isabelle: src/HOL/RealDef.thy@67da5904300a (annotated)

28952 15a4b2cf8c34 made repository layout more coherent with logical distribution structure; stripped some $Id$s haftmann parents: 28906 diff changeset	1	(* Title : HOL/RealDef.thy
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	2	Author : Jacques D. Fleuriot, 1998
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	3	Conversion to Isar and new proofs by Lawrence C Paulson, 2003/4
16819 00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	4	Additional contributions by Jeremy Avigad
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	5	Construction of Cauchy Reals by Brian Huffman, 2010
14269 502a7c95de73 conversion of some Real theories to Isar scripts paulson parents: 13487 diff changeset	6	*)
502a7c95de73 conversion of some Real theories to Isar scripts paulson parents: 13487 diff changeset	7
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	8	header {* Development of the Reals using Cauchy Sequences *}
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	9
15131 c69542757a4d New theory header syntax. nipkow parents: 15086 diff changeset	10	theory RealDef
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	11	imports Rat
15131 c69542757a4d New theory header syntax. nipkow parents: 15086 diff changeset	12	begin
5588 a3ab526bb891 Revised version with Abelian group simprocs paulson parents: diff changeset	13
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	14	text {*
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	15	This theory contains a formalization of the real numbers as
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	16	equivalence classes of Cauchy sequences of rationals. See
40810 142f890ceef6 use new 'file' antiquotation for reference to Dedekind_Real.thy huffman parents: 38857 diff changeset	17	@{file "~~/src/HOL/ex/Dedekind_Real.thy"} for an alternative
142f890ceef6 use new 'file' antiquotation for reference to Dedekind_Real.thy huffman parents: 38857 diff changeset	18	construction using Dedekind cuts.
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	19	*}
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	20
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	21	subsection {* Preliminary lemmas *}
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	22
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	23	lemma add_diff_add:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	24	fixes a b c d :: "'a::ab_group_add"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	25	shows "(a + c) - (b + d) = (a - b) + (c - d)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	26	by simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	27
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	28	lemma minus_diff_minus:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	29	fixes a b :: "'a::ab_group_add"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	30	shows "- a - - b = - (a - b)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	31	by simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	32
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	33	lemma mult_diff_mult:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	34	fixes x y a b :: "'a::ring"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	35	shows "(x * y - a * b) = x * (y - b) + (x - a) * b"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	36	by (simp add: algebra_simps)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	37
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	38	lemma inverse_diff_inverse:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	39	fixes a b :: "'a::division_ring"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	40	assumes "a \<noteq> 0" and "b \<noteq> 0"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	41	shows "inverse a - inverse b = - (inverse a * (a - b) * inverse b)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	42	using assms by (simp add: algebra_simps)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	43
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	44	lemma obtain_pos_sum:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	45	fixes r :: rat assumes r: "0 < r"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	46	obtains s t where "0 < s" and "0 < t" and "r = s + t"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	47	proof
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	48	from r show "0 < r/2" by simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	49	from r show "0 < r/2" by simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	50	show "r = r/2 + r/2" by simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	51	qed
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	52
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	53	subsection {* Sequences that converge to zero *}
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	54
19765 dfe940911617 misc cleanup; wenzelm parents: 19023 diff changeset	55	definition
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	56	vanishes :: "(nat \<Rightarrow> rat) \<Rightarrow> bool"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	57	where
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	58	"vanishes X = (\<forall>r>0. \<exists>k. \<forall>n\<ge>k. \<bar>X n\<bar> < r)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	59
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	60	lemma vanishesI: "(\<And>r. 0 < r \<Longrightarrow> \<exists>k. \<forall>n\<ge>k. \<bar>X n\<bar> < r) \<Longrightarrow> vanishes X"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	61	unfolding vanishes_def by simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	62
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	63	lemma vanishesD: "\<lbrakk>vanishes X; 0 < r\<rbrakk> \<Longrightarrow> \<exists>k. \<forall>n\<ge>k. \<bar>X n\<bar> < r"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	64	unfolding vanishes_def by simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	65
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	66	lemma vanishes_const [simp]: "vanishes (\<lambda>n. c) \<longleftrightarrow> c = 0"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	67	unfolding vanishes_def
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	68	apply (cases "c = 0", auto)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	69	apply (rule exI [where x="\<bar>c\<bar>"], auto)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	70	done
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	71
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	72	lemma vanishes_minus: "vanishes X \<Longrightarrow> vanishes (\<lambda>n. - X n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	73	unfolding vanishes_def by simp
14269 502a7c95de73 conversion of some Real theories to Isar scripts paulson parents: 13487 diff changeset	74
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	75	lemma vanishes_add:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	76	assumes X: "vanishes X" and Y: "vanishes Y"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	77	shows "vanishes (\<lambda>n. X n + Y n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	78	proof (rule vanishesI)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	79	fix r :: rat assume "0 < r"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	80	then obtain s t where s: "0 < s" and t: "0 < t" and r: "r = s + t"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	81	by (rule obtain_pos_sum)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	82	obtain i where i: "\<forall>n\<ge>i. \<bar>X n\<bar> < s"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	83	using vanishesD [OF X s] ..
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	84	obtain j where j: "\<forall>n\<ge>j. \<bar>Y n\<bar> < t"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	85	using vanishesD [OF Y t] ..
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	86	have "\<forall>n\<ge>max i j. \<bar>X n + Y n\<bar> < r"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	87	proof (clarsimp)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	88	fix n assume n: "i \<le> n" "j \<le> n"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	89	have "\<bar>X n + Y n\<bar> \<le> \<bar>X n\<bar> + \<bar>Y n\<bar>" by (rule abs_triangle_ineq)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	90	also have "\<dots> < s + t" by (simp add: add_strict_mono i j n)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	91	finally show "\<bar>X n + Y n\<bar> < r" unfolding r .
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	92	qed
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	93	thus "\<exists>k. \<forall>n\<ge>k. \<bar>X n + Y n\<bar> < r" ..
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	94	qed
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	95
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	96	lemma vanishes_diff:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	97	assumes X: "vanishes X" and Y: "vanishes Y"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	98	shows "vanishes (\<lambda>n. X n - Y n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	99	unfolding diff_minus by (intro vanishes_add vanishes_minus X Y)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	100
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	101	lemma vanishes_mult_bounded:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	102	assumes X: "\<exists>a>0. \<forall>n. \<bar>X n\<bar> < a"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	103	assumes Y: "vanishes (\<lambda>n. Y n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	104	shows "vanishes (\<lambda>n. X n * Y n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	105	proof (rule vanishesI)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	106	fix r :: rat assume r: "0 < r"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	107	obtain a where a: "0 < a" "\<forall>n. \<bar>X n\<bar> < a"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	108	using X by fast
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	109	obtain b where b: "0 < b" "r = a * b"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	110	proof
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	111	show "0 < r / a" using r a by (simp add: divide_pos_pos)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	112	show "r = a * (r / a)" using a by simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	113	qed
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	114	obtain k where k: "\<forall>n\<ge>k. \<bar>Y n\<bar> < b"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	115	using vanishesD [OF Y b(1)] ..
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	116	have "\<forall>n\<ge>k. \<bar>X n * Y n\<bar> < r"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	117	by (simp add: b(2) abs_mult mult_strict_mono' a k)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	118	thus "\<exists>k. \<forall>n\<ge>k. \<bar>X n * Y n\<bar> < r" ..
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	119	qed
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	120
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	121	subsection {* Cauchy sequences *}
5588 a3ab526bb891 Revised version with Abelian group simprocs paulson parents: diff changeset	122
19765 dfe940911617 misc cleanup; wenzelm parents: 19023 diff changeset	123	definition
44278 1220ecb81e8f observe distinction between sets and predicates more properly haftmann parents: 43887 diff changeset	124	cauchy :: "(nat \<Rightarrow> rat) \<Rightarrow> bool"
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	125	where
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	126	"cauchy X \<longleftrightarrow> (\<forall>r>0. \<exists>k. \<forall>m\<ge>k. \<forall>n\<ge>k. \<bar>X m - X n\<bar> < r)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	127
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	128	lemma cauchyI:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	129	"(\<And>r. 0 < r \<Longrightarrow> \<exists>k. \<forall>m\<ge>k. \<forall>n\<ge>k. \<bar>X m - X n\<bar> < r) \<Longrightarrow> cauchy X"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	130	unfolding cauchy_def by simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	131
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	132	lemma cauchyD:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	133	"\<lbrakk>cauchy X; 0 < r\<rbrakk> \<Longrightarrow> \<exists>k. \<forall>m\<ge>k. \<forall>n\<ge>k. \<bar>X m - X n\<bar> < r"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	134	unfolding cauchy_def by simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	135
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	136	lemma cauchy_const [simp]: "cauchy (\<lambda>n. x)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	137	unfolding cauchy_def by simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	138
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	139	lemma cauchy_add [simp]:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	140	assumes X: "cauchy X" and Y: "cauchy Y"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	141	shows "cauchy (\<lambda>n. X n + Y n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	142	proof (rule cauchyI)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	143	fix r :: rat assume "0 < r"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	144	then obtain s t where s: "0 < s" and t: "0 < t" and r: "r = s + t"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	145	by (rule obtain_pos_sum)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	146	obtain i where i: "\<forall>m\<ge>i. \<forall>n\<ge>i. \<bar>X m - X n\<bar> < s"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	147	using cauchyD [OF X s] ..
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	148	obtain j where j: "\<forall>m\<ge>j. \<forall>n\<ge>j. \<bar>Y m - Y n\<bar> < t"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	149	using cauchyD [OF Y t] ..
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	150	have "\<forall>m\<ge>max i j. \<forall>n\<ge>max i j. \<bar>(X m + Y m) - (X n + Y n)\<bar> < r"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	151	proof (clarsimp)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	152	fix m n assume *: "i \<le> m" "j \<le> m" "i \<le> n" "j \<le> n"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	153	have "\<bar>(X m + Y m) - (X n + Y n)\<bar> \<le> \<bar>X m - X n\<bar> + \<bar>Y m - Y n\<bar>"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	154	unfolding add_diff_add by (rule abs_triangle_ineq)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	155	also have "\<dots> < s + t"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	156	by (rule add_strict_mono, simp_all add: i j *)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	157	finally show "\<bar>(X m + Y m) - (X n + Y n)\<bar> < r" unfolding r .
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	158	qed
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	159	thus "\<exists>k. \<forall>m\<ge>k. \<forall>n\<ge>k. \<bar>(X m + Y m) - (X n + Y n)\<bar> < r" ..
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	160	qed
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	161
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	162	lemma cauchy_minus [simp]:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	163	assumes X: "cauchy X"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	164	shows "cauchy (\<lambda>n. - X n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	165	using assms unfolding cauchy_def
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	166	unfolding minus_diff_minus abs_minus_cancel .
