rzero[simp]: "x \<bullet> 0 = (0::'a::{comm_monoid_add, mult_zero})" by vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	601	lemma dot_pos_le[simp]: "(0::'a\<Colon>ordered_ring_strict) <= x \<bullet> x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	602	by (simp add: dot_def setsum_nonneg)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	603
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	604	lemma setsum_squares_eq_0_iff: assumes fS: "finite F" and fp: "\<forall>x \<in> F. f x \<ge> (0 ::'a::pordered_ab_group_add)" shows "setsum f F = 0 \<longleftrightarrow> (ALL x:F. f x = 0)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	605	using fS fp setsum_nonneg[OF fp]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	606	proof (induct set: finite)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	607	case empty thus ?case by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	608	next
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	609	case (insert x F)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	610	from insert.prems have Fx: "f x \<ge> 0" and Fp: "\<forall> a \<in> F. f a \<ge> 0" by simp_all
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	611	from insert.hyps Fp setsum_nonneg[OF Fp]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	612	have h: "setsum f F = 0 \<longleftrightarrow> (\<forall>a \<in>F. f a = 0)" by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	613	from sum_nonneg_eq_zero_iff[OF Fx setsum_nonneg[OF Fp]] insert.hyps(1,2)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	614	show ?case by (simp add: h)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	615	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	616
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	617	lemma dot_eq_0: "x \<bullet> x = 0 \<longleftrightarrow> (x::'a::{ordered_ring_strict,ring_no_zero_divisors} ^ 'n) = 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	618	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	619	{assume f: "finite (UNIV :: 'n set)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	620	let ?S = "{Suc 0 .. card (UNIV :: 'n set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	621	have fS: "finite ?S" using f by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	622	have fp: "\<forall> i\<in> ?S. x$i * x$i>= 0" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	623	have ?thesis by (vector dimindex_def f setsum_squares_eq_0_iff[OF fS fp])}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	624	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	625	{assume "\<not> finite (UNIV :: 'n set)" then have ?thesis by (vector dimindex_def)}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	626	ultimately show ?thesis by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	627	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	628
30263 c88af4619a73 fixed proofs; added rules as default simp-rules chaieb parents: 30242 diff changeset	629	lemma dot_pos_lt[simp]: "(0 < x \<bullet> x) \<longleftrightarrow> (x::'a::{ordered_ring_strict,ring_no_zero_divisors} ^ 'n) \<noteq> 0" using dot_eq_0[of x] dot_pos_le[of x]
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	630	by (auto simp add: le_less)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	631
30040 e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	632	subsection{* The collapse of the general concepts to dimension one. *}
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	633
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	634	lemma vector_one: "(x::'a ^1) = (\<chi> i. (x$1))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	635	by (vector dimindex_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	636
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	637	lemma forall_one: "(\<forall>(x::'a ^1). P x) \<longleftrightarrow> (\<forall>x. P(\<chi> i. x))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	638	apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	639	apply (erule_tac x= "x$1" in allE)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	640	apply (simp only: vector_one[symmetric])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	641	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	642
30040 e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	643	lemma norm_vector_1: "norm (x :: _^1) = norm (x$1)"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	644	by (simp add: vector_norm_def dimindex_def)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	645
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	646	lemma norm_real: "norm(x::real ^ 1) = abs(x$1)"
30040 e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	647	by (simp add: norm_vector_1)
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	648
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	649	text{* Metric *}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	650
30040 e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	651	text {* FIXME: generalize to arbitrary @{text real_normed_vector} types *}
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	652	definition dist:: "real ^ 'n \<Rightarrow> real ^ 'n \<Rightarrow> real" where
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	653	"dist x y = norm (x - y)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	654
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	655	lemma dist_real: "dist(x::real ^ 1) y = abs((x$1) - (y$1))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	656	using dimindex_ge_1[of "UNIV :: 1 set"]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	657	by (auto simp add: norm_real dist_def vector_component Cart_lambda_beta[where ?'a = "1"] )
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	658
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	659	subsection {* A connectedness or intermediate value lemma with several applications. *}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	660
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	661	lemma connected_real_lemma:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	662	fixes f :: "real \<Rightarrow> real ^ 'n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	663	assumes ab: "a \<le> b" and fa: "f a \<in> e1" and fb: "f b \<in> e2"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	664	and dst: "\<And>e x. a <= x \<Longrightarrow> x <= b \<Longrightarrow> 0 < e ==> \<exists>d > 0. \<forall>y. abs(y - x) < d \<longrightarrow> dist(f y) (f x) < e"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	665	and e1: "\<forall>y \<in> e1. \<exists>e > 0. \<forall>y'. dist y' y < e \<longrightarrow> y' \<in> e1"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	666	and e2: "\<forall>y \<in> e2. \<exists>e > 0. \<forall>y'. dist y' y < e \<longrightarrow> y' \<in> e2"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	667	and e12: "~(\<exists>x \<ge> a. x <= b \<and> f x \<in> e1 \<and> f x \<in> e2)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	668	shows "\<exists>x \<ge> a. x <= b \<and> f x \<notin> e1 \<and> f x \<notin> e2" (is "\<exists> x. ?P x")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	669	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	670	let ?S = "{c. \<forall>x \<ge> a. x <= c \<longrightarrow> f x \<in> e1}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	671	have Se: " \<exists>x. x \<in> ?S" apply (rule exI[where x=a]) by (auto simp add: fa)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	672	have Sub: "\<exists>y. isUb UNIV ?S y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	673	apply (rule exI[where x= b])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	674	using ab fb e12 by (auto simp add: isUb_def setle_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	675	from reals_complete[OF Se Sub] obtain l where
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	676	l: "isLub UNIV ?S l"by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	677	have alb: "a \<le> l" "l \<le> b" using l ab fa fb e12
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	678	apply (auto simp add: isLub_def leastP_def isUb_def setle_def setge_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	679	by (metis linorder_linear)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	680	have ale1: "\<forall>z \<ge> a. z < l \<longrightarrow> f z \<in> e1" using l
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	681	apply (auto simp add: isLub_def leastP_def isUb_def setle_def setge_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	682	by (metis linorder_linear not_le)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	683	have th1: "\<And>z x e d :: real. z <= x + e \<Longrightarrow> e < d ==> z < x \<or> abs(z - x) < d" by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	684	have th2: "\<And>e x:: real. 0 < e ==> ~(x + e <= x)" by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	685	have th3: "\<And>d::real. d > 0 \<Longrightarrow> \<exists>e > 0. e < d" by dlo
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	686	{assume le2: "f l \<in> e2"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	687	from le2 fa fb e12 alb have la: "l \<noteq> a" by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	688	hence lap: "l - a > 0" using alb by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	689	from e2[rule_format, OF le2] obtain e where
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	690	e: "e > 0" "\<forall>y. dist y (f l) < e \<longrightarrow> y \<in> e2" by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	691	from dst[OF alb e(1)] obtain d where
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	692	d: "d > 0" "\<forall>y. \<bar>y - l\<bar> < d \<longrightarrow> dist (f y) (f l) < e" by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	693	have "\<exists>d'. d' < d \<and> d' >0 \<and> l - d' > a" using lap d(1)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	694	apply ferrack by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	695	then obtain d' where d': "d' > 0" "d' < d" "l - d' > a" by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	696	from d e have th0: "\<forall>y. \<bar>y - l\<bar> < d \<longrightarrow> f y \<in> e2" by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	697	from th0[rule_format, of "l - d'"] d' have "f (l - d') \<in> e2" by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	698	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	699	have "f (l - d') \<in> e1" using ale1[rule_format, of "l -d'"] d' by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	700	ultimately have False using e12 alb d' by auto}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	701	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	702	{assume le1: "f l \<in> e1"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	703	from le1 fa fb e12 alb have lb: "l \<noteq> b" by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	704	hence blp: "b - l > 0" using alb by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	705	from e1[rule_format, OF le1] obtain e where
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	706	e: "e > 0" "\<forall>y. dist y (f l) < e \<longrightarrow> y \<in> e1" by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	707	from dst[OF alb e(1)] obtain d where
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	708	d: "d > 0" "\<forall>y. \<bar>y - l\<bar> < d \<longrightarrow> dist (f y) (f l) < e" by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	709	have "\<exists>d'. d' < d \<and> d' >0" using d(1) by dlo
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	710	then obtain d' where d': "d' > 0" "d' < d" by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	711	from d e have th0: "\<forall>y. \<bar>y - l\<bar> < d \<longrightarrow> f y \<in> e1" by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	712	hence "\<forall>y. l \<le> y \<and> y \<le> l + d' \<longrightarrow> f y \<in> e1" using d' by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	713	with ale1 have "\<forall>y. a \<le> y \<and> y \<le> l + d' \<longrightarrow> f y \<in> e1" by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	714	with l d' have False
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	715	by (auto simp add: isLub_def isUb_def setle_def setge_def leastP_def) }
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	716	ultimately show ?thesis using alb by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	717	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	718
29881 58f3c48dbbb7 fix document generation huffman parents: 29844 diff changeset	719	text{* One immediately useful corollary is the existence of square roots! --- Should help to get rid of all the development of square-root for reals as a special case @{typ "real^1"} *}
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	720
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	721	lemma square_bound_lemma: "(x::real) < (1 + x) * (1 + x)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	722	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	723	have "(x + 1/2)^2 + 3/4 > 0" using zero_le_power2[of "x+1/2"] by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	724	thus ?thesis by (simp add: ring_simps power2_eq_square)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	725	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	726
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	727	lemma square_continuous: "0 < (e::real) ==> \<exists>d. 0 < d \<and> (\<forall>y. abs(y - x) < d \<longrightarrow> abs(y * y - x * x) < e)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	728	using isCont_power[OF isCont_ident, of 2, unfolded isCont_def LIM_def, rule_format, of e x] apply (auto simp add: power2_eq_square)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	729	apply (rule_tac x="s" in exI)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	730	apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	731	apply (erule_tac x=y in allE)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	732	apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	733	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	734
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	735	lemma real_le_lsqrt: "0 <= x \<Longrightarrow> 0 <= y \<Longrightarrow> x <= y^2 ==> sqrt x <= y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	736	using real_sqrt_le_iff[of x "y^2"] by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	737
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	738	lemma real_le_rsqrt: "x^2 \<le> y \<Longrightarrow> x \<le> sqrt y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	739	using real_sqrt_le_mono[of "x^2" y] by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	740
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	741	lemma real_less_rsqrt: "x^2 < y \<Longrightarrow> x < sqrt y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	742	using real_sqrt_less_mono[of "x^2" y] by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	743
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	744	lemma sqrt_even_pow2: assumes n: "even n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	745	shows "sqrt(2 ^ n) = 2 ^ (n div 2)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	746	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	747	from n obtain m where m: "n = 2*m" unfolding even_nat_equiv_def2
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	748	by (auto simp add: nat_number)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	749	from m have "sqrt(2 ^ n) = sqrt ((2 ^ m) ^ 2)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	750	by (simp only: power_mult[symmetric] mult_commute)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	751	then show ?thesis using m by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	752	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	753
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	754	lemma real_div_sqrt: "0 <= x ==> x / sqrt(x) = sqrt(x)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	755	apply (cases "x = 0", simp_all)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	756	using sqrt_divide_self_eq[of x]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	757	apply (simp add: inverse_eq_divide real_sqrt_ge_0_iff field_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	758	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	759
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	760	text{* Hence derive more interesting properties of the norm. *}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	761
30263 c88af4619a73 fixed proofs; added rules as default simp-rules chaieb parents: 30242 diff changeset	762	lemma norm_0[simp]: "norm (0::real ^ 'n) = 0"
30040 e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	763	by (rule norm_zero)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	764
30263 c88af4619a73 fixed proofs; added rules as default simp-rules chaieb parents: 30242 diff changeset	765	lemma norm_mul[simp]: "norm(a s x) = abs(a) norm x"
30040 e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	766	by (simp add: vector_norm_def vector_component setL2_right_distrib
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	767	abs_mult cong: strong_setL2_cong)
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	768	lemma norm_eq_0_dot: "(norm x = 0) \<longleftrightarrow> (x \<bullet> x = (0::real))"
30040 e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	769	by (simp add: vector_norm_def dot_def setL2_def power2_eq_square)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	770	lemma real_vector_norm_def: "norm x = sqrt (x \<bullet> x)"
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	771	by (simp add: vector_norm_def setL2_def dot_def power2_eq_square)
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	772	lemma norm_pow_2: "norm x ^ 2 = x \<bullet> x"
30040 e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	773	by (simp add: real_vector_norm_def)
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	774	lemma norm_eq_0_imp: "norm x = 0 ==> x = (0::real ^'n)" by (metis norm_eq_zero)
30263 c88af4619a73 fixed proofs; added rules as default simp-rules chaieb parents: 30242 diff changeset	775	lemma vector_mul_eq_0[simp]: "(a *s x = 0) \<longleftrightarrow> a = (0::'a::idom) \<or> x = 0"
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	776	by vector
30263 c88af4619a73 fixed proofs; added rules as default simp-rules chaieb parents: 30242 diff changeset	777	lemma vector_mul_lcancel[simp]: "a s x = a s y \<longleftrightarrow> a = (0::real) \<or> x = y"
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	778	by (metis eq_iff_diff_eq_0 vector_mul_eq_0 vector_ssub_ldistrib)
30263 c88af4619a73 fixed proofs; added rules as default simp-rules chaieb parents: 30242 diff changeset	779	lemma vector_mul_rcancel[simp]: "a s x = b s x \<longleftrightarrow> (a::real) = b \<or> x = 0"
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	780	by (metis eq_iff_diff_eq_0 vector_mul_eq_0 vector_sub_rdistrib)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	781	lemma vector_mul_lcancel_imp: "a \<noteq> (0::real) ==> a s x = a s y ==> (x = y)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	782	by (metis vector_mul_lcancel)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	783	lemma vector_mul_rcancel_imp: "x \<noteq> 0 \<Longrightarrow> (a::real) s x = b s x ==> a = b"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	784	by (metis vector_mul_rcancel)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	785	lemma norm_cauchy_schwarz: "x \<bullet> y <= norm x * norm y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	786	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	787	{assume "norm x = 0"
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	788	hence ?thesis by (simp add: dot_lzero dot_rzero)}
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	789	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	790	{assume "norm y = 0"
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	791	hence ?thesis by (simp add: dot_lzero dot_rzero)}
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	792	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	793	{assume h: "norm x \<noteq> 0" "norm y \<noteq> 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	794	let ?z = "norm y s x - norm x s y"
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	795	from h have p: "norm x * norm y > 0" by (metis norm_ge_zero le_less zero_compare_simps)
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	796	from dot_pos_le[of ?z]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	797	have "(norm x * norm y) * (x \<bullet> y) \<le> norm x ^2 * norm y ^2"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	798	apply (simp add: dot_rsub dot_lsub dot_lmult dot_rmult ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	799	by (simp add: norm_pow_2[symmetric] power2_eq_square dot_sym)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	800	hence "x\<bullet>y \<le> (norm x ^2 * norm y ^2) / (norm x * norm y)" using p
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	801	by (simp add: field_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	802	hence ?thesis using h by (simp add: power2_eq_square)}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	803	ultimately show ?thesis by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	804	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	805
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	806	lemma norm_cauchy_schwarz_abs: "\<bar>x \<bullet> y\<bar> \<le> norm x * norm y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	807	using norm_cauchy_schwarz[of x y] norm_cauchy_schwarz[of x "-y"]
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	808	by (simp add: real_abs_def dot_rneg)
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	809
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	810	lemma norm_triangle_sub: "norm (x::real ^'n) <= norm(y) + norm(x - y)"
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	811	using norm_triangle_ineq[of "y" "x - y"] by (simp add: ring_simps)
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	812	lemma norm_triangle_le: "norm(x::real ^'n) + norm y <= e ==> norm(x + y) <= e"
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	813	by (metis order_trans norm_triangle_ineq)
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	814	lemma norm_triangle_lt: "norm(x::real ^'n) + norm(y) < e ==> norm(x + y) < e"
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	815	by (metis basic_trans_rules(21) norm_triangle_ineq)
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	816
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	817	lemma component_le_norm: "i \<in> {1 .. dimindex(UNIV :: 'n set)} ==> \<bar>x$i\<bar> <= norm (x::real ^ 'n)"
30040 e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	818	apply (simp add: vector_norm_def)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	819	apply (rule member_le_setL2, simp_all)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	820	done
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	821
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	822	lemma norm_bound_component_le: "norm(x::real ^ 'n) <= e
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	823	==> \<forall>i \<in> {1 .. dimindex(UNIV:: 'n set)}. \<bar>x$i\<bar> <= e"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	824	by (metis component_le_norm order_trans)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	825
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	826	lemma norm_bound_component_lt: "norm(x::real ^ 'n) < e
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	827	==> \<forall>i \<in> {1 .. dimindex(UNIV:: 'n set)}. \<bar>x$i\<bar> < e"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	828	by (metis component_le_norm basic_trans_rules(21))
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	829
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	830	lemma norm_le_l1: "norm (x:: real ^'n) <= setsum(\<lambda>i. \<bar>x$i\<bar>) {1..dimindex(UNIV::'n set)}"
30040 e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	831	by (simp add: vector_norm_def setL2_le_setsum)
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	832
30263 c88af4619a73 fixed proofs; added rules as default simp-rules chaieb parents: 30242 diff changeset	833	lemma real_abs_norm[simp]: "\<bar> norm x\<bar> = norm (x :: real ^'n)"
30040 e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	834	by (rule abs_norm_cancel)
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	835	lemma real_abs_sub_norm: "\<bar>norm(x::real ^'n) - norm y\<bar> <= norm(x - y)"
30040 e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	836	by (rule norm_triangle_ineq3)
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	837	lemma norm_le: "norm(x::real ^ 'n) <= norm(y) \<longleftrightarrow> x \<bullet> x <= y \<bullet> y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	838	by (simp add: real_vector_norm_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	839	lemma norm_lt: "norm(x::real ^'n) < norm(y) \<longleftrightarrow> x \<bullet> x < y \<bullet> y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	840	by (simp add: real_vector_norm_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	841	lemma norm_eq: "norm (x::real ^'n) = norm y \<longleftrightarrow> x \<bullet> x = y \<bullet> y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	842	by (simp add: order_eq_iff norm_le)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	843	lemma norm_eq_1: "norm(x::real ^ 'n) = 1 \<longleftrightarrow> x \<bullet> x = 1"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	844	by (simp add: real_vector_norm_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	845
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	846	text{* Squaring equations and inequalities involving norms. *}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	847
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	848	lemma dot_square_norm: "x \<bullet> x = norm(x)^2"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	849	by (simp add: real_vector_norm_def dot_pos_le )
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	850
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	851	lemma norm_eq_square: "norm(x) = a \<longleftrightarrow> 0 <= a \<and> x \<bullet> x = a^2"
30040 e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	852	by (auto simp add: real_vector_norm_def)
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	853
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	854	lemma real_abs_le_square_iff: "\<bar>x\<bar> \<le> \<bar>y\<bar> \<longleftrightarrow> (x::real)^2 \<le> y^2"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	855	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	856	have "x^2 \<le> y^2 \<longleftrightarrow> (x -y) * (y + x) \<le> 0" by (simp add: ring_simps power2_eq_square)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	857	also have "\<dots> \<longleftrightarrow> \<bar>x\<bar> \<le> \<bar>y\<bar>" apply (simp add: zero_compare_simps real_abs_def not_less) by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	858	finally show ?thesis ..
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	859	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	860
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	861	lemma norm_le_square: "norm(x) <= a \<longleftrightarrow> 0 <= a \<and> x \<bullet> x <= a^2"
30040 e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	862	apply (simp add: dot_square_norm real_abs_le_square_iff[symmetric])
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	863	using norm_ge_zero[of x]
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	864	apply arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	865	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	866
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	867	lemma norm_ge_square: "norm(x) >= a \<longleftrightarrow> a <= 0 \<or> x \<bullet> x >= a ^ 2"
30040 e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	868	apply (simp add: dot_square_norm real_abs_le_square_iff[symmetric])
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	869	using norm_ge_zero[of x]
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	870	apply arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	871	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	872
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	873	lemma norm_lt_square: "norm(x) < a \<longleftrightarrow> 0 < a \<and> x \<bullet> x < a^2"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	874	by (metis not_le norm_ge_square)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	875	lemma norm_gt_square: "norm(x) > a \<longleftrightarrow> a < 0 \<or> x \<bullet> x > a^2"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	876	by (metis norm_le_square not_less)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	877
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	878	text{* Dot product in terms of the norm rather than conversely. *}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	879
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	880	lemma dot_norm: "x \<bullet> y = (norm(x + y) ^2 - norm x ^ 2 - norm y ^ 2) / 2"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	881	by (simp add: norm_pow_2 dot_ladd dot_radd dot_sym)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	882
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	883	lemma dot_norm_neg: "x \<bullet> y = ((norm x ^ 2 + norm y ^ 2) - norm(x - y) ^ 2) / 2"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	884	by (simp add: norm_pow_2 dot_ladd dot_radd dot_lsub dot_rsub dot_sym)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	885
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	886
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	887	text{* Equality of vectors in terms of @{term "op \<bullet>"} products. *}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	888
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	889	lemma vector_eq: "(x:: real ^ 'n) = y \<longleftrightarrow> x \<bullet> x = x \<bullet> y\<and> y \<bullet> y = x \<bullet> x" (is "?lhs \<longleftrightarrow> ?rhs")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	890	proof
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	891	assume "?lhs" then show ?rhs by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	892	next
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	893	assume ?rhs
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	894	then have "x \<bullet> x - x \<bullet> y = 0 \<and> x \<bullet> y - y\<bullet> y = 0" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	895	hence "x \<bullet> (x - y) = 0 \<and> y \<bullet> (x - y) = 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	896	by (simp add: dot_rsub dot_lsub dot_sym)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	897	then have "(x - y) \<bullet> (x - y) = 0" by (simp add: ring_simps dot_lsub dot_rsub)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	898	then show "x = y" by (simp add: dot_eq_0)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	899	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	900
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	901
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	902	subsection{* General linear decision procedure for normed spaces. *}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	903
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	904	lemma norm_cmul_rule_thm: "b >= norm(x) ==> \<bar>c\<bar> * b >= norm(c *s x)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	905	apply (clarsimp simp add: norm_mul)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	906	apply (rule mult_mono1)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	907	apply simp_all
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	908	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	909
30263 c88af4619a73 fixed proofs; added rules as default simp-rules chaieb parents: 30242 diff changeset	910	(* FIXME: Move all these theorems into the ML code using lemma antiquotation *)
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	911	lemma norm_add_rule_thm: "b1 >= norm(x1 :: real ^'n) \<Longrightarrow> b2 >= norm(x2) ==> b1 + b2 >= norm(x1 + x2)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	912	apply (rule norm_triangle_le) by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	913
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	914	lemma ge_iff_diff_ge_0: "(a::'a::ordered_ring) \<ge> b == a - b \<ge> 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	915	by (simp add: ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	916
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	917	lemma pth_1: "(x::real^'n) == 1 *s x" by (simp only: vector_smult_lid)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	918	lemma pth_2: "x - (y::real^'n) == x + -y" by (atomize (full)) simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	919	lemma pth_3: "(-x::real^'n) == -1 *s x" by vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	920	lemma pth_4: "0 s (x::real^'n) == 0" "c s 0 = (0::real ^ 'n)" by vector+
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	921	lemma pth_5: "c s (d s x) == (c * d) *s (x::real ^ 'n)" by (atomize (full)) vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	922	lemma pth_6: "(c::real) s (x + y) == c s x + c *s y" by (atomize (full)) (vector ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	923	lemma pth_7: "0 + x == (x::real^'n)" "x + 0 == x" by simp_all
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	924	lemma pth_8: "(c::real) s x + d s x == (c + d) *s x" by (atomize (full)) (vector ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	925	lemma pth_9: "((c::real) s x + z) + d s x == (c + d) *s x + z"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	926	"c s x + (d s x + z) == (c + d) *s x + z"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	927	"(c s x + w) + (d s x + z) == (c + d) *s x + (w + z)" by ((atomize (full)), vector ring_simps)+
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	928	lemma pth_a: "(0::real) *s x + y == y" by (atomize (full)) vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	929	lemma pth_b: "(c::real) s x + d s y == c s x + d s y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	930	"(c s x + z) + d s y == c s x + (z + d s y)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	931	"c s x + (d s y + z) == c s x + (d s y + z)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	932	"(c s x + w) + (d s y + z) == c s x + (w + (d s y + z))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	933	by ((atomize (full)), vector)+
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	934	lemma pth_c: "(c::real) s x + d s y == d s y + c s x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	935	"(c s x + z) + d s y == d s y + (c s x + z)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	936	"c s x + (d s y + z) == d s y + (c s x + z)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	937	"(c s x + w) + (d s y + z) == d s y + ((c s x + w) + z)" by ((atomize (full)), vector)+
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	938	lemma pth_d: "x + (0::real ^'n) == x" by (atomize (full)) vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	939
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	940	lemma norm_imp_pos_and_ge: "norm (x::real ^ 'n) == n \<Longrightarrow> norm x \<ge> 0 \<and> n \<ge> norm x"
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	941	by (atomize) (auto simp add: norm_ge_zero)
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	942
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	943	lemma real_eq_0_iff_le_ge_0: "(x::real) = 0 == x \<ge> 0 \<and> -x \<ge> 0" by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	944
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	945	lemma norm_pths:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	946	"(x::real ^'n) = y \<longleftrightarrow> norm (x - y) \<le> 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	947	"x \<noteq> y \<longleftrightarrow> \<not> (norm (x - y) \<le> 0)"
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	948	using norm_ge_zero[of "x - y"] by auto
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	949
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	950	use "normarith.ML"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	951
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	952	method_setup norm = {* Method.ctxt_args (Method.SIMPLE_METHOD' o NormArith.norm_arith_tac)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	953	*} "Proves simple linear statements about vector norms"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	954
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	955
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	956
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	957	text{* Hence more metric properties. *}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	958
30263 c88af4619a73 fixed proofs; added rules as default simp-rules chaieb parents: 30242 diff changeset	959	lemma dist_refl[simp]: "dist x x = 0" by norm
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	960
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	961	lemma dist_sym: "dist x y = dist y x"by norm
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	962
30263 c88af4619a73 fixed proofs; added rules as default simp-rules chaieb parents: 30242 diff changeset	963	lemma dist_pos_le[simp]: "0 <= dist x y" by norm
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	964
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	965	lemma dist_triangle: "dist x z <= dist x y + dist y z" by norm
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	966
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	967	lemma dist_triangle_alt: "dist y z <= dist x y + dist x z" by norm
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	968
30263 c88af4619a73 fixed proofs; added rules as default simp-rules chaieb parents: 30242 diff changeset	969	lemma dist_eq_0[simp]: "dist x y = 0 \<longleftrightarrow> x = y" by norm
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	970
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	971	lemma dist_pos_lt: "x \<noteq> y ==> 0 < dist x y" by norm
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	972	lemma dist_nz: "x \<noteq> y \<longleftrightarrow> 0 < dist x y" by norm
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	973
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	974	lemma dist_triangle_le: "dist x z + dist y z <= e \<Longrightarrow> dist x y <= e" by norm
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	975
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	976	lemma dist_triangle_lt: "dist x z + dist y z < e ==> dist x y < e" by norm
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	977
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	978	lemma dist_triangle_half_l: "dist x1 y < e / 2 \<Longrightarrow> dist x2 y < e / 2 ==> dist x1 x2 < e" by norm
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	979
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	980	lemma dist_triangle_half_r: "dist y x1 < e / 2 \<Longrightarrow> dist y x2 < e / 2 ==> dist x1 x2 < e" by norm
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	981
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	982	lemma dist_triangle_add: "dist (x + y) (x' + y') <= dist x x' + dist y y'"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	983	by norm
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	984
30263 c88af4619a73 fixed proofs; added rules as default simp-rules chaieb parents: 30242 diff changeset	985	lemma dist_mul[simp]: "dist (c s x) (c s y) = \<bar>c\<bar> * dist x y"
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	986	unfolding dist_def vector_ssub_ldistrib[symmetric] norm_mul ..
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	987
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	988	lemma dist_triangle_add_half: " dist x x' < e / 2 \<Longrightarrow> dist y y' < e / 2 ==> dist(x + y) (x' + y') < e" by norm
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	989
30263 c88af4619a73 fixed proofs; added rules as default simp-rules chaieb parents: 30242 diff changeset	990	lemma dist_le_0[simp]: "dist x y <= 0 \<longleftrightarrow> x = y" by norm
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	991
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	992	lemma setsum_eq: "setsum f S = (\<chi> i. setsum (\<lambda>x. (f x)$i ) S)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	993	apply vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	994	apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	995	apply (cases "finite S")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	996	apply (rule finite_induct[of S])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	997	apply (auto simp add: vector_component zero_index)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	998	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	999
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1000	lemma setsum_clauses:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1001	shows "setsum f {} = 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1002	and "finite S \<Longrightarrow> setsum f (insert x S) =
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1003	(if x \<in> S then setsum f S else f x + setsum f S)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1004	by (auto simp add: insert_absorb)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1005
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1006	lemma setsum_cmul:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1007	fixes f:: "'c \<Rightarrow> ('a::semiring_1)^'n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1008	shows "setsum (\<lambda>x. c s f x) S = c s setsum f S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1009	by (simp add: setsum_eq Cart_eq Cart_lambda_beta vector_component setsum_right_distrib)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1010
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1011	lemma setsum_component:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1012	fixes f:: " 'a \<Rightarrow> ('b::semiring_1) ^'n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1013	assumes i: "i \<in> {1 .. dimindex(UNIV:: 'n set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1014	shows "(setsum f S)$i = setsum (\<lambda>x. (f x)$i) S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1015	using i by (simp add: setsum_eq Cart_lambda_beta)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1016
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1017	lemma setsum_norm:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1018	fixes f :: "'a \<Rightarrow> 'b::real_normed_vector"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1019	assumes fS: "finite S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1020	shows "norm (setsum f S) <= setsum (\<lambda>x. norm(f x)) S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1021	proof(induct rule: finite_induct[OF fS])
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	1022	case 1 thus ?case by simp
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1023	next
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1024	case (2 x S)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1025	from "2.hyps" have "norm (setsum f (insert x S)) \<le> norm (f x) + norm (setsum f S)" by (simp add: norm_triangle_ineq)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1026	also have "\<dots> \<le> norm (f x) + setsum (\<lambda>x. norm(f x)) S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1027	using "2.hyps" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1028	finally show ?case using "2.hyps" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1029	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1030
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1031	lemma real_setsum_norm:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1032	fixes f :: "'a \<Rightarrow> real ^'n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1033	assumes fS: "finite S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1034	shows "norm (setsum f S) <= setsum (\<lambda>x. norm(f x)) S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1035	proof(induct rule: finite_induct[OF fS])
30040 e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	1036	case 1 thus ?case by simp
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1037	next
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1038	case (2 x S)
30040 e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	1039	from "2.hyps" have "norm (setsum f (insert x S)) \<le> norm (f x) + norm (setsum f S)" by (simp add: norm_triangle_ineq)
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1040	also have "\<dots> \<le> norm (f x) + setsum (\<lambda>x. norm(f x)) S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1041	using "2.hyps" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1042	finally show ?case using "2.hyps" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1043	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1044
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1045	lemma setsum_norm_le:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1046	fixes f :: "'a \<Rightarrow> 'b::real_normed_vector"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1047	assumes fS: "finite S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1048	and fg: "\<forall>x \<in> S. norm (f x) \<le> g x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1049	shows "norm (setsum f S) \<le> setsum g S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1050	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1051	from fg have "setsum (\<lambda>x. norm(f x)) S <= setsum g S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1052	by - (rule setsum_mono, simp)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1053	then show ?thesis using setsum_norm[OF fS, of f] fg
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1054	by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1055	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1056
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1057	lemma real_setsum_norm_le:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1058	fixes f :: "'a \<Rightarrow> real ^ 'n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1059	assumes fS: "finite S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1060	and fg: "\<forall>x \<in> S. norm (f x) \<le> g x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1061	shows "norm (setsum f S) \<le> setsum g S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1062	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1063	from fg have "setsum (\<lambda>x. norm(f x)) S <= setsum g S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1064	by - (rule setsum_mono, simp)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1065	then show ?thesis using real_setsum_norm[OF fS, of f] fg
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1066	by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1067	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1068
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1069	lemma setsum_norm_bound:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1070	fixes f :: "'a \<Rightarrow> 'b::real_normed_vector"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1071	assumes fS: "finite S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1072	and K: "\<forall>x \<in> S. norm (f x) \<le> K"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1073	shows "norm (setsum f S) \<le> of_nat (card S) * K"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1074	using setsum_norm_le[OF fS K] setsum_constant[symmetric]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1075	by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1076
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1077	lemma real_setsum_norm_bound:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1078	fixes f :: "'a \<Rightarrow> real ^ 'n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1079	assumes fS: "finite S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1080	and K: "\<forall>x \<in> S. norm (f x) \<le> K"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1081	shows "norm (setsum f S) \<le> of_nat (card S) * K"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1082	using real_setsum_norm_le[OF fS K] setsum_constant[symmetric]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1083	by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1084
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1085	lemma setsum_vmul:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1086	fixes f :: "'a \<Rightarrow> 'b::{real_normed_vector,semiring, mult_zero}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1087	assumes fS: "finite S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1088	shows "setsum f S s v = setsum (\<lambda>x. f x s v) S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1089	proof(induct rule: finite_induct[OF fS])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1090	case 1 then show ?case by (simp add: vector_smult_lzero)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1091	next
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1092	case (2 x F)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1093	from "2.hyps" have "setsum f (insert x F) s v = (f x + setsum f F) s v"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1094	by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1095	also have "\<dots> = f x s v + setsum f F s v"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1096	by (simp add: vector_sadd_rdistrib)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1097	also have "\<dots> = setsum (\<lambda>x. f x *s v) (insert x F)" using "2.hyps" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1098	finally show ?case .
