isabelle: src/HOL/Matrix/Matrix.thy@8a86fd2a1bf0 (annotated)

14593 90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	1	(* Title: HOL/Matrix/Matrix.thy
90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	2	ID: $Id$
90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	3	Author: Steven Obua
90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	4	*)
90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	5
17915 e38947f9ba5e isatool fixheaders; wenzelm parents: 16733 diff changeset	6	theory Matrix
e38947f9ba5e isatool fixheaders; wenzelm parents: 16733 diff changeset	7	imports MatrixGeneral
e38947f9ba5e isatool fixheaders; wenzelm parents: 16733 diff changeset	8	begin
14940 b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	9
22452 8a86fd2a1bf0 adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy haftmann parents: 22422 diff changeset	10	instance matrix :: ("{zero, lattice}") lattice
8a86fd2a1bf0 adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy haftmann parents: 22422 diff changeset	11	"inf \<equiv> combine_matrix inf"
8a86fd2a1bf0 adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy haftmann parents: 22422 diff changeset	12	"sup \<equiv> combine_matrix sup"
8a86fd2a1bf0 adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy haftmann parents: 22422 diff changeset	13	by default (auto simp add: inf_le1 inf_le2 le_infI le_matrix_def inf_matrix_def sup_matrix_def)
8a86fd2a1bf0 adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy haftmann parents: 22422 diff changeset	14
22422 ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 21312 diff changeset	15	instance matrix :: ("{plus, zero}") plus
ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 21312 diff changeset	16	plus_matrix_def: "A + B \<equiv> combine_matrix (op +) A B" ..
14593 90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	17
22422 ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 21312 diff changeset	18	instance matrix :: ("{minus, zero}") minus
ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 21312 diff changeset	19	minus_matrix_def: "- A \<equiv> apply_matrix uminus A"
ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 21312 diff changeset	20	diff_matrix_def: "A - B \<equiv> combine_matrix (op -) A B" ..
14940 b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	21
22422 ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 21312 diff changeset	22	instance matrix :: ("{plus, times, zero}") times
ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 21312 diff changeset	23	times_matrix_def: "A * B \<equiv> mult_matrix (op *) (op +) A B" ..
14940 b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	24
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	25	instance matrix :: (lordered_ab_group) lordered_ab_group_meet
22452 8a86fd2a1bf0 adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy haftmann parents: 22422 diff changeset	26	abs_matrix_def: "abs (A::('a::lordered_ab_group) matrix) == sup A (- A)"
14940 b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	27	proof
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	28	fix A B C :: "('a::lordered_ab_group) matrix"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	29	show "A + B + C = A + (B + C)"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	30	apply (simp add: plus_matrix_def)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	31	apply (rule combine_matrix_assoc[simplified associative_def, THEN spec, THEN spec, THEN spec])
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	32	apply (simp_all add: add_assoc)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	33	done
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	34	show "A + B = B + A"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	35	apply (simp add: plus_matrix_def)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	36	apply (rule combine_matrix_commute[simplified commutative_def, THEN spec, THEN spec])
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	37	apply (simp_all add: add_commute)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	38	done
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	39	show "0 + A = A"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	40	apply (simp add: plus_matrix_def)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	41	apply (rule combine_matrix_zero_l_neutral[simplified zero_l_neutral_def, THEN spec])
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	42	apply (simp)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	43	done
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	44	show "- A + A = 0"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	45	by (simp add: plus_matrix_def minus_matrix_def Rep_matrix_inject[symmetric] ext)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	46	show "A - B = A + - B"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	47	by (simp add: plus_matrix_def diff_matrix_def minus_matrix_def Rep_matrix_inject[symmetric] ext)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	48	assume "A <= B"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	49	then show "C + A <= C + B"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	50	apply (simp add: plus_matrix_def)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	51	apply (rule le_left_combine_matrix)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	52	apply (simp_all)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	53	done
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	54	qed
14593 90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	55
14940 b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	56	instance matrix :: (lordered_ring) lordered_ring
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	57	proof