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	167
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	168	lemma cauchy_diff [simp]:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	169	assumes X: "cauchy X" and Y: "cauchy Y"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	170	shows "cauchy (\<lambda>n. X n - Y n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	171	using assms unfolding diff_minus by simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	172
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	173	lemma cauchy_imp_bounded:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	174	assumes "cauchy X" shows "\<exists>b>0. \<forall>n. \<bar>X n\<bar> < b"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	175	proof -
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	176	obtain k where k: "\<forall>m\<ge>k. \<forall>n\<ge>k. \<bar>X m - X n\<bar> < 1"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	177	using cauchyD [OF assms zero_less_one] ..
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	178	show "\<exists>b>0. \<forall>n. \<bar>X n\<bar> < b"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	179	proof (intro exI conjI allI)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	180	have "0 \<le> \<bar>X 0\<bar>" by simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	181	also have "\<bar>X 0\<bar> \<le> Max (abs ` X ` {..k})" by simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	182	finally have "0 \<le> Max (abs ` X ` {..k})" .
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	183	thus "0 < Max (abs ` X ` {..k}) + 1" by simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	184	next
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	185	fix n :: nat
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	186	show "\<bar>X n\<bar> < Max (abs ` X ` {..k}) + 1"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	187	proof (rule linorder_le_cases)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	188	assume "n \<le> k"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	189	hence "\<bar>X n\<bar> \<le> Max (abs ` X ` {..k})" by simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	190	thus "\<bar>X n\<bar> < Max (abs ` X ` {..k}) + 1" by simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	191	next
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	192	assume "k \<le> n"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	193	have "\<bar>X n\<bar> = \<bar>X k + (X n - X k)\<bar>" by simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	194	also have "\<bar>X k + (X n - X k)\<bar> \<le> \<bar>X k\<bar> + \<bar>X n - X k\<bar>"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	195	by (rule abs_triangle_ineq)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	196	also have "\<dots> < Max (abs ` X ` {..k}) + 1"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	197	by (rule add_le_less_mono, simp, simp add: k `k \<le> n`)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	198	finally show "\<bar>X n\<bar> < Max (abs ` X ` {..k}) + 1" .
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	199	qed
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	200	qed
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	201	qed
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	202
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	203	lemma cauchy_mult [simp]:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	204	assumes X: "cauchy X" and Y: "cauchy Y"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	205	shows "cauchy (\<lambda>n. X n * Y n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	206	proof (rule cauchyI)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	207	fix r :: rat assume "0 < r"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	208	then obtain u v where u: "0 < u" and v: "0 < v" and "r = u + v"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	209	by (rule obtain_pos_sum)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	210	obtain a where a: "0 < a" "\<forall>n. \<bar>X n\<bar> < a"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	211	using cauchy_imp_bounded [OF X] by fast
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	212	obtain b where b: "0 < b" "\<forall>n. \<bar>Y n\<bar> < b"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	213	using cauchy_imp_bounded [OF Y] by fast
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	214	obtain s t where s: "0 < s" and t: "0 < t" and r: "r = a * t + s * b"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	215	proof
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	216	show "0 < v/b" using v b(1) by (rule divide_pos_pos)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	217	show "0 < u/a" using u a(1) by (rule divide_pos_pos)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	218	show "r = a * (u/a) + (v/b) * b"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	219	using a(1) b(1) `r = u + v` by simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	220	qed
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	221	obtain i where i: "\<forall>m\<ge>i. \<forall>n\<ge>i. \<bar>X m - X n\<bar> < s"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	222	using cauchyD [OF X s] ..
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	223	obtain j where j: "\<forall>m\<ge>j. \<forall>n\<ge>j. \<bar>Y m - Y n\<bar> < t"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	224	using cauchyD [OF Y t] ..
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	225	have "\<forall>m\<ge>max i j. \<forall>n\<ge>max i j. \<bar>X m * Y m - X n * Y n\<bar> < r"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	226	proof (clarsimp)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	227	fix m n assume *: "i \<le> m" "j \<le> m" "i \<le> n" "j \<le> n"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	228	have "\<bar>X m * Y m - X n * Y n\<bar> = \<bar>X m * (Y m - Y n) + (X m - X n) * Y n\<bar>"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	229	unfolding mult_diff_mult ..
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	230	also have "\<dots> \<le> \<bar>X m * (Y m - Y n)\<bar> + \<bar>(X m - X n) * Y n\<bar>"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	231	by (rule abs_triangle_ineq)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	232	also have "\<dots> = \<bar>X m\<bar> * \<bar>Y m - Y n\<bar> + \<bar>X m - X n\<bar> * \<bar>Y n\<bar>"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	233	unfolding abs_mult ..
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	234	also have "\<dots> < a * t + s * b"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	235	by (simp_all add: add_strict_mono mult_strict_mono' a b i j *)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	236	finally show "\<bar>X m * Y m - X n * Y n\<bar> < r" unfolding r .
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	237	qed
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	238	thus "\<exists>k. \<forall>m\<ge>k. \<forall>n\<ge>k. \<bar>X m * Y m - X n * Y n\<bar> < r" ..
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	239	qed
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	240
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	241	lemma cauchy_not_vanishes_cases:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	242	assumes X: "cauchy X"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	243	assumes nz: "\<not> vanishes X"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	244	shows "\<exists>b>0. \<exists>k. (\<forall>n\<ge>k. b < - X n) \<or> (\<forall>n\<ge>k. b < X n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	245	proof -
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	246	obtain r where "0 < r" and r: "\<forall>k. \<exists>n\<ge>k. r \<le> \<bar>X n\<bar>"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	247	using nz unfolding vanishes_def by (auto simp add: not_less)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	248	obtain s t where s: "0 < s" and t: "0 < t" and "r = s + t"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	249	using `0 < r` by (rule obtain_pos_sum)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	250	obtain i where i: "\<forall>m\<ge>i. \<forall>n\<ge>i. \<bar>X m - X n\<bar> < s"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	251	using cauchyD [OF X s] ..
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	252	obtain k where "i \<le> k" and "r \<le> \<bar>X k\<bar>"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	253	using r by fast
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	254	have k: "\<forall>n\<ge>k. \<bar>X n - X k\<bar> < s"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	255	using i `i \<le> k` by auto
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	256	have "X k \<le> - r \<or> r \<le> X k"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	257	using `r \<le> \<bar>X k\<bar>` by auto
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	258	hence "(\<forall>n\<ge>k. t < - X n) \<or> (\<forall>n\<ge>k. t < X n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	259	unfolding `r = s + t` using k by auto
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	260	hence "\<exists>k. (\<forall>n\<ge>k. t < - X n) \<or> (\<forall>n\<ge>k. t < X n)" ..
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	261	thus "\<exists>t>0. \<exists>k. (\<forall>n\<ge>k. t < - X n) \<or> (\<forall>n\<ge>k. t < X n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	262	using t by auto
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	263	qed
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	264
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	265	lemma cauchy_not_vanishes:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	266	assumes X: "cauchy X"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	267	assumes nz: "\<not> vanishes X"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	268	shows "\<exists>b>0. \<exists>k. \<forall>n\<ge>k. b < \<bar>X n\<bar>"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	269	using cauchy_not_vanishes_cases [OF assms]
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	270	by clarify (rule exI, erule conjI, rule_tac x=k in exI, auto)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	271
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	272	lemma cauchy_inverse [simp]:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	273	assumes X: "cauchy X"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	274	assumes nz: "\<not> vanishes X"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	275	shows "cauchy (\<lambda>n. inverse (X n))"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	276	proof (rule cauchyI)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	277	fix r :: rat assume "0 < r"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	278	obtain b i where b: "0 < b" and i: "\<forall>n\<ge>i. b < \<bar>X n\<bar>"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	279	using cauchy_not_vanishes [OF X nz] by fast
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	280	from b i have nz: "\<forall>n\<ge>i. X n \<noteq> 0" by auto
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	281	obtain s where s: "0 < s" and r: "r = inverse b * s * inverse b"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	282	proof
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	283	show "0 < b * r * b"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	284	by (simp add: `0 < r` b mult_pos_pos)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	285	show "r = inverse b * (b * r * b) * inverse b"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	286	using b by simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	287	qed
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	288	obtain j where j: "\<forall>m\<ge>j. \<forall>n\<ge>j. \<bar>X m - X n\<bar> < s"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	289	using cauchyD [OF X s] ..
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	290	have "\<forall>m\<ge>max i j. \<forall>n\<ge>max i j. \<bar>inverse (X m) - inverse (X n)\<bar> < r"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	291	proof (clarsimp)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	292	fix m n assume *: "i \<le> m" "j \<le> m" "i \<le> n" "j \<le> n"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	293	have "\<bar>inverse (X m) - inverse (X n)\<bar> =
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	294	inverse \<bar>X m\<bar> * \<bar>X m - X n\<bar> * inverse \<bar>X n\<bar>"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	295	by (simp add: inverse_diff_inverse nz * abs_mult)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	296	also have "\<dots> < inverse b * s * inverse b"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	297	by (simp add: mult_strict_mono less_imp_inverse_less
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	298	mult_pos_pos i j b * s)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	299	finally show "\<bar>inverse (X m) - inverse (X n)\<bar> < r" unfolding r .
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	300	qed
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	301	thus "\<exists>k. \<forall>m\<ge>k. \<forall>n\<ge>k. \<bar>inverse (X m) - inverse (X n)\<bar> < r" ..