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1099	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1100
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1101	(* FIXME : Problem thm setsum_vmul[of _ "f:: 'a \<Rightarrow> real ^'n"] ---
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1102	Get rid of s and use real_vector instead! Also prove that ^ creates a real_vector !! )
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1103
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1104	lemma setsum_add_split: assumes mn: "(m::nat) \<le> n + 1"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1105	shows "setsum f {m..n + p} = setsum f {m..n} + setsum f {n + 1..n + p}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1106	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1107	let ?A = "{m .. n}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1108	let ?B = "{n + 1 .. n + p}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1109	have eq: "{m .. n+p} = ?A \<union> ?B" using mn by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1110	have d: "?A \<inter> ?B = {}" by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1111	from setsum_Un_disjoint[of "?A" "?B" f] eq d show ?thesis by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1112	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1113
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1114	lemma setsum_natinterval_left:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1115	assumes mn: "(m::nat) <= n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1116	shows "setsum f {m..n} = f m + setsum f {m + 1..n}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1117	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1118	from mn have "{m .. n} = insert m {m+1 .. n}" by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1119	then show ?thesis by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1120	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1121
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1122	lemma setsum_natinterval_difff:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1123	fixes f:: "nat \<Rightarrow> ('a::ab_group_add)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1124	shows "setsum (\<lambda>k. f k - f(k + 1)) {(m::nat) .. n} =
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1125	(if m <= n then f m - f(n + 1) else 0)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1126	by (induct n, auto simp add: ring_simps not_le le_Suc_eq)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1127
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1128	lemmas setsum_restrict_set' = setsum_restrict_set[unfolded Int_def]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1129
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1130	lemma setsum_setsum_restrict:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1131	"finite S \<Longrightarrow> finite T \<Longrightarrow> setsum (\<lambda>x. setsum (\<lambda>y. f x y) {y. y\<in> T \<and> R x y}) S = setsum (\<lambda>y. setsum (\<lambda>x. f x y) {x. x \<in> S \<and> R x y}) T"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1132	apply (simp add: setsum_restrict_set'[unfolded mem_def] mem_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1133	by (rule setsum_commute)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1134
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1135	lemma setsum_image_gen: assumes fS: "finite S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1136	shows "setsum g S = setsum (\<lambda>y. setsum g {x. x \<in> S \<and> f x = y}) (f ` S)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1137	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1138	{fix x assume "x \<in> S" then have "{y. y\<in> f`S \<and> f x = y} = {f x}" by auto}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1139	note th0 = this
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1140	have "setsum g S = setsum (\<lambda>x. setsum (\<lambda>y. g x) {y. y\<in> f`S \<and> f x = y}) S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1141	apply (rule setsum_cong2)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1142	by (simp add: th0)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1143	also have "\<dots> = setsum (\<lambda>y. setsum g {x. x \<in> S \<and> f x = y}) (f ` S)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1144	apply (rule setsum_setsum_restrict[OF fS])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1145	by (rule finite_imageI[OF fS])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1146	finally show ?thesis .
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1147	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1148
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1149	(* FIXME: Here too need stupid finiteness assumption on T!!! *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1150	lemma setsum_group:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1151	assumes fS: "finite S" and fT: "finite T" and fST: "f ` S \<subseteq> T"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1152	shows "setsum (\<lambda>y. setsum g {x. x\<in> S \<and> f x = y}) T = setsum g S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1153
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1154	apply (subst setsum_image_gen[OF fS, of g f])
30263 c88af4619a73 fixed proofs; added rules as default simp-rules chaieb parents: 30242 diff changeset	1155	apply (rule setsum_mono_zero_right[OF fT fST])
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1156	by (auto intro: setsum_0')
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1157
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1158	lemma vsum_norm_allsubsets_bound:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1159	fixes f:: "'a \<Rightarrow> real ^'n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1160	assumes fP: "finite P" and fPs: "\<And>Q. Q \<subseteq> P \<Longrightarrow> norm (setsum f Q) \<le> e"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1161	shows "setsum (\<lambda>x. norm (f x)) P \<le> 2 * real (dimindex(UNIV :: 'n set)) * e"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1162	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1163	let ?d = "real (dimindex (UNIV ::'n set))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1164	let ?nf = "\<lambda>x. norm (f x)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1165	let ?U = "{1 .. dimindex (UNIV :: 'n set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1166	have th0: "setsum (\<lambda>x. setsum (\<lambda>i. \<bar>f x $ i\<bar>) ?U) P = setsum (\<lambda>i. setsum (\<lambda>x. \<bar>f x $ i\<bar>) P) ?U"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1167	by (rule setsum_commute)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1168	have th1: "2 * ?d * e = of_nat (card ?U) * (2 * e)" by (simp add: real_of_nat_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1169	have "setsum ?nf P \<le> setsum (\<lambda>x. setsum (\<lambda>i. \<bar>f x $ i\<bar>) ?U) P"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1170	apply (rule setsum_mono)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1171	by (rule norm_le_l1)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1172	also have "\<dots> \<le> 2 * ?d * e"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1173	unfolding th0 th1
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1174	proof(rule setsum_bounded)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1175	fix i assume i: "i \<in> ?U"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1176	let ?Pp = "{x. x\<in> P \<and> f x $ i \<ge> 0}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1177	let ?Pn = "{x. x \<in> P \<and> f x $ i < 0}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1178	have thp: "P = ?Pp \<union> ?Pn" by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1179	have thp0: "?Pp \<inter> ?Pn ={}" by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1180	have PpP: "?Pp \<subseteq> P" and PnP: "?Pn \<subseteq> P" by blast+
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1181	have Ppe:"setsum (\<lambda>x. \<bar>f x $ i\<bar>) ?Pp \<le> e"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1182	using i component_le_norm[OF i, of "setsum (\<lambda>x. f x) ?Pp"] fPs[OF PpP]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1183	by (auto simp add: setsum_component intro: abs_le_D1)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1184	have Pne: "setsum (\<lambda>x. \<bar>f x $ i\<bar>) ?Pn \<le> e"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1185	using i component_le_norm[OF i, of "setsum (\<lambda>x. - f x) ?Pn"] fPs[OF PnP]
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	1186	by (auto simp add: setsum_negf setsum_component vector_component intro: abs_le_D1)
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1187	have "setsum (\<lambda>x. \<bar>f x $ i\<bar>) P = setsum (\<lambda>x. \<bar>f x $ i\<bar>) ?Pp + setsum (\<lambda>x. \<bar>f x $ i\<bar>) ?Pn"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1188	apply (subst thp)
30263 c88af4619a73 fixed proofs; added rules as default simp-rules chaieb parents: 30242 diff changeset	1189	apply (rule setsum_Un_zero)
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1190	using fP thp0 by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1191	also have "\<dots> \<le> 2*e" using Pne Ppe by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1192	finally show "setsum (\<lambda>x. \<bar>f x $ i\<bar>) P \<le> 2*e" .
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1193	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1194	finally show ?thesis .
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1195	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1196
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1197	lemma dot_lsum: "finite S \<Longrightarrow> setsum f S \<bullet> (y::'a::{comm_ring}^'n) = setsum (\<lambda>x. f x \<bullet> y) S "
30263 c88af4619a73 fixed proofs; added rules as default simp-rules chaieb parents: 30242 diff changeset	1198	by (induct rule: finite_induct, auto simp add: dot_lzero dot_ladd dot_radd)
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1199
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1200	lemma dot_rsum: "finite S \<Longrightarrow> (y::'a::{comm_ring}^'n) \<bullet> setsum f S = setsum (\<lambda>x. y \<bullet> f x) S "
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1201	by (induct rule: finite_induct, auto simp add: dot_rzero dot_radd)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1202
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1203	subsection{* Basis vectors in coordinate directions. *}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1204
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1205
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1206	definition "basis k = (\<chi> i. if i = k then 1 else 0)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1207
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1208	lemma delta_mult_idempotent:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1209	"(if k=a then 1 else (0::'a::semiring_1)) * (if k=a then 1 else 0) = (if k=a then 1 else 0)" by (cases "k=a", auto)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1210
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1211	lemma norm_basis:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1212	assumes k: "k \<in> {1 .. dimindex (UNIV :: 'n set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1213	shows "norm (basis k :: real ^'n) = 1"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1214	using k
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1215	apply (simp add: basis_def real_vector_norm_def dot_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1216	apply (vector delta_mult_idempotent)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1217	using setsum_delta[of "{1 .. dimindex (UNIV :: 'n set)}" "k" "\<lambda>k. 1::real"]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1218	apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1219	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1220
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1221	lemma norm_basis_1: "norm(basis 1 :: real ^'n) = 1"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1222	apply (simp add: basis_def real_vector_norm_def dot_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1223	apply (vector delta_mult_idempotent)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1224	using setsum_delta[of "{1 .. dimindex (UNIV :: 'n set)}" "1" "\<lambda>k. 1::real"] dimindex_nonzero[of "UNIV :: 'n set"]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1225	apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1226	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1227
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1228	lemma vector_choose_size: "0 <= c ==> \<exists>(x::real^'n). norm x = c"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1229	apply (rule exI[where x="c *s basis 1"])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1230	by (simp only: norm_mul norm_basis_1)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1231
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1232	lemma vector_choose_dist: assumes e: "0 <= e"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1233	shows "\<exists>(y::real^'n). dist x y = e"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1234	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1235	from vector_choose_size[OF e] obtain c:: "real ^'n" where "norm c = e"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1236	by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1237	then have "dist x (x - c) = e" by (simp add: dist_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1238	then show ?thesis by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1239	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1240
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1241	lemma basis_inj: "inj_on (basis :: nat \<Rightarrow> real ^'n) {1 .. dimindex (UNIV :: 'n set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1242	by (auto simp add: inj_on_def basis_def Cart_eq Cart_lambda_beta)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1243
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1244	lemma basis_component: "i \<in> {1 .. dimindex(UNIV:: 'n set)} ==> (basis k ::('a::semiring_1)^'n)$i = (if k=i then 1 else 0)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1245	by (simp add: basis_def Cart_lambda_beta)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1246
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1247	lemma cond_value_iff: "f (if b then x else y) = (if b then f x else f y)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1248	by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1249
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1250	lemma basis_expansion:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1251	"setsum (\<lambda>i. (x$i) *s basis i) {1 .. dimindex (UNIV :: 'n set)} = (x::('a::ring_1) ^'n)" (is "?lhs = ?rhs" is "setsum ?f ?S = _")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1252	by (auto simp add: Cart_eq basis_component[where ?'n = "'n"] setsum_component vector_component cond_value_iff setsum_delta[of "?S", where ?'b = "'a", simplified] cong del: if_weak_cong)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1253
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1254	lemma basis_expansion_unique:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1255	"setsum (\<lambda>i. f i *s basis i) {1 .. dimindex (UNIV :: 'n set)} = (x::('a::comm_ring_1) ^'n) \<longleftrightarrow> (\<forall>i\<in>{1 .. dimindex(UNIV:: 'n set)}. f i = x$i)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1256	by (simp add: Cart_eq setsum_component vector_component basis_component setsum_delta cond_value_iff cong del: if_weak_cong)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1257
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1258	lemma cond_application_beta: "(if b then f else g) x = (if b then f x else g x)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1259	by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1260
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1261	lemma dot_basis:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1262	assumes i: "i \<in> {1 .. dimindex (UNIV :: 'n set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1263	shows "basis i \<bullet> x = x$i" "x \<bullet> (basis i :: 'a^'n) = (x$i :: 'a::semiring_1)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1264	using i
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1265	by (auto simp add: dot_def basis_def Cart_lambda_beta cond_application_beta cond_value_iff setsum_delta cong del: if_weak_cong)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1266
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1267	lemma basis_eq_0: "basis i = (0::'a::semiring_1^'n) \<longleftrightarrow> i \<notin> {1..dimindex(UNIV ::'n set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1268	by (auto simp add: Cart_eq basis_component zero_index)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1269
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1270	lemma basis_nonzero:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1271	assumes k: "k \<in> {1 .. dimindex(UNIV ::'n set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1272	shows "basis k \<noteq> (0:: 'a::semiring_1 ^'n)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1273	using k by (simp add: basis_eq_0)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1274
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1275	lemma vector_eq_ldot: "(\<forall>x. x \<bullet> y = x \<bullet> z) \<longleftrightarrow> y = (z::'a::semiring_1^'n)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1276	apply (auto simp add: Cart_eq dot_basis)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1277	apply (erule_tac x="basis i" in allE)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1278	apply (simp add: dot_basis)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1279	apply (subgoal_tac "y = z")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1280	apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1281	apply vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1282	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1283
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1284	lemma vector_eq_rdot: "(\<forall>z. x \<bullet> z = y \<bullet> z) \<longleftrightarrow> x = (y::'a::semiring_1^'n)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1285	apply (auto simp add: Cart_eq dot_basis)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1286	apply (erule_tac x="basis i" in allE)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1287	apply (simp add: dot_basis)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1288	apply (subgoal_tac "x = y")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1289	apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1290	apply vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1291	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1292
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1293	subsection{* Orthogonality. *}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1294
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1295	definition "orthogonal x y \<longleftrightarrow> (x \<bullet> y = 0)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1296
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1297	lemma orthogonal_basis:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1298	assumes i:"i \<in> {1 .. dimindex(UNIV ::'n set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1299	shows "orthogonal (basis i :: 'a^'n) x \<longleftrightarrow> x$i = (0::'a::ring_1)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1300	using i
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1301	by (auto simp add: orthogonal_def dot_def basis_def Cart_lambda_beta cond_value_iff cond_application_beta setsum_delta cong del: if_weak_cong)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1302
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1303	lemma orthogonal_basis_basis:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1304	assumes i:"i \<in> {1 .. dimindex(UNIV ::'n set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1305	and j: "j \<in> {1 .. dimindex(UNIV ::'n set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1306	shows "orthogonal (basis i :: 'a::ring_1^'n) (basis j) \<longleftrightarrow> i \<noteq> j"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1307	unfolding orthogonal_basis[OF i] basis_component[OF i] by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1308
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1309	(* FIXME : Maybe some of these require less than comm_ring, but not all*)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1310	lemma orthogonal_clauses:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1311	"orthogonal a (0::'a::comm_ring ^'n)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1312	"orthogonal a x ==> orthogonal a (c *s x)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1313	"orthogonal a x ==> orthogonal a (-x)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1314	"orthogonal a x \<Longrightarrow> orthogonal a y ==> orthogonal a (x + y)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1315	"orthogonal a x \<Longrightarrow> orthogonal a y ==> orthogonal a (x - y)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1316	"orthogonal 0 a"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1317	"orthogonal x a ==> orthogonal (c *s x) a"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1318	"orthogonal x a ==> orthogonal (-x) a"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1319	"orthogonal x a \<Longrightarrow> orthogonal y a ==> orthogonal (x + y) a"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1320	"orthogonal x a \<Longrightarrow> orthogonal y a ==> orthogonal (x - y) a"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1321	unfolding orthogonal_def dot_rneg dot_rmult dot_radd dot_rsub
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1322	dot_lzero dot_rzero dot_lneg dot_lmult dot_ladd dot_lsub
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1323	by simp_all
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1324
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1325	lemma orthogonal_commute: "orthogonal (x::'a::{ab_semigroup_mult,comm_monoid_add} ^'n)y \<longleftrightarrow> orthogonal y x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1326	by (simp add: orthogonal_def dot_sym)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1327
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1328	subsection{* Explicit vector construction from lists. *}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1329
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1330	lemma Cart_lambda_beta_1[simp]: "(Cart_lambda g)$1 = g 1"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1331	apply (rule Cart_lambda_beta[rule_format])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1332	using dimindex_ge_1 apply auto done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1333
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1334	lemma Cart_lambda_beta_1'[simp]: "(Cart_lambda g)$(Suc 0) = g 1"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1335	by (simp only: One_nat_def[symmetric] Cart_lambda_beta_1)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1336
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1337	definition "vector l = (\<chi> i. if i <= length l then l ! (i - 1) else 0)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1338
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1339	lemma vector_1: "(vector[x]) $1 = x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1340	using dimindex_ge_1
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1341	by (auto simp add: vector_def Cart_lambda_beta[rule_format])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1342	lemma dimindex_2[simp]: "2 \<in> {1 .. dimindex (UNIV :: 2 set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1343	by (auto simp add: dimindex_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1344	lemma dimindex_2'[simp]: "2 \<in> {Suc 0 .. dimindex (UNIV :: 2 set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1345	by (auto simp add: dimindex_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1346	lemma dimindex_3[simp]: "2 \<in> {1 .. dimindex (UNIV :: 3 set)}" "3 \<in> {1 .. dimindex (UNIV :: 3 set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1347	by (auto simp add: dimindex_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1348
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1349	lemma dimindex_3'[simp]: "2 \<in> {Suc 0 .. dimindex (UNIV :: 3 set)}" "3 \<in> {Suc 0 .. dimindex (UNIV :: 3 set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1350	by (auto simp add: dimindex_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1351
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1352	lemma vector_2:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1353	"(vector[x,y]) $1 = x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1354	"(vector[x,y] :: 'a^2)$2 = (y::'a::zero)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1355	apply (simp add: vector_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1356	using Cart_lambda_beta[rule_format, OF dimindex_2, of "\<lambda>i. if i \<le> length [x,y] then [x,y] ! (i - 1) else (0::'a)"]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1357	apply (simp only: vector_def )
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1358	apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1359	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1360
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1361	lemma vector_3:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1362	"(vector [x,y,z] ::('a::zero)^3)$1 = x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1363	"(vector [x,y,z] ::('a::zero)^3)$2 = y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1364	"(vector [x,y,z] ::('a::zero)^3)$3 = z"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1365	apply (simp_all add: vector_def Cart_lambda_beta dimindex_3)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1366	using Cart_lambda_beta[rule_format, OF dimindex_3(1), of "\<lambda>i. if i \<le> length [x,y,z] then [x,y,z] ! (i - 1) else (0::'a)"] using Cart_lambda_beta[rule_format, OF dimindex_3(2), of "\<lambda>i. if i \<le> length [x,y,z] then [x,y,z] ! (i - 1) else (0::'a)"]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1367	by simp_all
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1368
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1369	lemma forall_vector_1: "(\<forall>v::'a::zero^1. P v) \<longleftrightarrow> (\<forall>x. P(vector[x]))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1370	apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1371	apply (erule_tac x="v$1" in allE)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1372	apply (subgoal_tac "vector [v$1] = v")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1373	apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1374	by (vector vector_def dimindex_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1375
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1376	lemma forall_vector_2: "(\<forall>v::'a::zero^2. P v) \<longleftrightarrow> (\<forall>x y. P(vector[x, y]))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1377	apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1378	apply (erule_tac x="v$1" in allE)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1379	apply (erule_tac x="v$2" in allE)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1380	apply (subgoal_tac "vector [v$1, v$2] = v")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1381	apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1382	apply (vector vector_def dimindex_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1383	apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1384	apply (subgoal_tac "i = 1 \<or> i =2", auto)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1385	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1386
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1387	lemma forall_vector_3: "(\<forall>v::'a::zero^3. P v) \<longleftrightarrow> (\<forall>x y z. P(vector[x, y, z]))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1388	apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1389	apply (erule_tac x="v$1" in allE)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1390	apply (erule_tac x="v$2" in allE)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1391	apply (erule_tac x="v$3" in allE)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1392	apply (subgoal_tac "vector [v$1, v$2, v$3] = v")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1393	apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1394	apply (vector vector_def dimindex_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1395	apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1396	apply (subgoal_tac "i = 1 \<or> i =2 \<or> i = 3", auto)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1397	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1398
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1399	subsection{* Linear functions. *}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1400
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1401	definition "linear f \<longleftrightarrow> (\<forall>x y. f(x + y) = f x + f y) \<and> (\<forall>c x. f(c s x) = c s f x)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1402
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1403	lemma linear_compose_cmul: "linear f ==> linear (\<lambda>x. (c::'a::comm_semiring) *s f x)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1404	by (vector linear_def Cart_eq Cart_lambda_beta[rule_format] ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1405
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1406	lemma linear_compose_neg: "linear (f :: 'a ^'n \<Rightarrow> 'a::comm_ring ^'m) ==> linear (\<lambda>x. -(f(x)))" by (vector linear_def Cart_eq)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1407
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1408	lemma linear_compose_add: "linear (f :: 'a ^'n \<Rightarrow> 'a::semiring_1 ^'m) \<Longrightarrow> linear g ==> linear (\<lambda>x. f(x) + g(x))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1409	by (vector linear_def Cart_eq ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1410
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1411	lemma linear_compose_sub: "linear (f :: 'a ^'n \<Rightarrow> 'a::ring_1 ^'m) \<Longrightarrow> linear g ==> linear (\<lambda>x. f x - g x)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1412	by (vector linear_def Cart_eq ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1413
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1414	lemma linear_compose: "linear f \<Longrightarrow> linear g ==> linear (g o f)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1415	by (simp add: linear_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1416
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1417	lemma linear_id: "linear id" by (simp add: linear_def id_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1418
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1419	lemma linear_zero: "linear (\<lambda>x. 0::'a::semiring_1 ^ 'n)" by (simp add: linear_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1420
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1421	lemma linear_compose_setsum:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1422	assumes fS: "finite S" and lS: "\<forall>a \<in> S. linear (f a :: 'a::semiring_1 ^ 'n \<Rightarrow> 'a ^ 'm)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1423	shows "linear(\<lambda>x. setsum (\<lambda>a. f a x :: 'a::semiring_1 ^'m) S)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1424	using lS
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1425	apply (induct rule: finite_induct[OF fS])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1426	by (auto simp add: linear_zero intro: linear_compose_add)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1427
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1428	lemma linear_vmul_component:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1429	fixes f:: "'a::semiring_1^'m \<Rightarrow> 'a^'n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1430	assumes lf: "linear f" and k: "k \<in> {1 .. dimindex (UNIV :: 'n set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1431	shows "linear (\<lambda>x. f x $ k *s v)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1432	using lf k
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1433	apply (auto simp add: linear_def )
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1434	by (vector ring_simps)+
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1435
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1436	lemma linear_0: "linear f ==> f 0 = (0::'a::semiring_1 ^'n)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1437	unfolding linear_def
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1438	apply clarsimp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1439	apply (erule allE[where x="0::'a"])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1440	apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1441	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1442
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1443	lemma linear_cmul: "linear f ==> f(cs x) = c s f x" by (simp add: linear_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1444
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1445	lemma linear_neg: "linear (f :: 'a::ring_1 ^'n \<Rightarrow> _) ==> f (-x) = - f x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1446	unfolding vector_sneg_minus1
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1447	using linear_cmul[of f] by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1448
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1449	lemma linear_add: "linear f ==> f(x + y) = f x + f y" by (metis linear_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1450
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1451	lemma linear_sub: "linear (f::'a::ring_1 ^'n \<Rightarrow> _) ==> f(x - y) = f x - f y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1452	by (simp add: diff_def linear_add linear_neg)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1453
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1454	lemma linear_setsum:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1455	fixes f:: "'a::semiring_1^'n \<Rightarrow> _"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1456	assumes lf: "linear f" and fS: "finite S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1457	shows "f (setsum g S) = setsum (f o g) S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1458	proof (induct rule: finite_induct[OF fS])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1459	case 1 thus ?case by (simp add: linear_0[OF lf])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1460	next
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1461	case (2 x F)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1462	have "f (setsum g (insert x F)) = f (g x + setsum g F)" using "2.hyps"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1463	by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1464	also have "\<dots> = f (g x) + f (setsum g F)" using linear_add[OF lf] by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1465	also have "\<dots> = setsum (f o g) (insert x F)" using "2.hyps" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1466	finally show ?case .
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1467	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1468
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1469	lemma linear_setsum_mul:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1470	fixes f:: "'a ^'n \<Rightarrow> 'a::semiring_1^'m"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1471	assumes lf: "linear f" and fS: "finite S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1472	shows "f (setsum (\<lambda>i. c i s v i) S) = setsum (\<lambda>i. c i s f (v i)) S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1473	using linear_setsum[OF lf fS, of "\<lambda>i. c i *s v i" , unfolded o_def]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1474	linear_cmul[OF lf] by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1475
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1476	lemma linear_injective_0:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1477	assumes lf: "linear (f:: 'a::ring_1 ^ 'n \<Rightarrow> _)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1478	shows "inj f \<longleftrightarrow> (\<forall>x. f x = 0 \<longrightarrow> x = 0)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1479	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1480	have "inj f \<longleftrightarrow> (\<forall> x y. f x = f y \<longrightarrow> x = y)" by (simp add: inj_on_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1481	also have "\<dots> \<longleftrightarrow> (\<forall> x y. f x - f y = 0 \<longrightarrow> x - y = 0)" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1482	also have "\<dots> \<longleftrightarrow> (\<forall> x y. f (x - y) = 0 \<longrightarrow> x - y = 0)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1483	by (simp add: linear_sub[OF lf])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1484	also have "\<dots> \<longleftrightarrow> (\<forall> x. f x = 0 \<longrightarrow> x = 0)" by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1485	finally show ?thesis .
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1486	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1487
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1488	lemma linear_bounded:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1489	fixes f:: "real ^'m \<Rightarrow> real ^'n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1490	assumes lf: "linear f"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1491	shows "\<exists>B. \<forall>x. norm (f x) \<le> B * norm x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1492	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1493	let ?S = "{1..dimindex(UNIV:: 'm set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1494	let ?B = "setsum (\<lambda>i. norm(f(basis i))) ?S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1495	have fS: "finite ?S" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1496	{fix x:: "real ^ 'm"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1497	let ?g = "(\<lambda>i::nat. (x$i) *s (basis i) :: real ^ 'm)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1498	have "norm (f x) = norm (f (setsum (\<lambda>i. (x$i) *s (basis i)) ?S))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1499	by (simp only: basis_expansion)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1500	also have "\<dots> = norm (setsum (\<lambda>i. (x$i) *s f (basis i))?S)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1501	using linear_setsum[OF lf fS, of ?g, unfolded o_def] linear_cmul[OF lf]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1502	by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1503	finally have th0: "norm (f x) = norm (setsum (\<lambda>i. (x$i) *s f (basis i))?S)" .
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1504	{fix i assume i: "i \<in> ?S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1505	from component_le_norm[OF i, of x]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1506	have "norm ((x$i) s f (basis i :: real ^'m)) \<le> norm (f (basis i)) norm x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1507	unfolding norm_mul
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1508	apply (simp only: mult_commute)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1509	apply (rule mult_mono)
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	1510	by (auto simp add: ring_simps norm_ge_zero) }
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1511	then have th: "\<forall>i\<in> ?S. norm ((x$i) s f (basis i :: real ^'m)) \<le> norm (f (basis i)) norm x" by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1512	from real_setsum_norm_le[OF fS, of "\<lambda>i. (x$i) *s (f (basis i))", OF th]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1513	have "norm (f x) \<le> ?B * norm x" unfolding th0 setsum_left_distrib by metis}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1514	then show ?thesis by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1515	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1516
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1517	lemma linear_bounded_pos:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1518	fixes f:: "real ^'n \<Rightarrow> real ^ 'm"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1519	assumes lf: "linear f"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1520	shows "\<exists>B > 0. \<forall>x. norm (f x) \<le> B * norm x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1521	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1522	from linear_bounded[OF lf] obtain B where
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1523	B: "\<forall>x. norm (f x) \<le> B * norm x" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1524	let ?K = "\<bar>B\<bar> + 1"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1525	have Kp: "?K > 0" by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1526	{assume C: "B < 0"
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	1527	have "norm (1::real ^ 'n) > 0" by (simp add: zero_less_norm_iff)
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1528	with C have "B * norm (1:: real ^ 'n) < 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1529	by (simp add: zero_compare_simps)
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	1530	with B[rule_format, of 1] norm_ge_zero[of "f 1"] have False by simp
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1531	}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1532	then have Bp: "B \<ge> 0" by ferrack
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1533	{fix x::"real ^ 'n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1534	have "norm (f x) \<le> ?K * norm x"
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	1535	using B[rule_format, of x] norm_ge_zero[of x] norm_ge_zero[of "f x"] Bp
30040 e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	1536	apply (auto simp add: ring_simps split add: abs_split)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	1537	apply (erule order_trans, simp)
e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	1538	done
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1539	}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1540	then show ?thesis using Kp by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1541	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1542
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1543	subsection{* Bilinear functions. *}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1544
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1545	definition "bilinear f \<longleftrightarrow> (\<forall>x. linear(\<lambda>y. f x y)) \<and> (\<forall>y. linear(\<lambda>x. f x y))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1546
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1547	lemma bilinear_ladd: "bilinear h ==> h (x + y) z = (h x z) + (h y z)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1548	by (simp add: bilinear_def linear_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1549	lemma bilinear_radd: "bilinear h ==> h x (y + z) = (h x y) + (h x z)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1550	by (simp add: bilinear_def linear_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1551
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1552	lemma bilinear_lmul: "bilinear h ==> h (c s x) y = c s (h x y)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1553	by (simp add: bilinear_def linear_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1554
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1555	lemma bilinear_rmul: "bilinear h ==> h x (c s y) = c s (h x y)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1556	by (simp add: bilinear_def linear_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1557
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1558	lemma bilinear_lneg: "bilinear h ==> h (- (x:: 'a::ring_1 ^ 'n)) y = -(h x y)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1559	by (simp only: vector_sneg_minus1 bilinear_lmul)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1560
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1561	lemma bilinear_rneg: "bilinear h ==> h x (- (y:: 'a::ring_1 ^ 'n)) = - h x y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1562	by (simp only: vector_sneg_minus1 bilinear_rmul)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1563
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1564	lemma (in ab_group_add) eq_add_iff: "x = x + y \<longleftrightarrow> y = 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1565	using add_imp_eq[of x y 0] by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1566
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1567	lemma bilinear_lzero:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1568	fixes h :: "'a::ring^'n \<Rightarrow> _" assumes bh: "bilinear h" shows "h 0 x = 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1569	using bilinear_ladd[OF bh, of 0 0 x]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1570	by (simp add: eq_add_iff ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1571
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1572	lemma bilinear_rzero:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1573	fixes h :: "'a::ring^'n \<Rightarrow> _" assumes bh: "bilinear h" shows "h x 0 = 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1574	using bilinear_radd[OF bh, of x 0 0 ]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1575	by (simp add: eq_add_iff ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1576
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1577	lemma bilinear_lsub: "bilinear h ==> h (x - (y:: 'a::ring_1 ^ 'n)) z = h x z - h y z"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1578	by (simp add: diff_def bilinear_ladd bilinear_lneg)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1579
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1580	lemma bilinear_rsub: "bilinear h ==> h z (x - (y:: 'a::ring_1 ^ 'n)) = h z x - h z y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1581	by (simp add: diff_def bilinear_radd bilinear_rneg)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1582
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1583	lemma bilinear_setsum:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1584	fixes h:: "'a ^'n \<Rightarrow> 'a::semiring_1^'m \<Rightarrow> 'a ^ 'k"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1585	assumes bh: "bilinear h" and fS: "finite S" and fT: "finite T"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1586	shows "h (setsum f S) (setsum g T) = setsum (\<lambda>(i,j). h (f i) (g j)) (S \<times> T) "
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1587	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1588	have "h (setsum f S) (setsum g T) = setsum (\<lambda>x. h (f x) (setsum g T)) S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1589	apply (rule linear_setsum[unfolded o_def])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1590	using bh fS by (auto simp add: bilinear_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1591	also have "\<dots> = setsum (\<lambda>x. setsum (\<lambda>y. h (f x) (g y)) T) S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1592	apply (rule setsum_cong, simp)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1593	apply (rule linear_setsum[unfolded o_def])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1594	using bh fT by (auto simp add: bilinear_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1595	finally show ?thesis unfolding setsum_cartesian_product .
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1596	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1597
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1598	lemma bilinear_bounded:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1599	fixes h:: "real ^'m \<Rightarrow> real^'n \<Rightarrow> real ^ 'k"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1600	assumes bh: "bilinear h"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1601	shows "\<exists>B. \<forall>x y. norm (h x y) \<le> B * norm x * norm y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1602	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1603	let ?M = "{1 .. dimindex (UNIV :: 'm set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1604	let ?N = "{1 .. dimindex (UNIV :: 'n set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1605	let ?B = "setsum (\<lambda>(i,j). norm (h (basis i) (basis j))) (?M \<times> ?N)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1606	have fM: "finite ?M" and fN: "finite ?N" by simp_all
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1607	{fix x:: "real ^ 'm" and y :: "real^'n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1608	have "norm (h x y) = norm (h (setsum (\<lambda>i. (x$i) s basis i) ?M) (setsum (\<lambda>i. (y$i) s basis i) ?N))" unfolding basis_expansion ..
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1609	also have "\<dots> = norm (setsum (\<lambda> (i,j). h ((x$i) s basis i) ((y$j) s basis j)) (?M \<times> ?N))" unfolding bilinear_setsum[OF bh fM fN] ..
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1610	finally have th: "norm (h x y) = \<dots>" .