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	58	fix A B C :: "('a :: lordered_ring) matrix"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	59	show "A * B * C = A * (B * C)"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	60	apply (simp add: times_matrix_def)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	61	apply (rule mult_matrix_assoc)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	62	apply (simp_all add: associative_def ring_eq_simps)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	63	done
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	64	show "(A + B) * C = A * C + B * C"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	65	apply (simp add: times_matrix_def plus_matrix_def)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	66	apply (rule l_distributive_matrix[simplified l_distributive_def, THEN spec, THEN spec, THEN spec])
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	67	apply (simp_all add: associative_def commutative_def ring_eq_simps)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	68	done
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	69	show "A * (B + C) = A * B + A * C"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	70	apply (simp add: times_matrix_def plus_matrix_def)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	71	apply (rule r_distributive_matrix[simplified r_distributive_def, THEN spec, THEN spec, THEN spec])
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	72	apply (simp_all add: associative_def commutative_def ring_eq_simps)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	73	done
22422 ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 21312 diff changeset	74	show "abs A = sup A (-A)"
14940 b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	75	by (simp add: abs_matrix_def)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	76	assume a: "A \<le> B"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	77	assume b: "0 \<le> C"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	78	from a b show "C * A \<le> C * B"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	79	apply (simp add: times_matrix_def)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	80	apply (rule le_left_mult)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	81	apply (simp_all add: add_mono mult_left_mono)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	82	done
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	83	from a b show "A * C \<le> B * C"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	84	apply (simp add: times_matrix_def)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	85	apply (rule le_right_mult)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	86	apply (simp_all add: add_mono mult_right_mono)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	87	done
22452 8a86fd2a1bf0 adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy haftmann parents: 22422 diff changeset	88	qed
14593 90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	89
14940 b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	90	lemma Rep_matrix_add[simp]: "Rep_matrix ((a::('a::lordered_ab_group)matrix)+b) j i = (Rep_matrix a j i) + (Rep_matrix b j i)"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	91	by (simp add: plus_matrix_def)
14593 90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	92
14940 b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	93	lemma Rep_matrix_mult: "Rep_matrix ((a::('a::lordered_ring) matrix) * b) j i =
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	94	foldseq (op +) (% k. (Rep_matrix a j k) * (Rep_matrix b k i)) (max (ncols a) (nrows b))"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	95	apply (simp add: times_matrix_def)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	96	apply (simp add: Rep_mult_matrix)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	97	done
14593 90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	98
14940 b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	99	lemma apply_matrix_add: "! x y. f (x+y) = (f x) + (f y) \<Longrightarrow> f 0 = (0::'a) \<Longrightarrow> apply_matrix f ((a::('a::lordered_ab_group) matrix) + b) = (apply_matrix f a) + (apply_matrix f b)"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	100	apply (subst Rep_matrix_inject[symmetric])
14593 90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	101	apply (rule ext)+
14940 b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	102	apply (simp)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	103	done
14593 90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	104
14940 b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	105	lemma singleton_matrix_add: "singleton_matrix j i ((a::_::lordered_ab_group)+b) = (singleton_matrix j i a) + (singleton_matrix j i b)"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	106	apply (subst Rep_matrix_inject[symmetric])
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	107	apply (rule ext)+
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	108	apply (simp)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	109	done
14593 90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	110
14940 b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	111	lemma nrows_mult: "nrows ((A::('a::lordered_ring) matrix) * B) <= nrows A"
14593 90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	112	by (simp add: times_matrix_def mult_nrows)
90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	113
14940 b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	114	lemma ncols_mult: "ncols ((A::('a::lordered_ring) matrix) * B) <= ncols B"
14593 90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	115	by (simp add: times_matrix_def mult_ncols)
90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	116
22422 ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 21312 diff changeset	117	definition
ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 21312 diff changeset	118	one_matrix :: "nat \<Rightarrow> ('a::{zero,one}) matrix" where