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	302	qed
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	303
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	304	subsection {* Equivalence relation on Cauchy sequences *}
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	305
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	306	definition
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	307	realrel :: "((nat \<Rightarrow> rat) \<times> (nat \<Rightarrow> rat)) set"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	308	where
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	309	"realrel = {(X, Y). cauchy X \<and> cauchy Y \<and> vanishes (\<lambda>n. X n - Y n)}"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	310
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	311	lemma refl_realrel: "refl_on {X. cauchy X} realrel"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	312	unfolding realrel_def by (rule refl_onI, clarsimp, simp)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	313
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	314	lemma sym_realrel: "sym realrel"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	315	unfolding realrel_def
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	316	by (rule symI, clarify, drule vanishes_minus, simp)
14484 ef8c7c5eb01b new treatment of equivalence classes paulson parents: 14476 diff changeset	317
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	318	lemma trans_realrel: "trans realrel"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	319	unfolding realrel_def
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	320	apply (rule transI, clarify)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	321	apply (drule (1) vanishes_add)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	322	apply (simp add: algebra_simps)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	323	done
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	324
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	325	lemma equiv_realrel: "equiv {X. cauchy X} realrel"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	326	using refl_realrel sym_realrel trans_realrel
40815 6e2d17cc0d1d equivI has replaced equiv.intro haftmann parents: 38857 diff changeset	327	by (rule equivI)
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	328
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	329	subsection {* The field of real numbers *}
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	330
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	331	typedef (open) real = "{X. cauchy X} // realrel"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	332	by (fast intro: quotientI cauchy_const)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	333
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	334	definition
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	335	Real :: "(nat \<Rightarrow> rat) \<Rightarrow> real"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	336	where
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	337	"Real X = Abs_real (realrel `` {X})"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	338
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	339	definition
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	340	real_case :: "((nat \<Rightarrow> rat) \<Rightarrow> 'a) \<Rightarrow> real \<Rightarrow> 'a"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	341	where
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	342	"real_case f x = (THE y. \<forall>X\<in>Rep_real x. y = f X)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	343
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	344	lemma Real_induct [induct type: real]:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	345	"(\<And>X. cauchy X \<Longrightarrow> P (Real X)) \<Longrightarrow> P x"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	346	unfolding Real_def
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	347	apply (induct x)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	348	apply (erule quotientE)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	349	apply (simp)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	350	done
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	351
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	352	lemma real_case_1:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	353	assumes f: "congruent realrel f"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	354	assumes X: "cauchy X"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	355	shows "real_case f (Real X) = f X"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	356	unfolding real_case_def Real_def
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	357	apply (subst Abs_real_inverse)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	358	apply (simp add: quotientI X)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	359	apply (rule the_equality)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	360	apply clarsimp
40816 19c492929756 replaced slightly odd locale congruent by plain definition haftmann parents: 40815 diff changeset	361	apply (erule congruentD [OF f])
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	362	apply (erule bspec)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	363	apply simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	364	apply (rule refl_onD [OF refl_realrel])
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	365	apply (simp add: X)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	366	done
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	367
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	368	lemma real_case_2:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	369	assumes f: "congruent2 realrel realrel f"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	370	assumes X: "cauchy X" and Y: "cauchy Y"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	371	shows "real_case (\<lambda>X. real_case (\<lambda>Y. f X Y) (Real Y)) (Real X) = f X Y"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	372	apply (subst real_case_1 [OF _ X])
40816 19c492929756 replaced slightly odd locale congruent by plain definition haftmann parents: 40815 diff changeset	373	apply (rule congruentI)
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	374	apply (subst real_case_1 [OF _ Y])
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	375	apply (rule congruent2_implies_congruent [OF equiv_realrel f])
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	376	apply (simp add: realrel_def)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	377	apply (subst real_case_1 [OF _ Y])
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	378	apply (rule congruent2_implies_congruent [OF equiv_realrel f])
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	379	apply (simp add: realrel_def)
40817 781da1e8808c replaced slightly odd locale congruent2 by plain definition haftmann parents: 40816 diff changeset	380	apply (erule congruent2D [OF f])
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	381	apply (rule refl_onD [OF refl_realrel])
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	382	apply (simp add: Y)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	383	apply (rule real_case_1 [OF _ Y])
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	384	apply (rule congruent2_implies_congruent [OF equiv_realrel f])
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	385	apply (simp add: X)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	386	done
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	387
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	388	lemma eq_Real:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	389	"cauchy X \<Longrightarrow> cauchy Y \<Longrightarrow> Real X = Real Y \<longleftrightarrow> vanishes (\<lambda>n. X n - Y n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	390	unfolding Real_def
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	391	apply (subst Abs_real_inject)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	392	apply (simp add: quotientI)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	393	apply (simp add: quotientI)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	394	apply (simp add: eq_equiv_class_iff [OF equiv_realrel])
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	395	apply (simp add: realrel_def)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	396	done
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	397
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	398	lemma add_respects2_realrel:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	399	"(\<lambda>X Y. Real (\<lambda>n. X n + Y n)) respects2 realrel"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	400	proof (rule congruent2_commuteI [OF equiv_realrel, unfolded mem_Collect_eq])
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	401	fix X Y show "Real (\<lambda>n. X n + Y n) = Real (\<lambda>n. Y n + X n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	402	by (simp add: add_commute)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	403	next
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	404	fix X assume X: "cauchy X"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	405	fix Y Z assume "(Y, Z) \<in> realrel"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	406	hence Y: "cauchy Y" and Z: "cauchy Z" and YZ: "vanishes (\<lambda>n. Y n - Z n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	407	unfolding realrel_def by simp_all
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	408	show "Real (\<lambda>n. X n + Y n) = Real (\<lambda>n. X n + Z n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	409	proof (rule eq_Real [THEN iffD2])
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	410	show "cauchy (\<lambda>n. X n + Y n)" using X Y by (rule cauchy_add)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	411	show "cauchy (\<lambda>n. X n + Z n)" using X Z by (rule cauchy_add)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	412	show "vanishes (\<lambda>n. (X n + Y n) - (X n + Z n))"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	413	unfolding add_diff_add using YZ by simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	414	qed
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	415	qed
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	416
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	417	lemma minus_respects_realrel:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	418	"(\<lambda>X. Real (\<lambda>n. - X n)) respects realrel"
40816 19c492929756 replaced slightly odd locale congruent by plain definition haftmann parents: 40815 diff changeset	419	proof (rule congruentI)
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	420	fix X Y assume "(X, Y) \<in> realrel"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	421	hence X: "cauchy X" and Y: "cauchy Y" and XY: "vanishes (\<lambda>n. X n - Y n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	422	unfolding realrel_def by simp_all
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	423	show "Real (\<lambda>n. - X n) = Real (\<lambda>n. - Y n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	424	proof (rule eq_Real [THEN iffD2])
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	425	show "cauchy (\<lambda>n. - X n)" using X by (rule cauchy_minus)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	426	show "cauchy (\<lambda>n. - Y n)" using Y by (rule cauchy_minus)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	427	show "vanishes (\<lambda>n. (- X n) - (- Y n))"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	428	unfolding minus_diff_minus using XY by (rule vanishes_minus)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	429	qed
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	430	qed
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	431
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	432	lemma mult_respects2_realrel:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	433	"(\<lambda>X Y. Real (\<lambda>n. X n * Y n)) respects2 realrel"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	434	proof (rule congruent2_commuteI [OF equiv_realrel, unfolded mem_Collect_eq])
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	435	fix X Y
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	436	show "Real (\<lambda>n. X n * Y n) = Real (\<lambda>n. Y n * X n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	437	by (simp add: mult_commute)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	438	next
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	439	fix X assume X: "cauchy X"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	440	fix Y Z assume "(Y, Z) \<in> realrel"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	441	hence Y: "cauchy Y" and Z: "cauchy Z" and YZ: "vanishes (\<lambda>n. Y n - Z n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	442	unfolding realrel_def by simp_all
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	443	show "Real (\<lambda>n. X n * Y n) = Real (\<lambda>n. X n * Z n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	444	proof (rule eq_Real [THEN iffD2])
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	445	show "cauchy (\<lambda>n. X n * Y n)" using X Y by (rule cauchy_mult)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	446	show "cauchy (\<lambda>n. X n * Z n)" using X Z by (rule cauchy_mult)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	447	have "vanishes (\<lambda>n. X n * (Y n - Z n))"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	448	by (intro vanishes_mult_bounded cauchy_imp_bounded X YZ)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	449	thus "vanishes (\<lambda>n. X n * Y n - X n * Z n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	450	by (simp add: right_diff_distrib)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	451	qed
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	452	qed
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	453
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	454	lemma vanishes_diff_inverse:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	455	assumes X: "cauchy X" "\<not> vanishes X"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	456	assumes Y: "cauchy Y" "\<not> vanishes Y"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	457	assumes XY: "vanishes (\<lambda>n. X n - Y n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	458	shows "vanishes (\<lambda>n. inverse (X n) - inverse (Y n))"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	459	proof (rule vanishesI)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	460	fix r :: rat assume r: "0 < r"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	461	obtain a i where a: "0 < a" and i: "\<forall>n\<ge>i. a < \<bar>X n\<bar>"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	462	using cauchy_not_vanishes [OF X] by fast
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	463	obtain b j where b: "0 < b" and j: "\<forall>n\<ge>j. b < \<bar>Y n\<bar>"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	464	using cauchy_not_vanishes [OF Y] by fast
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	465	obtain s where s: "0 < s" and "inverse a * s * inverse b = r"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	466	proof
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	467	show "0 < a * r * b"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	468	using a r b by (simp add: mult_pos_pos)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	469	show "inverse a * (a * r * b) * inverse b = r"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	470	using a r b by simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	471	qed
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	472	obtain k where k: "\<forall>n\<ge>k. \<bar>X n - Y n\<bar> < s"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	473	using vanishesD [OF XY s] ..
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	474	have "\<forall>n\<ge>max (max i j) k. \<bar>inverse (X n) - inverse (Y n)\<bar> < r"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	475	proof (clarsimp)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	476	fix n assume n: "i \<le> n" "j \<le> n" "k \<le> n"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	477	have "X n \<noteq> 0" and "Y n \<noteq> 0"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	478	using i j a b n by auto
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	479	hence "\<bar>inverse (X n) - inverse (Y n)\<bar> =
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	480	inverse \<bar>X n\<bar> * \<bar>X n - Y n\<bar> * inverse \<bar>Y n\<bar>"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	481	by (simp add: inverse_diff_inverse abs_mult)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	482	also have "\<dots> < inverse a * s * inverse b"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	483	apply (intro mult_strict_mono' less_imp_inverse_less)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	484	apply (simp_all add: a b i j k n mult_nonneg_nonneg)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	485	done
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	486	also note `inverse a * s * inverse b = r`
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	487	finally show "\<bar>inverse (X n) - inverse (Y n)\<bar> < r" .
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	488	qed
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	489	thus "\<exists>k. \<forall>n\<ge>k. \<bar>inverse (X n) - inverse (Y n)\<bar> < r" ..