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1611	have "norm (h x y) \<le> ?B * norm x * norm y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1612	apply (simp add: setsum_left_distrib th)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1613	apply (rule real_setsum_norm_le)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1614	using fN fM
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1615	apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1616	apply (auto simp add: bilinear_rmul[OF bh] bilinear_lmul[OF bh] norm_mul ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1617	apply (rule mult_mono)
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	1618	apply (auto simp add: norm_ge_zero zero_le_mult_iff component_le_norm)
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1619	apply (rule mult_mono)
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	1620	apply (auto simp add: norm_ge_zero zero_le_mult_iff component_le_norm)
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1621	done}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1622	then show ?thesis by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1623	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1624
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1625	lemma bilinear_bounded_pos:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1626	fixes h:: "real ^'m \<Rightarrow> real^'n \<Rightarrow> real ^ 'k"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1627	assumes bh: "bilinear h"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1628	shows "\<exists>B > 0. \<forall>x y. norm (h x y) \<le> B * norm x * norm y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1629	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1630	from bilinear_bounded[OF bh] obtain B where
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1631	B: "\<forall>x y. norm (h x y) \<le> B * norm x * norm y" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1632	let ?K = "\<bar>B\<bar> + 1"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1633	have Kp: "?K > 0" by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1634	have KB: "B < ?K" by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1635	{fix x::"real ^'m" and y :: "real ^'n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1636	from KB Kp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1637	have "B * norm x * norm y \<le> ?K * norm x * norm y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1638	apply -
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1639	apply (rule mult_right_mono, rule mult_right_mono)
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	1640	by (auto simp add: norm_ge_zero)
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1641	then have "norm (h x y) \<le> ?K * norm x * norm y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1642	using B[rule_format, of x y] by simp}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1643	with Kp show ?thesis by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1644	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1645
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1646	subsection{* Adjoints. *}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1647
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1648	definition "adjoint f = (SOME f'. \<forall>x y. f x \<bullet> y = x \<bullet> f' y)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1649
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1650	lemma choice_iff: "(\<forall>x. \<exists>y. P x y) \<longleftrightarrow> (\<exists>f. \<forall>x. P x (f x))" by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1651
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1652	lemma adjoint_works_lemma:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1653	fixes f:: "'a::ring_1 ^'n \<Rightarrow> 'a ^ 'm"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1654	assumes lf: "linear f"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1655	shows "\<forall>x y. f x \<bullet> y = x \<bullet> adjoint f y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1656	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1657	let ?N = "{1 .. dimindex (UNIV :: 'n set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1658	let ?M = "{1 .. dimindex (UNIV :: 'm set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1659	have fN: "finite ?N" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1660	have fM: "finite ?M" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1661	{fix y:: "'a ^ 'm"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1662	let ?w = "(\<chi> i. (f (basis i) \<bullet> y)) :: 'a ^ 'n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1663	{fix x
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1664	have "f x \<bullet> y = f (setsum (\<lambda>i. (x$i) *s basis i) ?N) \<bullet> y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1665	by (simp only: basis_expansion)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1666	also have "\<dots> = (setsum (\<lambda>i. (x$i) *s f (basis i)) ?N) \<bullet> y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1667	unfolding linear_setsum[OF lf fN]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1668	by (simp add: linear_cmul[OF lf])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1669	finally have "f x \<bullet> y = x \<bullet> ?w"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1670	apply (simp only: )
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1671	apply (simp add: dot_def setsum_component Cart_lambda_beta setsum_left_distrib setsum_right_distrib vector_component setsum_commute[of _ ?M ?N] ring_simps del: One_nat_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1672	done}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1673	}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1674	then show ?thesis unfolding adjoint_def
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1675	some_eq_ex[of "\<lambda>f'. \<forall>x y. f x \<bullet> y = x \<bullet> f' y"]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1676	using choice_iff[of "\<lambda>a b. \<forall>x. f x \<bullet> a = x \<bullet> b "]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1677	by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1678	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1679
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1680	lemma adjoint_works:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1681	fixes f:: "'a::ring_1 ^'n \<Rightarrow> 'a ^ 'm"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1682	assumes lf: "linear f"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1683	shows "x \<bullet> adjoint f y = f x \<bullet> y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1684	using adjoint_works_lemma[OF lf] by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1685
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1686
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1687	lemma adjoint_linear:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1688	fixes f :: "'a::comm_ring_1 ^'n \<Rightarrow> 'a ^ 'm"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1689	assumes lf: "linear f"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1690	shows "linear (adjoint f)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1691	by (simp add: linear_def vector_eq_ldot[symmetric] dot_radd dot_rmult adjoint_works[OF lf])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1692
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1693	lemma adjoint_clauses:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1694	fixes f:: "'a::comm_ring_1 ^'n \<Rightarrow> 'a ^ 'm"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1695	assumes lf: "linear f"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1696	shows "x \<bullet> adjoint f y = f x \<bullet> y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1697	and "adjoint f y \<bullet> x = y \<bullet> f x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1698	by (simp_all add: adjoint_works[OF lf] dot_sym )
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1699
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1700	lemma adjoint_adjoint:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1701	fixes f:: "'a::comm_ring_1 ^ 'n \<Rightarrow> _"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1702	assumes lf: "linear f"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1703	shows "adjoint (adjoint f) = f"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1704	apply (rule ext)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1705	by (simp add: vector_eq_ldot[symmetric] adjoint_clauses[OF adjoint_linear[OF lf]] adjoint_clauses[OF lf])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1706
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1707	lemma adjoint_unique:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1708	fixes f:: "'a::comm_ring_1 ^ 'n \<Rightarrow> 'a ^ 'm"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1709	assumes lf: "linear f" and u: "\<forall>x y. f' x \<bullet> y = x \<bullet> f y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1710	shows "f' = adjoint f"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1711	apply (rule ext)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1712	using u
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1713	by (simp add: vector_eq_rdot[symmetric] adjoint_clauses[OF lf])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1714
29881 58f3c48dbbb7 fix document generation huffman parents: 29844 diff changeset	1715	text{* Matrix notation. NB: an MxN matrix is of type @{typ "'a^'n^'m"}, not @{typ "'a^'m^'n"} *}
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1716
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1717	consts generic_mult :: "'a \<Rightarrow> 'b \<Rightarrow> 'c" (infixr "\<star>" 75)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1718
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1719	defs (overloaded)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1720	matrix_matrix_mult_def: "(m:: ('a::semiring_1) ^'n^'m) \<star> (m' :: 'a ^'p^'n) \<equiv> (\<chi> i j. setsum (\<lambda>k. ((m$i)$k) * ((m'$k)$j)) {1 .. dimindex (UNIV :: 'n set)}) ::'a ^ 'p ^'m"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1721
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1722	abbreviation
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1723	matrix_matrix_mult' :: "('a::semiring_1) ^'n^'m \<Rightarrow> 'a ^'p^'n \<Rightarrow> 'a ^ 'p ^'m" (infixl "**" 70)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1724	where "m ** m' == m\<star> m'"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1725
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1726	defs (overloaded)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1727	matrix_vector_mult_def: "(m::('a::semiring_1) ^'n^'m) \<star> (x::'a ^'n) \<equiv> (\<chi> i. setsum (\<lambda>j. ((m$i)$j) * (x$j)) {1..dimindex(UNIV ::'n set)}) :: 'a^'m"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1728
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1729	abbreviation
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1730	matrix_vector_mult' :: "('a::semiring_1) ^'n^'m \<Rightarrow> 'a ^'n \<Rightarrow> 'a ^ 'm" (infixl "*v" 70)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1731	where
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1732	"m *v v == m \<star> v"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1733
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1734	defs (overloaded)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1735	vector_matrix_mult_def: "(x::'a^'m) \<star> (m::('a::semiring_1) ^'n^'m) \<equiv> (\<chi> j. setsum (\<lambda>i. ((m$i)$j) * (x$i)) {1..dimindex(UNIV :: 'm set)}) :: 'a^'n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1736
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1737	abbreviation
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1738	vactor_matrix_mult' :: "'a ^ 'm \<Rightarrow> ('a::semiring_1) ^'n^'m \<Rightarrow> 'a ^'n " (infixl "v*" 70)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1739	where
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1740	"v v* m == v \<star> m"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1741
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1742	definition "(mat::'a::zero => 'a ^'n^'m) k = (\<chi> i j. if i = j then k else 0)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1743	definition "(transp::'a^'n^'m \<Rightarrow> 'a^'m^'n) A = (\<chi> i j. ((A$j)$i))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1744	definition "(row::nat => 'a ^'n^'m \<Rightarrow> 'a ^'n) i A = (\<chi> j. ((A$i)$j))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1745	definition "(column::nat =>'a^'n^'m =>'a^'m) j A = (\<chi> i. ((A$i)$j))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1746	definition "rows(A::'a^'n^'m) = { row i A \| i. i \<in> {1 .. dimindex(UNIV :: 'm set)}}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1747	definition "columns(A::'a^'n^'m) = { column i A \| i. i \<in> {1 .. dimindex(UNIV :: 'n set)}}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1748
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1749	lemma mat_0[simp]: "mat 0 = 0" by (vector mat_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1750	lemma matrix_add_ldistrib: "(A ** (B + C)) = (A \<star> B) + (A \<star> C)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1751	by (vector matrix_matrix_mult_def setsum_addf[symmetric] ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1752
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1753	lemma setsum_delta':
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1754	assumes fS: "finite S" shows
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1755	"setsum (\<lambda>k. if a = k then b k else 0) S =
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1756	(if a\<in> S then b a else 0)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1757	using setsum_delta[OF fS, of a b, symmetric]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1758	by (auto intro: setsum_cong)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1759
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1760	lemma matrix_mul_lid: "mat 1 ** A = A"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1761	apply (simp add: matrix_matrix_mult_def mat_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1762	apply vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1763	by (auto simp only: cond_value_iff cond_application_beta setsum_delta'[OF finite_atLeastAtMost] mult_1_left mult_zero_left if_True)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1764
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1765
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1766	lemma matrix_mul_rid: "A ** mat 1 = A"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1767	apply (simp add: matrix_matrix_mult_def mat_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1768	apply vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1769	by (auto simp only: cond_value_iff cond_application_beta setsum_delta[OF finite_atLeastAtMost] mult_1_right mult_zero_right if_True cong: if_cong)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1770
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1771	lemma matrix_mul_assoc: "A (B C) = (A B) C"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1772	apply (vector matrix_matrix_mult_def setsum_right_distrib setsum_left_distrib mult_assoc)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1773	apply (subst setsum_commute)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1774	apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1775	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1776
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1777	lemma matrix_vector_mul_assoc: "A v (B v x) = (A ** B) *v x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1778	apply (vector matrix_matrix_mult_def matrix_vector_mult_def setsum_right_distrib setsum_left_distrib mult_assoc)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1779	apply (subst setsum_commute)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1780	apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1781	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1782
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1783	lemma matrix_vector_mul_lid: "mat 1 *v x = x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1784	apply (vector matrix_vector_mult_def mat_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1785	by (simp add: cond_value_iff cond_application_beta
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1786	setsum_delta' cong del: if_weak_cong)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1787
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1788	lemma matrix_transp_mul: "transp(A B) = transp B transp (A::'a::comm_semiring_1^'m^'n)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1789	by (simp add: matrix_matrix_mult_def transp_def Cart_eq Cart_lambda_beta mult_commute)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1790
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1791	lemma matrix_eq: "A = B \<longleftrightarrow> (\<forall>x. A v x = B v x)" (is "?lhs \<longleftrightarrow> ?rhs")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1792	apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1793	apply (subst Cart_eq)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1794	apply clarify
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1795	apply (clarsimp simp add: matrix_vector_mult_def basis_def cond_value_iff cond_application_beta Cart_eq Cart_lambda_beta cong del: if_weak_cong)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1796	apply (erule_tac x="basis ia" in allE)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1797	apply (erule_tac x="i" in ballE)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1798	by (auto simp add: basis_def cond_value_iff cond_application_beta Cart_lambda_beta setsum_delta[OF finite_atLeastAtMost] cong del: if_weak_cong)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1799
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1800	lemma matrix_vector_mul_component:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1801	assumes k: "k \<in> {1.. dimindex (UNIV :: 'm set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1802	shows "((A::'a::semiring_1^'n'^'m) *v x)$k = (A$k) \<bullet> x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1803	using k
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1804	by (simp add: matrix_vector_mult_def Cart_lambda_beta dot_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1805
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1806	lemma dot_lmul_matrix: "((x::'a::comm_semiring_1 ^'n) v* A) \<bullet> y = x \<bullet> (A *v y)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1807	apply (simp add: dot_def matrix_vector_mult_def vector_matrix_mult_def setsum_left_distrib setsum_right_distrib Cart_lambda_beta mult_ac)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1808	apply (subst setsum_commute)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1809	by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1810
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1811	lemma transp_mat: "transp (mat n) = mat n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1812	by (vector transp_def mat_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1813
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1814	lemma transp_transp: "transp(transp A) = A"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1815	by (vector transp_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1816
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1817	lemma row_transp:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1818	fixes A:: "'a::semiring_1^'n^'m"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1819	assumes i: "i \<in> {1.. dimindex (UNIV :: 'n set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1820	shows "row i (transp A) = column i A"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1821	using i
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1822	by (simp add: row_def column_def transp_def Cart_eq Cart_lambda_beta)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1823
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1824	lemma column_transp:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1825	fixes A:: "'a::semiring_1^'n^'m"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1826	assumes i: "i \<in> {1.. dimindex (UNIV :: 'm set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1827	shows "column i (transp A) = row i A"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1828	using i
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1829	by (simp add: row_def column_def transp_def Cart_eq Cart_lambda_beta)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1830
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1831	lemma rows_transp: "rows(transp (A::'a::semiring_1^'n^'m)) = columns A"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1832	apply (auto simp add: rows_def columns_def row_transp intro: set_ext)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1833	apply (rule_tac x=i in exI)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1834	apply (auto simp add: row_transp)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1835	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1836
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1837	lemma columns_transp: "columns(transp (A::'a::semiring_1^'n^'m)) = rows A" by (metis transp_transp rows_transp)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1838
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1839	text{* Two sometimes fruitful ways of looking at matrix-vector multiplication. *}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1840
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1841	lemma matrix_mult_dot: "A *v x = (\<chi> i. A$i \<bullet> x)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1842	by (simp add: matrix_vector_mult_def dot_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1843
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1844	lemma matrix_mult_vsum: "(A::'a::comm_semiring_1^'n^'m) v x = setsum (\<lambda>i. (x$i) s column i A) {1 .. dimindex(UNIV:: 'n set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1845	by (simp add: matrix_vector_mult_def Cart_eq setsum_component Cart_lambda_beta vector_component column_def mult_commute)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1846
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1847	lemma vector_componentwise:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1848	"(x::'a::ring_1^'n) = (\<chi> j. setsum (\<lambda>i. (x$i) * (basis i :: 'a^'n)$j) {1..dimindex(UNIV :: 'n set)})"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1849	apply (subst basis_expansion[symmetric])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1850	by (vector Cart_eq Cart_lambda_beta setsum_component)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1851
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1852	lemma linear_componentwise:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1853	fixes f:: "'a::ring_1 ^ 'm \<Rightarrow> 'a ^ 'n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1854	assumes lf: "linear f" and j: "j \<in> {1 .. dimindex (UNIV :: 'n set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1855	shows "(f x)$j = setsum (\<lambda>i. (x$i) * (f (basis i)$j)) {1 .. dimindex (UNIV :: 'm set)}" (is "?lhs = ?rhs")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1856	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1857	let ?M = "{1 .. dimindex (UNIV :: 'm set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1858	let ?N = "{1 .. dimindex (UNIV :: 'n set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1859	have fM: "finite ?M" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1860	have "?rhs = (setsum (\<lambda>i.(x$i) *s f (basis i) ) ?M)$j"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1861	unfolding vector_smult_component[OF j, symmetric]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1862	unfolding setsum_component[OF j, of "(\<lambda>i.(x$i) *s f (basis i :: 'a^'m))" ?M]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1863	..
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1864	then show ?thesis unfolding linear_setsum_mul[OF lf fM, symmetric] basis_expansion ..
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1865	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1866
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1867	text{* Inverse matrices (not necessarily square) *}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1868
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1869	definition "invertible(A::'a::semiring_1^'n^'m) \<longleftrightarrow> (\<exists>A'::'a^'m^'n. A A' = mat 1 \<and> A' A = mat 1)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1870
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1871	definition "matrix_inv(A:: 'a::semiring_1^'n^'m) =
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1872	(SOME A'::'a^'m^'n. A A' = mat 1 \<and> A' A = mat 1)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1873
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1874	text{* Correspondence between matrices and linear operators. *}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1875
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1876	definition matrix:: "('a::{plus,times, one, zero}^'m \<Rightarrow> 'a ^ 'n) \<Rightarrow> 'a^'m^'n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1877	where "matrix f = (\<chi> i j. (f(basis j))$i)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1878
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1879	lemma matrix_vector_mul_linear: "linear(\<lambda>x. A *v (x::'a::comm_semiring_1 ^ 'n))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1880	by (simp add: linear_def matrix_vector_mult_def Cart_eq Cart_lambda_beta vector_component ring_simps setsum_right_distrib setsum_addf)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1881
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1882	lemma matrix_works: assumes lf: "linear f" shows "matrix f *v x = f (x::'a::comm_ring_1 ^ 'n)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1883	apply (simp add: matrix_def matrix_vector_mult_def Cart_eq Cart_lambda_beta mult_commute del: One_nat_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1884	apply clarify
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1885	apply (rule linear_componentwise[OF lf, symmetric])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1886	apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1887	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1888
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1889	lemma matrix_vector_mul: "linear f ==> f = (\<lambda>x. matrix f *v (x::'a::comm_ring_1 ^ 'n))" by (simp add: ext matrix_works)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1890
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1891	lemma matrix_of_matrix_vector_mul: "matrix(\<lambda>x. A *v (x :: 'a:: comm_ring_1 ^ 'n)) = A"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1892	by (simp add: matrix_eq matrix_vector_mul_linear matrix_works)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1893
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1894	lemma matrix_compose:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1895	assumes lf: "linear (f::'a::comm_ring_1^'n \<Rightarrow> _)" and lg: "linear g"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1896	shows "matrix (g o f) = matrix g ** matrix f"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1897	using lf lg linear_compose[OF lf lg] matrix_works[OF linear_compose[OF lf lg]]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1898	by (simp add: matrix_eq matrix_works matrix_vector_mul_assoc[symmetric] o_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1899
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1900	lemma matrix_vector_column:"(A::'a::comm_semiring_1^'n^'m) v x = setsum (\<lambda>i. (x$i) s ((transp A)$i)) {1..dimindex(UNIV:: 'n set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1901	by (simp add: matrix_vector_mult_def transp_def Cart_eq Cart_lambda_beta setsum_component vector_component mult_commute)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1902
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1903	lemma adjoint_matrix: "adjoint(\<lambda>x. (A::'a::comm_ring_1^'n^'m) v x) = (\<lambda>x. transp A v x)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1904	apply (rule adjoint_unique[symmetric])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1905	apply (rule matrix_vector_mul_linear)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1906	apply (simp add: transp_def dot_def Cart_lambda_beta matrix_vector_mult_def setsum_left_distrib setsum_right_distrib)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1907	apply (subst setsum_commute)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1908	apply (auto simp add: mult_ac)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1909	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1910
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1911	lemma matrix_adjoint: assumes lf: "linear (f :: 'a::comm_ring_1^'n \<Rightarrow> 'a ^ 'm)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1912	shows "matrix(adjoint f) = transp(matrix f)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1913	apply (subst matrix_vector_mul[OF lf])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1914	unfolding adjoint_matrix matrix_of_matrix_vector_mul ..
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1915
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1916	subsection{* Interlude: Some properties of real sets *}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1917
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1918	lemma seq_mono_lemma: assumes "\<forall>(n::nat) \<ge> m. (d n :: real) < e n" and "\<forall>n \<ge> m. e n <= e m"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1919	shows "\<forall>n \<ge> m. d n < e m"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1920	using prems apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1921	apply (erule_tac x="n" in allE)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1922	apply (erule_tac x="n" in allE)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1923	apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1924	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1925
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1926
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1927	lemma real_convex_bound_lt:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1928	assumes xa: "(x::real) < a" and ya: "y < a" and u: "0 <= u" and v: "0 <= v"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1929	and uv: "u + v = 1"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1930	shows "u * x + v * y < a"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1931	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1932	have uv': "u = 0 \<longrightarrow> v \<noteq> 0" using u v uv by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1933	have "a = a * (u + v)" unfolding uv by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1934	hence th: "u * a + v * a = a" by (simp add: ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1935	from xa u have "u \<noteq> 0 \<Longrightarrow> ux < ua" by (simp add: mult_compare_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1936	from ya v have "v \<noteq> 0 \<Longrightarrow> v * y < v * a" by (simp add: mult_compare_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1937	from xa ya u v have "u * x + v * y < u * a + v * a"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1938	apply (cases "u = 0", simp_all add: uv')
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1939	apply(rule mult_strict_left_mono)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1940	using uv' apply simp_all
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1941
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1942	apply (rule add_less_le_mono)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1943	apply(rule mult_strict_left_mono)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1944	apply simp_all
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1945	apply (rule mult_left_mono)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1946	apply simp_all
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1947	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1948	thus ?thesis unfolding th .
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1949	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1950
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1951	lemma real_convex_bound_le:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1952	assumes xa: "(x::real) \<le> a" and ya: "y \<le> a" and u: "0 <= u" and v: "0 <= v"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1953	and uv: "u + v = 1"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1954	shows "u * x + v * y \<le> a"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1955	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1956	from xa ya u v have "u * x + v * y \<le> u * a + v * a" by (simp add: add_mono mult_left_mono)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1957	also have "\<dots> \<le> (u + v) * a" by (simp add: ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1958	finally show ?thesis unfolding uv by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1959	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1960
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1961	lemma infinite_enumerate: assumes fS: "infinite S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1962	shows "\<exists>r. subseq r \<and> (\<forall>n. r n \<in> S)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1963	unfolding subseq_def
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1964	using enumerate_in_set[OF fS] enumerate_mono[of _ _ S] fS by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1965
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1966	lemma approachable_lt_le: "(\<exists>(d::real)>0. \<forall>x. f x < d \<longrightarrow> P x) \<longleftrightarrow> (\<exists>d>0. \<forall>x. f x \<le> d \<longrightarrow> P x)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1967	apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1968	apply (rule_tac x="d/2" in exI)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1969	apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1970	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1971
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1972
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1973	lemma triangle_lemma:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1974	assumes x: "0 <= (x::real)" and y:"0 <= y" and z: "0 <= z" and xy: "x^2 <= y^2 + z^2"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1975	shows "x <= y + z"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1976	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1977	have "y^2 + z^2 \<le> y^2 + 2yz + z^2" using z y by (simp add: zero_compare_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1978	with xy have th: "x ^2 \<le> (y+z)^2" by (simp add: power2_eq_square ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1979	from y z have yz: "y + z \<ge> 0" by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1980	from power2_le_imp_le[OF th yz] show ?thesis .
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1981	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1982
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1983
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1984	lemma lambda_skolem: "(\<forall>i \<in> {1 .. dimindex(UNIV :: 'n set)}. \<exists>x. P i x) \<longleftrightarrow>
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1985	(\<exists>x::'a ^ 'n. \<forall>i \<in> {1 .. dimindex(UNIV:: 'n set)}. P i (x$i))" (is "?lhs \<longleftrightarrow> ?rhs")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1986	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1987	let ?S = "{1 .. dimindex(UNIV :: 'n set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1988	{assume H: "?rhs"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1989	then have ?lhs by auto}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1990	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1991	{assume H: "?lhs"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1992	then obtain f where f:"\<forall>i\<in> ?S. P i (f i)" unfolding Ball_def choice_iff by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1993	let ?x = "(\<chi> i. (f i)) :: 'a ^ 'n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1994	{fix i assume i: "i \<in> ?S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1995	with f i have "P i (f i)" by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1996	then have "P i (?x$i)" using Cart_lambda_beta[of f, rule_format, OF i] by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1997	}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1998	hence "\<forall>i \<in> ?S. P i (?x$i)" by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	1999	hence ?rhs by metis }
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2000	ultimately show ?thesis by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2001	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2002
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2003	(* Supremum and infimum of real sets *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2004
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2005
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2006	definition rsup:: "real set \<Rightarrow> real" where
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2007	"rsup S = (SOME a. isLub UNIV S a)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2008
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2009	lemma rsup_alt: "rsup S = (SOME a. (\<forall>x \<in> S. x \<le> a) \<and> (\<forall>b. (\<forall>x \<in> S. x \<le> b) \<longrightarrow> a \<le> b))" by (auto simp add: isLub_def rsup_def leastP_def isUb_def setle_def setge_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2010
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2011	lemma rsup: assumes Se: "S \<noteq> {}" and b: "\<exists>b. S *<= b"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2012	shows "isLub UNIV S (rsup S)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2013	using Se b
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2014	unfolding rsup_def
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2015	apply clarify
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2016	apply (rule someI_ex)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2017	apply (rule reals_complete)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2018	by (auto simp add: isUb_def setle_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2019
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2020	lemma rsup_le: assumes Se: "S \<noteq> {}" and Sb: "S *<= b" shows "rsup S \<le> b"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2021	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2022	from Sb have bu: "isUb UNIV S b" by (simp add: isUb_def setle_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2023	from rsup[OF Se] Sb have "isLub UNIV S (rsup S)" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2024	then show ?thesis using bu by (auto simp add: isLub_def leastP_def setle_def setge_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2025	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2026
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2027	lemma rsup_finite_Max: assumes fS: "finite S" and Se: "S \<noteq> {}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2028	shows "rsup S = Max S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2029	using fS Se
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2030	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2031	let ?m = "Max S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2032	from Max_ge[OF fS] have Sm: "\<forall> x\<in> S. x \<le> ?m" by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2033	with rsup[OF Se] have lub: "isLub UNIV S (rsup S)" by (metis setle_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2034	from Max_in[OF fS Se] lub have mrS: "?m \<le> rsup S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2035	by (auto simp add: isLub_def leastP_def setle_def setge_def isUb_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2036	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2037	have "rsup S \<le> ?m" using Sm lub
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2038	by (auto simp add: isLub_def leastP_def isUb_def setle_def setge_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2039	ultimately show ?thesis by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2040	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2041
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2042	lemma rsup_finite_in: assumes fS: "finite S" and Se: "S \<noteq> {}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2043	shows "rsup S \<in> S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2044	using rsup_finite_Max[OF fS Se] Max_in[OF fS Se] by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2045
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2046	lemma rsup_finite_Ub: assumes fS: "finite S" and Se: "S \<noteq> {}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2047	shows "isUb S S (rsup S)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2048	using rsup_finite_Max[OF fS Se] rsup_finite_in[OF fS Se] Max_ge[OF fS]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2049	unfolding isUb_def setle_def by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2050
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2051	lemma rsup_finite_ge_iff: assumes fS: "finite S" and Se: "S \<noteq> {}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2052	shows "a \<le> rsup S \<longleftrightarrow> (\<exists> x \<in> S. a \<le> x)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2053	using rsup_finite_Ub[OF fS Se] by (auto simp add: isUb_def setle_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2054
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2055	lemma rsup_finite_le_iff: assumes fS: "finite S" and Se: "S \<noteq> {}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2056	shows "a \<ge> rsup S \<longleftrightarrow> (\<forall> x \<in> S. a \<ge> x)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2057	using rsup_finite_Ub[OF fS Se] by (auto simp add: isUb_def setle_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2058
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2059	lemma rsup_finite_gt_iff: assumes fS: "finite S" and Se: "S \<noteq> {}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2060	shows "a < rsup S \<longleftrightarrow> (\<exists> x \<in> S. a < x)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2061	using rsup_finite_Ub[OF fS Se] by (auto simp add: isUb_def setle_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2062
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2063	lemma rsup_finite_lt_iff: assumes fS: "finite S" and Se: "S \<noteq> {}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2064	shows "a > rsup S \<longleftrightarrow> (\<forall> x \<in> S. a > x)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2065	using rsup_finite_Ub[OF fS Se] by (auto simp add: isUb_def setle_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2066
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2067	lemma rsup_unique: assumes b: "S *<= b" and S: "\<forall>b' < b. \<exists>x \<in> S. b' < x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2068	shows "rsup S = b"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2069	using b S
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2070	unfolding setle_def rsup_alt
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2071	apply -
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2072	apply (rule some_equality)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2073	apply (metis linorder_not_le order_eq_iff[symmetric])+
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2074	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2075
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2076	lemma rsup_le_subset: "S\<noteq>{} \<Longrightarrow> S \<subseteq> T \<Longrightarrow> (\<exists>b. T *<= b) \<Longrightarrow> rsup S \<le> rsup T"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2077	apply (rule rsup_le)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2078	apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2079	using rsup[of T] by (auto simp add: isLub_def leastP_def setge_def setle_def isUb_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2080
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2081	lemma isUb_def': "isUb R S = (\<lambda>x. S *<= x \<and> x \<in> R)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2082	apply (rule ext)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2083	by (metis isUb_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2084
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2085	lemma UNIV_trivial: "UNIV x" using UNIV_I[of x] by (metis mem_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2086	lemma rsup_bounds: assumes Se: "S \<noteq> {}" and l: "a <=* S" and u: "S *<= b"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2087	shows "a \<le> rsup S \<and> rsup S \<le> b"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2088	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2089	from rsup[OF Se] u have lub: "isLub UNIV S (rsup S)" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2090	hence b: "rsup S \<le> b" using u by (auto simp add: isLub_def leastP_def setle_def setge_def isUb_def')
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2091	from Se obtain y where y: "y \<in> S" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2092	from lub l have "a \<le> rsup S" apply (auto simp add: isLub_def leastP_def setle_def setge_def isUb_def')
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2093	apply (erule ballE[where x=y])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2094	apply (erule ballE[where x=y])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2095	apply arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2096	using y apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2097	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2098	with b show ?thesis by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2099	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2100
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2101	lemma rsup_abs_le: "S \<noteq> {} \<Longrightarrow> (\<forall>x\<in>S. \<bar>x\<bar> \<le> a) \<Longrightarrow> \<bar>rsup S\<bar> \<le> a"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2102	unfolding abs_le_interval_iff using rsup_bounds[of S "-a" a]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2103	by (auto simp add: setge_def setle_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2104
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2105	lemma rsup_asclose: assumes S:"S \<noteq> {}" and b: "\<forall>x\<in>S. \<bar>x - l\<bar> \<le> e" shows "\<bar>rsup S - l\<bar> \<le> e"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2106	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2107	have th: "\<And>(x::real) l e. \<bar>x - l\<bar> \<le> e \<longleftrightarrow> l - e \<le> x \<and> x \<le> l + e" by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2108	show ?thesis using S b rsup_bounds[of S "l - e" "l+e"] unfolding th
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2109	by (auto simp add: setge_def setle_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2110	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2111
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2112	definition rinf:: "real set \<Rightarrow> real" where
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2113	"rinf S = (SOME a. isGlb UNIV S a)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2114
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2115	lemma rinf_alt: "rinf S = (SOME a. (\<forall>x \<in> S. x \<ge> a) \<and> (\<forall>b. (\<forall>x \<in> S. x \<ge> b) \<longrightarrow> a \<ge> b))" by (auto simp add: isGlb_def rinf_def greatestP_def isLb_def setle_def setge_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2116
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2117	lemma reals_complete_Glb: assumes Se: "\<exists>x. x \<in> S" and lb: "\<exists> y. isLb UNIV S y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2118	shows "\<exists>(t::real). isGlb UNIV S t"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2119	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2120	let ?M = "uminus ` S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2121	from lb have th: "\<exists>y. isUb UNIV ?M y" apply (auto simp add: isUb_def isLb_def setle_def setge_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2122	by (rule_tac x="-y" in exI, auto)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2123	from Se have Me: "\<exists>x. x \<in> ?M" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2124	from reals_complete[OF Me th] obtain t where t: "isLub UNIV ?M t" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2125	have "isGlb UNIV S (- t)" using t
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2126	apply (auto simp add: isLub_def isGlb_def leastP_def greatestP_def setle_def setge_def isUb_def isLb_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2127	apply (erule_tac x="-y" in allE)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2128	apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2129	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2130	then show ?thesis by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2131	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2132