ee19cdb07528 stepping towards uniform lattice theory development in HOL haftmann parents: 21312 diff changeset	119	"one_matrix n = Abs_matrix (% j i. if j = i & j < n then 1 else 0)"
14593 90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	120
90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	121	lemma Rep_one_matrix[simp]: "Rep_matrix (one_matrix n) j i = (if (j = i & j < n) then 1 else 0)"
90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	122	apply (simp add: one_matrix_def)
15481 fc075ae929e4 the new subst tactic, by Lucas Dixon paulson parents: 15178 diff changeset	123	apply (simplesubst RepAbs_matrix)
14593 90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	124	apply (rule exI[of _ n], simp add: split_if)+
16733 236dfafbeb63 linear arithmetic now takes "&" in assumptions apart. nipkow parents: 15481 diff changeset	125	by (simp add: split_if)
14593 90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	126
20633 e98f59806244 renamed axclass_xxxx axclasses; wenzelm parents: 17915 diff changeset	127	lemma nrows_one_matrix[simp]: "nrows ((one_matrix n) :: ('a::zero_neq_one)matrix) = n" (is "?r = _")
14593 90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	128	proof -
90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	129	have "?r <= n" by (simp add: nrows_le)
14940 b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	130	moreover have "n <= ?r" by (simp add:le_nrows, arith)
14593 90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	131	ultimately show "?r = n" by simp
90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	132	qed
90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	133
20633 e98f59806244 renamed axclass_xxxx axclasses; wenzelm parents: 17915 diff changeset	134	lemma ncols_one_matrix[simp]: "ncols ((one_matrix n) :: ('a::zero_neq_one)matrix) = n" (is "?r = _")
14593 90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	135	proof -
90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	136	have "?r <= n" by (simp add: ncols_le)
90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	137	moreover have "n <= ?r" by (simp add: le_ncols, arith)
90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	138	ultimately show "?r = n" by simp
90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	139	qed
90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	140
14940 b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	141	lemma one_matrix_mult_right[simp]: "ncols A <= n \<Longrightarrow> (A::('a::{lordered_ring,ring_1}) matrix) * (one_matrix n) = A"
14593 90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	142	apply (subst Rep_matrix_inject[THEN sym])
90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	143	apply (rule ext)+
90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	144	apply (simp add: times_matrix_def Rep_mult_matrix)
90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	145	apply (rule_tac j1="xa" in ssubst[OF foldseq_almostzero])
90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	146	apply (simp_all)
90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	147	by (simp add: max_def ncols)
90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	148
14940 b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	149	lemma one_matrix_mult_left[simp]: "nrows A <= n \<Longrightarrow> (one_matrix n) * A = (A::('a::{lordered_ring, ring_1}) matrix)"
14593 90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	150	apply (subst Rep_matrix_inject[THEN sym])
90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	151	apply (rule ext)+
90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	152	apply (simp add: times_matrix_def Rep_mult_matrix)
90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	153	apply (rule_tac j1="x" in ssubst[OF foldseq_almostzero])
90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	154	apply (simp_all)
90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	155	by (simp add: max_def nrows)
90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	156
14940 b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	157	lemma transpose_matrix_mult: "transpose_matrix ((A::('a::{lordered_ring,comm_ring}) matrix)B) = (transpose_matrix B) (transpose_matrix A)"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	158	apply (simp add: times_matrix_def)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	159	apply (subst transpose_mult_matrix)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	160	apply (simp_all add: mult_commute)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	161	done
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	162
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	163	lemma transpose_matrix_add: "transpose_matrix ((A::('a::lordered_ab_group) matrix)+B) = transpose_matrix A + transpose_matrix B"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	164	by (simp add: plus_matrix_def transpose_combine_matrix)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	165
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	166	lemma transpose_matrix_diff: "transpose_matrix ((A::('a::lordered_ab_group) matrix)-B) = transpose_matrix A - transpose_matrix B"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	167	by (simp add: diff_matrix_def transpose_combine_matrix)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	168
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	169	lemma transpose_matrix_minus: "transpose_matrix (-(A::('a::lordered_ring) matrix)) = - transpose_matrix (A::('a::lordered_ring) matrix)"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	170	by (simp add: minus_matrix_def transpose_apply_matrix)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	171
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	172	constdefs