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	490	qed
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	491
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	492	lemma inverse_respects_realrel:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	493	"(\<lambda>X. if vanishes X then c else Real (\<lambda>n. inverse (X n))) respects realrel"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	494	(is "?inv respects realrel")
40816 19c492929756 replaced slightly odd locale congruent by plain definition haftmann parents: 40815 diff changeset	495	proof (rule congruentI)
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	496	fix X Y assume "(X, Y) \<in> realrel"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	497	hence X: "cauchy X" and Y: "cauchy Y" and XY: "vanishes (\<lambda>n. X n - Y n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	498	unfolding realrel_def by simp_all
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	499	have "vanishes X \<longleftrightarrow> vanishes Y"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	500	proof
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	501	assume "vanishes X"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	502	from vanishes_diff [OF this XY] show "vanishes Y" by simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	503	next
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	504	assume "vanishes Y"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	505	from vanishes_add [OF this XY] show "vanishes X" by simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	506	qed
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	507	thus "?inv X = ?inv Y"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	508	by (simp add: vanishes_diff_inverse eq_Real X Y XY)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	509	qed
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	510
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	511	instantiation real :: field_inverse_zero
25571 c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25546 diff changeset	512	begin
5588 a3ab526bb891 Revised version with Abelian group simprocs paulson parents: diff changeset	513
25571 c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25546 diff changeset	514	definition
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	515	"0 = Real (\<lambda>n. 0)"
25571 c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25546 diff changeset	516
c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25546 diff changeset	517	definition
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	518	"1 = Real (\<lambda>n. 1)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	519
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	520	definition
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	521	"x + y = real_case (\<lambda>X. real_case (\<lambda>Y. Real (\<lambda>n. X n + Y n)) y) x"
5588 a3ab526bb891 Revised version with Abelian group simprocs paulson parents: diff changeset	522
25571 c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25546 diff changeset	523	definition
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	524	"- x = real_case (\<lambda>X. Real (\<lambda>n. - X n)) x"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	525
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	526	definition
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	527	"x - y = (x::real) + - y"
10606 e3229a37d53f converted rinv to inverse; bauerg parents: 9391 diff changeset	528
25571 c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25546 diff changeset	529	definition
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	530	"x * y = real_case (\<lambda>X. real_case (\<lambda>Y. Real (\<lambda>n. X n * Y n)) y) x"
25571 c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25546 diff changeset	531
c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25546 diff changeset	532	definition
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	533	"inverse =
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	534	real_case (\<lambda>X. if vanishes X then 0 else Real (\<lambda>n. inverse (X n)))"
14484 ef8c7c5eb01b new treatment of equivalence classes paulson parents: 14476 diff changeset	535
25571 c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25546 diff changeset	536	definition
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	537	"x / y = (x::real) * inverse y"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	538
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	539	lemma add_Real:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	540	assumes X: "cauchy X" and Y: "cauchy Y"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	541	shows "Real X + Real Y = Real (\<lambda>n. X n + Y n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	542	unfolding plus_real_def
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	543	by (rule real_case_2 [OF add_respects2_realrel X Y])
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	544
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	545	lemma minus_Real:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	546	assumes X: "cauchy X"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	547	shows "- Real X = Real (\<lambda>n. - X n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	548	unfolding uminus_real_def
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	549	by (rule real_case_1 [OF minus_respects_realrel X])
5588 a3ab526bb891 Revised version with Abelian group simprocs paulson parents: diff changeset	550
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	551	lemma diff_Real:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	552	assumes X: "cauchy X" and Y: "cauchy Y"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	553	shows "Real X - Real Y = Real (\<lambda>n. X n - Y n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	554	unfolding minus_real_def diff_minus
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	555	by (simp add: minus_Real add_Real X Y)
25571 c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25546 diff changeset	556
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	557	lemma mult_Real:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	558	assumes X: "cauchy X" and Y: "cauchy Y"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	559	shows "Real X * Real Y = Real (\<lambda>n. X n * Y n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	560	unfolding times_real_def
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	561	by (rule real_case_2 [OF mult_respects2_realrel X Y])
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	562
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	563	lemma inverse_Real:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	564	assumes X: "cauchy X"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	565	shows "inverse (Real X) =
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	566	(if vanishes X then 0 else Real (\<lambda>n. inverse (X n)))"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	567	unfolding inverse_real_def
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	568	by (rule real_case_1 [OF inverse_respects_realrel X])
14269 502a7c95de73 conversion of some Real theories to Isar scripts paulson parents: 13487 diff changeset	569
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	570	instance proof
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	571	fix a b c :: real
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	572	show "a + b = b + a"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	573	by (induct a, induct b) (simp add: add_Real add_ac)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	574	show "(a + b) + c = a + (b + c)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	575	by (induct a, induct b, induct c) (simp add: add_Real add_ac)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	576	show "0 + a = a"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	577	unfolding zero_real_def
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	578	by (induct a) (simp add: add_Real)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	579	show "- a + a = 0"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	580	unfolding zero_real_def
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	581	by (induct a) (simp add: minus_Real add_Real)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	582	show "a - b = a + - b"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	583	by (rule minus_real_def)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	584	show "(a * b) * c = a * (b * c)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	585	by (induct a, induct b, induct c) (simp add: mult_Real mult_ac)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	586	show "a * b = b * a"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	587	by (induct a, induct b) (simp add: mult_Real mult_ac)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	588	show "1 * a = a"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	589	unfolding one_real_def
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	590	by (induct a) (simp add: mult_Real)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	591	show "(a + b) * c = a * c + b * c"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	592	by (induct a, induct b, induct c)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	593	(simp add: mult_Real add_Real algebra_simps)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	594	show "(0\<Colon>real) \<noteq> (1\<Colon>real)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	595	unfolding zero_real_def one_real_def
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	596	by (simp add: eq_Real)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	597	show "a \<noteq> 0 \<Longrightarrow> inverse a * a = 1"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	598	unfolding zero_real_def one_real_def
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	599	apply (induct a)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	600	apply (simp add: eq_Real inverse_Real mult_Real)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	601	apply (rule vanishesI)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	602	apply (frule (1) cauchy_not_vanishes, clarify)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	603	apply (rule_tac x=k in exI, clarify)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	604	apply (drule_tac x=n in spec, simp)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	605	done
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	606	show "a / b = a * inverse b"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	607	by (rule divide_real_def)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	608	show "inverse (0::real) = 0"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	609	by (simp add: zero_real_def inverse_Real)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	610	qed
25571 c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25546 diff changeset	611
c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25546 diff changeset	612	end
14334 6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	613
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	614	subsection {* Positive reals *}
14269 502a7c95de73 conversion of some Real theories to Isar scripts paulson parents: 13487 diff changeset	615
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	616	definition
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	617	positive :: "real \<Rightarrow> bool"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	618	where
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	619	"positive = real_case (\<lambda>X. \<exists>r>0. \<exists>k. \<forall>n\<ge>k. r < X n)"
14269 502a7c95de73 conversion of some Real theories to Isar scripts paulson parents: 13487 diff changeset	620
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	621	lemma bool_congruentI:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	622	assumes sym: "sym r"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	623	assumes P: "\<And>x y. (x, y) \<in> r \<Longrightarrow> P x \<Longrightarrow> P y"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	624	shows "P respects r"
40816 19c492929756 replaced slightly odd locale congruent by plain definition haftmann parents: 40815 diff changeset	625	apply (rule congruentI)
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	626	apply (rule iffI)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	627	apply (erule (1) P)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	628	apply (erule (1) P [OF symD [OF sym]])
14269 502a7c95de73 conversion of some Real theories to Isar scripts paulson parents: 13487 diff changeset	629	done
502a7c95de73 conversion of some Real theories to Isar scripts paulson parents: 13487 diff changeset	630
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	631	lemma positive_respects_realrel:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	632	"(\<lambda>X. \<exists>r>0. \<exists>k. \<forall>n\<ge>k. r < X n) respects realrel"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	633	proof (rule bool_congruentI)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	634	show "sym realrel" by (rule sym_realrel)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	635	next
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	636	fix X Y assume "(X, Y) \<in> realrel"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	637	hence XY: "vanishes (\<lambda>n. X n - Y n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	638	unfolding realrel_def by simp_all
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	639	assume "\<exists>r>0. \<exists>k. \<forall>n\<ge>k. r < X n"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	640	then obtain r i where "0 < r" and i: "\<forall>n\<ge>i. r < X n"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	641	by fast
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	642	obtain s t where s: "0 < s" and t: "0 < t" and r: "r = s + t"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	643	using `0 < r` by (rule obtain_pos_sum)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	644	obtain j where j: "\<forall>n\<ge>j. \<bar>X n - Y n\<bar> < s"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	645	using vanishesD [OF XY s] ..
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	646	have "\<forall>n\<ge>max i j. t < Y n"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	647	proof (clarsimp)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	648	fix n assume n: "i \<le> n" "j \<le> n"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	649	have "\<bar>X n - Y n\<bar> < s" and "r < X n"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	650	using i j n by simp_all
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	651	thus "t < Y n" unfolding r by simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	652	qed
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	653	thus "\<exists>r>0. \<exists>k. \<forall>n\<ge>k. r < Y n" using t by fast
14484 ef8c7c5eb01b new treatment of equivalence classes paulson parents: 14476 diff changeset	654	qed
14269 502a7c95de73 conversion of some Real theories to Isar scripts paulson parents: 13487 diff changeset	655
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	656	lemma positive_Real:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	657	assumes X: "cauchy X"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	658	shows "positive (Real X) \<longleftrightarrow> (\<exists>r>0. \<exists>k. \<forall>n\<ge>k. r < X n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	659	unfolding positive_def
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	660	by (rule real_case_1 [OF positive_respects_realrel X])
23287 063039db59dd define (1::preal); clean up instance declarations huffman parents: 23031 diff changeset	661
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	662	lemma positive_zero: "\<not> positive 0"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	663	unfolding zero_real_def by (auto simp add: positive_Real)
14269 502a7c95de73 conversion of some Real theories to Isar scripts paulson parents: 13487 diff changeset	664
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	665	lemma positive_add:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	666	"positive x \<Longrightarrow> positive y \<Longrightarrow> positive (x + y)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	667	apply (induct x, induct y, rename_tac Y X)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	668	apply (simp add: add_Real positive_Real)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	669	apply (clarify, rename_tac a b i j)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	670	apply (rule_tac x="a + b" in exI, simp)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	671	apply (rule_tac x="max i j" in exI, clarsimp)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	672	apply (simp add: add_strict_mono)
14269 502a7c95de73 conversion of some Real theories to Isar scripts paulson parents: 13487 diff changeset	673	done
502a7c95de73 conversion of some Real theories to Isar scripts paulson parents: 13487 diff changeset	674
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	675	lemma positive_mult:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	676	"positive x \<Longrightarrow> positive y \<Longrightarrow> positive (x * y)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	677	apply (induct x, induct y, rename_tac Y X)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	678	apply (simp add: mult_Real positive_Real)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	679	apply (clarify, rename_tac a b i j)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	680	apply (rule_tac x="a * b" in exI, simp add: mult_pos_pos)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	681	apply (rule_tac x="max i j" in exI, clarsimp)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	682	apply (rule mult_strict_mono, auto)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	683	done
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	684
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	685	lemma positive_minus:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	686	"\<not> positive x \<Longrightarrow> x \<noteq> 0 \<Longrightarrow> positive (- x)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	687	apply (induct x, rename_tac X)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	688	apply (simp add: zero_real_def eq_Real minus_Real positive_Real)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	689	apply (drule (1) cauchy_not_vanishes_cases, safe, fast, fast)
14269 502a7c95de73 conversion of some Real theories to Isar scripts paulson parents: 13487 diff changeset	690	done
14334 6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	691
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	692	instantiation real :: linordered_field_inverse_zero
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	693	begin
14341 a09441bd4f1e Ring_and_Field now requires axiom add_left_imp_eq for semirings. paulson parents: 14335 diff changeset	694
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	695	definition