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2133	lemma rinf: assumes Se: "S \<noteq> {}" and b: "\<exists>b. b <=* S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2134	shows "isGlb UNIV S (rinf S)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2135	using Se b
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2136	unfolding rinf_def
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2137	apply clarify
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2138	apply (rule someI_ex)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2139	apply (rule reals_complete_Glb)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2140	apply (auto simp add: isLb_def setle_def setge_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2141	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2142
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2143	lemma rinf_ge: assumes Se: "S \<noteq> {}" and Sb: "b <=* S" shows "rinf S \<ge> b"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2144	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2145	from Sb have bu: "isLb UNIV S b" by (simp add: isLb_def setge_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2146	from rinf[OF Se] Sb have "isGlb UNIV S (rinf S)" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2147	then show ?thesis using bu by (auto simp add: isGlb_def greatestP_def setle_def setge_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2148	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2149
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2150	lemma rinf_finite_Min: assumes fS: "finite S" and Se: "S \<noteq> {}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2151	shows "rinf S = Min S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2152	using fS Se
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2153	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2154	let ?m = "Min S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2155	from Min_le[OF fS] have Sm: "\<forall> x\<in> S. x \<ge> ?m" by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2156	with rinf[OF Se] have glb: "isGlb UNIV S (rinf S)" by (metis setge_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2157	from Min_in[OF fS Se] glb have mrS: "?m \<ge> rinf S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2158	by (auto simp add: isGlb_def greatestP_def setle_def setge_def isLb_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2159	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2160	have "rinf S \<ge> ?m" using Sm glb
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2161	by (auto simp add: isGlb_def greatestP_def isLb_def setle_def setge_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2162	ultimately show ?thesis by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2163	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2164
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2165	lemma rinf_finite_in: assumes fS: "finite S" and Se: "S \<noteq> {}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2166	shows "rinf S \<in> S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2167	using rinf_finite_Min[OF fS Se] Min_in[OF fS Se] by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2168
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2169	lemma rinf_finite_Lb: assumes fS: "finite S" and Se: "S \<noteq> {}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2170	shows "isLb S S (rinf S)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2171	using rinf_finite_Min[OF fS Se] rinf_finite_in[OF fS Se] Min_le[OF fS]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2172	unfolding isLb_def setge_def by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2173
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2174	lemma rinf_finite_ge_iff: assumes fS: "finite S" and Se: "S \<noteq> {}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2175	shows "a \<le> rinf S \<longleftrightarrow> (\<forall> x \<in> S. a \<le> x)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2176	using rinf_finite_Lb[OF fS Se] by (auto simp add: isLb_def setge_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2177
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2178	lemma rinf_finite_le_iff: assumes fS: "finite S" and Se: "S \<noteq> {}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2179	shows "a \<ge> rinf S \<longleftrightarrow> (\<exists> x \<in> S. a \<ge> x)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2180	using rinf_finite_Lb[OF fS Se] by (auto simp add: isLb_def setge_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2181
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2182	lemma rinf_finite_gt_iff: assumes fS: "finite S" and Se: "S \<noteq> {}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2183	shows "a < rinf S \<longleftrightarrow> (\<forall> x \<in> S. a < x)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2184	using rinf_finite_Lb[OF fS Se] by (auto simp add: isLb_def setge_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2185
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2186	lemma rinf_finite_lt_iff: assumes fS: "finite S" and Se: "S \<noteq> {}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2187	shows "a > rinf S \<longleftrightarrow> (\<exists> x \<in> S. a > x)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2188	using rinf_finite_Lb[OF fS Se] by (auto simp add: isLb_def setge_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2189
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2190	lemma rinf_unique: assumes b: "b <=* S" and S: "\<forall>b' > b. \<exists>x \<in> S. b' > x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2191	shows "rinf S = b"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2192	using b S
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2193	unfolding setge_def rinf_alt
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2194	apply -
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2195	apply (rule some_equality)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2196	apply (metis linorder_not_le order_eq_iff[symmetric])+
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2197	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2198
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2199	lemma rinf_ge_subset: "S\<noteq>{} \<Longrightarrow> S \<subseteq> T \<Longrightarrow> (\<exists>b. b <=* T) \<Longrightarrow> rinf S >= rinf T"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2200	apply (rule rinf_ge)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2201	apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2202	using rinf[of T] by (auto simp add: isGlb_def greatestP_def setge_def setle_def isLb_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2203
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2204	lemma isLb_def': "isLb R S = (\<lambda>x. x <=* S \<and> x \<in> R)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2205	apply (rule ext)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2206	by (metis isLb_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2207
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2208	lemma rinf_bounds: assumes Se: "S \<noteq> {}" and l: "a <=* S" and u: "S *<= b"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2209	shows "a \<le> rinf S \<and> rinf S \<le> b"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2210	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2211	from rinf[OF Se] l have lub: "isGlb UNIV S (rinf S)" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2212	hence b: "a \<le> rinf S" using l by (auto simp add: isGlb_def greatestP_def setle_def setge_def isLb_def')
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2213	from Se obtain y where y: "y \<in> S" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2214	from lub u have "b \<ge> rinf S" apply (auto simp add: isGlb_def greatestP_def setle_def setge_def isLb_def')
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2215	apply (erule ballE[where x=y])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2216	apply (erule ballE[where x=y])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2217	apply arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2218	using y apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2219	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2220	with b show ?thesis by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2221	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2222
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2223	lemma rinf_abs_ge: "S \<noteq> {} \<Longrightarrow> (\<forall>x\<in>S. \<bar>x\<bar> \<le> a) \<Longrightarrow> \<bar>rinf S\<bar> \<le> a"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2224	unfolding abs_le_interval_iff using rinf_bounds[of S "-a" a]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2225	by (auto simp add: setge_def setle_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2226
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2227	lemma rinf_asclose: assumes S:"S \<noteq> {}" and b: "\<forall>x\<in>S. \<bar>x - l\<bar> \<le> e" shows "\<bar>rinf S - l\<bar> \<le> e"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2228	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2229	have th: "\<And>(x::real) l e. \<bar>x - l\<bar> \<le> e \<longleftrightarrow> l - e \<le> x \<and> x \<le> l + e" by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2230	show ?thesis using S b rinf_bounds[of S "l - e" "l+e"] unfolding th
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2231	by (auto simp add: setge_def setle_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2232	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2233
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2234
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2235
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2236	subsection{* Operator norm. *}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2237
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2238	definition "onorm f = rsup {norm (f x)\| x. norm x = 1}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2239
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2240	lemma norm_bound_generalize:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2241	fixes f:: "real ^'n \<Rightarrow> real^'m"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2242	assumes lf: "linear f"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2243	shows "(\<forall>x. norm x = 1 \<longrightarrow> norm (f x) \<le> b) \<longleftrightarrow> (\<forall>x. norm (f x) \<le> b * norm x)" (is "?lhs \<longleftrightarrow> ?rhs")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2244	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2245	{assume H: ?rhs
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2246	{fix x :: "real^'n" assume x: "norm x = 1"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2247	from H[rule_format, of x] x have "norm (f x) \<le> b" by simp}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2248	then have ?lhs by blast }
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2249
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2250	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2251	{assume H: ?lhs
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2252	from H[rule_format, of "basis 1"]
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	2253	have bp: "b \<ge> 0" using norm_ge_zero[of "f (basis 1)"] dimindex_ge_1[of "UNIV:: 'n set"]
30040 e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	2254	by (auto simp add: norm_basis elim: order_trans [OF norm_ge_zero])
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2255	{fix x :: "real ^'n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2256	{assume "x = 0"
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	2257	then have "norm (f x) \<le> b * norm x" by (simp add: linear_0[OF lf] bp)}
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2258	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2259	{assume x0: "x \<noteq> 0"
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	2260	hence n0: "norm x \<noteq> 0" by (metis norm_eq_zero)
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2261	let ?c = "1/ norm x"
30040 e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	2262	have "norm (?c*s x) = 1" using x0 by (simp add: n0 norm_mul)
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2263	with H have "norm (f(?c*s x)) \<le> b" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2264	hence "?c * norm (f x) \<le> b"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2265	by (simp add: linear_cmul[OF lf] norm_mul)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2266	hence "norm (f x) \<le> b * norm x"
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	2267	using n0 norm_ge_zero[of x] by (auto simp add: field_simps)}
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2268	ultimately have "norm (f x) \<le> b * norm x" by blast}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2269	then have ?rhs by blast}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2270	ultimately show ?thesis by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2271	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2272
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2273	lemma onorm:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2274	fixes f:: "real ^'n \<Rightarrow> real ^'m"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2275	assumes lf: "linear f"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2276	shows "norm (f x) <= onorm f * norm x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2277	and "\<forall>x. norm (f x) <= b * norm x \<Longrightarrow> onorm f <= b"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2278	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2279	{
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2280	let ?S = "{norm (f x) \|x. norm x = 1}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2281	have Se: "?S \<noteq> {}" using norm_basis_1 by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2282	from linear_bounded[OF lf] have b: "\<exists> b. ?S *<= b"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2283	unfolding norm_bound_generalize[OF lf, symmetric] by (auto simp add: setle_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2284	{from rsup[OF Se b, unfolded onorm_def[symmetric]]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2285	show "norm (f x) <= onorm f * norm x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2286	apply -
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2287	apply (rule spec[where x = x])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2288	unfolding norm_bound_generalize[OF lf, symmetric]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2289	by (auto simp add: isLub_def isUb_def leastP_def setge_def setle_def)}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2290	{
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2291	show "\<forall>x. norm (f x) <= b * norm x \<Longrightarrow> onorm f <= b"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2292	using rsup[OF Se b, unfolded onorm_def[symmetric]]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2293	unfolding norm_bound_generalize[OF lf, symmetric]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2294	by (auto simp add: isLub_def isUb_def leastP_def setge_def setle_def)}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2295	}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2296	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2297
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2298	lemma onorm_pos_le: assumes lf: "linear (f::real ^'n \<Rightarrow> real ^'m)" shows "0 <= onorm f"
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	2299	using order_trans[OF norm_ge_zero onorm(1)[OF lf, of "basis 1"], unfolded norm_basis_1] by simp
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2300
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2301	lemma onorm_eq_0: assumes lf: "linear (f::real ^'n \<Rightarrow> real ^'m)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2302	shows "onorm f = 0 \<longleftrightarrow> (\<forall>x. f x = 0)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2303	using onorm[OF lf]
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	2304	apply (auto simp add: onorm_pos_le)
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2305	apply atomize
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2306	apply (erule allE[where x="0::real"])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2307	using onorm_pos_le[OF lf]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2308	apply arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2309	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2310
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2311	lemma onorm_const: "onorm(\<lambda>x::real^'n. (y::real ^ 'm)) = norm y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2312	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2313	let ?f = "\<lambda>x::real^'n. (y::real ^ 'm)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2314	have th: "{norm (?f x)\| x. norm x = 1} = {norm y}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2315	by(auto intro: vector_choose_size set_ext)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2316	show ?thesis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2317	unfolding onorm_def th
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2318	apply (rule rsup_unique) by (simp_all add: setle_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2319	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2320
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2321	lemma onorm_pos_lt: assumes lf: "linear (f::real ^ 'n \<Rightarrow> real ^'m)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2322	shows "0 < onorm f \<longleftrightarrow> ~(\<forall>x. f x = 0)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2323	unfolding onorm_eq_0[OF lf, symmetric]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2324	using onorm_pos_le[OF lf] by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2325
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2326	lemma onorm_compose:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2327	assumes lf: "linear (f::real ^'n \<Rightarrow> real ^'m)" and lg: "linear g"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2328	shows "onorm (f o g) <= onorm f * onorm g"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2329	apply (rule onorm(2)[OF linear_compose[OF lg lf], rule_format])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2330	unfolding o_def
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2331	apply (subst mult_assoc)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2332	apply (rule order_trans)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2333	apply (rule onorm(1)[OF lf])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2334	apply (rule mult_mono1)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2335	apply (rule onorm(1)[OF lg])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2336	apply (rule onorm_pos_le[OF lf])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2337	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2338
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2339	lemma onorm_neg_lemma: assumes lf: "linear (f::real ^'n \<Rightarrow> real^'m)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2340	shows "onorm (\<lambda>x. - f x) \<le> onorm f"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2341	using onorm[OF linear_compose_neg[OF lf]] onorm[OF lf]
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	2342	unfolding norm_minus_cancel by metis
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2343
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2344	lemma onorm_neg: assumes lf: "linear (f::real ^'n \<Rightarrow> real^'m)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2345	shows "onorm (\<lambda>x. - f x) = onorm f"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2346	using onorm_neg_lemma[OF lf] onorm_neg_lemma[OF linear_compose_neg[OF lf]]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2347	by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2348
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2349	lemma onorm_triangle:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2350	assumes lf: "linear (f::real ^'n \<Rightarrow> real ^'m)" and lg: "linear g"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2351	shows "onorm (\<lambda>x. f x + g x) <= onorm f + onorm g"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2352	apply(rule onorm(2)[OF linear_compose_add[OF lf lg], rule_format])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2353	apply (rule order_trans)
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	2354	apply (rule norm_triangle_ineq)
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2355	apply (simp add: distrib)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2356	apply (rule add_mono)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2357	apply (rule onorm(1)[OF lf])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2358	apply (rule onorm(1)[OF lg])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2359	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2360
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2361	lemma onorm_triangle_le: "linear (f::real ^'n \<Rightarrow> real ^'m) \<Longrightarrow> linear g \<Longrightarrow> onorm(f) + onorm(g) <= e
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2362	\<Longrightarrow> onorm(\<lambda>x. f x + g x) <= e"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2363	apply (rule order_trans)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2364	apply (rule onorm_triangle)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2365	apply assumption+
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2366	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2367
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2368	lemma onorm_triangle_lt: "linear (f::real ^'n \<Rightarrow> real ^'m) \<Longrightarrow> linear g \<Longrightarrow> onorm(f) + onorm(g) < e
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2369	==> onorm(\<lambda>x. f x + g x) < e"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2370	apply (rule order_le_less_trans)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2371	apply (rule onorm_triangle)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2372	by assumption+
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2373
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2374	(* "lift" from 'a to 'a^1 and "drop" from 'a^1 to 'a -- FIXME: potential use of transfer *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2375
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2376	definition vec1:: "'a \<Rightarrow> 'a ^ 1" where "vec1 x = (\<chi> i. x)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2377
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2378	definition dest_vec1:: "'a ^1 \<Rightarrow> 'a"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2379	where "dest_vec1 x = (x$1)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2380
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2381	lemma vec1_component[simp]: "(vec1 x)$1 = x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2382	by (simp add: vec1_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2383
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2384	lemma vec1_dest_vec1[simp]: "vec1(dest_vec1 x) = x" "dest_vec1(vec1 y) = y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2385	by (simp_all add: vec1_def dest_vec1_def Cart_eq Cart_lambda_beta dimindex_def del: One_nat_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2386
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2387	lemma forall_vec1: "(\<forall>x. P x) \<longleftrightarrow> (\<forall>x. P (vec1 x))" by (metis vec1_dest_vec1)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2388
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2389	lemma exists_vec1: "(\<exists>x. P x) \<longleftrightarrow> (\<exists>x. P(vec1 x))" by (metis vec1_dest_vec1)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2390
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2391	lemma forall_dest_vec1: "(\<forall>x. P x) \<longleftrightarrow> (\<forall>x. P(dest_vec1 x))" by (metis vec1_dest_vec1)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2392
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2393	lemma exists_dest_vec1: "(\<exists>x. P x) \<longleftrightarrow> (\<exists>x. P(dest_vec1 x))"by (metis vec1_dest_vec1)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2394
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2395	lemma vec1_eq[simp]: "vec1 x = vec1 y \<longleftrightarrow> x = y" by (metis vec1_dest_vec1)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2396
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2397	lemma dest_vec1_eq[simp]: "dest_vec1 x = dest_vec1 y \<longleftrightarrow> x = y" by (metis vec1_dest_vec1)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2398
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2399	lemma vec1_in_image_vec1: "vec1 x \<in> (vec1 ` S) \<longleftrightarrow> x \<in> S" by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2400
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2401	lemma vec1_vec: "vec1 x = vec x" by (vector vec1_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2402
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2403	lemma vec1_add: "vec1(x + y) = vec1 x + vec1 y" by (vector vec1_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2404	lemma vec1_sub: "vec1(x - y) = vec1 x - vec1 y" by (vector vec1_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2405	lemma vec1_cmul: "vec1(c* x) = c *s vec1 x " by (vector vec1_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2406	lemma vec1_neg: "vec1(- x) = - vec1 x " by (vector vec1_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2407
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2408	lemma vec1_setsum: assumes fS: "finite S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2409	shows "vec1(setsum f S) = setsum (vec1 o f) S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2410	apply (induct rule: finite_induct[OF fS])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2411	apply (simp add: vec1_vec)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2412	apply (auto simp add: vec1_add)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2413	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2414
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2415	lemma dest_vec1_lambda: "dest_vec1(\<chi> i. x i) = x 1"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2416	by (simp add: dest_vec1_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2417
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2418	lemma dest_vec1_vec: "dest_vec1(vec x) = x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2419	by (simp add: vec1_vec[symmetric])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2420
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2421	lemma dest_vec1_add: "dest_vec1(x + y) = dest_vec1 x + dest_vec1 y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2422	by (metis vec1_dest_vec1 vec1_add)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2423
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2424	lemma dest_vec1_sub: "dest_vec1(x - y) = dest_vec1 x - dest_vec1 y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2425	by (metis vec1_dest_vec1 vec1_sub)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2426
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2427	lemma dest_vec1_cmul: "dest_vec1(csx) = c dest_vec1 x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2428	by (metis vec1_dest_vec1 vec1_cmul)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2429
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2430	lemma dest_vec1_neg: "dest_vec1(- x) = - dest_vec1 x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2431	by (metis vec1_dest_vec1 vec1_neg)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2432
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2433	lemma dest_vec1_0[simp]: "dest_vec1 0 = 0" by (metis vec_0 dest_vec1_vec)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2434
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2435	lemma dest_vec1_sum: assumes fS: "finite S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2436	shows "dest_vec1(setsum f S) = setsum (dest_vec1 o f) S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2437	apply (induct rule: finite_induct[OF fS])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2438	apply (simp add: dest_vec1_vec)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2439	apply (auto simp add: dest_vec1_add)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2440	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2441
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2442	lemma norm_vec1: "norm(vec1 x) = abs(x)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2443	by (simp add: vec1_def norm_real)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2444
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2445	lemma dist_vec1: "dist(vec1 x) (vec1 y) = abs(x - y)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2446	by (simp only: dist_real vec1_component)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2447	lemma abs_dest_vec1: "norm x = \<bar>dest_vec1 x\<bar>"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2448	by (metis vec1_dest_vec1 norm_vec1)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2449
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2450	lemma linear_vmul_dest_vec1:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2451	fixes f:: "'a::semiring_1^'n \<Rightarrow> 'a^1"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2452	shows "linear f \<Longrightarrow> linear (\<lambda>x. dest_vec1(f x) *s v)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2453	unfolding dest_vec1_def
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2454	apply (rule linear_vmul_component)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2455	by (auto simp add: dimindex_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2456
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2457	lemma linear_from_scalars:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2458	assumes lf: "linear (f::'a::comm_ring_1 ^1 \<Rightarrow> 'a^'n)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2459	shows "f = (\<lambda>x. dest_vec1 x *s column 1 (matrix f))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2460	apply (rule ext)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2461	apply (subst matrix_works[OF lf, symmetric])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2462	apply (auto simp add: Cart_eq matrix_vector_mult_def dest_vec1_def column_def Cart_lambda_beta vector_component dimindex_def mult_commute del: One_nat_def )
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2463	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2464
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2465	lemma linear_to_scalars: assumes lf: "linear (f::'a::comm_ring_1 ^'n \<Rightarrow> 'a^1)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2466	shows "f = (\<lambda>x. vec1(row 1 (matrix f) \<bullet> x))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2467	apply (rule ext)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2468	apply (subst matrix_works[OF lf, symmetric])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2469	apply (auto simp add: Cart_eq matrix_vector_mult_def vec1_def row_def Cart_lambda_beta vector_component dimindex_def dot_def mult_commute)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2470	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2471
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2472	lemma dest_vec1_eq_0: "dest_vec1 x = 0 \<longleftrightarrow> x = 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2473	by (simp add: dest_vec1_eq[symmetric])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2474
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2475	lemma setsum_scalars: assumes fS: "finite S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2476	shows "setsum f S = vec1 (setsum (dest_vec1 o f) S)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2477	unfolding vec1_setsum[OF fS] by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2478
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2479	lemma dest_vec1_wlog_le: "(\<And>(x::'a::linorder ^ 1) y. P x y \<longleftrightarrow> P y x) \<Longrightarrow> (\<And>x y. dest_vec1 x <= dest_vec1 y ==> P x y) \<Longrightarrow> P x y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2480	apply (cases "dest_vec1 x \<le> dest_vec1 y")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2481	apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2482	apply (subgoal_tac "dest_vec1 y \<le> dest_vec1 x")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2483	apply (auto)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2484	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2485
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2486	text{* Pasting vectors. *}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2487
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2488	lemma linear_fstcart: "linear fstcart"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2489	by (auto simp add: linear_def fstcart_def Cart_eq Cart_lambda_beta vector_component dimindex_finite_sum)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2490
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2491	lemma linear_sndcart: "linear sndcart"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2492	by (auto simp add: linear_def sndcart_def Cart_eq Cart_lambda_beta vector_component dimindex_finite_sum)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2493
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2494	lemma fstcart_vec[simp]: "fstcart(vec x) = vec x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2495	by (vector fstcart_def vec_def dimindex_finite_sum)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2496
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2497	lemma fstcart_add[simp]:"fstcart(x + y) = fstcart (x::'a::{plus,times}^('b,'c) finite_sum) + fstcart y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2498	using linear_fstcart[unfolded linear_def] by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2499
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2500	lemma fstcart_cmul[simp]:"fstcart(cs x) = cs fstcart (x::'a::{plus,times}^('b,'c) finite_sum)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2501	using linear_fstcart[unfolded linear_def] by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2502
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2503	lemma fstcart_neg[simp]:"fstcart(- x) = - fstcart (x::'a::ring_1^('b,'c) finite_sum)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2504	unfolding vector_sneg_minus1 fstcart_cmul ..
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2505
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2506	lemma fstcart_sub[simp]:"fstcart(x - y) = fstcart (x::'a::ring_1^('b,'c) finite_sum) - fstcart y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2507	unfolding diff_def fstcart_add fstcart_neg ..
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2508
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2509	lemma fstcart_setsum:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2510	fixes f:: "'d \<Rightarrow> 'a::semiring_1^_"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2511	assumes fS: "finite S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2512	shows "fstcart (setsum f S) = setsum (\<lambda>i. fstcart (f i)) S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2513	by (induct rule: finite_induct[OF fS], simp_all add: vec_0[symmetric] del: vec_0)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2514
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2515	lemma sndcart_vec[simp]: "sndcart(vec x) = vec x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2516	by (vector sndcart_def vec_def dimindex_finite_sum)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2517
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2518	lemma sndcart_add[simp]:"sndcart(x + y) = sndcart (x::'a::{plus,times}^('b,'c) finite_sum) + sndcart y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2519	using linear_sndcart[unfolded linear_def] by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2520
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2521	lemma sndcart_cmul[simp]:"sndcart(cs x) = cs sndcart (x::'a::{plus,times}^('b,'c) finite_sum)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2522	using linear_sndcart[unfolded linear_def] by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2523
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2524	lemma sndcart_neg[simp]:"sndcart(- x) = - sndcart (x::'a::ring_1^('b,'c) finite_sum)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2525	unfolding vector_sneg_minus1 sndcart_cmul ..
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2526
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2527	lemma sndcart_sub[simp]:"sndcart(x - y) = sndcart (x::'a::ring_1^('b,'c) finite_sum) - sndcart y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2528	unfolding diff_def sndcart_add sndcart_neg ..
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2529
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2530	lemma sndcart_setsum:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2531	fixes f:: "'d \<Rightarrow> 'a::semiring_1^_"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2532	assumes fS: "finite S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2533	shows "sndcart (setsum f S) = setsum (\<lambda>i. sndcart (f i)) S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2534	by (induct rule: finite_induct[OF fS], simp_all add: vec_0[symmetric] del: vec_0)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2535
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2536	lemma pastecart_vec[simp]: "pastecart (vec x) (vec x) = vec x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2537	by (simp add: pastecart_eq fstcart_vec sndcart_vec fstcart_pastecart sndcart_pastecart)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2538
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2539	lemma pastecart_add[simp]:"pastecart (x1::'a::{plus,times}^_) y1 + pastecart x2 y2 = pastecart (x1 + x2) (y1 + y2)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2540	by (simp add: pastecart_eq fstcart_add sndcart_add fstcart_pastecart sndcart_pastecart)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2541
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2542	lemma pastecart_cmul[simp]: "pastecart (c s (x1::'a::{plus,times}^_)) (c s y1) = c *s pastecart x1 y1"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2543	by (simp add: pastecart_eq fstcart_pastecart sndcart_pastecart)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2544
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2545	lemma pastecart_neg[simp]: "pastecart (- (x::'a::ring_1^_)) (- y) = - pastecart x y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2546	unfolding vector_sneg_minus1 pastecart_cmul ..
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2547
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2548	lemma pastecart_sub: "pastecart (x1::'a::ring_1^_) y1 - pastecart x2 y2 = pastecart (x1 - x2) (y1 - y2)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2549	by (simp add: diff_def pastecart_neg[symmetric] del: pastecart_neg)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2550
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2551	lemma pastecart_setsum:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2552	fixes f:: "'d \<Rightarrow> 'a::semiring_1^_"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2553	assumes fS: "finite S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2554	shows "pastecart (setsum f S) (setsum g S) = setsum (\<lambda>i. pastecart (f i) (g i)) S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2555	by (simp add: pastecart_eq fstcart_setsum[OF fS] sndcart_setsum[OF fS] fstcart_pastecart sndcart_pastecart)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2556
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2557	lemma norm_fstcart: "norm(fstcart x) <= norm (x::real ^('n,'m) finite_sum)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2558	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2559	let ?n = "dimindex (UNIV :: 'n set)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2560	let ?m = "dimindex (UNIV :: 'm set)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2561	let ?N = "{1 .. ?n}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2562	let ?M = "{1 .. ?m}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2563	let ?NM = "{1 .. dimindex (UNIV :: ('n,'m) finite_sum set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2564	have th_0: "1 \<le> ?n +1" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2565	have th0: "norm x = norm (pastecart (fstcart x) (sndcart x))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2566	by (simp add: pastecart_fst_snd)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2567	have th1: "fstcart x \<bullet> fstcart x \<le> pastecart (fstcart x) (sndcart x) \<bullet> pastecart (fstcart x) (sndcart x)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2568	by (simp add: dot_def setsum_add_split[OF th_0, of _ ?m] pastecart_def dimindex_finite_sum Cart_lambda_beta setsum_nonneg zero_le_square del: One_nat_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2569	then show ?thesis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2570	unfolding th0
30040 e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	2571	unfolding real_vector_norm_def real_sqrt_le_iff id_def
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2572	by (simp add: dot_def dimindex_finite_sum Cart_lambda_beta)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2573	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2574
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2575	lemma dist_fstcart: "dist(fstcart (x::real^_)) (fstcart y) <= dist x y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2576	by (metis dist_def fstcart_sub[symmetric] norm_fstcart)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2577
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2578	lemma norm_sndcart: "norm(sndcart x) <= norm (x::real ^('n,'m) finite_sum)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2579	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2580	let ?n = "dimindex (UNIV :: 'n set)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2581	let ?m = "dimindex (UNIV :: 'm set)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2582	let ?N = "{1 .. ?n}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2583	let ?M = "{1 .. ?m}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2584	let ?nm = "dimindex (UNIV :: ('n,'m) finite_sum set)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2585	let ?NM = "{1 .. ?nm}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2586	have thnm[simp]: "?nm = ?n + ?m" by (simp add: dimindex_finite_sum)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2587	have th_0: "1 \<le> ?n +1" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2588	have th0: "norm x = norm (pastecart (fstcart x) (sndcart x))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2589	by (simp add: pastecart_fst_snd)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2590	let ?f = "\<lambda>n. n - ?n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2591	let ?S = "{?n+1 .. ?nm}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2592	have finj:"inj_on ?f ?S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2593	using dimindex_nonzero[of "UNIV :: 'n set"] dimindex_nonzero[of "UNIV :: 'm set"]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2594	apply (simp add: Ball_def atLeastAtMost_iff inj_on_def dimindex_finite_sum del: One_nat_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2595	by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2596	have fS: "?f ` ?S = ?M"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2597	apply (rule set_ext)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2598	apply (simp add: image_iff Bex_def) using dimindex_nonzero[of "UNIV :: 'n set"] dimindex_nonzero[of "UNIV :: 'm set"] by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2599	have th1: "sndcart x \<bullet> sndcart x \<le> pastecart (fstcart x) (sndcart x) \<bullet> pastecart (fstcart x) (sndcart x)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2600	by (simp add: dot_def setsum_add_split[OF th_0, of _ ?m] pastecart_def dimindex_finite_sum Cart_lambda_beta setsum_nonneg zero_le_square setsum_reindex[OF finj, unfolded fS] del: One_nat_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2601	then show ?thesis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2602	unfolding th0
30040 e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	2603	unfolding real_vector_norm_def real_sqrt_le_iff id_def
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2604	by (simp add: dot_def dimindex_finite_sum Cart_lambda_beta)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2605	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2606
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2607	lemma dist_sndcart: "dist(sndcart (x::real^_)) (sndcart y) <= dist x y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2608	by (metis dist_def sndcart_sub[symmetric] norm_sndcart)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2609
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2610	lemma dot_pastecart: "(pastecart (x1::'a::{times,comm_monoid_add}^'n) (x2::'a::{times,comm_monoid_add}^'m)) \<bullet> (pastecart y1 y2) = x1 \<bullet> y1 + x2 \<bullet> y2"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2611	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2612	let ?n = "dimindex (UNIV :: 'n set)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2613	let ?m = "dimindex (UNIV :: 'm set)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2614	let ?N = "{1 .. ?n}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2615	let ?M = "{1 .. ?m}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2616	let ?nm = "dimindex (UNIV :: ('n,'m) finite_sum set)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2617	let ?NM = "{1 .. ?nm}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2618	have thnm: "?nm = ?n + ?m" by (simp add: dimindex_finite_sum)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2619	have th_0: "1 \<le> ?n +1" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2620	have th_1: "\<And>i. i \<in> {?m + 1 .. ?nm} \<Longrightarrow> i - ?m \<in> ?N" apply (simp add: thnm) by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2621	let ?f = "\<lambda>a b i. (a$i) * (b$i)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2622	let ?g = "?f (pastecart x1 x2) (pastecart y1 y2)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2623	let ?S = "{?n +1 .. ?nm}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2624	{fix i
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2625	assume i: "i \<in> ?N"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2626	have "?g i = ?f x1 y1 i"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2627	using i
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2628	apply (simp add: pastecart_def Cart_lambda_beta thnm) done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2629	}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2630	hence th2: "setsum ?g ?N = setsum (?f x1 y1) ?N"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2631	apply -
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2632	apply (rule setsum_cong)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2633	apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2634	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2635	{fix i
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2636	assume i: "i \<in> ?S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2637	have "?g i = ?f x2 y2 (i - ?n)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2638	using i
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2639	apply (simp add: pastecart_def Cart_lambda_beta thnm) done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2640	}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2641	hence th3: "setsum ?g ?S = setsum (\<lambda>i. ?f x2 y2 (i -?n)) ?S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2642	apply -
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2643	apply (rule setsum_cong)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2644	apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2645	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2646	let ?r = "\<lambda>n. n - ?n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2647	have rinj: "inj_on ?r ?S" apply (simp add: inj_on_def Ball_def thnm) by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2648	have rS: "?r ` ?S = ?M" apply (rule set_ext)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2649	apply (simp add: thnm image_iff Bex_def) by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2650	have "pastecart x1 x2 \<bullet> (pastecart y1 y2) = setsum ?g ?NM" by (simp add: dot_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2651	also have "\<dots> = setsum ?g ?N + setsum ?g ?S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2652	by (simp add: dot_def thnm setsum_add_split[OF th_0, of _ ?m] del: One_nat_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2653	also have "\<dots> = setsum (?f x1 y1) ?N + setsum (?f x2 y2) ?M"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2654	unfolding setsum_reindex[OF rinj, unfolded rS o_def] th2 th3 ..