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	173	right_inverse_matrix :: "('a::{lordered_ring, ring_1}) matrix \<Rightarrow> 'a matrix \<Rightarrow> bool"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	174	"right_inverse_matrix A X == (A * X = one_matrix (max (nrows A) (ncols X))) \<and> nrows X \<le> ncols A"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	175	left_inverse_matrix :: "('a::{lordered_ring, ring_1}) matrix \<Rightarrow> 'a matrix \<Rightarrow> bool"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	176	"left_inverse_matrix A X == (X * A = one_matrix (max(nrows X) (ncols A))) \<and> ncols X \<le> nrows A"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	177	inverse_matrix :: "('a::{lordered_ring, ring_1}) matrix \<Rightarrow> 'a matrix \<Rightarrow> bool"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	178	"inverse_matrix A X == (right_inverse_matrix A X) \<and> (left_inverse_matrix A X)"
14593 90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	179
90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	180	lemma right_inverse_matrix_dim: "right_inverse_matrix A X \<Longrightarrow> nrows A = ncols X"
90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	181	apply (insert ncols_mult[of A X], insert nrows_mult[of A X])
90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	182	by (simp add: right_inverse_matrix_def)
90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	183
14940 b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	184	lemma left_inverse_matrix_dim: "left_inverse_matrix A Y \<Longrightarrow> ncols A = nrows Y"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	185	apply (insert ncols_mult[of Y A], insert nrows_mult[of Y A])
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	186	by (simp add: left_inverse_matrix_def)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	187
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	188	lemma left_right_inverse_matrix_unique:
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	189	assumes "left_inverse_matrix A Y" "right_inverse_matrix A X"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	190	shows "X = Y"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	191	proof -
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	192	have "Y = Y * one_matrix (nrows A)"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	193	apply (subst one_matrix_mult_right)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	194	apply (insert prems)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	195	by (simp_all add: left_inverse_matrix_def)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	196	also have "\<dots> = Y * (A * X)"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	197	apply (insert prems)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	198	apply (frule right_inverse_matrix_dim)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	199	by (simp add: right_inverse_matrix_def)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	200	also have "\<dots> = (Y * A) * X" by (simp add: mult_assoc)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	201	also have "\<dots> = X"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	202	apply (insert prems)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	203	apply (frule left_inverse_matrix_dim)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	204	apply (simp_all add: left_inverse_matrix_def right_inverse_matrix_def one_matrix_mult_left)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	205	done
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	206	ultimately show "X = Y" by (simp)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	207	qed
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	208
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	209	lemma inverse_matrix_inject: "\<lbrakk> inverse_matrix A X; inverse_matrix A Y \<rbrakk> \<Longrightarrow> X = Y"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	210	by (auto simp add: inverse_matrix_def left_right_inverse_matrix_unique)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	211
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	212	lemma one_matrix_inverse: "inverse_matrix (one_matrix n) (one_matrix n)"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	213	by (simp add: inverse_matrix_def left_inverse_matrix_def right_inverse_matrix_def)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	214
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	215	lemma zero_imp_mult_zero: "(a::'a::ring) = 0 \| b = 0 \<Longrightarrow> a * b = 0"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	216	by auto
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	217
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	218	lemma Rep_matrix_zero_imp_mult_zero:
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	219	"! j i k. (Rep_matrix A j k = 0) \| (Rep_matrix B k i) = 0 \<Longrightarrow> A * B = (0::('a::lordered_ring) matrix)"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	220	apply (subst Rep_matrix_inject[symmetric])
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	221	apply (rule ext)+
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	222	apply (auto simp add: Rep_matrix_mult foldseq_zero zero_imp_mult_zero)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	223	done
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	224
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	225	lemma add_nrows: "nrows (A::('a::comm_monoid_add) matrix) <= u \<Longrightarrow> nrows B <= u \<Longrightarrow> nrows (A + B) <= u"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	226	apply (simp add: plus_matrix_def)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	227	apply (rule combine_nrows)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	228	apply (simp_all)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	229	done
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	230