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	696	"x < y \<longleftrightarrow> positive (y - x)"
14341 a09441bd4f1e Ring_and_Field now requires axiom add_left_imp_eq for semirings. paulson parents: 14335 diff changeset	697
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	698	definition
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	699	"x \<le> (y::real) \<longleftrightarrow> x < y \<or> x = y"
14334 6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	700
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	701	definition
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	702	"abs (a::real) = (if a < 0 then - a else a)"
14269 502a7c95de73 conversion of some Real theories to Isar scripts paulson parents: 13487 diff changeset	703
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	704	definition
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	705	"sgn (a::real) = (if a = 0 then 0 else if 0 < a then 1 else - 1)"
14269 502a7c95de73 conversion of some Real theories to Isar scripts paulson parents: 13487 diff changeset	706
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	707	instance proof
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	708	fix a b c :: real
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	709	show "\<bar>a\<bar> = (if a < 0 then - a else a)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	710	by (rule abs_real_def)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	711	show "a < b \<longleftrightarrow> a \<le> b \<and> \<not> b \<le> a"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	712	unfolding less_eq_real_def less_real_def
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	713	by (auto, drule (1) positive_add, simp_all add: positive_zero)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	714	show "a \<le> a"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	715	unfolding less_eq_real_def by simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	716	show "a \<le> b \<Longrightarrow> b \<le> c \<Longrightarrow> a \<le> c"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	717	unfolding less_eq_real_def less_real_def
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	718	by (auto, drule (1) positive_add, simp add: algebra_simps)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	719	show "a \<le> b \<Longrightarrow> b \<le> a \<Longrightarrow> a = b"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	720	unfolding less_eq_real_def less_real_def
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	721	by (auto, drule (1) positive_add, simp add: positive_zero)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	722	show "a \<le> b \<Longrightarrow> c + a \<le> c + b"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	723	unfolding less_eq_real_def less_real_def by auto
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	724	show "sgn a = (if a = 0 then 0 else if 0 < a then 1 else - 1)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	725	by (rule sgn_real_def)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	726	show "a \<le> b \<or> b \<le> a"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	727	unfolding less_eq_real_def less_real_def
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	728	by (auto dest!: positive_minus)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	729	show "a < b \<Longrightarrow> 0 < c \<Longrightarrow> c * a < c * b"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	730	unfolding less_real_def
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	731	by (drule (1) positive_mult, simp add: algebra_simps)
23288 3e45b5464d2b remove references to preal-specific theorems huffman parents: 23287 diff changeset	732	qed
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14369 diff changeset	733
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	734	end
14334 6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	735
25571 c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25546 diff changeset	736	instantiation real :: distrib_lattice
c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25546 diff changeset	737	begin
c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25546 diff changeset	738
c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25546 diff changeset	739	definition
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	740	"(inf :: real \<Rightarrow> real \<Rightarrow> real) = min"
25571 c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25546 diff changeset	741
c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25546 diff changeset	742	definition
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	743	"(sup :: real \<Rightarrow> real \<Rightarrow> real) = max"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	744
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	745	instance proof
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	746	qed (auto simp add: inf_real_def sup_real_def min_max.sup_inf_distrib1)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	747
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	748	end
25571 c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25546 diff changeset	749
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	750	instantiation real :: number_ring
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	751	begin
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	752
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	753	definition
37767 a2b7a20d6ea3 dropped superfluous [code del]s haftmann parents: 37765 diff changeset	754	"(number_of x :: real) = of_int x"
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	755
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	756	instance proof
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	757	qed (rule number_of_real_def)
22456 6070e48ecb78 added lattice definitions haftmann parents: 21404 diff changeset	758
25571 c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25546 diff changeset	759	end
c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25546 diff changeset	760
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	761	lemma of_nat_Real: "of_nat x = Real (\<lambda>n. of_nat x)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	762	apply (induct x)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	763	apply (simp add: zero_real_def)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	764	apply (simp add: one_real_def add_Real)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	765	done
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14369 diff changeset	766
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	767	lemma of_int_Real: "of_int x = Real (\<lambda>n. of_int x)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	768	apply (cases x rule: int_diff_cases)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	769	apply (simp add: of_nat_Real diff_Real)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	770	done
14334 6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	771
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	772	lemma of_rat_Real: "of_rat x = Real (\<lambda>n. x)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	773	apply (induct x)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	774	apply (simp add: Fract_of_int_quotient of_rat_divide)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	775	apply (simp add: of_int_Real divide_inverse)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	776	apply (simp add: inverse_Real mult_Real)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	777	done
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	778
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	779	instance real :: archimedean_field
14334 6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	780	proof
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	781	fix x :: real
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	782	show "\<exists>z. x \<le> of_int z"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	783	apply (induct x)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	784	apply (frule cauchy_imp_bounded, clarify)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	785	apply (rule_tac x="ceiling b + 1" in exI)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	786	apply (rule less_imp_le)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	787	apply (simp add: of_int_Real less_real_def diff_Real positive_Real)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	788	apply (rule_tac x=1 in exI, simp add: algebra_simps)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	789	apply (rule_tac x=0 in exI, clarsimp)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	790	apply (rule le_less_trans [OF abs_ge_self])
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	791	apply (rule less_le_trans [OF _ le_of_int_ceiling])
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	792	apply simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	793	done
14334 6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	794	qed
6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	795
43732 6b2bdc57155b adding a floor_ceiling type class for different instantiations of floor (changeset from Brian Huffman) bulwahn parents: 42311 diff changeset	796	instantiation real :: floor_ceiling
6b2bdc57155b adding a floor_ceiling type class for different instantiations of floor (changeset from Brian Huffman) bulwahn parents: 42311 diff changeset	797	begin
6b2bdc57155b adding a floor_ceiling type class for different instantiations of floor (changeset from Brian Huffman) bulwahn parents: 42311 diff changeset	798
6b2bdc57155b adding a floor_ceiling type class for different instantiations of floor (changeset from Brian Huffman) bulwahn parents: 42311 diff changeset	799	definition [code del]:
6b2bdc57155b adding a floor_ceiling type class for different instantiations of floor (changeset from Brian Huffman) bulwahn parents: 42311 diff changeset	800	"floor (x::real) = (THE z. of_int z \<le> x \<and> x < of_int (z + 1))"
6b2bdc57155b adding a floor_ceiling type class for different instantiations of floor (changeset from Brian Huffman) bulwahn parents: 42311 diff changeset	801
6b2bdc57155b adding a floor_ceiling type class for different instantiations of floor (changeset from Brian Huffman) bulwahn parents: 42311 diff changeset	802	instance proof
6b2bdc57155b adding a floor_ceiling type class for different instantiations of floor (changeset from Brian Huffman) bulwahn parents: 42311 diff changeset	803	fix x :: real
6b2bdc57155b adding a floor_ceiling type class for different instantiations of floor (changeset from Brian Huffman) bulwahn parents: 42311 diff changeset	804	show "of_int (floor x) \<le> x \<and> x < of_int (floor x + 1)"
6b2bdc57155b adding a floor_ceiling type class for different instantiations of floor (changeset from Brian Huffman) bulwahn parents: 42311 diff changeset	805	unfolding floor_real_def using floor_exists1 by (rule theI')
6b2bdc57155b adding a floor_ceiling type class for different instantiations of floor (changeset from Brian Huffman) bulwahn parents: 42311 diff changeset	806	qed
6b2bdc57155b adding a floor_ceiling type class for different instantiations of floor (changeset from Brian Huffman) bulwahn parents: 42311 diff changeset	807
6b2bdc57155b adding a floor_ceiling type class for different instantiations of floor (changeset from Brian Huffman) bulwahn parents: 42311 diff changeset	808	end
6b2bdc57155b adding a floor_ceiling type class for different instantiations of floor (changeset from Brian Huffman) bulwahn parents: 42311 diff changeset	809
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	810	subsection {* Completeness *}
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14348 diff changeset	811
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	812	lemma not_positive_Real:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	813	assumes X: "cauchy X"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	814	shows "\<not> positive (Real X) \<longleftrightarrow> (\<forall>r>0. \<exists>k. \<forall>n\<ge>k. X n \<le> r)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	815	unfolding positive_Real [OF X]
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	816	apply (auto, unfold not_less)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	817	apply (erule obtain_pos_sum)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	818	apply (drule_tac x=s in spec, simp)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	819	apply (drule_tac r=t in cauchyD [OF X], clarify)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	820	apply (drule_tac x=k in spec, clarsimp)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	821	apply (rule_tac x=n in exI, clarify, rename_tac m)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	822	apply (drule_tac x=m in spec, simp)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	823	apply (drule_tac x=n in spec, simp)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	824	apply (drule spec, drule (1) mp, clarify, rename_tac i)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	825	apply (rule_tac x="max i k" in exI, simp)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	826	done
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	827
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	828	lemma le_Real:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	829	assumes X: "cauchy X" and Y: "cauchy Y"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	830	shows "Real X \<le> Real Y = (\<forall>r>0. \<exists>k. \<forall>n\<ge>k. X n \<le> Y n + r)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	831	unfolding not_less [symmetric, where 'a=real] less_real_def
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	832	apply (simp add: diff_Real not_positive_Real X Y)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	833	apply (simp add: diff_le_eq add_ac)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	834	done
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14348 diff changeset	835
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	836	lemma le_RealI:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	837	assumes Y: "cauchy Y"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	838	shows "\<forall>n. x \<le> of_rat (Y n) \<Longrightarrow> x \<le> Real Y"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	839	proof (induct x)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	840	fix X assume X: "cauchy X" and "\<forall>n. Real X \<le> of_rat (Y n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	841	hence le: "\<And>m r. 0 < r \<Longrightarrow> \<exists>k. \<forall>n\<ge>k. X n \<le> Y m + r"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	842	by (simp add: of_rat_Real le_Real)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	843	{
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	844	fix r :: rat assume "0 < r"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	845	then obtain s t where s: "0 < s" and t: "0 < t" and r: "r = s + t"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	846	by (rule obtain_pos_sum)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	847	obtain i where i: "\<forall>m\<ge>i. \<forall>n\<ge>i. \<bar>Y m - Y n\<bar> < s"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	848	using cauchyD [OF Y s] ..
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	849	obtain j where j: "\<forall>n\<ge>j. X n \<le> Y i + t"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	850	using le [OF t] ..
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	851	have "\<forall>n\<ge>max i j. X n \<le> Y n + r"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	852	proof (clarsimp)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	853	fix n assume n: "i \<le> n" "j \<le> n"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	854	have "X n \<le> Y i + t" using n j by simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	855	moreover have "\<bar>Y i - Y n\<bar> < s" using n i by simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	856	ultimately show "X n \<le> Y n + r" unfolding r by simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	857	qed
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	858	hence "\<exists>k. \<forall>n\<ge>k. X n \<le> Y n + r" ..
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	859	}
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	860	thus "Real X \<le> Real Y"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	861	by (simp add: of_rat_Real le_Real X Y)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	862	qed
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14348 diff changeset	863
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	864	lemma Real_leI:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	865	assumes X: "cauchy X"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	866	assumes le: "\<forall>n. of_rat (X n) \<le> y"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	867	shows "Real X \<le> y"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	868	proof -
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	869	have "- y \<le> - Real X"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	870	by (simp add: minus_Real X le_RealI of_rat_minus le)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	871	thus ?thesis by simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	872	qed
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	873
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	874	lemma less_RealD:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	875	assumes Y: "cauchy Y"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	876	shows "x < Real Y \<Longrightarrow> \<exists>n. x < of_rat (Y n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	877	by (erule contrapos_pp, simp add: not_less, erule Real_leI [OF Y])
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	878
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	879	lemma of_nat_less_two_power:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	880	"of_nat n < (2::'a::{linordered_idom,number_ring}) ^ n"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	881	apply (induct n)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	882	apply simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	883	apply (subgoal_tac "(1::'a) \<le> 2 ^ n")
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	884	apply (drule (1) add_le_less_mono, simp)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	885	apply simp
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14348 diff changeset	886	done
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14348 diff changeset	887
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	888	lemma complete_real:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	889	fixes S :: "real set"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	890	assumes "\<exists>x. x \<in> S" and "\<exists>z. \<forall>x\<in>S. x \<le> z"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	891	shows "\<exists>y. (\<forall>x\<in>S. x \<le> y) \<and> (\<forall>z. (\<forall>x\<in>S. x \<le> z) \<longrightarrow> y \<le> z)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	892	proof -
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	893	obtain x where x: "x \<in> S" using assms(1) ..