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2655	finally
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2656	show ?thesis by (simp add: dot_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2657	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2658
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2659	lemma norm_pastecart: "norm(pastecart x y) <= norm(x :: real ^ _) + norm(y)"
30040 e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	2660	unfolding real_vector_norm_def dot_pastecart real_sqrt_le_iff id_def
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2661	apply (rule power2_le_imp_le)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2662	apply (simp add: real_sqrt_pow2[OF add_nonneg_nonneg[OF dot_pos_le[of x] dot_pos_le[of y]]])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2663	apply (auto simp add: power2_eq_square ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2664	apply (simp add: power2_eq_square[symmetric])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2665	apply (rule mult_nonneg_nonneg)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2666	apply (simp_all add: real_sqrt_pow2[OF dot_pos_le])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2667	apply (rule add_nonneg_nonneg)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2668	apply (simp_all add: real_sqrt_pow2[OF dot_pos_le])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2669	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2670
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2671	subsection {* A generic notion of "hull" (convex, affine, conic hull and closure). *}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2672
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2673	definition hull :: "'a set set \<Rightarrow> 'a set \<Rightarrow> 'a set" (infixl "hull" 75) where
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2674	"S hull s = Inter {t. t \<in> S \<and> s \<subseteq> t}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2675
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2676	lemma hull_same: "s \<in> S \<Longrightarrow> S hull s = s"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2677	unfolding hull_def by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2678
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2679	lemma hull_in: "(\<And>T. T \<subseteq> S ==> Inter T \<in> S) ==> (S hull s) \<in> S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2680	unfolding hull_def subset_iff by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2681
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2682	lemma hull_eq: "(\<And>T. T \<subseteq> S ==> Inter T \<in> S) ==> (S hull s) = s \<longleftrightarrow> s \<in> S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2683	using hull_same[of s S] hull_in[of S s] by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2684
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2685
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2686	lemma hull_hull: "S hull (S hull s) = S hull s"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2687	unfolding hull_def by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2688
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2689	lemma hull_subset: "s \<subseteq> (S hull s)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2690	unfolding hull_def by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2691
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2692	lemma hull_mono: " s \<subseteq> t ==> (S hull s) \<subseteq> (S hull t)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2693	unfolding hull_def by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2694
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2695	lemma hull_antimono: "S \<subseteq> T ==> (T hull s) \<subseteq> (S hull s)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2696	unfolding hull_def by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2697
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2698	lemma hull_minimal: "s \<subseteq> t \<Longrightarrow> t \<in> S ==> (S hull s) \<subseteq> t"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2699	unfolding hull_def by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2700
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2701	lemma subset_hull: "t \<in> S ==> S hull s \<subseteq> t \<longleftrightarrow> s \<subseteq> t"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2702	unfolding hull_def by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2703
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2704	lemma hull_unique: "s \<subseteq> t \<Longrightarrow> t \<in> S \<Longrightarrow> (\<And>t'. s \<subseteq> t' \<Longrightarrow> t' \<in> S ==> t \<subseteq> t')
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2705	==> (S hull s = t)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2706	unfolding hull_def by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2707
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2708	lemma hull_induct: "(\<And>x. x\<in> S \<Longrightarrow> P x) \<Longrightarrow> Q {x. P x} \<Longrightarrow> \<forall>x\<in> Q hull S. P x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2709	using hull_minimal[of S "{x. P x}" Q]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2710	by (auto simp add: subset_eq Collect_def mem_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2711
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2712	lemma hull_inc: "x \<in> S \<Longrightarrow> x \<in> P hull S" by (metis hull_subset subset_eq)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2713
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2714	lemma hull_union_subset: "(S hull s) \<union> (S hull t) \<subseteq> (S hull (s \<union> t))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2715	unfolding Un_subset_iff by (metis hull_mono Un_upper1 Un_upper2)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2716
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2717	lemma hull_union: assumes T: "\<And>T. T \<subseteq> S ==> Inter T \<in> S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2718	shows "S hull (s \<union> t) = S hull (S hull s \<union> S hull t)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2719	apply rule
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2720	apply (rule hull_mono)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2721	unfolding Un_subset_iff
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2722	apply (metis hull_subset Un_upper1 Un_upper2 subset_trans)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2723	apply (rule hull_minimal)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2724	apply (metis hull_union_subset)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2725	apply (metis hull_in T)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2726	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2727
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2728	lemma hull_redundant_eq: "a \<in> (S hull s) \<longleftrightarrow> (S hull (insert a s) = S hull s)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2729	unfolding hull_def by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2730
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2731	lemma hull_redundant: "a \<in> (S hull s) ==> (S hull (insert a s) = S hull s)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2732	by (metis hull_redundant_eq)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2733
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2734	text{* Archimedian properties and useful consequences. *}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2735
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2736	lemma real_arch_simple: "\<exists>n. x <= real (n::nat)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2737	using reals_Archimedean2[of x] apply auto by (rule_tac x="Suc n" in exI, auto)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2738	lemmas real_arch_lt = reals_Archimedean2
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2739
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2740	lemmas real_arch = reals_Archimedean3
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2741
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2742	lemma real_arch_inv: "0 < e \<longleftrightarrow> (\<exists>n::nat. n \<noteq> 0 \<and> 0 < inverse (real n) \<and> inverse (real n) < e)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2743	using reals_Archimedean
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2744	apply (auto simp add: field_simps inverse_positive_iff_positive)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2745	apply (subgoal_tac "inverse (real n) > 0")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2746	apply arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2747	apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2748	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2749
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2750	lemma real_pow_lbound: "0 <= x ==> 1 + real n * x <= (1 + x) ^ n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2751	proof(induct n)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2752	case 0 thus ?case by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2753	next
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2754	case (Suc n)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2755	hence h: "1 + real n * x \<le> (1 + x) ^ n" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2756	from h have p: "1 \<le> (1 + x) ^ n" using Suc.prems by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2757	from h have "1 + real n * x + x \<le> (1 + x) ^ n + x" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2758	also have "\<dots> \<le> (1 + x) ^ Suc n" apply (subst diff_le_0_iff_le[symmetric])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2759	apply (simp add: ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2760	using mult_left_mono[OF p Suc.prems] by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2761	finally show ?case by (simp add: real_of_nat_Suc ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2762	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2763
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2764	lemma real_arch_pow: assumes x: "1 < (x::real)" shows "\<exists>n. y < x^n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2765	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2766	from x have x0: "x - 1 > 0" by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2767	from real_arch[OF x0, rule_format, of y]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2768	obtain n::nat where n:"y < real n * (x - 1)" by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2769	from x0 have x00: "x- 1 \<ge> 0" by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2770	from real_pow_lbound[OF x00, of n] n
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2771	have "y < x^n" by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2772	then show ?thesis by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2773	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2774
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2775	lemma real_arch_pow2: "\<exists>n. (x::real) < 2^ n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2776	using real_arch_pow[of 2 x] by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2777
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2778	lemma real_arch_pow_inv: assumes y: "(y::real) > 0" and x1: "x < 1"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2779	shows "\<exists>n. x^n < y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2780	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2781	{assume x0: "x > 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2782	from x0 x1 have ix: "1 < 1/x" by (simp add: field_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2783	from real_arch_pow[OF ix, of "1/y"]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2784	obtain n where n: "1/y < (1/x)^n" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2785	then
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2786	have ?thesis using y x0 by (auto simp add: field_simps power_divide) }
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2787	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2788	{assume "\<not> x > 0" with y x1 have ?thesis apply auto by (rule exI[where x=1], auto)}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2789	ultimately show ?thesis by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2790	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2791
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2792	lemma forall_pos_mono: "(\<And>d e::real. d < e \<Longrightarrow> P d ==> P e) \<Longrightarrow> (\<And>n::nat. n \<noteq> 0 ==> P(inverse(real n))) \<Longrightarrow> (\<And>e. 0 < e ==> P e)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2793	by (metis real_arch_inv)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2794
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2795	lemma forall_pos_mono_1: "(\<And>d e::real. d < e \<Longrightarrow> P d ==> P e) \<Longrightarrow> (\<And>n. P(inverse(real (Suc n)))) ==> 0 < e ==> P e"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2796	apply (rule forall_pos_mono)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2797	apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2798	apply (atomize)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2799	apply (erule_tac x="n - 1" in allE)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2800	apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2801	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2802
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2803	lemma real_archimedian_rdiv_eq_0: assumes x0: "x \<ge> 0" and c: "c \<ge> 0" and xc: "\<forall>(m::nat)>0. real m * x \<le> c"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2804	shows "x = 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2805	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2806	{assume "x \<noteq> 0" with x0 have xp: "x > 0" by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2807	from real_arch[OF xp, rule_format, of c] obtain n::nat where n: "c < real n * x" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2808	with xc[rule_format, of n] have "n = 0" by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2809	with n c have False by simp}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2810	then show ?thesis by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2811	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2812
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2813	(* ------------------------------------------------------------------------- *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2814	(* Relate max and min to sup and inf. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2815	(* ------------------------------------------------------------------------- *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2816
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2817	lemma real_max_rsup: "max x y = rsup {x,y}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2818	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2819	have f: "finite {x, y}" "{x,y} \<noteq> {}" by simp_all
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2820	from rsup_finite_le_iff[OF f, of "max x y"] have "rsup {x,y} \<le> max x y" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2821	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2822	have "max x y \<le> rsup {x,y}" using rsup_finite_ge_iff[OF f, of "max x y"]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2823	by (simp add: linorder_linear)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2824	ultimately show ?thesis by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2825	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2826
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2827	lemma real_min_rinf: "min x y = rinf {x,y}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2828	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2829	have f: "finite {x, y}" "{x,y} \<noteq> {}" by simp_all
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2830	from rinf_finite_le_iff[OF f, of "min x y"] have "rinf {x,y} \<le> min x y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2831	by (simp add: linorder_linear)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2832	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2833	have "min x y \<le> rinf {x,y}" using rinf_finite_ge_iff[OF f, of "min x y"]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2834	by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2835	ultimately show ?thesis by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2836	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2837
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2838	(* ------------------------------------------------------------------------- *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2839	(* Geometric progression. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2840	(* ------------------------------------------------------------------------- *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2841
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2842	lemma sum_gp_basic: "((1::'a::{field, recpower}) - x) * setsum (\<lambda>i. x^i) {0 .. n} = (1 - x^(Suc n))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2843	(is "?lhs = ?rhs")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2844	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2845	{assume x1: "x = 1" hence ?thesis by simp}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2846	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2847	{assume x1: "x\<noteq>1"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2848	hence x1': "x - 1 \<noteq> 0" "1 - x \<noteq> 0" "x - 1 = - (1 - x)" "- (1 - x) \<noteq> 0" by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2849	from geometric_sum[OF x1, of "Suc n", unfolded x1']
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2850	have "(- (1 - x)) * setsum (\<lambda>i. x^i) {0 .. n} = - (1 - x^(Suc n))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2851	unfolding atLeastLessThanSuc_atLeastAtMost
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2852	using x1' apply (auto simp only: field_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2853	apply (simp add: ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2854	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2855	then have ?thesis by (simp add: ring_simps) }
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2856	ultimately show ?thesis by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2857	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2858
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2859	lemma sum_gp_multiplied: assumes mn: "m <= n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2860	shows "((1::'a::{field, recpower}) - x) * setsum (op ^ x) {m..n} = x^m - x^ Suc n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2861	(is "?lhs = ?rhs")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2862	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2863	let ?S = "{0..(n - m)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2864	from mn have mn': "n - m \<ge> 0" by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2865	let ?f = "op + m"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2866	have i: "inj_on ?f ?S" unfolding inj_on_def by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2867	have f: "?f ` ?S = {m..n}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2868	using mn apply (auto simp add: image_iff Bex_def) by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2869	have th: "op ^ x o op + m = (\<lambda>i. x^m * x^i)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2870	by (rule ext, simp add: power_add power_mult)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2871	from setsum_reindex[OF i, of "op ^ x", unfolded f th setsum_right_distrib[symmetric]]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2872	have "?lhs = x^m * ((1 - x) * setsum (op ^ x) {0..n - m})" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2873	then show ?thesis unfolding sum_gp_basic using mn
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2874	by (simp add: ring_simps power_add[symmetric])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2875	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2876
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2877	lemma sum_gp: "setsum (op ^ (x::'a::{field, recpower})) {m .. n} =
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2878	(if n < m then 0 else if x = 1 then of_nat ((n + 1) - m)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2879	else (x^ m - x^ (Suc n)) / (1 - x))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2880	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2881	{assume nm: "n < m" hence ?thesis by simp}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2882	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2883	{assume "\<not> n < m" hence nm: "m \<le> n" by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2884	{assume x: "x = 1" hence ?thesis by simp}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2885	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2886	{assume x: "x \<noteq> 1" hence nz: "1 - x \<noteq> 0" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2887	from sum_gp_multiplied[OF nm, of x] nz have ?thesis by (simp add: field_simps)}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2888	ultimately have ?thesis by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2889	}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2890	ultimately show ?thesis by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2891	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2892
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2893	lemma sum_gp_offset: "setsum (op ^ (x::'a::{field,recpower})) {m .. m+n} =
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2894	(if x = 1 then of_nat n + 1 else x^m * (1 - x^Suc n) / (1 - x))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2895	unfolding sum_gp[of x m "m + n"] power_Suc
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2896	by (simp add: ring_simps power_add)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2897
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2898
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2899	subsection{* A bit of linear algebra. *}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2900
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2901	definition "subspace S \<longleftrightarrow> 0 \<in> S \<and> (\<forall>x\<in> S. \<forall>y \<in>S. x + y \<in> S) \<and> (\<forall>c. \<forall>x \<in>S. c *s x \<in>S )"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2902	definition "span S = (subspace hull S)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2903	definition "dependent S \<longleftrightarrow> (\<exists>a \<in> S. a \<in> span(S - {a}))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2904	abbreviation "independent s == ~(dependent s)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2905
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2906	(* Closure properties of subspaces. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2907
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2908	lemma subspace_UNIV[simp]: "subspace(UNIV)" by (simp add: subspace_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2909
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2910	lemma subspace_0: "subspace S ==> 0 \<in> S" by (metis subspace_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2911
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2912	lemma subspace_add: "subspace S \<Longrightarrow> x \<in> S \<Longrightarrow> y \<in> S ==> x + y \<in> S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2913	by (metis subspace_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2914
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2915	lemma subspace_mul: "subspace S \<Longrightarrow> x \<in> S \<Longrightarrow> c *s x \<in> S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2916	by (metis subspace_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2917
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2918	lemma subspace_neg: "subspace S \<Longrightarrow> (x::'a::ring_1^'n) \<in> S \<Longrightarrow> - x \<in> S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2919	by (metis vector_sneg_minus1 subspace_mul)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2920
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2921	lemma subspace_sub: "subspace S \<Longrightarrow> (x::'a::ring_1^'n) \<in> S \<Longrightarrow> y \<in> S \<Longrightarrow> x - y \<in> S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2922	by (metis diff_def subspace_add subspace_neg)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2923
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2924	lemma subspace_setsum:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2925	assumes sA: "subspace A" and fB: "finite B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2926	and f: "\<forall>x\<in> B. f x \<in> A"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2927	shows "setsum f B \<in> A"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2928	using fB f sA
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2929	apply(induct rule: finite_induct[OF fB])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2930	by (simp add: subspace_def sA, auto simp add: sA subspace_add)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2931
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2932	lemma subspace_linear_image:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2933	assumes lf: "linear (f::'a::semiring_1^'n \<Rightarrow> _)" and sS: "subspace S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2934	shows "subspace(f ` S)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2935	using lf sS linear_0[OF lf]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2936	unfolding linear_def subspace_def
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2937	apply (auto simp add: image_iff)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2938	apply (rule_tac x="x + y" in bexI, auto)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2939	apply (rule_tac x="c*s x" in bexI, auto)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2940	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2941
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2942	lemma subspace_linear_preimage: "linear (f::'a::semiring_1^'n \<Rightarrow> _) ==> subspace S ==> subspace {x. f x \<in> S}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2943	by (auto simp add: subspace_def linear_def linear_0[of f])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2944
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2945	lemma subspace_trivial: "subspace {0::'a::semiring_1 ^_}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2946	by (simp add: subspace_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2947
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2948	lemma subspace_inter: "subspace A \<Longrightarrow> subspace B ==> subspace (A \<inter> B)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2949	by (simp add: subspace_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2950
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2951
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2952	lemma span_mono: "A \<subseteq> B ==> span A \<subseteq> span B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2953	by (metis span_def hull_mono)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2954
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2955	lemma subspace_span: "subspace(span S)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2956	unfolding span_def
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2957	apply (rule hull_in[unfolded mem_def])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2958	apply (simp only: subspace_def Inter_iff Int_iff subset_eq)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2959	apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2960	apply (erule_tac x="X" in ballE)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2961	apply (simp add: mem_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2962	apply blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2963	apply (erule_tac x="X" in ballE)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2964	apply (erule_tac x="X" in ballE)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2965	apply (erule_tac x="X" in ballE)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2966	apply (clarsimp simp add: mem_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2967	apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2968	apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2969	apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2970	apply (erule_tac x="X" in ballE)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2971	apply (erule_tac x="X" in ballE)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2972	apply (simp add: mem_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2973	apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2974	apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2975	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2976
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2977	lemma span_clauses:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2978	"a \<in> S ==> a \<in> span S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2979	"0 \<in> span S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2980	"x\<in> span S \<Longrightarrow> y \<in> span S ==> x + y \<in> span S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2981	"x \<in> span S \<Longrightarrow> c *s x \<in> span S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2982	by (metis span_def hull_subset subset_eq subspace_span subspace_def)+
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2983
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2984	lemma span_induct: assumes SP: "\<And>x. x \<in> S ==> P x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2985	and P: "subspace P" and x: "x \<in> span S" shows "P x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2986	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2987	from SP have SP': "S \<subseteq> P" by (simp add: mem_def subset_eq)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2988	from P have P': "P \<in> subspace" by (simp add: mem_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2989	from x hull_minimal[OF SP' P', unfolded span_def[symmetric]]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2990	show "P x" by (metis mem_def subset_eq)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2991	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2992
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2993	lemma span_empty: "span {} = {(0::'a::semiring_0 ^ 'n)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2994	apply (simp add: span_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2995	apply (rule hull_unique)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2996	apply (auto simp add: mem_def subspace_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2997	unfolding mem_def[of "0::'a^'n", symmetric]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2998	apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	2999	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3000
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3001	lemma independent_empty: "independent {}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3002	by (simp add: dependent_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3003
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3004	lemma independent_mono: "independent A \<Longrightarrow> B \<subseteq> A ==> independent B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3005	apply (clarsimp simp add: dependent_def span_mono)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3006	apply (subgoal_tac "span (B - {a}) \<le> span (A - {a})")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3007	apply force
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3008	apply (rule span_mono)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3009	apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3010	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3011
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3012	lemma span_subspace: "A \<subseteq> B \<Longrightarrow> B \<le> span A \<Longrightarrow> subspace B \<Longrightarrow> span A = B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3013	by (metis order_antisym span_def hull_minimal mem_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3014
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3015	lemma span_induct': assumes SP: "\<forall>x \<in> S. P x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3016	and P: "subspace P" shows "\<forall>x \<in> span S. P x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3017	using span_induct SP P by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3018
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3019	inductive span_induct_alt_help for S:: "'a::semiring_1^'n \<Rightarrow> bool"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3020	where
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3021	span_induct_alt_help_0: "span_induct_alt_help S 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3022	\| span_induct_alt_help_S: "x \<in> S \<Longrightarrow> span_induct_alt_help S z \<Longrightarrow> span_induct_alt_help S (c *s x + z)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3023
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3024	lemma span_induct_alt':
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3025	assumes h0: "h (0::'a::semiring_1^'n)" and hS: "\<And>c x y. x \<in> S \<Longrightarrow> h y \<Longrightarrow> h (c*s x + y)" shows "\<forall>x \<in> span S. h x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3026	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3027	{fix x:: "'a^'n" assume x: "span_induct_alt_help S x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3028	have "h x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3029	apply (rule span_induct_alt_help.induct[OF x])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3030	apply (rule h0)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3031	apply (rule hS, assumption, assumption)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3032	done}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3033	note th0 = this
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3034	{fix x assume x: "x \<in> span S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3035
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3036	have "span_induct_alt_help S x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3037	proof(rule span_induct[where x=x and S=S])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3038	show "x \<in> span S" using x .
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3039	next
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3040	fix x assume xS : "x \<in> S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3041	from span_induct_alt_help_S[OF xS span_induct_alt_help_0, of 1]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3042	show "span_induct_alt_help S x" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3043	next
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3044	have "span_induct_alt_help S 0" by (rule span_induct_alt_help_0)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3045	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3046	{fix x y assume h: "span_induct_alt_help S x" "span_induct_alt_help S y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3047	from h
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3048	have "span_induct_alt_help S (x + y)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3049	apply (induct rule: span_induct_alt_help.induct)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3050	apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3051	unfolding add_assoc
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3052	apply (rule span_induct_alt_help_S)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3053	apply assumption
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3054	apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3055	done}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3056	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3057	{fix c x assume xt: "span_induct_alt_help S x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3058	then have "span_induct_alt_help S (c*s x)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3059	apply (induct rule: span_induct_alt_help.induct)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3060	apply (simp add: span_induct_alt_help_0)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3061	apply (simp add: vector_smult_assoc vector_add_ldistrib)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3062	apply (rule span_induct_alt_help_S)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3063	apply assumption
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3064	apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3065	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3066	}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3067	ultimately show "subspace (span_induct_alt_help S)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3068	unfolding subspace_def mem_def Ball_def by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3069	qed}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3070	with th0 show ?thesis by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3071	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3072
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3073	lemma span_induct_alt:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3074	assumes h0: "h (0::'a::semiring_1^'n)" and hS: "\<And>c x y. x \<in> S \<Longrightarrow> h y \<Longrightarrow> h (c*s x + y)" and x: "x \<in> span S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3075	shows "h x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3076	using span_induct_alt'[of h S] h0 hS x by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3077
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3078	(* Individual closure properties. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3079
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3080	lemma span_superset: "x \<in> S ==> x \<in> span S" by (metis span_clauses)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3081
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3082	lemma span_0: "0 \<in> span S" by (metis subspace_span subspace_0)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3083
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3084	lemma span_add: "x \<in> span S \<Longrightarrow> y \<in> span S ==> x + y \<in> span S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3085	by (metis subspace_add subspace_span)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3086
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3087	lemma span_mul: "x \<in> span S ==> (c *s x) \<in> span S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3088	by (metis subspace_span subspace_mul)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3089
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3090	lemma span_neg: "x \<in> span S ==> - (x::'a::ring_1^'n) \<in> span S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3091	by (metis subspace_neg subspace_span)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3092
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3093	lemma span_sub: "(x::'a::ring_1^'n) \<in> span S \<Longrightarrow> y \<in> span S ==> x - y \<in> span S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3094	by (metis subspace_span subspace_sub)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3095
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3096	lemma span_setsum: "finite A \<Longrightarrow> \<forall>x \<in> A. f x \<in> span S ==> setsum f A \<in> span S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3097	apply (rule subspace_setsum)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3098	by (metis subspace_span subspace_setsum)+
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3099
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3100	lemma span_add_eq: "(x::'a::ring_1^'n) \<in> span S \<Longrightarrow> x + y \<in> span S \<longleftrightarrow> y \<in> span S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3101	apply (auto simp only: span_add span_sub)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3102	apply (subgoal_tac "(x + y) - x \<in> span S", simp)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3103	by (simp only: span_add span_sub)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3104
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3105	(* Mapping under linear image. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3106
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3107	lemma span_linear_image: assumes lf: "linear (f::'a::semiring_1 ^ 'n => _)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3108	shows "span (f ` S) = f ` (span S)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3109	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3110	{fix x
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3111	assume x: "x \<in> span (f ` S)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3112	have "x \<in> f ` span S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3113	apply (rule span_induct[where x=x and S = "f ` S"])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3114	apply (clarsimp simp add: image_iff)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3115	apply (frule span_superset)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3116	apply blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3117	apply (simp only: mem_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3118	apply (rule subspace_linear_image[OF lf])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3119	apply (rule subspace_span)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3120	apply (rule x)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3121	done}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3122	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3123	{fix x assume x: "x \<in> span S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3124	have th0:"(\<lambda>a. f a \<in> span (f ` S)) = {x. f x \<in> span (f ` S)}" apply (rule set_ext)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3125	unfolding mem_def Collect_def ..
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3126	have "f x \<in> span (f ` S)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3127	apply (rule span_induct[where S=S])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3128	apply (rule span_superset)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3129	apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3130	apply (subst th0)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3131	apply (rule subspace_linear_preimage[OF lf subspace_span, of "f ` S"])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3132	apply (rule x)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3133	done}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3134	ultimately show ?thesis by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3135	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3136
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3137	(* The key breakdown property. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3138
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3139	lemma span_breakdown:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3140	assumes bS: "(b::'a::ring_1 ^ 'n) \<in> S" and aS: "a \<in> span S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3141	shows "\<exists>k. a - k*s b \<in> span (S - {b})" (is "?P a")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3142	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3143	{fix x assume xS: "x \<in> S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3144	{assume ab: "x = b"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3145	then have "?P x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3146	apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3147	apply (rule exI[where x="1"], simp)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3148	by (rule span_0)}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3149	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3150	{assume ab: "x \<noteq> b"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3151	then have "?P x" using xS
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3152	apply -
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3153	apply (rule exI[where x=0])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3154	apply (rule span_superset)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3155	by simp}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3156	ultimately have "?P x" by blast}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3157	moreover have "subspace ?P"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3158	unfolding subspace_def
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3159	apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3160	apply (simp add: mem_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3161	apply (rule exI[where x=0])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3162	using span_0[of "S - {b}"]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3163	apply (simp add: mem_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3164	apply (clarsimp simp add: mem_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3165	apply (rule_tac x="k + ka" in exI)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3166	apply (subgoal_tac "x + y - (k + ka) s b = (x - ks b) + (y - ka *s b)")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3167	apply (simp only: )
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3168	apply (rule span_add[unfolded mem_def])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3169	apply assumption+
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3170	apply (vector ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3171	apply (clarsimp simp add: mem_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3172	apply (rule_tac x= "c*k" in exI)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3173	apply (subgoal_tac "c s x - (c k) s b = cs (x - k*s b)")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3174	apply (simp only: )
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3175	apply (rule span_mul[unfolded mem_def])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3176	apply assumption
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3177	by (vector ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3178	ultimately show "?P a" using aS span_induct[where S=S and P= "?P"] by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3179	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3180
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3181	lemma span_breakdown_eq:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3182	"(x::'a::ring_1^'n) \<in> span (insert a S) \<longleftrightarrow> (\<exists>k. (x - k *s a) \<in> span S)" (is "?lhs \<longleftrightarrow> ?rhs")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3183	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3184	{assume x: "x \<in> span (insert a S)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3185	from x span_breakdown[of "a" "insert a S" "x"]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3186	have ?rhs apply clarsimp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3187	apply (rule_tac x= "k" in exI)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3188	apply (rule set_rev_mp[of _ "span (S - {a})" _])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3189	apply assumption
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3190	apply (rule span_mono)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3191	apply blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3192	done}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3193	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3194	{ fix k assume k: "x - k *s a \<in> span S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3195	have eq: "x = (x - k s a) + k s a" by vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3196	have "(x - k s a) + k s a \<in> span (insert a S)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3197	apply (rule span_add)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3198	apply (rule set_rev_mp[of _ "span S" _])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3199	apply (rule k)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3200	apply (rule span_mono)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3201	apply blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3202	apply (rule span_mul)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3203	apply (rule span_superset)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3204	apply blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3205	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3206	then have ?lhs using eq by metis}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3207	ultimately show ?thesis by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3208	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3209
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3210	(* Hence some "reversal" results.*)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3211
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3212	lemma in_span_insert:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3213	assumes a: "(a::'a::field^'n) \<in> span (insert b S)" and na: "a \<notin> span S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3214	shows "b \<in> span (insert a S)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3215	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3216	from span_breakdown[of b "insert b S" a, OF insertI1 a]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3217	obtain k where k: "a - k*s b \<in> span (S - {b})" by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3218	{assume k0: "k = 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3219	with k have "a \<in> span S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3220	apply (simp)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3221	apply (rule set_rev_mp)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3222	apply assumption
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3223	apply (rule span_mono)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3224	apply blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3225	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3226	with na have ?thesis by blast}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3227	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3228	{assume k0: "k \<noteq> 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3229	have eq: "b = (1/k) s a - ((1/k) s a - b)" by vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3230	from k0 have eq': "(1/k) s (a - ks b) = (1/k) *s a - b"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3231	by (vector field_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3232	from k have "(1/k) s (a - ks b) \<in> span (S - {b})"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3233	by (rule span_mul)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3234	hence th: "(1/k) *s a - b \<in> span (S - {b})"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3235	unfolding eq' .
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3236
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3237	from k
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3238	have ?thesis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3239	apply (subst eq)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3240	apply (rule span_sub)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3241	apply (rule span_mul)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3242	apply (rule span_superset)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3243	apply blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3244	apply (rule set_rev_mp)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3245	apply (rule th)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3246	apply (rule span_mono)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3247	using na by blast}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3248	ultimately show ?thesis by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3249	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3250
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3251	lemma in_span_delete:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3252	assumes a: "(a::'a::field^'n) \<in> span S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3253	and na: "a \<notin> span (S-{b})"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3254	shows "b \<in> span (insert a (S - {b}))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3255	apply (rule in_span_insert)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3256	apply (rule set_rev_mp)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3257	apply (rule a)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3258	apply (rule span_mono)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3259	apply blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3260	apply (rule na)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3261	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3262
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3263	(* Transitivity property. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3264
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3265	lemma span_trans:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3266	assumes x: "(x::'a::ring_1^'n) \<in> span S" and y: "y \<in> span (insert x S)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3267	shows "y \<in> span S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3268	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3269	from span_breakdown[of x "insert x S" y, OF insertI1 y]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3270	obtain k where k: "y -k*s x \<in> span (S - {x})" by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3271	have eq: "y = (y - k s x) + k s x" by vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3272	show ?thesis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3273	apply (subst eq)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3274	apply (rule span_add)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3275	apply (rule set_rev_mp)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3276	apply (rule k)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3277	apply (rule span_mono)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3278	apply blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3279	apply (rule span_mul)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3280	by (rule x)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3281	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3282
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3283	(* ------------------------------------------------------------------------- *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3284	(* An explicit expansion is sometimes needed. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3285	(* ------------------------------------------------------------------------- *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3286
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3287	lemma span_explicit:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3288	"span P = {y::'a::semiring_1^'n. \<exists>S u. finite S \<and> S \<subseteq> P \<and> setsum (\<lambda>v. u v *s v) S = y}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3289	(is "_ = ?E" is "_ = {y. ?h y}" is "_ = {y. \<exists>S u. ?Q S u y}")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3290	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3291	{fix x assume x: "x \<in> ?E"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3292	then obtain S u where fS: "finite S" and SP: "S\<subseteq>P" and u: "setsum (\<lambda>v. u v *s v) S = x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3293	by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3294	have "x \<in> span P"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3295	unfolding u[symmetric]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3296	apply (rule span_setsum[OF fS])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3297	using span_mono[OF SP]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3298	by (auto intro: span_superset span_mul)}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3299	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3300	have "\<forall>x \<in> span P. x \<in> ?E"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3301	unfolding mem_def Collect_def
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3302	proof(rule span_induct_alt')
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3303	show "?h 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3304	apply (rule exI[where x="{}"]) by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3305	next
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3306	fix c x y
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3307	assume x: "x \<in> P" and hy: "?h y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3308	from hy obtain S u where fS: "finite S" and SP: "S\<subseteq>P"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3309	and u: "setsum (\<lambda>v. u v *s v) S = y" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3310	let ?S = "insert x S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3311	let ?u = "\<lambda>y. if y = x then (if x \<in> S then u y + c else c)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3312	else u y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3313	from fS SP x have th0: "finite (insert x S)" "insert x S \<subseteq> P" by blast+
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3314	{assume xS: "x \<in> S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3315	have S1: "S = (S - {x}) \<union> {x}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3316	and Sss:"finite (S - {x})" "finite {x}" "(S -{x}) \<inter> {x} = {}" using xS fS by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3317	have "setsum (\<lambda>v. ?u v s v) ?S =(\<Sum>v\<in>S - {x}. u v s v) + (u x + c) *s x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3318	using xS
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3319	by (simp add: setsum_Un_disjoint[OF Sss, unfolded S1[symmetric]]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3320	setsum_clauses(2)[OF fS] cong del: if_weak_cong)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3321	also have "\<dots> = (\<Sum>v\<in>S. u v s v) + c s x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3322	apply (simp add: setsum_Un_disjoint[OF Sss, unfolded S1[symmetric]])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3323	by (vector ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3324	also have "\<dots> = c*s x + y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3325	by (simp add: add_commute u)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3326	finally have "setsum (\<lambda>v. ?u v s v) ?S = cs x + y" .
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3327	then have "?Q ?S ?u (c*s x + y)" using th0 by blast}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3328	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3329	{assume xS: "x \<notin> S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3330	have th00: "(\<Sum>v\<in>S. (if v = x then c else u v) *s v) = y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3331	unfolding u[symmetric]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3332	apply (rule setsum_cong2)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3333	using xS by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3334	have "?Q ?S ?u (c*s x + y)" using fS xS th0
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3335	by (simp add: th00 setsum_clauses add_commute cong del: if_weak_cong)}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3336	ultimately have "?Q ?S ?u (c*s x + y)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3337	by (cases "x \<in> S", simp, simp)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3338	then show "?h (c*s x + y)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3339	apply -
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3340	apply (rule exI[where x="?S"])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3341	apply (rule exI[where x="?u"]) by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3342	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3343	ultimately show ?thesis by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3344	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3345
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3346	lemma dependent_explicit:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3347	"dependent P \<longleftrightarrow> (\<exists>S u. finite S \<and> S \<subseteq> P \<and> (\<exists>(v::'a::{idom,field}^'n) \<in>S. u v \<noteq> 0 \<and> setsum (\<lambda>v. u v *s v) S = 0))" (is "?lhs = ?rhs")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3348	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3349	{assume dP: "dependent P"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3350	then obtain a S u where aP: "a \<in> P" and fS: "finite S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3351	and SP: "S \<subseteq> P - {a}" and ua: "setsum (\<lambda>v. u v *s v) S = a"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3352	unfolding dependent_def span_explicit by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3353	let ?S = "insert a S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3354	let ?u = "\<lambda>y. if y = a then - 1 else u y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3355	let ?v = a
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3356	from aP SP have aS: "a \<notin> S" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3357	from fS SP aP have th0: "finite ?S" "?S \<subseteq> P" "?v \<in> ?S" "?u ?v \<noteq> 0" by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3358	have s0: "setsum (\<lambda>v. ?u v *s v) ?S = 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3359	using fS aS
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3360	apply (simp add: vector_smult_lneg vector_smult_lid setsum_clauses ring_simps )
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3361	apply (subst (2) ua[symmetric])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3362	apply (rule setsum_cong2)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3363	by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3364	with th0 have ?rhs
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3365	apply -
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3366	apply (rule exI[where x= "?S"])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3367	apply (rule exI[where x= "?u"])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3368	by clarsimp}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3369	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3370	{fix S u v assume fS: "finite S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3371	and SP: "S \<subseteq> P" and vS: "v \<in> S" and uv: "u v \<noteq> 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3372	and u: "setsum (\<lambda>v. u v *s v) S = 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3373	let ?a = v
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3374	let ?S = "S - {v}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3375	let ?u = "\<lambda>i. (- u i) / u v"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3376	have th0: "?a \<in> P" "finite ?S" "?S \<subseteq> P" using fS SP vS by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3377	have "setsum (\<lambda>v. ?u v s v) ?S = setsum (\<lambda>v. (- (inverse (u ?a))) s (u v s v)) S - ?u v s v"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3378	using fS vS uv
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3379	by (simp add: setsum_diff1 vector_smult_lneg divide_inverse
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3380	vector_smult_assoc field_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3381	also have "\<dots> = ?a"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3382	unfolding setsum_cmul u
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3383	using uv by (simp add: vector_smult_lneg)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3384	finally have "setsum (\<lambda>v. ?u v *s v) ?S = ?a" .