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	231	lemma move_matrix_row_mult: "move_matrix ((A::('a::lordered_ring) matrix) * B) j 0 = (move_matrix A j 0) * B"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	232	apply (subst Rep_matrix_inject[symmetric])
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	233	apply (rule ext)+
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	234	apply (auto simp add: Rep_matrix_mult foldseq_zero)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	235	apply (rule_tac foldseq_zerotail[symmetric])
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	236	apply (auto simp add: nrows zero_imp_mult_zero max2)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	237	apply (rule order_trans)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	238	apply (rule ncols_move_matrix_le)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	239	apply (simp add: max1)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	240	done
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	241
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	242	lemma move_matrix_col_mult: "move_matrix ((A::('a::lordered_ring) matrix) * B) 0 i = A * (move_matrix B 0 i)"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	243	apply (subst Rep_matrix_inject[symmetric])
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	244	apply (rule ext)+
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	245	apply (auto simp add: Rep_matrix_mult foldseq_zero)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	246	apply (rule_tac foldseq_zerotail[symmetric])
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	247	apply (auto simp add: ncols zero_imp_mult_zero max1)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	248	apply (rule order_trans)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	249	apply (rule nrows_move_matrix_le)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	250	apply (simp add: max2)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	251	done
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	252
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	253	lemma move_matrix_add: "((move_matrix (A + B) j i)::(('a::lordered_ab_group) matrix)) = (move_matrix A j i) + (move_matrix B j i)"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	254	apply (subst Rep_matrix_inject[symmetric])
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	255	apply (rule ext)+
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	256	apply (simp)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	257	done
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	258
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	259	lemma move_matrix_mult: "move_matrix ((A::('a::lordered_ring) matrix)B) j i = (move_matrix A j 0) (move_matrix B 0 i)"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	260	by (simp add: move_matrix_ortho[of "A*B"] move_matrix_col_mult move_matrix_row_mult)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	261
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	262	constdefs
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	263	scalar_mult :: "('a::lordered_ring) \<Rightarrow> 'a matrix \<Rightarrow> 'a matrix"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	264	"scalar_mult a m == apply_matrix (op * a) m"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	265
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	266	lemma scalar_mult_zero[simp]: "scalar_mult y 0 = 0"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	267	by (simp add: scalar_mult_def)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	268
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	269	lemma scalar_mult_add: "scalar_mult y (a+b) = (scalar_mult y a) + (scalar_mult y b)"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	270	by (simp add: scalar_mult_def apply_matrix_add ring_eq_simps)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	271
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	272	lemma Rep_scalar_mult[simp]: "Rep_matrix (scalar_mult y a) j i = y * (Rep_matrix a j i)"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	273	by (simp add: scalar_mult_def)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	274
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	275	lemma scalar_mult_singleton[simp]: "scalar_mult y (singleton_matrix j i x) = singleton_matrix j i (y * x)"
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	276	apply (subst Rep_matrix_inject[symmetric])
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	277	apply (rule ext)+
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	278	apply (auto)
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	279	done
b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	280
15178 5f621aa35c25 Matrix theory, linear programming obua parents: 14940 diff changeset	281	lemma Rep_minus[simp]: "Rep_matrix (-(A::_::lordered_ab_group)) x y = - (Rep_matrix A x y)"
5f621aa35c25 Matrix theory, linear programming obua parents: 14940 diff changeset	282	by (simp add: minus_matrix_def)
14940 b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	283
15178 5f621aa35c25 Matrix theory, linear programming obua parents: 14940 diff changeset	284	lemma Rep_abs[simp]: "Rep_matrix (abs (A::_::lordered_ring)) x y = abs (Rep_matrix A x y)"
22452 8a86fd2a1bf0 adjusted to new lattice theory developement in Lattices.thy / FixedPoint.thy haftmann parents: 22422 diff changeset	285	by (simp add: abs_lattice sup_matrix_def)
14940 b9ab8babd8b3 Further development of matrix theory obua parents: 14738 diff changeset	286
14593 90c88e7ef62d first version of matrices for HOL/Isabelle obua parents: diff changeset	287	end

author	haftmann
	Fri, 16 Mar 2007 21:32:08 +0100
changeset 22452	8a86fd2a1bf0
parent 22422	ee19cdb07528
child 23477	f4b83f03cac9
permissions	-rw-r--r--