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	894	obtain z where z: "\<forall>x\<in>S. x \<le> z" using assms(2) ..
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14348 diff changeset	895
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	896	def P \<equiv> "\<lambda>x. \<forall>y\<in>S. y \<le> of_rat x"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	897	obtain a where a: "\<not> P a"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	898	proof
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	899	have "of_int (floor (x - 1)) \<le> x - 1" by (rule of_int_floor_le)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	900	also have "x - 1 < x" by simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	901	finally have "of_int (floor (x - 1)) < x" .
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	902	hence "\<not> x \<le> of_int (floor (x - 1))" by (simp only: not_le)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	903	then show "\<not> P (of_int (floor (x - 1)))"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	904	unfolding P_def of_rat_of_int_eq using x by fast
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	905	qed
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	906	obtain b where b: "P b"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	907	proof
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	908	show "P (of_int (ceiling z))"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	909	unfolding P_def of_rat_of_int_eq
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	910	proof
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	911	fix y assume "y \<in> S"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	912	hence "y \<le> z" using z by simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	913	also have "z \<le> of_int (ceiling z)" by (rule le_of_int_ceiling)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	914	finally show "y \<le> of_int (ceiling z)" .
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	915	qed
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	916	qed
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14348 diff changeset	917
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	918	def avg \<equiv> "\<lambda>x y :: rat. x/2 + y/2"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	919	def bisect \<equiv> "\<lambda>(x, y). if P (avg x y) then (x, avg x y) else (avg x y, y)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	920	def A \<equiv> "\<lambda>n. fst ((bisect ^^ n) (a, b))"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	921	def B \<equiv> "\<lambda>n. snd ((bisect ^^ n) (a, b))"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	922	def C \<equiv> "\<lambda>n. avg (A n) (B n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	923	have A_0 [simp]: "A 0 = a" unfolding A_def by simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	924	have B_0 [simp]: "B 0 = b" unfolding B_def by simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	925	have A_Suc [simp]: "\<And>n. A (Suc n) = (if P (C n) then A n else C n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	926	unfolding A_def B_def C_def bisect_def split_def by simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	927	have B_Suc [simp]: "\<And>n. B (Suc n) = (if P (C n) then C n else B n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	928	unfolding A_def B_def C_def bisect_def split_def by simp
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14348 diff changeset	929
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	930	have width: "\<And>n. B n - A n = (b - a) / 2^n"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	931	apply (simp add: eq_divide_eq)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	932	apply (induct_tac n, simp)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	933	apply (simp add: C_def avg_def algebra_simps)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	934	done
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	935
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	936	have twos: "\<And>y r :: rat. 0 < r \<Longrightarrow> \<exists>n. y / 2 ^ n < r"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	937	apply (simp add: divide_less_eq)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	938	apply (subst mult_commute)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	939	apply (frule_tac y=y in ex_less_of_nat_mult)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	940	apply clarify
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	941	apply (rule_tac x=n in exI)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	942	apply (erule less_trans)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	943	apply (rule mult_strict_right_mono)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	944	apply (rule le_less_trans [OF _ of_nat_less_two_power])
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	945	apply simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	946	apply assumption
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	947	done
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14348 diff changeset	948
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	949	have PA: "\<And>n. \<not> P (A n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	950	by (induct_tac n, simp_all add: a)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	951	have PB: "\<And>n. P (B n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	952	by (induct_tac n, simp_all add: b)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	953	have ab: "a < b"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	954	using a b unfolding P_def
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	955	apply (clarsimp simp add: not_le)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	956	apply (drule (1) bspec)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	957	apply (drule (1) less_le_trans)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	958	apply (simp add: of_rat_less)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	959	done
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	960	have AB: "\<And>n. A n < B n"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	961	by (induct_tac n, simp add: ab, simp add: C_def avg_def)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	962	have A_mono: "\<And>i j. i \<le> j \<Longrightarrow> A i \<le> A j"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	963	apply (auto simp add: le_less [where 'a=nat])
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	964	apply (erule less_Suc_induct)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	965	apply (clarsimp simp add: C_def avg_def)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	966	apply (simp add: add_divide_distrib [symmetric])
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	967	apply (rule AB [THEN less_imp_le])
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	968	apply simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	969	done
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	970	have B_mono: "\<And>i j. i \<le> j \<Longrightarrow> B j \<le> B i"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	971	apply (auto simp add: le_less [where 'a=nat])
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	972	apply (erule less_Suc_induct)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	973	apply (clarsimp simp add: C_def avg_def)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	974	apply (simp add: add_divide_distrib [symmetric])
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	975	apply (rule AB [THEN less_imp_le])
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	976	apply simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	977	done
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	978	have cauchy_lemma:
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	979	"\<And>X. \<forall>n. \<forall>i\<ge>n. A n \<le> X i \<and> X i \<le> B n \<Longrightarrow> cauchy X"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	980	apply (rule cauchyI)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	981	apply (drule twos [where y="b - a"])
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	982	apply (erule exE)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	983	apply (rule_tac x=n in exI, clarify, rename_tac i j)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	984	apply (rule_tac y="B n - A n" in le_less_trans) defer
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	985	apply (simp add: width)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	986	apply (drule_tac x=n in spec)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	987	apply (frule_tac x=i in spec, drule (1) mp)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	988	apply (frule_tac x=j in spec, drule (1) mp)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	989	apply (frule A_mono, drule B_mono)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	990	apply (frule A_mono, drule B_mono)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	991	apply arith
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	992	done
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	993	have "cauchy A"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	994	apply (rule cauchy_lemma [rule_format])
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	995	apply (simp add: A_mono)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	996	apply (erule order_trans [OF less_imp_le [OF AB] B_mono])
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	997	done
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	998	have "cauchy B"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	999	apply (rule cauchy_lemma [rule_format])
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1000	apply (simp add: B_mono)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1001	apply (erule order_trans [OF A_mono less_imp_le [OF AB]])
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1002	done
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1003	have 1: "\<forall>x\<in>S. x \<le> Real B"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1004	proof
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1005	fix x assume "x \<in> S"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1006	then show "x \<le> Real B"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1007	using PB [unfolded P_def] `cauchy B`
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1008	by (simp add: le_RealI)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1009	qed
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1010	have 2: "\<forall>z. (\<forall>x\<in>S. x \<le> z) \<longrightarrow> Real A \<le> z"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1011	apply clarify
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1012	apply (erule contrapos_pp)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1013	apply (simp add: not_le)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1014	apply (drule less_RealD [OF `cauchy A`], clarify)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1015	apply (subgoal_tac "\<not> P (A n)")
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1016	apply (simp add: P_def not_le, clarify)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1017	apply (erule rev_bexI)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1018	apply (erule (1) less_trans)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1019	apply (simp add: PA)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1020	done
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1021	have "vanishes (\<lambda>n. (b - a) / 2 ^ n)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1022	proof (rule vanishesI)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1023	fix r :: rat assume "0 < r"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1024	then obtain k where k: "\<bar>b - a\<bar> / 2 ^ k < r"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1025	using twos by fast
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1026	have "\<forall>n\<ge>k. \<bar>(b - a) / 2 ^ n\<bar> < r"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1027	proof (clarify)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1028	fix n assume n: "k \<le> n"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1029	have "\<bar>(b - a) / 2 ^ n\<bar> = \<bar>b - a\<bar> / 2 ^ n"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1030	by simp
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1031	also have "\<dots> \<le> \<bar>b - a\<bar> / 2 ^ k"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1032	using n by (simp add: divide_left_mono mult_pos_pos)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1033	also note k
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1034	finally show "\<bar>(b - a) / 2 ^ n\<bar> < r" .
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1035	qed
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1036	thus "\<exists>k. \<forall>n\<ge>k. \<bar>(b - a) / 2 ^ n\<bar> < r" ..