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3385	with th0 have ?lhs
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3386	unfolding dependent_def span_explicit
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3387	apply -
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3388	apply (rule bexI[where x= "?a"])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3389	apply simp_all
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3390	apply (rule exI[where x= "?S"])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3391	by auto}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3392	ultimately show ?thesis by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3393	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3394
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3395
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3396	lemma span_finite:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3397	assumes fS: "finite S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3398	shows "span S = {(y::'a::semiring_1^'n). \<exists>u. setsum (\<lambda>v. u v *s v) S = y}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3399	(is "_ = ?rhs")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3400	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3401	{fix y assume y: "y \<in> span S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3402	from y obtain S' u where fS': "finite S'" and SS': "S' \<subseteq> S" and
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3403	u: "setsum (\<lambda>v. u v *s v) S' = y" unfolding span_explicit by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3404	let ?u = "\<lambda>x. if x \<in> S' then u x else 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3405	from setsum_restrict_set[OF fS, of "\<lambda>v. u v *s v" S', symmetric] SS'
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3406	have "setsum (\<lambda>v. ?u v s v) S = setsum (\<lambda>v. u v s v) S'"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3407	unfolding cond_value_iff cond_application_beta
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3408	apply (simp add: cond_value_iff cong del: if_weak_cong)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3409	apply (rule setsum_cong)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3410	apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3411	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3412	hence "setsum (\<lambda>v. ?u v *s v) S = y" by (metis u)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3413	hence "y \<in> ?rhs" by auto}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3414	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3415	{fix y u assume u: "setsum (\<lambda>v. u v *s v) S = y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3416	then have "y \<in> span S" using fS unfolding span_explicit by auto}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3417	ultimately show ?thesis by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3418	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3419
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3420
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3421	(* Standard bases are a spanning set, and obviously finite. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3422
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3423	lemma span_stdbasis:"span {basis i :: 'a::ring_1^'n \| i. i \<in> {1 .. dimindex(UNIV :: 'n set)}} = UNIV"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3424	apply (rule set_ext)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3425	apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3426	apply (subst basis_expansion[symmetric])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3427	apply (rule span_setsum)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3428	apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3429	apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3430	apply (rule span_mul)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3431	apply (rule span_superset)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3432	apply (auto simp add: Collect_def mem_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3433	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3434
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3435
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3436	lemma has_size_stdbasis: "{basis i ::real ^'n \| i. i \<in> {1 .. dimindex (UNIV :: 'n set)}} hassize (dimindex(UNIV :: 'n set))" (is "?S hassize ?n")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3437	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3438	have eq: "?S = basis ` {1 .. ?n}" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3439	show ?thesis unfolding eq
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3440	apply (rule hassize_image_inj[OF basis_inj])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3441	by (simp add: hassize_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3442	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3443
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3444	lemma finite_stdbasis: "finite {basis i ::real^'n \|i. i\<in> {1 .. dimindex(UNIV:: 'n set)}}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3445	using has_size_stdbasis[unfolded hassize_def]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3446	..
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3447
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3448	lemma card_stdbasis: "card {basis i ::real^'n \|i. i\<in> {1 .. dimindex(UNIV :: 'n set)}} = dimindex(UNIV :: 'n set)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3449	using has_size_stdbasis[unfolded hassize_def]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3450	..
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3451
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3452	lemma independent_stdbasis_lemma:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3453	assumes x: "(x::'a::semiring_1 ^ 'n) \<in> span (basis ` S)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3454	and i: "i \<in> {1 .. dimindex (UNIV :: 'n set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3455	and iS: "i \<notin> S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3456	shows "(x$i) = 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3457	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3458	let ?n = "dimindex (UNIV :: 'n set)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3459	let ?U = "{1 .. ?n}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3460	let ?B = "basis ` S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3461	let ?P = "\<lambda>(x::'a^'n). \<forall>i\<in> ?U. i \<notin> S \<longrightarrow> x$i =0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3462	{fix x::"'a^'n" assume xS: "x\<in> ?B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3463	from xS have "?P x" by (auto simp add: basis_component)}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3464	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3465	have "subspace ?P"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3466	by (auto simp add: subspace_def Collect_def mem_def zero_index vector_component)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3467	ultimately show ?thesis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3468	using x span_induct[of ?B ?P x] i iS by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3469	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3470
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3471	lemma independent_stdbasis: "independent {basis i ::real^'n \|i. i\<in> {1 .. dimindex(UNIV :: 'n set)}}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3472	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3473	let ?n = "dimindex (UNIV :: 'n set)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3474	let ?I = "{1 .. ?n}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3475	let ?b = "basis :: nat \<Rightarrow> real ^'n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3476	let ?B = "?b ` ?I"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3477	have eq: "{?b i\|i. i \<in> ?I} = ?B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3478	by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3479	{assume d: "dependent ?B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3480	then obtain k where k: "k \<in> ?I" "?b k \<in> span (?B - {?b k})"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3481	unfolding dependent_def by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3482	have eq1: "?B - {?b k} = ?B - ?b ` {k}" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3483	have eq2: "?B - {?b k} = ?b ` (?I - {k})"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3484	unfolding eq1
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3485	apply (rule inj_on_image_set_diff[symmetric])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3486	apply (rule basis_inj) using k(1) by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3487	from k(2) have th0: "?b k \<in> span (?b ` (?I - {k}))" unfolding eq2 .
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3488	from independent_stdbasis_lemma[OF th0 k(1), simplified]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3489	have False by (simp add: basis_component[OF k(1), of k])}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3490	then show ?thesis unfolding eq dependent_def ..
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3491	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3492
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3493	(* This is useful for building a basis step-by-step. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3494
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3495	lemma independent_insert:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3496	"independent(insert (a::'a::field ^'n) S) \<longleftrightarrow>
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3497	(if a \<in> S then independent S
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3498	else independent S \<and> a \<notin> span S)" (is "?lhs \<longleftrightarrow> ?rhs")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3499	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3500	{assume aS: "a \<in> S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3501	hence ?thesis using insert_absorb[OF aS] by simp}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3502	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3503	{assume aS: "a \<notin> S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3504	{assume i: ?lhs
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3505	then have ?rhs using aS
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3506	apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3507	apply (rule conjI)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3508	apply (rule independent_mono)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3509	apply assumption
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3510	apply blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3511	by (simp add: dependent_def)}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3512	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3513	{assume i: ?rhs
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3514	have ?lhs using i aS
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3515	apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3516	apply (auto simp add: dependent_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3517	apply (case_tac "aa = a", auto)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3518	apply (subgoal_tac "insert a S - {aa} = insert a (S - {aa})")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3519	apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3520	apply (subgoal_tac "a \<in> span (insert aa (S - {aa}))")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3521	apply (subgoal_tac "insert aa (S - {aa}) = S")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3522	apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3523	apply blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3524	apply (rule in_span_insert)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3525	apply assumption
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3526	apply blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3527	apply blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3528	done}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3529	ultimately have ?thesis by blast}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3530	ultimately show ?thesis by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3531	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3532
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3533	(* The degenerate case of the Exchange Lemma. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3534
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3535	lemma mem_delete: "x \<in> (A - {a}) \<longleftrightarrow> x \<noteq> a \<and> x \<in> A"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3536	by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3537
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3538	lemma span_span: "span (span A) = span A"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3539	unfolding span_def hull_hull ..
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3540
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3541	lemma span_inc: "S \<subseteq> span S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3542	by (metis subset_eq span_superset)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3543
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3544	lemma spanning_subset_independent:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3545	assumes BA: "B \<subseteq> A" and iA: "independent (A::('a::field ^'n) set)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3546	and AsB: "A \<subseteq> span B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3547	shows "A = B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3548	proof
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3549	from BA show "B \<subseteq> A" .
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3550	next
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3551	from span_mono[OF BA] span_mono[OF AsB]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3552	have sAB: "span A = span B" unfolding span_span by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3553
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3554	{fix x assume x: "x \<in> A"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3555	from iA have th0: "x \<notin> span (A - {x})"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3556	unfolding dependent_def using x by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3557	from x have xsA: "x \<in> span A" by (blast intro: span_superset)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3558	have "A - {x} \<subseteq> A" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3559	hence th1:"span (A - {x}) \<subseteq> span A" by (metis span_mono)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3560	{assume xB: "x \<notin> B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3561	from xB BA have "B \<subseteq> A -{x}" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3562	hence "span B \<subseteq> span (A - {x})" by (metis span_mono)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3563	with th1 th0 sAB have "x \<notin> span A" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3564	with x have False by (metis span_superset)}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3565	then have "x \<in> B" by blast}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3566	then show "A \<subseteq> B" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3567	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3568
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3569	(* The general case of the Exchange Lemma, the key to what follows. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3570
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3571	lemma exchange_lemma:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3572	assumes f:"finite (t:: ('a::field^'n) set)" and i: "independent s"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3573	and sp:"s \<subseteq> span t"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3574	shows "\<exists>t'. (t' hassize card t) \<and> s \<subseteq> t' \<and> t' \<subseteq> s \<union> t \<and> s \<subseteq> span t'"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3575	using f i sp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3576	proof(induct c\<equiv>"card(t - s)" arbitrary: s t rule: nat_less_induct)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3577	fix n:: nat and s t :: "('a ^'n) set"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3578	assume H: " \<forall>m<n. \<forall>(x:: ('a ^'n) set) xa.
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3579	finite xa \<longrightarrow>
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3580	independent x \<longrightarrow>
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3581	x \<subseteq> span xa \<longrightarrow>
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3582	m = card (xa - x) \<longrightarrow>
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3583	(\<exists>t'. (t' hassize card xa) \<and>
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3584	x \<subseteq> t' \<and> t' \<subseteq> x \<union> xa \<and> x \<subseteq> span t')"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3585	and ft: "finite t" and s: "independent s" and sp: "s \<subseteq> span t"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3586	and n: "n = card (t - s)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3587	let ?P = "\<lambda>t'. (t' hassize card t) \<and> s \<subseteq> t' \<and> t' \<subseteq> s \<union> t \<and> s \<subseteq> span t'"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3588	let ?ths = "\<exists>t'. ?P t'"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3589	{assume st: "s \<subseteq> t"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3590	from st ft span_mono[OF st] have ?ths apply - apply (rule exI[where x=t])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3591	by (auto simp add: hassize_def intro: span_superset)}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3592	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3593	{assume st: "t \<subseteq> s"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3594
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3595	from spanning_subset_independent[OF st s sp]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3596	st ft span_mono[OF st] have ?ths apply - apply (rule exI[where x=t])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3597	by (auto simp add: hassize_def intro: span_superset)}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3598	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3599	{assume st: "\<not> s \<subseteq> t" "\<not> t \<subseteq> s"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3600	from st(2) obtain b where b: "b \<in> t" "b \<notin> s" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3601	from b have "t - {b} - s \<subset> t - s" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3602	then have cardlt: "card (t - {b} - s) < n" using n ft
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3603	by (auto intro: psubset_card_mono)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3604	from b ft have ct0: "card t \<noteq> 0" by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3605	{assume stb: "s \<subseteq> span(t -{b})"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3606	from ft have ftb: "finite (t -{b})" by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3607	from H[rule_format, OF cardlt ftb s stb]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3608	obtain u where u: "u hassize card (t-{b})" "s \<subseteq> u" "u \<subseteq> s \<union> (t - {b})" "s \<subseteq> span u" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3609	let ?w = "insert b u"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3610	have th0: "s \<subseteq> insert b u" using u by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3611	from u(3) b have "u \<subseteq> s \<union> t" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3612	then have th1: "insert b u \<subseteq> s \<union> t" using u b by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3613	have bu: "b \<notin> u" using b u by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3614	from u(1) have fu: "finite u" by (simp add: hassize_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3615	from u(1) ft b have "u hassize (card t - 1)" by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3616	then
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3617	have th2: "insert b u hassize card t"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3618	using card_insert_disjoint[OF fu bu] ct0 by (auto simp add: hassize_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3619	from u(4) have "s \<subseteq> span u" .
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3620	also have "\<dots> \<subseteq> span (insert b u)" apply (rule span_mono) by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3621	finally have th3: "s \<subseteq> span (insert b u)" . from th0 th1 th2 th3 have th: "?P ?w" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3622	from th have ?ths by blast}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3623	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3624	{assume stb: "\<not> s \<subseteq> span(t -{b})"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3625	from stb obtain a where a: "a \<in> s" "a \<notin> span (t - {b})" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3626	have ab: "a \<noteq> b" using a b by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3627	have at: "a \<notin> t" using a ab span_superset[of a "t- {b}"] by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3628	have mlt: "card ((insert a (t - {b})) - s) < n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3629	using cardlt ft n a b by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3630	have ft': "finite (insert a (t - {b}))" using ft by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3631	{fix x assume xs: "x \<in> s"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3632	have t: "t \<subseteq> (insert b (insert a (t -{b})))" using b by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3633	from b(1) have "b \<in> span t" by (simp add: span_superset)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3634	have bs: "b \<in> span (insert a (t - {b}))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3635	by (metis in_span_delete a sp mem_def subset_eq)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3636	from xs sp have "x \<in> span t" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3637	with span_mono[OF t]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3638	have x: "x \<in> span (insert b (insert a (t - {b})))" ..
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3639	from span_trans[OF bs x] have "x \<in> span (insert a (t - {b}))" .}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3640	then have sp': "s \<subseteq> span (insert a (t - {b}))" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3641
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3642	from H[rule_format, OF mlt ft' s sp' refl] obtain u where
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3643	u: "u hassize card (insert a (t -{b}))" "s \<subseteq> u" "u \<subseteq> s \<union> insert a (t -{b})"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3644	"s \<subseteq> span u" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3645	from u a b ft at ct0 have "?P u" by (auto simp add: hassize_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3646	then have ?ths by blast }
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3647	ultimately have ?ths by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3648	}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3649	ultimately
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3650	show ?ths by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3651	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3652
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3653	(* This implies corresponding size bounds. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3654
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3655	lemma independent_span_bound:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3656	assumes f: "finite t" and i: "independent (s::('a::field^'n) set)" and sp:"s \<subseteq> span t"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3657	shows "finite s \<and> card s \<le> card t"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3658	by (metis exchange_lemma[OF f i sp] hassize_def finite_subset card_mono)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3659
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3660	lemma finite_Atleast_Atmost[simp]: "finite {f x \|x. x\<in> {(i::'a::finite_intvl_succ) .. j}}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3661	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3662	have eq: "{f x \|x. x\<in> {i .. j}} = f ` {i .. j}" by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3663	show ?thesis unfolding eq
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3664	apply (rule finite_imageI)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3665	apply (rule finite_intvl)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3666	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3667	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3668
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3669	lemma finite_Atleast_Atmost_nat[simp]: "finite {f x \|x. x\<in> {(i::nat) .. j}}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3670	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3671	have eq: "{f x \|x. x\<in> {i .. j}} = f ` {i .. j}" by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3672	show ?thesis unfolding eq
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3673	apply (rule finite_imageI)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3674	apply (rule finite_atLeastAtMost)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3675	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3676	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3677
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3678
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3679	lemma independent_bound:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3680	fixes S:: "(real^'n) set"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3681	shows "independent S \<Longrightarrow> finite S \<and> card S <= dimindex(UNIV :: 'n set)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3682	apply (subst card_stdbasis[symmetric])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3683	apply (rule independent_span_bound)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3684	apply (rule finite_Atleast_Atmost_nat)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3685	apply assumption
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3686	unfolding span_stdbasis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3687	apply (rule subset_UNIV)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3688	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3689
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3690	lemma dependent_biggerset: "(finite (S::(real ^'n) set) ==> card S > dimindex(UNIV:: 'n set)) ==> dependent S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3691	by (metis independent_bound not_less)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3692
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3693	(* Hence we can create a maximal independent subset. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3694
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3695	lemma maximal_independent_subset_extend:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3696	assumes sv: "(S::(real^'n) set) \<subseteq> V" and iS: "independent S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3697	shows "\<exists>B. S \<subseteq> B \<and> B \<subseteq> V \<and> independent B \<and> V \<subseteq> span B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3698	using sv iS
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3699	proof(induct d\<equiv> "dimindex (UNIV :: 'n set) - card S" arbitrary: S rule: nat_less_induct)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3700	fix n and S:: "(real^'n) set"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3701	assume H: "\<forall>m<n. \<forall>S \<subseteq> V. independent S \<longrightarrow> m = dimindex (UNIV::'n set) - card S \<longrightarrow>
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3702	(\<exists>B. S \<subseteq> B \<and> B \<subseteq> V \<and> independent B \<and> V \<subseteq> span B)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3703	and sv: "S \<subseteq> V" and i: "independent S" and n: "n = dimindex (UNIV :: 'n set) - card S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3704	let ?P = "\<lambda>B. S \<subseteq> B \<and> B \<subseteq> V \<and> independent B \<and> V \<subseteq> span B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3705	let ?ths = "\<exists>x. ?P x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3706	let ?d = "dimindex (UNIV :: 'n set)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3707	{assume "V \<subseteq> span S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3708	then have ?ths using sv i by blast }
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3709	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3710	{assume VS: "\<not> V \<subseteq> span S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3711	from VS obtain a where a: "a \<in> V" "a \<notin> span S" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3712	from a have aS: "a \<notin> S" by (auto simp add: span_superset)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3713	have th0: "insert a S \<subseteq> V" using a sv by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3714	from independent_insert[of a S] i a
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3715	have th1: "independent (insert a S)" by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3716	have mlt: "?d - card (insert a S) < n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3717	using aS a n independent_bound[OF th1] dimindex_ge_1[of "UNIV :: 'n set"]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3718	by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3719
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3720	from H[rule_format, OF mlt th0 th1 refl]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3721	obtain B where B: "insert a S \<subseteq> B" "B \<subseteq> V" "independent B" " V \<subseteq> span B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3722	by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3723	from B have "?P B" by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3724	then have ?ths by blast}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3725	ultimately show ?ths by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3726	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3727
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3728	lemma maximal_independent_subset:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3729	"\<exists>(B:: (real ^'n) set). B\<subseteq> V \<and> independent B \<and> V \<subseteq> span B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3730	by (metis maximal_independent_subset_extend[of "{}:: (real ^'n) set"] empty_subsetI independent_empty)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3731
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3732	(* Notion of dimension. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3733
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3734	definition "dim V = (SOME n. \<exists>B. B \<subseteq> V \<and> independent B \<and> V \<subseteq> span B \<and> (B hassize n))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3735
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3736	lemma basis_exists: "\<exists>B. (B :: (real ^'n) set) \<subseteq> V \<and> independent B \<and> V \<subseteq> span B \<and> (B hassize dim V)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3737	unfolding dim_def some_eq_ex[of "\<lambda>n. \<exists>B. B \<subseteq> V \<and> independent B \<and> V \<subseteq> span B \<and> (B hassize n)"]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3738	unfolding hassize_def
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3739	using maximal_independent_subset[of V] independent_bound
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3740	by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3741
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3742	(* Consequences of independence or spanning for cardinality. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3743
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3744	lemma independent_card_le_dim: "(B::(real ^'n) set) \<subseteq> V \<Longrightarrow> independent B \<Longrightarrow> finite B \<and> card B \<le> dim V"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3745	by (metis basis_exists[of V] independent_span_bound[where ?'a=real] hassize_def subset_trans)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3746
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3747	lemma span_card_ge_dim: "(B::(real ^'n) set) \<subseteq> V \<Longrightarrow> V \<subseteq> span B \<Longrightarrow> finite B \<Longrightarrow> dim V \<le> card B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3748	by (metis basis_exists[of V] independent_span_bound hassize_def subset_trans)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3749
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3750	lemma basis_card_eq_dim:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3751	"B \<subseteq> (V:: (real ^'n) set) \<Longrightarrow> V \<subseteq> span B \<Longrightarrow> independent B \<Longrightarrow> finite B \<and> card B = dim V"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3752	by (metis order_eq_iff independent_card_le_dim span_card_ge_dim independent_mono)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3753
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3754	lemma dim_unique: "(B::(real ^'n) set) \<subseteq> V \<Longrightarrow> V \<subseteq> span B \<Longrightarrow> independent B \<Longrightarrow> B hassize n \<Longrightarrow> dim V = n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3755	by (metis basis_card_eq_dim hassize_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3756
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3757	(* More lemmas about dimension. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3758
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3759	lemma dim_univ: "dim (UNIV :: (real^'n) set) = dimindex (UNIV :: 'n set)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3760	apply (rule dim_unique[of "{basis i \|i. i\<in> {1 .. dimindex (UNIV :: 'n set)}}"])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3761	by (auto simp only: span_stdbasis has_size_stdbasis independent_stdbasis)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3762
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3763	lemma dim_subset:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3764	"(S:: (real ^'n) set) \<subseteq> T \<Longrightarrow> dim S \<le> dim T"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3765	using basis_exists[of T] basis_exists[of S]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3766	by (metis independent_span_bound[where ?'a = real and ?'n = 'n] subset_eq hassize_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3767
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3768	lemma dim_subset_univ: "dim (S:: (real^'n) set) \<le> dimindex (UNIV :: 'n set)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3769	by (metis dim_subset subset_UNIV dim_univ)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3770
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3771	(* Converses to those. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3772
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3773	lemma card_ge_dim_independent:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3774	assumes BV:"(B::(real ^'n) set) \<subseteq> V" and iB:"independent B" and dVB:"dim V \<le> card B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3775	shows "V \<subseteq> span B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3776	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3777	{fix a assume aV: "a \<in> V"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3778	{assume aB: "a \<notin> span B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3779	then have iaB: "independent (insert a B)" using iB aV BV by (simp add: independent_insert)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3780	from aV BV have th0: "insert a B \<subseteq> V" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3781	from aB have "a \<notin>B" by (auto simp add: span_superset)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3782	with independent_card_le_dim[OF th0 iaB] dVB have False by auto}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3783	then have "a \<in> span B" by blast}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3784	then show ?thesis by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3785	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3786
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3787	lemma card_le_dim_spanning:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3788	assumes BV: "(B:: (real ^'n) set) \<subseteq> V" and VB: "V \<subseteq> span B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3789	and fB: "finite B" and dVB: "dim V \<ge> card B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3790	shows "independent B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3791	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3792	{fix a assume a: "a \<in> B" "a \<in> span (B -{a})"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3793	from a fB have c0: "card B \<noteq> 0" by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3794	from a fB have cb: "card (B -{a}) = card B - 1" by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3795	from BV a have th0: "B -{a} \<subseteq> V" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3796	{fix x assume x: "x \<in> V"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3797	from a have eq: "insert a (B -{a}) = B" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3798	from x VB have x': "x \<in> span B" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3799	from span_trans[OF a(2), unfolded eq, OF x']
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3800	have "x \<in> span (B -{a})" . }
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3801	then have th1: "V \<subseteq> span (B -{a})" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3802	have th2: "finite (B -{a})" using fB by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3803	from span_card_ge_dim[OF th0 th1 th2]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3804	have c: "dim V \<le> card (B -{a})" .
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3805	from c c0 dVB cb have False by simp}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3806	then show ?thesis unfolding dependent_def by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3807	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3808
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3809	lemma card_eq_dim: "(B:: (real ^'n) set) \<subseteq> V \<Longrightarrow> B hassize dim V \<Longrightarrow> independent B \<longleftrightarrow> V \<subseteq> span B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3810	by (metis hassize_def order_eq_iff card_le_dim_spanning
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3811	card_ge_dim_independent)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3812
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3813	(* ------------------------------------------------------------------------- *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3814	(* More general size bound lemmas. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3815	(* ------------------------------------------------------------------------- *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3816
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3817	lemma independent_bound_general:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3818	"independent (S:: (real^'n) set) \<Longrightarrow> finite S \<and> card S \<le> dim S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3819	by (metis independent_card_le_dim independent_bound subset_refl)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3820
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3821	lemma dependent_biggerset_general: "(finite (S:: (real^'n) set) \<Longrightarrow> card S > dim S) \<Longrightarrow> dependent S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3822	using independent_bound_general[of S] by (metis linorder_not_le)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3823
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3824	lemma dim_span: "dim (span (S:: (real ^'n) set)) = dim S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3825	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3826	have th0: "dim S \<le> dim (span S)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3827	by (auto simp add: subset_eq intro: dim_subset span_superset)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3828	from basis_exists[of S]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3829	obtain B where B: "B \<subseteq> S" "independent B" "S \<subseteq> span B" "B hassize dim S" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3830	from B have fB: "finite B" "card B = dim S" unfolding hassize_def by blast+
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3831	have bSS: "B \<subseteq> span S" using B(1) by (metis subset_eq span_inc)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3832	have sssB: "span S \<subseteq> span B" using span_mono[OF B(3)] by (simp add: span_span)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3833	from span_card_ge_dim[OF bSS sssB fB(1)] th0 show ?thesis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3834	using fB(2) by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3835	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3836
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3837	lemma subset_le_dim: "(S:: (real ^'n) set) \<subseteq> span T \<Longrightarrow> dim S \<le> dim T"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3838	by (metis dim_span dim_subset)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3839
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3840	lemma span_eq_dim: "span (S:: (real ^'n) set) = span T ==> dim S = dim T"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3841	by (metis dim_span)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3842
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3843	lemma spans_image:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3844	assumes lf: "linear (f::'a::semiring_1^'n \<Rightarrow> _)" and VB: "V \<subseteq> span B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3845	shows "f ` V \<subseteq> span (f ` B)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3846	unfolding span_linear_image[OF lf]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3847	by (metis VB image_mono)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3848
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3849	lemma dim_image_le: assumes lf: "linear f" shows "dim (f ` S) \<le> dim (S:: (real ^'n) set)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3850	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3851	from basis_exists[of S] obtain B where
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3852	B: "B \<subseteq> S" "independent B" "S \<subseteq> span B" "B hassize dim S" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3853	from B have fB: "finite B" "card B = dim S" unfolding hassize_def by blast+
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3854	have "dim (f ` S) \<le> card (f ` B)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3855	apply (rule span_card_ge_dim)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3856	using lf B fB by (auto simp add: span_linear_image spans_image subset_image_iff)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3857	also have "\<dots> \<le> dim S" using card_image_le[OF fB(1)] fB by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3858	finally show ?thesis .
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3859	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3860
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3861	(* Relation between bases and injectivity/surjectivity of map. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3862
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3863	lemma spanning_surjective_image:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3864	assumes us: "UNIV \<subseteq> span (S:: ('a::semiring_1 ^'n) set)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3865	and lf: "linear f" and sf: "surj f"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3866	shows "UNIV \<subseteq> span (f ` S)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3867	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3868	have "UNIV \<subseteq> f ` UNIV" using sf by (auto simp add: surj_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3869	also have " \<dots> \<subseteq> span (f ` S)" using spans_image[OF lf us] .
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3870	finally show ?thesis .
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3871	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3872
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3873	lemma independent_injective_image:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3874	assumes iS: "independent (S::('a::semiring_1^'n) set)" and lf: "linear f" and fi: "inj f"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3875	shows "independent (f ` S)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3876	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3877	{fix a assume a: "a \<in> S" "f a \<in> span (f ` S - {f a})"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3878	have eq: "f ` S - {f a} = f ` (S - {a})" using fi
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3879	by (auto simp add: inj_on_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3880	from a have "f a \<in> f ` span (S -{a})"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3881	unfolding eq span_linear_image[OF lf, of "S - {a}"] by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3882	hence "a \<in> span (S -{a})" using fi by (auto simp add: inj_on_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3883	with a(1) iS have False by (simp add: dependent_def) }
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3884	then show ?thesis unfolding dependent_def by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3885	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3886
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3887	(* ------------------------------------------------------------------------- *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3888	(* Picking an orthogonal replacement for a spanning set. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3889	(* ------------------------------------------------------------------------- *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3890	(* FIXME : Move to some general theory ?*)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3891	definition "pairwise R S \<longleftrightarrow> (\<forall>x \<in> S. \<forall>y\<in> S. x\<noteq>y \<longrightarrow> R x y)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3892
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3893	lemma vector_sub_project_orthogonal: "(b::'a::ordered_field^'n) \<bullet> (x - ((b \<bullet> x) / (b\<bullet>b)) *s b) = 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3894	apply (cases "b = 0", simp)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3895	apply (simp add: dot_rsub dot_rmult)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3896	unfolding times_divide_eq_right[symmetric]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3897	by (simp add: field_simps dot_eq_0)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3898
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3899	lemma basis_orthogonal:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3900	fixes B :: "(real ^'n) set"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3901	assumes fB: "finite B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3902	shows "\<exists>C. finite C \<and> card C \<le> card B \<and> span C = span B \<and> pairwise orthogonal C"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3903	(is " \<exists>C. ?P B C")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3904	proof(induct rule: finite_induct[OF fB])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3905	case 1 thus ?case apply (rule exI[where x="{}"]) by (auto simp add: pairwise_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3906	next
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3907	case (2 a B)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3908	note fB = `finite B` and aB = `a \<notin> B`
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3909	from `\<exists>C. finite C \<and> card C \<le> card B \<and> span C = span B \<and> pairwise orthogonal C`
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3910	obtain C where C: "finite C" "card C \<le> card B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3911	"span C = span B" "pairwise orthogonal C" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3912	let ?a = "a - setsum (\<lambda>x. (x\<bullet>a / (x\<bullet>x)) *s x) C"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3913	let ?C = "insert ?a C"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3914	from C(1) have fC: "finite ?C" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3915	from fB aB C(1,2) have cC: "card ?C \<le> card (insert a B)" by (simp add: card_insert_if)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3916	{fix x k
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3917	have th0: "\<And>(a::'b::comm_ring) b c. a - (b - c) = c + (a - b)" by (simp add: ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3918	have "x - k s (a - (\<Sum>x\<in>C. (x \<bullet> a / (x \<bullet> x)) s x)) \<in> span C \<longleftrightarrow> x - k *s a \<in> span C"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3919	apply (simp only: vector_ssub_ldistrib th0)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3920	apply (rule span_add_eq)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3921	apply (rule span_mul)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3922	apply (rule span_setsum[OF C(1)])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3923	apply clarify
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3924	apply (rule span_mul)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3925	by (rule span_superset)}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3926	then have SC: "span ?C = span (insert a B)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3927	unfolding expand_set_eq span_breakdown_eq C(3)[symmetric] by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3928	thm pairwise_def
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3929	{fix x y assume xC: "x \<in> ?C" and yC: "y \<in> ?C" and xy: "x \<noteq> y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3930	{assume xa: "x = ?a" and ya: "y = ?a"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3931	have "orthogonal x y" using xa ya xy by blast}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3932	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3933	{assume xa: "x = ?a" and ya: "y \<noteq> ?a" "y \<in> C"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3934	from ya have Cy: "C = insert y (C - {y})" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3935	have fth: "finite (C - {y})" using C by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3936	have "orthogonal x y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3937	using xa ya
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3938	unfolding orthogonal_def xa dot_lsub dot_rsub diff_eq_0_iff_eq
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3939	apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3940	apply (subst Cy)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3941	using C(1) fth
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3942	apply (simp only: setsum_clauses)
30263 c88af4619a73 fixed proofs; added rules as default simp-rules chaieb parents: 30242 diff changeset	3943	thm dot_ladd
c88af4619a73 fixed proofs; added rules as default simp-rules chaieb parents: 30242 diff changeset	3944	apply (auto simp add: dot_ladd dot_radd dot_lmult dot_rmult dot_eq_0 dot_sym[of y a] dot_lsum[OF fth])
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3945	apply (rule setsum_0')
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3946	apply clarsimp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3947	apply (rule C(4)[unfolded pairwise_def orthogonal_def, rule_format])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3948	by auto}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3949	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3950	{assume xa: "x \<noteq> ?a" "x \<in> C" and ya: "y = ?a"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3951	from xa have Cx: "C = insert x (C - {x})" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3952	have fth: "finite (C - {x})" using C by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3953	have "orthogonal x y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3954	using xa ya
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3955	unfolding orthogonal_def ya dot_rsub dot_lsub diff_eq_0_iff_eq
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3956	apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3957	apply (subst Cx)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3958	using C(1) fth
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3959	apply (simp only: setsum_clauses)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3960	apply (subst dot_sym[of x])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3961	apply (auto simp add: dot_radd dot_rmult dot_eq_0 dot_sym[of x a] dot_rsum[OF fth])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3962	apply (rule setsum_0')
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3963	apply clarsimp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3964	apply (rule C(4)[unfolded pairwise_def orthogonal_def, rule_format])
29844 4ac95212efcc fixed proof -- removed unnecessary sorry chaieb parents: 29842 diff changeset	3965	by auto}
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3966	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3967	{assume xa: "x \<in> C" and ya: "y \<in> C"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3968	have "orthogonal x y" using xa ya xy C(4) unfolding pairwise_def by blast}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3969	ultimately have "orthogonal x y" using xC yC by blast}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3970	then have CPO: "pairwise orthogonal ?C" unfolding pairwise_def by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3971	from fC cC SC CPO have "?P (insert a B) ?C" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3972	then show ?case by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3973	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3974
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3975	lemma orthogonal_basis_exists:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3976	fixes V :: "(real ^'n) set"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3977	shows "\<exists>B. independent B \<and> B \<subseteq> span V \<and> V \<subseteq> span B \<and> (B hassize dim V) \<and> pairwise orthogonal B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3978	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3979	from basis_exists[of V] obtain B where B: "B \<subseteq> V" "independent B" "V \<subseteq> span B" "B hassize dim V" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3980	from B have fB: "finite B" "card B = dim V" by (simp_all add: hassize_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3981	from basis_orthogonal[OF fB(1)] obtain C where
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3982	C: "finite C" "card C \<le> card B" "span C = span B" "pairwise orthogonal C" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3983	from C B
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3984	have CSV: "C \<subseteq> span V" by (metis span_inc span_mono subset_trans)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3985	from span_mono[OF B(3)] C have SVC: "span V \<subseteq> span C" by (simp add: span_span)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3986	from card_le_dim_spanning[OF CSV SVC C(1)] C(2,3) fB
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3987	have iC: "independent C" by (simp add: dim_span)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3988	from C fB have "card C \<le> dim V" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3989	moreover have "dim V \<le> card C" using span_card_ge_dim[OF CSV SVC C(1)]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3990	by (simp add: dim_span)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3991	ultimately have CdV: "C hassize dim V" unfolding hassize_def using C(1) by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3992	from C B CSV CdV iC show ?thesis by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3993	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3994
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3995	lemma span_eq: "span S = span T \<longleftrightarrow> S \<subseteq> span T \<and> T \<subseteq> span S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3996	by (metis set_eq_subset span_mono span_span span_inc)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3997
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3998	(* ------------------------------------------------------------------------- *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	3999	(* Low-dimensional subset is in a hyperplane (weak orthogonal complement). *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4000	(* ------------------------------------------------------------------------- *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4001
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4002	lemma span_not_univ_orthogonal:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4003	assumes sU: "span S \<noteq> UNIV"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4004	shows "\<exists>(a:: real ^'n). a \<noteq>0 \<and> (\<forall>x \<in> span S. a \<bullet> x = 0)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4005	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4006	from sU obtain a where a: "a \<notin> span S" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4007	from orthogonal_basis_exists obtain B where
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4008	B: "independent B" "B \<subseteq> span S" "S \<subseteq> span B" "B hassize dim S" "pairwise orthogonal B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4009	by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4010	from B have fB: "finite B" "card B = dim S" by (simp_all add: hassize_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4011	from span_mono[OF B(2)] span_mono[OF B(3)]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4012	have sSB: "span S = span B" by (simp add: span_span)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4013	let ?a = "a - setsum (\<lambda>b. (a\<bullet>b / (b\<bullet>b)) *s b) B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4014	have "setsum (\<lambda>b. (a\<bullet>b / (b\<bullet>b)) *s b) B \<in> span S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4015	unfolding sSB
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4016	apply (rule span_setsum[OF fB(1)])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4017	apply clarsimp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4018	apply (rule span_mul)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4019	by (rule span_superset)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4020	with a have a0:"?a \<noteq> 0" by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4021	have "\<forall>x\<in>span B. ?a \<bullet> x = 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4022	proof(rule span_induct')
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4023	show "subspace (\<lambda>x. ?a \<bullet> x = 0)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4024	by (auto simp add: subspace_def mem_def dot_radd dot_rmult)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4025	next
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4026	{fix x assume x: "x \<in> B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4027	from x have B': "B = insert x (B - {x})" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4028	have fth: "finite (B - {x})" using fB by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4029	have "?a \<bullet> x = 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4030	apply (subst B') using fB fth
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4031	unfolding setsum_clauses(2)[OF fth]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4032	apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4033	apply (clarsimp simp add: dot_lsub dot_ladd dot_lmult dot_lsum dot_eq_0)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4034	apply (rule setsum_0', rule ballI)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4035	unfolding dot_sym
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4036	by (auto simp add: x field_simps dot_eq_0 intro: B(5)[unfolded pairwise_def orthogonal_def, rule_format])}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4037	then show "\<forall>x \<in> B. ?a \<bullet> x = 0" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4038	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4039	with a0 show ?thesis unfolding sSB by (auto intro: exI[where x="?a"])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4040	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4041
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4042	lemma span_not_univ_subset_hyperplane:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4043	assumes SU: "span S \<noteq> (UNIV ::(real^'n) set)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4044	shows "\<exists> a. a \<noteq>0 \<and> span S \<subseteq> {x. a \<bullet> x = 0}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4045	using span_not_univ_orthogonal[OF SU] by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4046
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4047	lemma lowdim_subset_hyperplane:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4048	assumes d: "dim S < dimindex (UNIV :: 'n set)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4049	shows "\<exists>(a::real ^'n). a \<noteq> 0 \<and> span S \<subseteq> {x. a \<bullet> x = 0}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4050	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4051	{assume "span S = UNIV"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4052	hence "dim (span S) = dim (UNIV :: (real ^'n) set)" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4053	hence "dim S = dimindex (UNIV :: 'n set)" by (simp add: dim_span dim_univ)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4054	with d have False by arith}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4055	hence th: "span S \<noteq> UNIV" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4056	from span_not_univ_subset_hyperplane[OF th] show ?thesis .