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1037	qed
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1038	hence 3: "Real B = Real A"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1039	by (simp add: eq_Real `cauchy A` `cauchy B` width)
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1040	show "\<exists>y. (\<forall>x\<in>S. x \<le> y) \<and> (\<forall>z. (\<forall>x\<in>S. x \<le> z) \<longrightarrow> y \<le> z)"
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1041	using 1 2 3 by (rule_tac x="Real B" in exI, simp)
14484 ef8c7c5eb01b new treatment of equivalence classes paulson parents: 14476 diff changeset	1042	qed
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14348 diff changeset	1043
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1044	subsection {* Hiding implementation details *}
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14348 diff changeset	1045
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1046	hide_const (open) vanishes cauchy positive Real real_case
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14348 diff changeset	1047
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1048	declare Real_induct [induct del]
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1049	declare Abs_real_induct [induct del]
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1050	declare Abs_real_cases [cases del]
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1051
14334 6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1052	subsection{More Lemmas}
6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1053
36776 c137ae7673d3 remove a couple of redundant lemmas; simplify some proofs huffman parents: 36414 diff changeset	1054	text {* BH: These lemmas should not be necessary; they should be
c137ae7673d3 remove a couple of redundant lemmas; simplify some proofs huffman parents: 36414 diff changeset	1055	covered by existing simp rules and simplification procedures. *}
c137ae7673d3 remove a couple of redundant lemmas; simplify some proofs huffman parents: 36414 diff changeset	1056
14334 6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1057	lemma real_mult_left_cancel: "(c::real) \<noteq> 0 ==> (ca=cb) = (a=b)"
36776 c137ae7673d3 remove a couple of redundant lemmas; simplify some proofs huffman parents: 36414 diff changeset	1058	by simp (* redundant with mult_cancel_left *)
14334 6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1059
6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1060	lemma real_mult_right_cancel: "(c::real) \<noteq> 0 ==> (ac=bc) = (a=b)"
36776 c137ae7673d3 remove a couple of redundant lemmas; simplify some proofs huffman parents: 36414 diff changeset	1061	by simp (* redundant with mult_cancel_right *)
14334 6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1062
6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1063	lemma real_mult_less_iff1 [simp]: "(0::real) < z ==> (xz < yz) = (x < y)"
36776 c137ae7673d3 remove a couple of redundant lemmas; simplify some proofs huffman parents: 36414 diff changeset	1064	by simp (* solved by linordered_ring_less_cancel_factor simproc *)
14334 6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1065
6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1066	lemma real_mult_le_cancel_iff1 [simp]: "(0::real) < z ==> (xz \<le> yz) = (x\<le>y)"
36776 c137ae7673d3 remove a couple of redundant lemmas; simplify some proofs huffman parents: 36414 diff changeset	1067	by simp (* solved by linordered_ring_le_cancel_factor simproc *)
14334 6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1068
6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1069	lemma real_mult_le_cancel_iff2 [simp]: "(0::real) < z ==> (zx \<le> zy) = (x\<le>y)"
36776 c137ae7673d3 remove a couple of redundant lemmas; simplify some proofs huffman parents: 36414 diff changeset	1070	by (rule mult_le_cancel_left_pos)
c137ae7673d3 remove a couple of redundant lemmas; simplify some proofs huffman parents: 36414 diff changeset	1071	(* BH: Why doesn't "simp" prove this one, like it does the last one? *)
14334 6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1072
6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1073
24198 4031da6d8ba3 adaptions for code generation haftmann parents: 24075 diff changeset	1074	subsection {* Embedding numbers into the Reals *}
4031da6d8ba3 adaptions for code generation haftmann parents: 24075 diff changeset	1075
4031da6d8ba3 adaptions for code generation haftmann parents: 24075 diff changeset	1076	abbreviation
4031da6d8ba3 adaptions for code generation haftmann parents: 24075 diff changeset	1077	real_of_nat :: "nat \<Rightarrow> real"
4031da6d8ba3 adaptions for code generation haftmann parents: 24075 diff changeset	1078	where
4031da6d8ba3 adaptions for code generation haftmann parents: 24075 diff changeset	1079	"real_of_nat \<equiv> of_nat"
4031da6d8ba3 adaptions for code generation haftmann parents: 24075 diff changeset	1080
4031da6d8ba3 adaptions for code generation haftmann parents: 24075 diff changeset	1081	abbreviation
4031da6d8ba3 adaptions for code generation haftmann parents: 24075 diff changeset	1082	real_of_int :: "int \<Rightarrow> real"
4031da6d8ba3 adaptions for code generation haftmann parents: 24075 diff changeset	1083	where
4031da6d8ba3 adaptions for code generation haftmann parents: 24075 diff changeset	1084	"real_of_int \<equiv> of_int"
4031da6d8ba3 adaptions for code generation haftmann parents: 24075 diff changeset	1085
4031da6d8ba3 adaptions for code generation haftmann parents: 24075 diff changeset	1086	abbreviation
4031da6d8ba3 adaptions for code generation haftmann parents: 24075 diff changeset	1087	real_of_rat :: "rat \<Rightarrow> real"
4031da6d8ba3 adaptions for code generation haftmann parents: 24075 diff changeset	1088	where
4031da6d8ba3 adaptions for code generation haftmann parents: 24075 diff changeset	1089	"real_of_rat \<equiv> of_rat"
4031da6d8ba3 adaptions for code generation haftmann parents: 24075 diff changeset	1090
4031da6d8ba3 adaptions for code generation haftmann parents: 24075 diff changeset	1091	consts
4031da6d8ba3 adaptions for code generation haftmann parents: 24075 diff changeset	1092	(overloaded constant for injecting other types into "real")
4031da6d8ba3 adaptions for code generation haftmann parents: 24075 diff changeset	1093	real :: "'a => real"
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14348 diff changeset	1094
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14369 diff changeset	1095	defs (overloaded)
31998 2c7a24f74db9 code attributes use common underscore convention haftmann parents: 31952 diff changeset	1096	real_of_nat_def [code_unfold]: "real == real_of_nat"
2c7a24f74db9 code attributes use common underscore convention haftmann parents: 31952 diff changeset	1097	real_of_int_def [code_unfold]: "real == real_of_int"
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14348 diff changeset	1098
40939 2c150063cd4d setup subtyping/coercions once in HOL.thy, but enable it only later via configuration option; wenzelm parents: 40864 diff changeset	1099	declare [[coercion_enabled]]
40864 4abaaadfdaf2 moved activation of coercion inference into RealDef and declared function real a coercion. nipkow parents: 40826 diff changeset	1100	declare [[coercion "real::nat\<Rightarrow>real"]]
4abaaadfdaf2 moved activation of coercion inference into RealDef and declared function real a coercion. nipkow parents: 40826 diff changeset	1101	declare [[coercion "real::int\<Rightarrow>real"]]
41022 81d337539d57 moved coercion decl. for int nipkow parents: 40939 diff changeset	1102	declare [[coercion "int"]]
40864 4abaaadfdaf2 moved activation of coercion inference into RealDef and declared function real a coercion. nipkow parents: 40826 diff changeset	1103
41024 ba961a606c67 move coercions to appropriate places hoelzl parents: 41022 diff changeset	1104	declare [[coercion_map map]]
42112 9cb122742f5c Change coercion for RealDef to use function application (not composition) noschinl parents: 41920 diff changeset	1105	declare [[coercion_map "% f g h x. g (h (f x))"]]
41024 ba961a606c67 move coercions to appropriate places hoelzl parents: 41022 diff changeset	1106	declare [[coercion_map "% f g (x,y) . (f x, g y)"]]
ba961a606c67 move coercions to appropriate places hoelzl parents: 41022 diff changeset	1107
16819 00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1108	lemma real_eq_of_nat: "real = of_nat"
24198 4031da6d8ba3 adaptions for code generation haftmann parents: 24075 diff changeset	1109	unfolding real_of_nat_def ..
16819 00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1110
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1111	lemma real_eq_of_int: "real = of_int"
24198 4031da6d8ba3 adaptions for code generation haftmann parents: 24075 diff changeset	1112	unfolding real_of_int_def ..
16819 00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1113
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14348 diff changeset	1114	lemma real_of_int_zero [simp]: "real (0::int) = 0"
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14369 diff changeset	1115	by (simp add: real_of_int_def)
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14348 diff changeset	1116
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14348 diff changeset	1117	lemma real_of_one [simp]: "real (1::int) = (1::real)"
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14369 diff changeset	1118	by (simp add: real_of_int_def)
14334 6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1119
16819 00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1120	lemma real_of_int_add [simp]: "real(x + y) = real (x::int) + real y"
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14369 diff changeset	1121	by (simp add: real_of_int_def)
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14348 diff changeset	1122
16819 00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1123	lemma real_of_int_minus [simp]: "real(-x) = -real (x::int)"
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14369 diff changeset	1124	by (simp add: real_of_int_def)
16819 00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1125
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1126	lemma real_of_int_diff [simp]: "real(x - y) = real (x::int) - real y"
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1127	by (simp add: real_of_int_def)
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14348 diff changeset	1128
16819 00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1129	lemma real_of_int_mult [simp]: "real(x * y) = real (x::int) * real y"
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14369 diff changeset	1130	by (simp add: real_of_int_def)
14334 6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1131
35344 e0b46cd72414 moved some lemmas from RealPow to RealDef; changed orientation of real_of_int_power huffman parents: 35216 diff changeset	1132	lemma real_of_int_power [simp]: "real (x ^ n) = real (x::int) ^ n"
e0b46cd72414 moved some lemmas from RealPow to RealDef; changed orientation of real_of_int_power huffman parents: 35216 diff changeset	1133	by (simp add: real_of_int_def of_int_power)
e0b46cd72414 moved some lemmas from RealPow to RealDef; changed orientation of real_of_int_power huffman parents: 35216 diff changeset	1134
e0b46cd72414 moved some lemmas from RealPow to RealDef; changed orientation of real_of_int_power huffman parents: 35216 diff changeset	1135	lemmas power_real_of_int = real_of_int_power [symmetric]
e0b46cd72414 moved some lemmas from RealPow to RealDef; changed orientation of real_of_int_power huffman parents: 35216 diff changeset	1136
16819 00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1137	lemma real_of_int_setsum [simp]: "real ((SUM x:A. f x)::int) = (SUM x:A. real(f x))"
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1138	apply (subst real_eq_of_int)+
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1139	apply (rule of_int_setsum)
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1140	done
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1141
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1142	lemma real_of_int_setprod [simp]: "real ((PROD x:A. f x)::int) =
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1143	(PROD x:A. real(f x))"
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1144	apply (subst real_eq_of_int)+
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1145	apply (rule of_int_setprod)
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1146	done
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14348 diff changeset	1147
27668 6eb20b2cecf8 Tuned and simplified proofs chaieb parents: 27652 diff changeset	1148	lemma real_of_int_zero_cancel [simp, algebra, presburger]: "(real x = 0) = (x = (0::int))"
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14369 diff changeset	1149	by (simp add: real_of_int_def)
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14348 diff changeset	1150
27668 6eb20b2cecf8 Tuned and simplified proofs chaieb parents: 27652 diff changeset	1151	lemma real_of_int_inject [iff, algebra, presburger]: "(real (x::int) = real y) = (x = y)"
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14369 diff changeset	1152	by (simp add: real_of_int_def)
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14348 diff changeset	1153
27668 6eb20b2cecf8 Tuned and simplified proofs chaieb parents: 27652 diff changeset	1154	lemma real_of_int_less_iff [iff, presburger]: "(real (x::int) < real y) = (x < y)"
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14369 diff changeset	1155	by (simp add: real_of_int_def)
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14348 diff changeset	1156
27668 6eb20b2cecf8 Tuned and simplified proofs chaieb parents: 27652 diff changeset	1157	lemma real_of_int_le_iff [simp, presburger]: "(real (x::int) \<le> real y) = (x \<le> y)"
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14369 diff changeset	1158	by (simp add: real_of_int_def)
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14348 diff changeset	1159
27668 6eb20b2cecf8 Tuned and simplified proofs chaieb parents: 27652 diff changeset	1160	lemma real_of_int_gt_zero_cancel_iff [simp, presburger]: "(0 < real (n::int)) = (0 < n)"
16819 00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1161	by (simp add: real_of_int_def)
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1162
27668 6eb20b2cecf8 Tuned and simplified proofs chaieb parents: 27652 diff changeset	1163	lemma real_of_int_ge_zero_cancel_iff [simp, presburger]: "(0 <= real (n::int)) = (0 <= n)"
16819 00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1164	by (simp add: real_of_int_def)
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1165
27668 6eb20b2cecf8 Tuned and simplified proofs chaieb parents: 27652 diff changeset	1166	lemma real_of_int_lt_zero_cancel_iff [simp, presburger]: "(real (n::int) < 0) = (n < 0)"
16819 00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1167	by (simp add: real_of_int_def)
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1168
27668 6eb20b2cecf8 Tuned and simplified proofs chaieb parents: 27652 diff changeset	1169	lemma real_of_int_le_zero_cancel_iff [simp, presburger]: "(real (n::int) <= 0) = (n <= 0)"