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4057	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4058
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4059	(* We can extend a linear basis-basis injection to the whole set. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4060
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4061	lemma linear_indep_image_lemma:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4062	assumes lf: "linear f" and fB: "finite B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4063	and ifB: "independent (f ` B)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4064	and fi: "inj_on f B" and xsB: "x \<in> span B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4065	and fx: "f (x::'a::field^'n) = 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4066	shows "x = 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4067	using fB ifB fi xsB fx
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4068	proof(induct arbitrary: x rule: finite_induct[OF fB])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4069	case 1 thus ?case by (auto simp add: span_empty)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4070	next
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4071	case (2 a b x)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4072	have fb: "finite b" using "2.prems" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4073	have th0: "f ` b \<subseteq> f ` (insert a b)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4074	apply (rule image_mono) by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4075	from independent_mono[ OF "2.prems"(2) th0]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4076	have ifb: "independent (f ` b)" .
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4077	have fib: "inj_on f b"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4078	apply (rule subset_inj_on [OF "2.prems"(3)])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4079	by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4080	from span_breakdown[of a "insert a b", simplified, OF "2.prems"(4)]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4081	obtain k where k: "x - k*s a \<in> span (b -{a})" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4082	have "f (x - k*s a) \<in> span (f ` b)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4083	unfolding span_linear_image[OF lf]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4084	apply (rule imageI)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4085	using k span_mono[of "b-{a}" b] by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4086	hence "f x - k*s f a \<in> span (f ` b)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4087	by (simp add: linear_sub[OF lf] linear_cmul[OF lf])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4088	hence th: "-k *s f a \<in> span (f ` b)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4089	using "2.prems"(5) by (simp add: vector_smult_lneg)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4090	{assume k0: "k = 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4091	from k0 k have "x \<in> span (b -{a})" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4092	then have "x \<in> span b" using span_mono[of "b-{a}" b]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4093	by blast}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4094	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4095	{assume k0: "k \<noteq> 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4096	from span_mul[OF th, of "- 1/ k"] k0
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4097	have th1: "f a \<in> span (f ` b)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4098	by (auto simp add: vector_smult_assoc)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4099	from inj_on_image_set_diff[OF "2.prems"(3), of "insert a b " "{a}", symmetric]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4100	have tha: "f ` insert a b - f ` {a} = f ` (insert a b - {a})" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4101	from "2.prems"(2)[unfolded dependent_def bex_simps(10), rule_format, of "f a"]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4102	have "f a \<notin> span (f ` b)" using tha
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4103	using "2.hyps"(2)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4104	"2.prems"(3) by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4105	with th1 have False by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4106	then have "x \<in> span b" by blast}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4107	ultimately have xsb: "x \<in> span b" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4108	from "2.hyps"(3)[OF fb ifb fib xsb "2.prems"(5)]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4109	show "x = 0" .
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4110	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4111
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4112	(* We can extend a linear mapping from basis. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4113
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4114	lemma linear_independent_extend_lemma:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4115	assumes fi: "finite B" and ib: "independent B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4116	shows "\<exists>g. (\<forall>x\<in> span B. \<forall>y\<in> span B. g ((x::'a::field^'n) + y) = g x + g y)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4117	\<and> (\<forall>x\<in> span B. \<forall>c. g (cs x) = c s g x)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4118	\<and> (\<forall>x\<in> B. g x = f x)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4119	using ib fi
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4120	proof(induct rule: finite_induct[OF fi])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4121	case 1 thus ?case by (auto simp add: span_empty)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4122	next
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4123	case (2 a b)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4124	from "2.prems" "2.hyps" have ibf: "independent b" "finite b"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4125	by (simp_all add: independent_insert)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4126	from "2.hyps"(3)[OF ibf] obtain g where
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4127	g: "\<forall>x\<in>span b. \<forall>y\<in>span b. g (x + y) = g x + g y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4128	"\<forall>x\<in>span b. \<forall>c. g (c s x) = c s g x" "\<forall>x\<in>b. g x = f x" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4129	let ?h = "\<lambda>z. SOME k. (z - k *s a) \<in> span b"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4130	{fix z assume z: "z \<in> span (insert a b)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4131	have th0: "z - ?h z *s a \<in> span b"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4132	apply (rule someI_ex)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4133	unfolding span_breakdown_eq[symmetric]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4134	using z .
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4135	{fix k assume k: "z - k *s a \<in> span b"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4136	have eq: "z - ?h z s a - (z - ks a) = (k - ?h z) *s a"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4137	by (simp add: ring_simps vector_sadd_rdistrib[symmetric])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4138	from span_sub[OF th0 k]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4139	have khz: "(k - ?h z) *s a \<in> span b" by (simp add: eq)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4140	{assume "k \<noteq> ?h z" hence k0: "k - ?h z \<noteq> 0" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4141	from k0 span_mul[OF khz, of "1 /(k - ?h z)"]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4142	have "a \<in> span b" by (simp add: vector_smult_assoc)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4143	with "2.prems"(1) "2.hyps"(2) have False
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4144	by (auto simp add: dependent_def)}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4145	then have "k = ?h z" by blast}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4146	with th0 have "z - ?h z s a \<in> span b \<and> (\<forall>k. z - k s a \<in> span b \<longrightarrow> k = ?h z)" by blast}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4147	note h = this
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4148	let ?g = "\<lambda>z. ?h z s f a + g (z - ?h z s a)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4149	{fix x y assume x: "x \<in> span (insert a b)" and y: "y \<in> span (insert a b)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4150	have tha: "\<And>(x::'a^'n) y a k l. (x + y) - (k + l) s a = (x - k s a) + (y - l *s a)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4151	by (vector ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4152	have addh: "?h (x + y) = ?h x + ?h y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4153	apply (rule conjunct2[OF h, rule_format, symmetric])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4154	apply (rule span_add[OF x y])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4155	unfolding tha
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4156	by (metis span_add x y conjunct1[OF h, rule_format])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4157	have "?g (x + y) = ?g x + ?g y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4158	unfolding addh tha
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4159	g(1)[rule_format,OF conjunct1[OF h, OF x] conjunct1[OF h, OF y]]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4160	by (simp add: vector_sadd_rdistrib)}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4161	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4162	{fix x:: "'a^'n" and c:: 'a assume x: "x \<in> span (insert a b)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4163	have tha: "\<And>(x::'a^'n) c k a. c s x - (c k) s a = c s (x - k *s a)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4164	by (vector ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4165	have hc: "?h (c s x) = c ?h x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4166	apply (rule conjunct2[OF h, rule_format, symmetric])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4167	apply (metis span_mul x)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4168	by (metis tha span_mul x conjunct1[OF h])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4169	have "?g (c s x) = cs ?g x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4170	unfolding hc tha g(2)[rule_format, OF conjunct1[OF h, OF x]]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4171	by (vector ring_simps)}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4172	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4173	{fix x assume x: "x \<in> (insert a b)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4174	{assume xa: "x = a"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4175	have ha1: "1 = ?h a"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4176	apply (rule conjunct2[OF h, rule_format])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4177	apply (metis span_superset insertI1)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4178	using conjunct1[OF h, OF span_superset, OF insertI1]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4179	by (auto simp add: span_0)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4180
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4181	from xa ha1[symmetric] have "?g x = f x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4182	apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4183	using g(2)[rule_format, OF span_0, of 0]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4184	by simp}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4185	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4186	{assume xb: "x \<in> b"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4187	have h0: "0 = ?h x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4188	apply (rule conjunct2[OF h, rule_format])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4189	apply (metis span_superset insertI1 xb x)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4190	apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4191	apply (metis span_superset xb)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4192	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4193	have "?g x = f x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4194	by (simp add: h0[symmetric] g(3)[rule_format, OF xb])}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4195	ultimately have "?g x = f x" using x by blast }
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4196	ultimately show ?case apply - apply (rule exI[where x="?g"]) by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4197	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4198
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4199	lemma linear_independent_extend:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4200	assumes iB: "independent (B:: (real ^'n) set)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4201	shows "\<exists>g. linear g \<and> (\<forall>x\<in>B. g x = f x)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4202	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4203	from maximal_independent_subset_extend[of B "UNIV"] iB
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4204	obtain C where C: "B \<subseteq> C" "independent C" "\<And>x. x \<in> span C" by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4205
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4206	from C(2) independent_bound[of C] linear_independent_extend_lemma[of C f]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4207	obtain g where g: "(\<forall>x\<in> span C. \<forall>y\<in> span C. g (x + y) = g x + g y)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4208	\<and> (\<forall>x\<in> span C. \<forall>c. g (cs x) = c s g x)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4209	\<and> (\<forall>x\<in> C. g x = f x)" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4210	from g show ?thesis unfolding linear_def using C
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4211	apply clarsimp by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4212	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4213
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4214	(* Can construct an isomorphism between spaces of same dimension. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4215
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4216	lemma card_le_inj: assumes fA: "finite A" and fB: "finite B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4217	and c: "card A \<le> card B" shows "(\<exists>f. f ` A \<subseteq> B \<and> inj_on f A)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4218	using fB c
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4219	proof(induct arbitrary: B rule: finite_induct[OF fA])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4220	case 1 thus ?case by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4221	next
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4222	case (2 x s t)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4223	thus ?case
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4224	proof(induct rule: finite_induct[OF "2.prems"(1)])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4225	case 1 then show ?case by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4226	next
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4227	case (2 y t)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4228	from "2.prems"(1,2,5) "2.hyps"(1,2) have cst:"card s \<le> card t" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4229	from "2.prems"(3) [OF "2.hyps"(1) cst] obtain f where
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4230	f: "f ` s \<subseteq> t \<and> inj_on f s" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4231	from f "2.prems"(2) "2.hyps"(2) show ?case
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4232	apply -
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4233	apply (rule exI[where x = "\<lambda>z. if z = x then y else f z"])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4234	by (auto simp add: inj_on_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4235	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4236	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4237
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4238	lemma card_subset_eq: assumes fB: "finite B" and AB: "A \<subseteq> B" and
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4239	c: "card A = card B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4240	shows "A = B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4241	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4242	from fB AB have fA: "finite A" by (auto intro: finite_subset)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4243	from fA fB have fBA: "finite (B - A)" by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4244	have e: "A \<inter> (B - A) = {}" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4245	have eq: "A \<union> (B - A) = B" using AB by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4246	from card_Un_disjoint[OF fA fBA e, unfolded eq c]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4247	have "card (B - A) = 0" by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4248	hence "B - A = {}" unfolding card_eq_0_iff using fA fB by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4249	with AB show "A = B" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4250	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4251
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4252	lemma subspace_isomorphism:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4253	assumes s: "subspace (S:: (real ^'n) set)" and t: "subspace T"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4254	and d: "dim S = dim T"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4255	shows "\<exists>f. linear f \<and> f ` S = T \<and> inj_on f S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4256	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4257	from basis_exists[of S] obtain B where
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4258	B: "B \<subseteq> S" "independent B" "S \<subseteq> span B" "B hassize dim S" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4259	from basis_exists[of T] obtain C where
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4260	C: "C \<subseteq> T" "independent C" "T \<subseteq> span C" "C hassize dim T" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4261	from B(4) C(4) card_le_inj[of B C] d obtain f where
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4262	f: "f ` B \<subseteq> C" "inj_on f B" unfolding hassize_def by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4263	from linear_independent_extend[OF B(2)] obtain g where
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4264	g: "linear g" "\<forall>x\<in> B. g x = f x" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4265	from B(4) have fB: "finite B" by (simp add: hassize_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4266	from C(4) have fC: "finite C" by (simp add: hassize_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4267	from inj_on_iff_eq_card[OF fB, of f] f(2)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4268	have "card (f ` B) = card B" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4269	with B(4) C(4) have ceq: "card (f ` B) = card C" using d
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4270	by (simp add: hassize_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4271	have "g ` B = f ` B" using g(2)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4272	by (auto simp add: image_iff)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4273	also have "\<dots> = C" using card_subset_eq[OF fC f(1) ceq] .
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4274	finally have gBC: "g ` B = C" .
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4275	have gi: "inj_on g B" using f(2) g(2)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4276	by (auto simp add: inj_on_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4277	note g0 = linear_indep_image_lemma[OF g(1) fB, unfolded gBC, OF C(2) gi]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4278	{fix x y assume x: "x \<in> S" and y: "y \<in> S" and gxy:"g x = g y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4279	from B(3) x y have x': "x \<in> span B" and y': "y \<in> span B" by blast+
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4280	from gxy have th0: "g (x - y) = 0" by (simp add: linear_sub[OF g(1)])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4281	have th1: "x - y \<in> span B" using x' y' by (metis span_sub)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4282	have "x=y" using g0[OF th1 th0] by simp }
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4283	then have giS: "inj_on g S"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4284	unfolding inj_on_def by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4285	from span_subspace[OF B(1,3) s]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4286	have "g ` S = span (g ` B)" by (simp add: span_linear_image[OF g(1)])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4287	also have "\<dots> = span C" unfolding gBC ..
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4288	also have "\<dots> = T" using span_subspace[OF C(1,3) t] .
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4289	finally have gS: "g ` S = T" .
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4290	from g(1) gS giS show ?thesis by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4291	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4292
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4293	(* linear functions are equal on a subspace if they are on a spanning set. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4294
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4295	lemma subspace_kernel:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4296	assumes lf: "linear (f::'a::semiring_1 ^'n \<Rightarrow> _)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4297	shows "subspace {x. f x = 0}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4298	apply (simp add: subspace_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4299	by (simp add: linear_add[OF lf] linear_cmul[OF lf] linear_0[OF lf])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4300
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4301	lemma linear_eq_0_span:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4302	assumes lf: "linear f" and f0: "\<forall>x\<in>B. f x = 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4303	shows "\<forall>x \<in> span B. f x = (0::'a::semiring_1 ^'n)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4304	proof
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4305	fix x assume x: "x \<in> span B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4306	let ?P = "\<lambda>x. f x = 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4307	from subspace_kernel[OF lf] have "subspace ?P" unfolding Collect_def .
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4308	with x f0 span_induct[of B "?P" x] show "f x = 0" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4309	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4310
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4311	lemma linear_eq_0:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4312	assumes lf: "linear f" and SB: "S \<subseteq> span B" and f0: "\<forall>x\<in>B. f x = 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4313	shows "\<forall>x \<in> S. f x = (0::'a::semiring_1^'n)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4314	by (metis linear_eq_0_span[OF lf] subset_eq SB f0)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4315
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4316	lemma linear_eq:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4317	assumes lf: "linear (f::'a::ring_1^'n \<Rightarrow> _)" and lg: "linear g" and S: "S \<subseteq> span B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4318	and fg: "\<forall> x\<in> B. f x = g x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4319	shows "\<forall>x\<in> S. f x = g x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4320	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4321	let ?h = "\<lambda>x. f x - g x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4322	from fg have fg': "\<forall>x\<in> B. ?h x = 0" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4323	from linear_eq_0[OF linear_compose_sub[OF lf lg] S fg']
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4324	show ?thesis by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4325	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4326
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4327	lemma linear_eq_stdbasis:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4328	assumes lf: "linear (f::'a::ring_1^'m \<Rightarrow> 'a^'n)" and lg: "linear g"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4329	and fg: "\<forall>i \<in> {1 .. dimindex(UNIV :: 'm set)}. f (basis i) = g(basis i)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4330	shows "f = g"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4331	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4332	let ?U = "UNIV :: 'm set"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4333	let ?I = "{basis i:: 'a^'m\|i. i \<in> {1 .. dimindex ?U}}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4334	{fix x assume x: "x \<in> (UNIV :: ('a^'m) set)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4335	from equalityD2[OF span_stdbasis]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4336	have IU: " (UNIV :: ('a^'m) set) \<subseteq> span ?I" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4337	from linear_eq[OF lf lg IU] fg x
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4338	have "f x = g x" unfolding Collect_def Ball_def mem_def by metis}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4339	then show ?thesis by (auto intro: ext)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4340	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4341
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4342	(* Similar results for bilinear functions. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4343
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4344	lemma bilinear_eq:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4345	assumes bf: "bilinear (f:: 'a::ring^'m \<Rightarrow> 'a^'n \<Rightarrow> 'a^'p)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4346	and bg: "bilinear g"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4347	and SB: "S \<subseteq> span B" and TC: "T \<subseteq> span C"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4348	and fg: "\<forall>x\<in> B. \<forall>y\<in> C. f x y = g x y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4349	shows "\<forall>x\<in>S. \<forall>y\<in>T. f x y = g x y "
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4350	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4351	let ?P = "\<lambda>x. \<forall>y\<in> span C. f x y = g x y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4352	from bf bg have sp: "subspace ?P"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4353	unfolding bilinear_def linear_def subspace_def bf bg
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4354	by(auto simp add: span_0 mem_def bilinear_lzero[OF bf] bilinear_lzero[OF bg] span_add Ball_def intro: bilinear_ladd[OF bf])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4355
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4356	have "\<forall>x \<in> span B. \<forall>y\<in> span C. f x y = g x y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4357	apply -
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4358	apply (rule ballI)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4359	apply (rule span_induct[of B ?P])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4360	defer
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4361	apply (rule sp)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4362	apply assumption
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4363	apply (clarsimp simp add: Ball_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4364	apply (rule_tac P="\<lambda>y. f xa y = g xa y" and S=C in span_induct)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4365	using fg
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4366	apply (auto simp add: subspace_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4367	using bf bg unfolding bilinear_def linear_def
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4368	by(auto simp add: span_0 mem_def bilinear_rzero[OF bf] bilinear_rzero[OF bg] span_add Ball_def intro: bilinear_ladd[OF bf])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4369	then show ?thesis using SB TC by (auto intro: ext)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4370	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4371
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4372	lemma bilinear_eq_stdbasis:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4373	assumes bf: "bilinear (f:: 'a::ring_1^'m \<Rightarrow> 'a^'n \<Rightarrow> 'a^'p)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4374	and bg: "bilinear g"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4375	and fg: "\<forall>i\<in> {1 .. dimindex (UNIV :: 'm set)}. \<forall>j\<in> {1 .. dimindex (UNIV :: 'n set)}. f (basis i) (basis j) = g (basis i) (basis j)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4376	shows "f = g"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4377	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4378	from fg have th: "\<forall>x \<in> {basis i\| i. i\<in> {1 .. dimindex (UNIV :: 'm set)}}. \<forall>y\<in> {basis j \|j. j \<in> {1 .. dimindex (UNIV :: 'n set)}}. f x y = g x y" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4379	from bilinear_eq[OF bf bg equalityD2[OF span_stdbasis] equalityD2[OF span_stdbasis] th] show ?thesis by (blast intro: ext)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4380	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4381
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4382	(* Detailed theorems about left and right invertibility in general case. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4383
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4384	lemma left_invertible_transp:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4385	"(\<exists>(B::'a^'n^'m). B transp (A::'a^'n^'m) = mat (1::'a::comm_semiring_1)) \<longleftrightarrow> (\<exists>(B::'a^'m^'n). A B = mat 1)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4386	by (metis matrix_transp_mul transp_mat transp_transp)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4387
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4388	lemma right_invertible_transp:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4389	"(\<exists>(B::'a^'n^'m). transp (A::'a^'n^'m) B = mat (1::'a::comm_semiring_1)) \<longleftrightarrow> (\<exists>(B::'a^'m^'n). B A = mat 1)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4390	by (metis matrix_transp_mul transp_mat transp_transp)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4391
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4392	lemma linear_injective_left_inverse:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4393	assumes lf: "linear (f::real ^'n \<Rightarrow> real ^'m)" and fi: "inj f"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4394	shows "\<exists>g. linear g \<and> g o f = id"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4395	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4396	from linear_independent_extend[OF independent_injective_image, OF independent_stdbasis, OF lf fi]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4397	obtain h:: "real ^'m \<Rightarrow> real ^'n" where h: "linear h" " \<forall>x \<in> f ` {basis i\|i. i \<in> {1 .. dimindex (UNIV::'n set)}}. h x = inv f x" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4398	from h(2)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4399	have th: "\<forall>i\<in>{1..dimindex (UNIV::'n set)}. (h \<circ> f) (basis i) = id (basis i)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4400	using inv_o_cancel[OF fi, unfolded stupid_ext[symmetric] id_def o_def]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4401	apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4402	apply (erule_tac x="basis i" in allE)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4403	by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4404
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4405	from linear_eq_stdbasis[OF linear_compose[OF lf h(1)] linear_id th]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4406	have "h o f = id" .
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4407	then show ?thesis using h(1) by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4408	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4409
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4410	lemma linear_surjective_right_inverse:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4411	assumes lf: "linear (f:: real ^'m \<Rightarrow> real ^'n)" and sf: "surj f"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4412	shows "\<exists>g. linear g \<and> f o g = id"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4413	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4414	from linear_independent_extend[OF independent_stdbasis]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4415	obtain h:: "real ^'n \<Rightarrow> real ^'m" where
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4416	h: "linear h" "\<forall> x\<in> {basis i\| i. i\<in> {1 .. dimindex (UNIV :: 'n set)}}. h x = inv f x" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4417	from h(2)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4418	have th: "\<forall>i\<in>{1..dimindex (UNIV::'n set)}. (f o h) (basis i) = id (basis i)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4419	using sf
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4420	apply (auto simp add: surj_iff o_def stupid_ext[symmetric])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4421	apply (erule_tac x="basis i" in allE)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4422	by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4423
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4424	from linear_eq_stdbasis[OF linear_compose[OF h(1) lf] linear_id th]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4425	have "f o h = id" .
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4426	then show ?thesis using h(1) by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4427	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4428
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4429	lemma matrix_left_invertible_injective:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4430	"(\<exists>B. (B::real^'m^'n) ** (A::real^'n^'m) = mat 1) \<longleftrightarrow> (\<forall>x y. A v x = A v y \<longrightarrow> x = y)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4431	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4432	{fix B:: "real^'m^'n" and x y assume B: "B ** A = mat 1" and xy: "A v x = Av y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4433	from xy have "Bv (A v x) = B v (Av y)" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4434	hence "x = y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4435	unfolding matrix_vector_mul_assoc B matrix_vector_mul_lid .}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4436	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4437	{assume A: "\<forall>x y. A v x = A v y \<longrightarrow> x = y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4438	hence i: "inj (op *v A)" unfolding inj_on_def by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4439	from linear_injective_left_inverse[OF matrix_vector_mul_linear i]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4440	obtain g where g: "linear g" "g o op *v A = id" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4441	have "matrix g ** A = mat 1"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4442	unfolding matrix_eq matrix_vector_mul_lid matrix_vector_mul_assoc[symmetric] matrix_works[OF g(1)]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4443	using g(2) by (simp add: o_def id_def stupid_ext)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4444	then have "\<exists>B. (B::real ^'m^'n) ** A = mat 1" by blast}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4445	ultimately show ?thesis by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4446	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4447
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4448	lemma matrix_left_invertible_ker:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4449	"(\<exists>B. (B::real ^'m^'n) ** (A::real^'n^'m) = mat 1) \<longleftrightarrow> (\<forall>x. A *v x = 0 \<longrightarrow> x = 0)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4450	unfolding matrix_left_invertible_injective
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4451	using linear_injective_0[OF matrix_vector_mul_linear, of A]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4452	by (simp add: inj_on_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4453
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4454	lemma matrix_right_invertible_surjective:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4455	"(\<exists>B. (A::real^'n^'m) ** (B::real^'m^'n) = mat 1) \<longleftrightarrow> surj (\<lambda>x. A *v x)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4456	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4457	{fix B :: "real ^'m^'n" assume AB: "A ** B = mat 1"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4458	{fix x :: "real ^ 'm"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4459	have "A v (B v x) = x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4460	by (simp add: matrix_vector_mul_lid matrix_vector_mul_assoc AB)}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4461	hence "surj (op *v A)" unfolding surj_def by metis }
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4462	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4463	{assume sf: "surj (op *v A)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4464	from linear_surjective_right_inverse[OF matrix_vector_mul_linear sf]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4465	obtain g:: "real ^'m \<Rightarrow> real ^'n" where g: "linear g" "op *v A o g = id"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4466	by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4467
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4468	have "A ** (matrix g) = mat 1"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4469	unfolding matrix_eq matrix_vector_mul_lid
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4470	matrix_vector_mul_assoc[symmetric] matrix_works[OF g(1)]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4471	using g(2) unfolding o_def stupid_ext[symmetric] id_def
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4472	.
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4473	hence "\<exists>B. A ** (B::real^'m^'n) = mat 1" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4474	}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4475	ultimately show ?thesis unfolding surj_def by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4476	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4477
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4478	lemma matrix_left_invertible_independent_columns:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4479	fixes A :: "real^'n^'m"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4480	shows "(\<exists>(B::real ^'m^'n). B ** A = mat 1) \<longleftrightarrow> (\<forall>c. setsum (\<lambda>i. c i *s column i A) {1 .. dimindex(UNIV :: 'n set)} = 0 \<longrightarrow> (\<forall>i\<in> {1 .. dimindex (UNIV :: 'n set)}. c i = 0))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4481	(is "?lhs \<longleftrightarrow> ?rhs")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4482	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4483	let ?U = "{1 .. dimindex(UNIV :: 'n set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4484	{assume k: "\<forall>x. A *v x = 0 \<longrightarrow> x = 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4485	{fix c i assume c: "setsum (\<lambda>i. c i *s column i A) ?U = 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4486	and i: "i \<in> ?U"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4487	let ?x = "\<chi> i. c i"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4488	have th0:"A *v ?x = 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4489	using c
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4490	unfolding matrix_mult_vsum Cart_eq
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4491	by (auto simp add: vector_component zero_index setsum_component Cart_lambda_beta)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4492	from k[rule_format, OF th0] i
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4493	have "c i = 0" by (vector Cart_eq)}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4494	hence ?rhs by blast}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4495	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4496	{assume H: ?rhs
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4497	{fix x assume x: "A *v x = 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4498	let ?c = "\<lambda>i. ((x$i ):: real)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4499	from H[rule_format, of ?c, unfolded matrix_mult_vsum[symmetric], OF x]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4500	have "x = 0" by vector}}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4501	ultimately show ?thesis unfolding matrix_left_invertible_ker by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4502	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4503
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4504	lemma matrix_right_invertible_independent_rows:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4505	fixes A :: "real^'n^'m"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4506	shows "(\<exists>(B::real^'m^'n). A ** B = mat 1) \<longleftrightarrow> (\<forall>c. setsum (\<lambda>i. c i *s row i A) {1 .. dimindex(UNIV :: 'm set)} = 0 \<longrightarrow> (\<forall>i\<in> {1 .. dimindex (UNIV :: 'm set)}. c i = 0))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4507	unfolding left_invertible_transp[symmetric]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4508	matrix_left_invertible_independent_columns
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4509	by (simp add: column_transp)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4510
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4511	lemma matrix_right_invertible_span_columns:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4512	"(\<exists>(B::real ^'n^'m). (A::real ^'m^'n) ** B = mat 1) \<longleftrightarrow> span (columns A) = UNIV" (is "?lhs = ?rhs")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4513	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4514	let ?U = "{1 .. dimindex (UNIV :: 'm set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4515	have fU: "finite ?U" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4516	have lhseq: "?lhs \<longleftrightarrow> (\<forall>y. \<exists>(x::real^'m). setsum (\<lambda>i. (x$i) *s column i A) ?U = y)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4517	unfolding matrix_right_invertible_surjective matrix_mult_vsum surj_def
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4518	apply (subst eq_commute) ..
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4519	have rhseq: "?rhs \<longleftrightarrow> (\<forall>x. x \<in> span (columns A))" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4520	{assume h: ?lhs
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4521	{fix x:: "real ^'n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4522	from h[unfolded lhseq, rule_format, of x] obtain y:: "real ^'m"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4523	where y: "setsum (\<lambda>i. (y$i) *s column i A) ?U = x" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4524	have "x \<in> span (columns A)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4525	unfolding y[symmetric]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4526	apply (rule span_setsum[OF fU])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4527	apply clarify
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4528	apply (rule span_mul)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4529	apply (rule span_superset)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4530	unfolding columns_def
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4531	by blast}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4532	then have ?rhs unfolding rhseq by blast}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4533	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4534	{assume h:?rhs
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4535	let ?P = "\<lambda>(y::real ^'n). \<exists>(x::real^'m). setsum (\<lambda>i. (x$i) *s column i A) ?U = y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4536	{fix y have "?P y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4537	proof(rule span_induct_alt[of ?P "columns A"])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4538	show "\<exists>x\<Colon>real ^ 'm. setsum (\<lambda>i. (x$i) *s column i A) ?U = 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4539	apply (rule exI[where x=0])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4540	by (simp add: zero_index vector_smult_lzero)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4541	next
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4542	fix c y1 y2 assume y1: "y1 \<in> columns A" and y2: "?P y2"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4543	from y1 obtain i where i: "i \<in> ?U" "y1 = column i A"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4544	unfolding columns_def by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4545	from y2 obtain x:: "real ^'m" where
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4546	x: "setsum (\<lambda>i. (x$i) *s column i A) ?U = y2" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4547	let ?x = "(\<chi> j. if j = i then c + (x$i) else (x$j))::real^'m"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4548	show "?P (c*s y1 + y2)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4549	proof(rule exI[where x= "?x"], vector, auto simp add: i x[symmetric]Cart_lambda_beta setsum_component cond_value_iff right_distrib cond_application_beta vector_component cong del: if_weak_cong, simp only: One_nat_def[symmetric])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4550	fix j
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4551	have th: "\<forall>xa \<in> ?U. (if xa = i then (c + (x$i)) * ((column xa A)$j)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4552	else (x$xa) * ((column xa A$j))) = (if xa = i then c * ((column i A)$j) else 0) + ((x$xa) * ((column xa A)$j))" using i(1)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4553	by (simp add: ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4554	have "setsum (\<lambda>xa. if xa = i then (c + (x$i)) * ((column xa A)$j)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4555	else (x$xa) * ((column xa A$j))) ?U = setsum (\<lambda>xa. (if xa = i then c * ((column i A)$j) else 0) + ((x$xa) * ((column xa A)$j))) ?U"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4556	apply (rule setsum_cong[OF refl])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4557	using th by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4558	also have "\<dots> = setsum (\<lambda>xa. if xa = i then c * ((column i A)$j) else 0) ?U + setsum (\<lambda>xa. ((x$xa) * ((column xa A)$j))) ?U"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4559	by (simp add: setsum_addf)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4560	also have "\<dots> = c * ((column i A)$j) + setsum (\<lambda>xa. ((x$xa) * ((column xa A)$j))) ?U"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4561	unfolding setsum_delta[OF fU]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4562	using i(1) by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4563	finally show "setsum (\<lambda>xa. if xa = i then (c + (x$i)) * ((column xa A)$j)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4564	else (x$xa) * ((column xa A$j))) ?U = c * ((column i A)$j) + setsum (\<lambda>xa. ((x$xa) * ((column xa A)$j))) ?U" .
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4565	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4566	next
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4567	show "y \<in> span (columns A)" unfolding h by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4568	qed}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4569	then have ?lhs unfolding lhseq ..}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4570	ultimately show ?thesis by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4571	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4572
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4573	lemma matrix_left_invertible_span_rows:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4574	"(\<exists>(B::real^'m^'n). B ** (A::real^'n^'m) = mat 1) \<longleftrightarrow> span (rows A) = UNIV"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4575	unfolding right_invertible_transp[symmetric]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4576	unfolding columns_transp[symmetric]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4577	unfolding matrix_right_invertible_span_columns
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4578	..
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4579
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4580	(* An injective map real^'n->real^'n is also surjective. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4581
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4582	lemma linear_injective_imp_surjective:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4583	assumes lf: "linear (f:: real ^'n \<Rightarrow> real ^'n)" and fi: "inj f"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4584	shows "surj f"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4585	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4586	let ?U = "UNIV :: (real ^'n) set"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4587	from basis_exists[of ?U] obtain B
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4588	where B: "B \<subseteq> ?U" "independent B" "?U \<subseteq> span B" "B hassize dim ?U"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4589	by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4590	from B(4) have d: "dim ?U = card B" by (simp add: hassize_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4591	have th: "?U \<subseteq> span (f ` B)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4592	apply (rule card_ge_dim_independent)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4593	apply blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4594	apply (rule independent_injective_image[OF B(2) lf fi])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4595	apply (rule order_eq_refl)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4596	apply (rule sym)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4597	unfolding d
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4598	apply (rule card_image)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4599	apply (rule subset_inj_on[OF fi])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4600	by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4601	from th show ?thesis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4602	unfolding span_linear_image[OF lf] surj_def
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4603	using B(3) by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4604	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4605
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4606	(* And vice versa. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4607
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4608	lemma surjective_iff_injective_gen:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4609	assumes fS: "finite S" and fT: "finite T" and c: "card S = card T"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4610	and ST: "f ` S \<subseteq> T"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4611	shows "(\<forall>y \<in> T. \<exists>x \<in> S. f x = y) \<longleftrightarrow> inj_on f S" (is "?lhs \<longleftrightarrow> ?rhs")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4612	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4613	{assume h: "?lhs"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4614	{fix x y assume x: "x \<in> S" and y: "y \<in> S" and f: "f x = f y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4615	from x fS have S0: "card S \<noteq> 0" by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4616	{assume xy: "x \<noteq> y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4617	have th: "card S \<le> card (f ` (S - {y}))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4618	unfolding c
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4619	apply (rule card_mono)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4620	apply (rule finite_imageI)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4621	using fS apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4622	using h xy x y f unfolding subset_eq image_iff
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4623	apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4624	apply (case_tac "xa = f x")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4625	apply (rule bexI[where x=x])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4626	apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4627	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4628	also have " \<dots> \<le> card (S -{y})"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4629	apply (rule card_image_le)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4630	using fS by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4631	also have "\<dots> \<le> card S - 1" using y fS by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4632	finally have False using S0 by arith }
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4633	then have "x = y" by blast}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4634	then have ?rhs unfolding inj_on_def by blast}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4635	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4636	{assume h: ?rhs
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4637	have "f ` S = T"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4638	apply (rule card_subset_eq[OF fT ST])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4639	unfolding card_image[OF h] using c .
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4640	then have ?lhs by blast}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4641	ultimately show ?thesis by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4642	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4643
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4644	lemma linear_surjective_imp_injective:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4645	assumes lf: "linear (f::real ^'n => real ^'n)" and sf: "surj f"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4646	shows "inj f"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4647	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4648	let ?U = "UNIV :: (real ^'n) set"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4649	from basis_exists[of ?U] obtain B
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4650	where B: "B \<subseteq> ?U" "independent B" "?U \<subseteq> span B" "B hassize dim ?U"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4651	by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4652	{fix x assume x: "x \<in> span B" and fx: "f x = 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4653	from B(4) have fB: "finite B" by (simp add: hassize_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4654	from B(4) have d: "dim ?U = card B" by (simp add: hassize_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4655	have fBi: "independent (f ` B)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4656	apply (rule card_le_dim_spanning[of "f ` B" ?U])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4657	apply blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4658	using sf B(3)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4659	unfolding span_linear_image[OF lf] surj_def subset_eq image_iff
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4660	apply blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4661	using fB apply (blast intro: finite_imageI)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4662	unfolding d
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4663	apply (rule card_image_le)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4664	apply (rule fB)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4665	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4666	have th0: "dim ?U \<le> card (f ` B)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4667	apply (rule span_card_ge_dim)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4668	apply blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4669	unfolding span_linear_image[OF lf]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4670	apply (rule subset_trans[where B = "f ` UNIV"])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4671	using sf unfolding surj_def apply blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4672	apply (rule image_mono)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4673	apply (rule B(3))
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4674	apply (metis finite_imageI fB)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4675	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4676
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4677	moreover have "card (f ` B) \<le> card B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4678	by (rule card_image_le, rule fB)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4679	ultimately have th1: "card B = card (f ` B)" unfolding d by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4680	have fiB: "inj_on f B"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4681	unfolding surjective_iff_injective_gen[OF fB finite_imageI[OF fB] th1 subset_refl, symmetric] by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4682	from linear_indep_image_lemma[OF lf fB fBi fiB x] fx
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4683	have "x = 0" by blast}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4684	note th = this
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4685	from th show ?thesis unfolding linear_injective_0[OF lf]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4686	using B(3) by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4687	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4688
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4689	(* Hence either is enough for isomorphism. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4690
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4691	lemma left_right_inverse_eq:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4692	assumes fg: "f o g = id" and gh: "g o h = id"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4693	shows "f = h"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4694	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4695	have "f = f o (g o h)" unfolding gh by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4696	also have "\<dots> = (f o g) o h" by (simp add: o_assoc)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4697	finally show "f = h" unfolding fg by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4698	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4699
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4700	lemma isomorphism_expand:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4701	"f o g = id \<and> g o f = id \<longleftrightarrow> (\<forall>x. f(g x) = x) \<and> (\<forall>x. g(f x) = x)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4702	by (simp add: expand_fun_eq o_def id_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4703
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4704	lemma linear_injective_isomorphism:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4705	assumes lf: "linear (f :: real^'n \<Rightarrow> real ^'n)" and fi: "inj f"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4706	shows "\<exists>f'. linear f' \<and> (\<forall>x. f' (f x) = x) \<and> (\<forall>x. f (f' x) = x)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4707	unfolding isomorphism_expand[symmetric]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4708	using linear_surjective_right_inverse[OF lf linear_injective_imp_surjective[OF lf fi]] linear_injective_left_inverse[OF lf fi]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4709	by (metis left_right_inverse_eq)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4710
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4711	lemma linear_surjective_isomorphism:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4712	assumes lf: "linear (f::real ^'n \<Rightarrow> real ^'n)" and sf: "surj f"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4713	shows "\<exists>f'. linear f' \<and> (\<forall>x. f' (f x) = x) \<and> (\<forall>x. f (f' x) = x)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4714	unfolding isomorphism_expand[symmetric]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4715	using linear_surjective_right_inverse[OF lf sf] linear_injective_left_inverse[OF lf linear_surjective_imp_injective[OF lf sf]]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4716	by (metis left_right_inverse_eq)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4717
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4718	(* Left and right inverses are the same for R^N->R^N. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4719
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4720	lemma linear_inverse_left:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4721	assumes lf: "linear (f::real ^'n \<Rightarrow> real ^'n)" and lf': "linear f'"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4722	shows "f o f' = id \<longleftrightarrow> f' o f = id"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4723	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4724	{fix f f':: "real ^'n \<Rightarrow> real ^'n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4725	assume lf: "linear f" "linear f'" and f: "f o f' = id"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4726	from f have sf: "surj f"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4727
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4728	apply (auto simp add: o_def stupid_ext[symmetric] id_def surj_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4729	by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4730	from linear_surjective_isomorphism[OF lf(1) sf] lf f
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4731	have "f' o f = id" unfolding stupid_ext[symmetric] o_def id_def
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4732	by metis}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4733	then show ?thesis using lf lf' by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4734	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4735
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4736	(* Moreover, a one-sided inverse is automatically linear. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4737
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4738	lemma left_inverse_linear:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4739	assumes lf: "linear (f::real ^'n \<Rightarrow> real ^'n)" and gf: "g o f = id"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4740	shows "linear g"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4741	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4742	from gf have fi: "inj f" apply (auto simp add: inj_on_def o_def id_def stupid_ext[symmetric])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4743	by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4744	from linear_injective_isomorphism[OF lf fi]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4745	obtain h:: "real ^'n \<Rightarrow> real ^'n" where
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4746	h: "linear h" "\<forall>x. h (f x) = x" "\<forall>x. f (h x) = x" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4747	have "h = g" apply (rule ext) using gf h(2,3)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4748	apply (simp add: o_def id_def stupid_ext[symmetric])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4749	by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4750	with h(1) show ?thesis by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4751	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4752
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4753	lemma right_inverse_linear:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4754	assumes lf: "linear (f:: real ^'n \<Rightarrow> real ^'n)" and gf: "f o g = id"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4755	shows "linear g"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4756	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4757	from gf have fi: "surj f" apply (auto simp add: surj_def o_def id_def stupid_ext[symmetric])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4758	by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4759	from linear_surjective_isomorphism[OF lf fi]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4760	obtain h:: "real ^'n \<Rightarrow> real ^'n" where
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4761	h: "linear h" "\<forall>x. h (f x) = x" "\<forall>x. f (h x) = x" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4762	have "h = g" apply (rule ext) using gf h(2,3)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4763	apply (simp add: o_def id_def stupid_ext[symmetric])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4764	by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4765	with h(1) show ?thesis by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4766	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4767
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4768	(* The same result in terms of square matrices. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4769
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4770	lemma matrix_left_right_inverse:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4771	fixes A A' :: "real ^'n^'n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4772	shows "A A' = mat 1 \<longleftrightarrow> A' A = mat 1"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4773	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4774	{fix A A' :: "real ^'n^'n" assume AA': "A ** A' = mat 1"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4775	have sA: "surj (op *v A)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4776	unfolding surj_def
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4777	apply clarify
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4778	apply (rule_tac x="(A' *v y)" in exI)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4779	by (simp add: matrix_vector_mul_assoc AA' matrix_vector_mul_lid)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4780	from linear_surjective_isomorphism[OF matrix_vector_mul_linear sA]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4781	obtain f' :: "real ^'n \<Rightarrow> real ^'n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4782	where f': "linear f'" "\<forall>x. f' (A v x) = x" "\<forall>x. A v f' x = x" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4783	have th: "matrix f' ** A = mat 1"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4784	by (simp add: matrix_eq matrix_works[OF f'(1)] matrix_vector_mul_assoc[symmetric] matrix_vector_mul_lid f'(2)[rule_format])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4785	hence "(matrix f' A) A' = mat 1 ** A'" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4786	hence "matrix f' = A'" by (simp add: matrix_mul_assoc[symmetric] AA' matrix_mul_rid matrix_mul_lid)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4787	hence "matrix f' A = A' A" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4788	hence "A' ** A = mat 1" by (simp add: th)}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4789	then show ?thesis by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4790	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4791
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4792	(* Considering an n-element vector as an n-by-1 or 1-by-n matrix. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4793
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4794	definition "rowvector v = (\<chi> i j. (v$j))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4795
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4796	definition "columnvector v = (\<chi> i j. (v$i))"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4797
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4798	lemma transp_columnvector:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4799	"transp(columnvector v) = rowvector v"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4800	by (simp add: transp_def rowvector_def columnvector_def Cart_eq Cart_lambda_beta)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4801
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4802	lemma transp_rowvector: "transp(rowvector v) = columnvector v"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4803	by (simp add: transp_def columnvector_def rowvector_def Cart_eq Cart_lambda_beta)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4804
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4805	lemma dot_rowvector_columnvector:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4806	"columnvector (A v v) = A * columnvector v"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4807	by (vector columnvector_def matrix_matrix_mult_def matrix_vector_mult_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4808
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4809	lemma dot_matrix_product: "(x::'a::semiring_1^'n) \<bullet> y = (((rowvector x ::'a^'n^1) ** (columnvector y :: 'a^1^'n))$1)$1"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4810	apply (vector matrix_matrix_mult_def rowvector_def columnvector_def dot_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4811	by (simp add: Cart_lambda_beta)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4812
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4813	lemma dot_matrix_vector_mul:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4814	fixes A B :: "real ^'n ^'n" and x y :: "real ^'n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4815	shows "(A v x) \<bullet> (B v y) =
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4816	(((rowvector x :: real^'n^1) ((transp A B) ** (columnvector y :: real ^1^'n)))$1)$1"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4817	unfolding dot_matrix_product transp_columnvector[symmetric]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4818	dot_rowvector_columnvector matrix_transp_mul matrix_mul_assoc ..
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4819
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4820	(* Infinity norm. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4821
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4822	definition "infnorm (x::real^'n) = rsup {abs(x$i) \|i. i\<in> {1 .. dimindex(UNIV :: 'n set)}}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4823
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4824	lemma numseg_dimindex_nonempty: "\<exists>i. i \<in> {1 .. dimindex (UNIV :: 'n set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4825	using dimindex_ge_1 by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4826
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4827	lemma infnorm_set_image:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4828	"{abs(x$i) \|i. i\<in> {1 .. dimindex(UNIV :: 'n set)}} =
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4829	(\<lambda>i. abs(x$i)) ` {1 .. dimindex(UNIV :: 'n set)}" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4830
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4831	lemma infnorm_set_lemma:
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4832	shows "finite {abs((x::'a::abs ^'n)$i) \|i. i\<in> {1 .. dimindex(UNIV :: 'n set)}}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4833	and "{abs(x$i) \|i. i\<in> {1 .. dimindex(UNIV :: 'n set)}} \<noteq> {}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4834	unfolding infnorm_set_image
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4835	using dimindex_ge_1[of "UNIV :: 'n set"]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4836	by (auto intro: finite_imageI)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4837
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4838	lemma infnorm_pos_le: "0 \<le> infnorm x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4839	unfolding infnorm_def
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4840	unfolding rsup_finite_ge_iff[ OF infnorm_set_lemma]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4841	unfolding infnorm_set_image
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4842	using dimindex_ge_1
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4843	by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4844
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4845	lemma infnorm_triangle: "infnorm ((x::real^'n) + y) \<le> infnorm x + infnorm y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4846	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4847	have th: "\<And>x y (z::real). x - y <= z \<longleftrightarrow> x - z <= y" by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4848	have th1: "\<And>S f. f ` S = { f i\| i. i \<in> S}" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4849	have th2: "\<And>x (y::real). abs(x + y) - abs(x) <= abs(y)" by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4850	show ?thesis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4851	unfolding infnorm_def
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4852	unfolding rsup_finite_le_iff[ OF infnorm_set_lemma]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4853	apply (subst diff_le_eq[symmetric])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4854	unfolding rsup_finite_ge_iff[ OF infnorm_set_lemma]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4855	unfolding infnorm_set_image bex_simps
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4856	apply (subst th)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4857	unfolding th1
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4858	unfolding rsup_finite_ge_iff[ OF infnorm_set_lemma]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4859
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4860	unfolding infnorm_set_image ball_simps bex_simps
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4861	apply (simp add: vector_add_component)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4862	apply (metis numseg_dimindex_nonempty th2)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4863	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4864	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4865
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4866	lemma infnorm_eq_0: "infnorm x = 0 \<longleftrightarrow> (x::real ^'n) = 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4867	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4868	have "infnorm x <= 0 \<longleftrightarrow> x = 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4869	unfolding infnorm_def
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4870	unfolding rsup_finite_le_iff[OF infnorm_set_lemma]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4871	unfolding infnorm_set_image ball_simps
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4872	by vector
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4873	then show ?thesis using infnorm_pos_le[of x] by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4874	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4875
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4876	lemma infnorm_0: "infnorm 0 = 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4877	by (simp add: infnorm_eq_0)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4878
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4879	lemma infnorm_neg: "infnorm (- x) = infnorm x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4880	unfolding infnorm_def
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4881	apply (rule cong[of "rsup" "rsup"])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4882	apply blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4883	apply (rule set_ext)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4884	apply (auto simp add: vector_component abs_minus_cancel)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4885	apply (rule_tac x="i" in exI)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4886	apply (simp add: vector_component)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4887	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4888
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4889	lemma infnorm_sub: "infnorm (x - y) = infnorm (y - x)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4890	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4891	have "y - x = - (x - y)" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4892	then show ?thesis by (metis infnorm_neg)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4893	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4894
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4895	lemma real_abs_sub_infnorm: "\<bar> infnorm x - infnorm y\<bar> \<le> infnorm (x - y)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4896	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4897	have th: "\<And>(nx::real) n ny. nx <= n + ny \<Longrightarrow> ny <= n + nx ==> \<bar>nx - ny\<bar> <= n"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4898	by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4899	from infnorm_triangle[of "x - y" " y"] infnorm_triangle[of "x - y" "-x"]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4900	have ths: "infnorm x \<le> infnorm (x - y) + infnorm y"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4901	"infnorm y \<le> infnorm (x - y) + infnorm x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4902	by (simp_all add: ring_simps infnorm_neg diff_def[symmetric])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4903	from th[OF ths] show ?thesis .
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4904	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4905
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4906	lemma real_abs_infnorm: " \<bar>infnorm x\<bar> = infnorm x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4907	using infnorm_pos_le[of x] by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4908
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4909	lemma component_le_infnorm: assumes i: "i \<in> {1 .. dimindex (UNIV :: 'n set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4910	shows "\<bar>x$i\<bar> \<le> infnorm (x::real^'n)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4911	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4912	let ?U = "{1 .. dimindex (UNIV :: 'n set)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4913	let ?S = "{\<bar>x$i\<bar> \|i. i\<in> ?U}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4914	have fS: "finite ?S" unfolding image_Collect[symmetric]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4915	apply (rule finite_imageI) unfolding Collect_def mem_def by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4916	have S0: "?S \<noteq> {}" using numseg_dimindex_nonempty by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4917	have th1: "\<And>S f. f ` S = { f i\| i. i \<in> S}" by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4918	from rsup_finite_in[OF fS S0] rsup_finite_Ub[OF fS S0] i
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4919	show ?thesis unfolding infnorm_def isUb_def setle_def
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4920	unfolding infnorm_set_image ball_simps by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4921	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4922
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4923	lemma infnorm_mul_lemma: "infnorm(a s x) <= \<bar>a\<bar> infnorm x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4924	apply (subst infnorm_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4925	unfolding rsup_finite_le_iff[OF infnorm_set_lemma]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4926	unfolding infnorm_set_image ball_simps
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4927	apply (simp add: abs_mult vector_component del: One_nat_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4928	apply (rule ballI)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4929	apply (drule component_le_infnorm[of _ x])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4930	apply (rule mult_mono)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4931	apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4932	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4933
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4934	lemma infnorm_mul: "infnorm(a s x) = abs a infnorm x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4935	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4936	{assume a0: "a = 0" hence ?thesis by (simp add: infnorm_0) }
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4937	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4938	{assume a0: "a \<noteq> 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4939	from a0 have th: "(1/a) s (a s x) = x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4940	by (simp add: vector_smult_assoc)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4941	from a0 have ap: "\<bar>a\<bar> > 0" by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4942	from infnorm_mul_lemma[of "1/a" "a *s x"]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4943	have "infnorm x \<le> 1/\<bar>a\<bar> * infnorm (a*s x)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4944	unfolding th by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4945	with ap have "\<bar>a\<bar> * infnorm x \<le> \<bar>a\<bar> * (1/\<bar>a\<bar> * infnorm (a *s x))" by (simp add: field_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4946	then have "\<bar>a\<bar> * infnorm x \<le> infnorm (a*s x)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4947	using ap by (simp add: field_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4948	with infnorm_mul_lemma[of a x] have ?thesis by arith }
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4949	ultimately show ?thesis by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4950	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4951
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4952	lemma infnorm_pos_lt: "infnorm x > 0 \<longleftrightarrow> x \<noteq> 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4953	using infnorm_pos_le[of x] infnorm_eq_0[of x] by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4954
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4955	(* Prove that it differs only up to a bound from Euclidean norm. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4956
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4957	lemma infnorm_le_norm: "infnorm x \<le> norm x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4958	unfolding infnorm_def rsup_finite_le_iff[OF infnorm_set_lemma]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4959	unfolding infnorm_set_image ball_simps
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4960	by (metis component_le_norm)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4961	lemma card_enum: "card {1 .. n} = n" by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4962	lemma norm_le_infnorm: "norm(x) <= sqrt(real (dimindex(UNIV ::'n set))) * infnorm(x::real ^'n)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4963	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4964	let ?d = "dimindex(UNIV ::'n set)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4965	have d: "?d = card {1 .. ?d}" by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4966	have "real ?d \<ge> 0" by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4967	hence d2: "(sqrt (real ?d))^2 = real ?d"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4968	by (auto intro: real_sqrt_pow2)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4969	have th: "sqrt (real ?d) * infnorm x \<ge> 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4970	by (simp add: dimindex_ge_1 zero_le_mult_iff real_sqrt_ge_0_iff infnorm_pos_le)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4971	have th1: "x\<bullet>x \<le> (sqrt (real ?d) * infnorm x)^2"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4972	unfolding power_mult_distrib d2
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4973	apply (subst d)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4974	apply (subst power2_abs[symmetric])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4975	unfolding real_of_nat_def dot_def power2_eq_square[symmetric]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4976	apply (subst power2_abs[symmetric])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4977	apply (rule setsum_bounded)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4978	apply (rule power_mono)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4979	unfolding abs_of_nonneg[OF infnorm_pos_le]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4980	unfolding infnorm_def rsup_finite_ge_iff[OF infnorm_set_lemma]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4981	unfolding infnorm_set_image bex_simps
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4982	apply blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4983	by (rule abs_ge_zero)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4984	from real_le_lsqrt[OF dot_pos_le th th1]
30040 e2cd1acda1ab real_normed_vector instance huffman parents: 30039 diff changeset	4985	show ?thesis unfolding real_vector_norm_def id_def .
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4986	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4987
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4988	(* Equality in Cauchy-Schwarz and triangle inequalities. *)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4989
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4990	lemma norm_cauchy_schwarz_eq: "(x::real ^'n) \<bullet> y = norm x * norm y \<longleftrightarrow> norm x s y = norm y s x" (is "?lhs \<longleftrightarrow> ?rhs")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4991	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4992	{assume h: "x = 0"
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	4993	hence ?thesis by simp}
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4994	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4995	{assume h: "y = 0"
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	4996	hence ?thesis by simp}
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4997	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4998	{assume x: "x \<noteq> 0" and y: "y \<noteq> 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	4999	from dot_eq_0[of "norm y s x - norm x s y"]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5000	have "?rhs \<longleftrightarrow> (norm y * (norm y * norm x * norm x - norm x * (x \<bullet> y)) - norm x * (norm y * (y \<bullet> x) - norm x * norm y * norm y) = 0)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5001	using x y
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5002	unfolding dot_rsub dot_lsub dot_lmult dot_rmult
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5003	unfolding norm_pow_2[symmetric] power2_eq_square diff_eq_0_iff_eq apply (simp add: dot_sym)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5004	apply (simp add: ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5005	apply metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5006	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5007	also have "\<dots> \<longleftrightarrow> (2 * norm x * norm y * (norm x * norm y - x \<bullet> y) = 0)" using x y
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5008	by (simp add: ring_simps dot_sym)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5009	also have "\<dots> \<longleftrightarrow> ?lhs" using x y
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	5010	apply simp
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5011	by metis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5012	finally have ?thesis by blast}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5013	ultimately show ?thesis by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5014	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5015
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5016	lemma norm_cauchy_schwarz_abs_eq: "abs(x \<bullet> y) = norm x * norm y \<longleftrightarrow>
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5017	norm x s y = norm y s x \<or> norm(x) s y = - norm y s x" (is "?lhs \<longleftrightarrow> ?rhs")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5018	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5019	have th: "\<And>(x::real) a. a \<ge> 0 \<Longrightarrow> abs x = a \<longleftrightarrow> x = a \<or> x = - a" by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5020	have "?rhs \<longleftrightarrow> norm x s y = norm y s x \<or> norm (- x) s y = norm y s (- x)"
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	5021	apply simp by vector
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5022	also have "\<dots> \<longleftrightarrow>(x \<bullet> y = norm x * norm y \<or>
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5023	(-x) \<bullet> y = norm x * norm y)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5024	unfolding norm_cauchy_schwarz_eq[symmetric]
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	5025	unfolding norm_minus_cancel
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5026	norm_mul by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5027	also have "\<dots> \<longleftrightarrow> ?lhs"
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	5028	unfolding th[OF mult_nonneg_nonneg, OF norm_ge_zero[of x] norm_ge_zero[of y]] dot_lneg
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5029	by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5030	finally show ?thesis ..
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5031	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5032
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5033	lemma norm_triangle_eq: "norm(x + y) = norm x + norm y \<longleftrightarrow> norm x s y = norm y s x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5034	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5035	{assume x: "x =0 \<or> y =0"
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	5036	hence ?thesis by (cases "x=0", simp_all)}
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5037	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5038	{assume x: "x \<noteq> 0" and y: "y \<noteq> 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5039	hence "norm x \<noteq> 0" "norm y \<noteq> 0"
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	5040	by simp_all
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5041	hence n: "norm x > 0" "norm y > 0"
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	5042	using norm_ge_zero[of x] norm_ge_zero[of y]
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5043	by arith+
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5044	have th: "\<And>(a::real) b c. a + b + c \<noteq> 0 ==> (a = b + c \<longleftrightarrow> a^2 = (b + c)^2)" by algebra
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5045	have "norm(x + y) = norm x + norm y \<longleftrightarrow> norm(x + y)^ 2 = (norm x + norm y) ^2"
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	5046	apply (rule th) using n norm_ge_zero[of "x + y"]
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5047	by arith
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5048	also have "\<dots> \<longleftrightarrow> norm x s y = norm y s x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5049	unfolding norm_cauchy_schwarz_eq[symmetric]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5050	unfolding norm_pow_2 dot_ladd dot_radd
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5051	by (simp add: norm_pow_2[symmetric] power2_eq_square dot_sym ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5052	finally have ?thesis .}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5053	ultimately show ?thesis by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5054	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5055
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5056	(* Collinearity.*)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5057
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5058	definition "collinear S \<longleftrightarrow> (\<exists>u. \<forall>x \<in> S. \<forall> y \<in> S. \<exists>c. x - y = c *s u)"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5059
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5060	lemma collinear_empty: "collinear {}" by (simp add: collinear_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5061
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5062	lemma collinear_sing: "collinear {(x::'a::ring_1^'n)}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5063	apply (simp add: collinear_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5064	apply (rule exI[where x=0])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5065	by simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5066
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5067	lemma collinear_2: "collinear {(x::'a::ring_1^'n),y}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5068	apply (simp add: collinear_def)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5069	apply (rule exI[where x="x - y"])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5070	apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5071	apply (rule exI[where x=0], simp)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5072	apply (rule exI[where x=1], simp)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5073	apply (rule exI[where x="- 1"], simp add: vector_sneg_minus1[symmetric])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5074	apply (rule exI[where x=0], simp)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5075	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5076
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5077	lemma collinear_lemma: "collinear {(0::real^'n),x,y} \<longleftrightarrow> x = 0 \<or> y = 0 \<or> (\<exists>c. y = c *s x)" (is "?lhs \<longleftrightarrow> ?rhs")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5078	proof-
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5079	{assume "x=0 \<or> y = 0" hence ?thesis
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5080	by (cases "x = 0", simp_all add: collinear_2 insert_commute)}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5081	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5082	{assume x: "x \<noteq> 0" and y: "y \<noteq> 0"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5083	{assume h: "?lhs"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5084	then obtain u where u: "\<forall> x\<in> {0,x,y}. \<forall>y\<in> {0,x,y}. \<exists>c. x - y = c *s u" unfolding collinear_def by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5085	from u[rule_format, of x 0] u[rule_format, of y 0]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5086	obtain cx and cy where
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5087	cx: "x = cxs u" and cy: "y = cys u"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5088	by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5089	from cx x have cx0: "cx \<noteq> 0" by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5090	from cy y have cy0: "cy \<noteq> 0" by auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5091	let ?d = "cy / cx"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5092	from cx cy cx0 have "y = ?d *s x"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5093	by (simp add: vector_smult_assoc)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5094	hence ?rhs using x y by blast}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5095	moreover
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5096	{assume h: "?rhs"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5097	then obtain c where c: "y = c*s x" using x y by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5098	have ?lhs unfolding collinear_def c
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5099	apply (rule exI[where x=x])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5100	apply auto
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5101	apply (rule exI[where x="- 1"], simp only: vector_smult_lneg vector_smult_lid)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5102	apply (rule exI[where x= "-c"], simp only: vector_smult_lneg)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5103	apply (rule exI[where x=1], simp)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5104	apply (rule exI[where x="1 - c"], simp add: vector_smult_lneg vector_sub_rdistrib)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5105	apply (rule exI[where x="c - 1"], simp add: vector_smult_lneg vector_sub_rdistrib)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5106	done}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5107	ultimately have ?thesis by blast}
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5108	ultimately show ?thesis by blast
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5109	qed
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5110
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5111	lemma norm_cauchy_schwarz_equal: "abs(x \<bullet> y) = norm x * norm y \<longleftrightarrow> collinear {(0::real^'n),x,y}"
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5112	unfolding norm_cauchy_schwarz_abs_eq
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	5113	apply (cases "x=0", simp_all add: collinear_2)
9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	5114	apply (cases "y=0", simp_all add: collinear_2 insert_commute)
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5115	unfolding collinear_lemma
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5116	apply simp
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5117	apply (subgoal_tac "norm x \<noteq> 0")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5118	apply (subgoal_tac "norm y \<noteq> 0")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5119	apply (rule iffI)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5120	apply (cases "norm x s y = norm y s x")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5121	apply (rule exI[where x="(1/norm x) * norm y"])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5122	apply (drule sym)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5123	unfolding vector_smult_assoc[symmetric]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5124	apply (simp add: vector_smult_assoc field_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5125	apply (rule exI[where x="(1/norm x) * - norm y"])
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5126	apply clarify
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5127	apply (drule sym)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5128	unfolding vector_smult_assoc[symmetric]
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5129	apply (simp add: vector_smult_assoc field_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5130	apply (erule exE)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5131	apply (erule ssubst)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5132	unfolding vector_smult_assoc
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5133	unfolding norm_mul
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5134	apply (subgoal_tac "norm x * c = \<bar>c\<bar> * norm x \<or> norm x * c = - \<bar>c\<bar> * norm x")
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5135	apply (case_tac "c <= 0", simp add: ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5136	apply (simp add: ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5137	apply (case_tac "c <= 0", simp add: ring_simps)
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5138	apply (simp add: ring_simps)
30041 9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	5139	apply simp
9becd197a40e remove duplicated lemmas about norm huffman parents: 30040 diff changeset	5140	apply simp
29842 4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5141	done
4ac60c7d9b78 (Real) Vectors in Euclidean space, and elementary linear algebra. chaieb parents: diff changeset	5142
30039 7208c88df507 fix real_vector, real_algebra instances huffman parents: 29906 diff changeset	5143	end

author	wenzelm
	Wed, 04 Mar 2009 23:05:32 +0100
changeset 30266	970bf4f594c9
parent 30263	c88af4619a73
child 30267	171b3bd93c90
permissions	-rw-r--r--