16819 00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1170	by (simp add: real_of_int_def)
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1171
16888 7cb4bcfa058e added list of theorem changes to NEWS avigad parents: 16819 diff changeset	1172	lemma real_of_int_abs [simp]: "real (abs x) = abs(real (x::int))"
7cb4bcfa058e added list of theorem changes to NEWS avigad parents: 16819 diff changeset	1173	by (auto simp add: abs_if)
7cb4bcfa058e added list of theorem changes to NEWS avigad parents: 16819 diff changeset	1174
16819 00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1175	lemma int_less_real_le: "((n::int) < m) = (real n + 1 <= real m)"
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1176	apply (subgoal_tac "real n + 1 = real (n + 1)")
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1177	apply (simp del: real_of_int_add)
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1178	apply auto
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1179	done
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1180
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1181	lemma int_le_real_less: "((n::int) <= m) = (real n < real m + 1)"
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1182	apply (subgoal_tac "real m + 1 = real (m + 1)")
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1183	apply (simp del: real_of_int_add)
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1184	apply simp
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1185	done
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1186
46670 e9aa6d151329 removing unnecessary assumptions in RealDef; bulwahn parents: 46028 diff changeset	1187	lemma real_of_int_div_aux: "(real (x::int)) / (real d) =
16819 00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1188	real (x div d) + (real (x mod d)) / (real d)"
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1189	proof -
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1190	have "x = (x div d) * d + x mod d"
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1191	by auto
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1192	then have "real x = real (x div d) * real d + real(x mod d)"
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1193	by (simp only: real_of_int_mult [THEN sym] real_of_int_add [THEN sym])
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1194	then have "real x / real d = ... / real d"
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1195	by simp
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1196	then show ?thesis
46670 e9aa6d151329 removing unnecessary assumptions in RealDef; bulwahn parents: 46028 diff changeset	1197	by (auto simp add: add_divide_distrib algebra_simps)
16819 00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1198	qed
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1199
46670 e9aa6d151329 removing unnecessary assumptions in RealDef; bulwahn parents: 46028 diff changeset	1200	lemma real_of_int_div: "(d :: int) dvd n ==>
16819 00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1201	real(n div d) = real n / real d"
46670 e9aa6d151329 removing unnecessary assumptions in RealDef; bulwahn parents: 46028 diff changeset	1202	apply (subst real_of_int_div_aux)
16819 00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1203	apply simp
30042 31039ee583fa Removed subsumed lemmas nipkow parents: 29667 diff changeset	1204	apply (simp add: dvd_eq_mod_eq_0)
16819 00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1205	done
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1206
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1207	lemma real_of_int_div2:
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1208	"0 <= real (n::int) / real (x) - real (n div x)"
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1209	apply (case_tac "x = 0")
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1210	apply simp
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1211	apply (case_tac "0 < x")
29667 53103fc8ffa3 Replaced group_ and ring_simps by algebra_simps; nipkow parents: 28952 diff changeset	1212	apply (simp add: algebra_simps)
16819 00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1213	apply (subst real_of_int_div_aux)
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1214	apply simp
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1215	apply (subst zero_le_divide_iff)
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1216	apply auto
29667 53103fc8ffa3 Replaced group_ and ring_simps by algebra_simps; nipkow parents: 28952 diff changeset	1217	apply (simp add: algebra_simps)
16819 00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1218	apply (subst real_of_int_div_aux)
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1219	apply simp
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1220	apply (subst zero_le_divide_iff)
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1221	apply auto
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1222	done
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1223
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1224	lemma real_of_int_div3:
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1225	"real (n::int) / real (x) - real (n div x) <= 1"
29667 53103fc8ffa3 Replaced group_ and ring_simps by algebra_simps; nipkow parents: 28952 diff changeset	1226	apply (simp add: algebra_simps)
16819 00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1227	apply (subst real_of_int_div_aux)
46670 e9aa6d151329 removing unnecessary assumptions in RealDef; bulwahn parents: 46028 diff changeset	1228	apply (auto simp add: divide_le_eq intro: order_less_imp_le)
16819 00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1229	done
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1230
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1231	lemma real_of_int_div4: "real (n div x) <= real (n::int) / real x"
27964 1e0303048c0b added const Rational nipkow parents: 27833 diff changeset	1232	by (insert real_of_int_div2 [of n x], simp)
1e0303048c0b added const Rational nipkow parents: 27833 diff changeset	1233
35635 90fffd5ff996 add simp rules about Ints, Nats huffman parents: 35344 diff changeset	1234	lemma Ints_real_of_int [simp]: "real (x::int) \<in> Ints"
90fffd5ff996 add simp rules about Ints, Nats huffman parents: 35344 diff changeset	1235	unfolding real_of_int_def by (rule Ints_of_int)
90fffd5ff996 add simp rules about Ints, Nats huffman parents: 35344 diff changeset	1236
27964 1e0303048c0b added const Rational nipkow parents: 27833 diff changeset	1237
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14348 diff changeset	1238	subsection{Embedding the Naturals into the Reals}
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14348 diff changeset	1239
14334 6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1240	lemma real_of_nat_zero [simp]: "real (0::nat) = 0"
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14348 diff changeset	1241	by (simp add: real_of_nat_def)
14334 6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1242
30082 43c5b7bfc791 make more proofs work whether or not One_nat_def is a simp rule huffman parents: 30042 diff changeset	1243	lemma real_of_nat_1 [simp]: "real (1::nat) = 1"
43c5b7bfc791 make more proofs work whether or not One_nat_def is a simp rule huffman parents: 30042 diff changeset	1244	by (simp add: real_of_nat_def)
43c5b7bfc791 make more proofs work whether or not One_nat_def is a simp rule huffman parents: 30042 diff changeset	1245
14334 6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1246	lemma real_of_nat_one [simp]: "real (Suc 0) = (1::real)"
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14348 diff changeset	1247	by (simp add: real_of_nat_def)
14334 6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1248
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14348 diff changeset	1249	lemma real_of_nat_add [simp]: "real (m + n) = real (m::nat) + real n"
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14369 diff changeset	1250	by (simp add: real_of_nat_def)
14334 6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1251
6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1252	(Not for addsimps: often the LHS is used to represent a positive natural)
6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1253	lemma real_of_nat_Suc: "real (Suc n) = real n + (1::real)"
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14369 diff changeset	1254	by (simp add: real_of_nat_def)
14334 6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1255
6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1256	lemma real_of_nat_less_iff [iff]:
6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1257	"(real (n::nat) < real m) = (n < m)"
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14348 diff changeset	1258	by (simp add: real_of_nat_def)
14334 6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1259
6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1260	lemma real_of_nat_le_iff [iff]: "(real (n::nat) \<le> real m) = (n \<le> m)"
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14369 diff changeset	1261	by (simp add: real_of_nat_def)
14334 6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1262
6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1263	lemma real_of_nat_ge_zero [iff]: "0 \<le> real (n::nat)"
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14369 diff changeset	1264	by (simp add: real_of_nat_def zero_le_imp_of_nat)
14334 6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1265
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14348 diff changeset	1266	lemma real_of_nat_Suc_gt_zero: "0 < real (Suc n)"
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14369 diff changeset	1267	by (simp add: real_of_nat_def del: of_nat_Suc)
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14348 diff changeset	1268
14334 6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1269	lemma real_of_nat_mult [simp]: "real (m * n) = real (m::nat) * real n"
23431 25ca91279a9b change simp rules for of_nat to work like int did previously (reorient of_nat_Suc, remove of_nat_mult [simp]); preserve original variable names in legacy int theorems huffman parents: 23289 diff changeset	1270	by (simp add: real_of_nat_def of_nat_mult)
14334 6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1271
35344 e0b46cd72414 moved some lemmas from RealPow to RealDef; changed orientation of real_of_int_power huffman parents: 35216 diff changeset	1272	lemma real_of_nat_power [simp]: "real (m ^ n) = real (m::nat) ^ n"
e0b46cd72414 moved some lemmas from RealPow to RealDef; changed orientation of real_of_int_power huffman parents: 35216 diff changeset	1273	by (simp add: real_of_nat_def of_nat_power)
e0b46cd72414 moved some lemmas from RealPow to RealDef; changed orientation of real_of_int_power huffman parents: 35216 diff changeset	1274
e0b46cd72414 moved some lemmas from RealPow to RealDef; changed orientation of real_of_int_power huffman parents: 35216 diff changeset	1275	lemmas power_real_of_nat = real_of_nat_power [symmetric]
e0b46cd72414 moved some lemmas from RealPow to RealDef; changed orientation of real_of_int_power huffman parents: 35216 diff changeset	1276
16819 00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1277	lemma real_of_nat_setsum [simp]: "real ((SUM x:A. f x)::nat) =
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1278	(SUM x:A. real(f x))"
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1279	apply (subst real_eq_of_nat)+
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1280	apply (rule of_nat_setsum)
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1281	done
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1282
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1283	lemma real_of_nat_setprod [simp]: "real ((PROD x:A. f x)::nat) =
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1284	(PROD x:A. real(f x))"
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1285	apply (subst real_eq_of_nat)+
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1286	apply (rule of_nat_setprod)
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1287	done
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1288
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1289	lemma real_of_card: "real (card A) = setsum (%x.1) A"
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1290	apply (subst card_eq_setsum)
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1291	apply (subst real_of_nat_setsum)
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1292	apply simp
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1293	done
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1294
14334 6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1295	lemma real_of_nat_inject [iff]: "(real (n::nat) = real m) = (n = m)"
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14369 diff changeset	1296	by (simp add: real_of_nat_def)
14334 6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1297
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1298	lemma real_of_nat_zero_iff [iff]: "(real (n::nat) = 0) = (n = 0)"
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14369 diff changeset	1299	by (simp add: real_of_nat_def)
14334 6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1300
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14348 diff changeset	1301	lemma real_of_nat_diff: "n \<le> m ==> real (m - n) = real (m::nat) - real n"
23438 dd824e86fa8a remove simp attribute from of_nat_diff, for backward compatibility with zdiff_int huffman parents: 23431 diff changeset	1302	by (simp add: add: real_of_nat_def of_nat_diff)
14334 6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1303
25162 ad4d5365d9d8 went back to >0 nipkow parents: 25140 diff changeset	1304	lemma real_of_nat_gt_zero_cancel_iff [simp]: "(0 < real (n::nat)) = (0 < n)"
25140 273772abbea2 More changes from >0 to ~=0::nat nipkow parents: 25134 diff changeset	1305	by (auto simp: real_of_nat_def)
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14348 diff changeset	1306
3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14348 diff changeset	1307	lemma real_of_nat_le_zero_cancel_iff [simp]: "(real (n::nat) \<le> 0) = (n = 0)"
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14369 diff changeset	1308	by (simp add: add: real_of_nat_def)
14334 6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1309
14365 3d4df8c166ae replacing HOL/Real/PRat, PNat by the rational number development paulson parents: 14348 diff changeset	1310	lemma not_real_of_nat_less_zero [simp]: "~ real (n::nat) < 0"
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14369 diff changeset	1311	by (simp add: add: real_of_nat_def)
14334 6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1312
16819 00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1313	lemma nat_less_real_le: "((n::nat) < m) = (real n + 1 <= real m)"
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1314	apply (subgoal_tac "real n + 1 = real (Suc n)")
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1315	apply simp
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1316	apply (auto simp add: real_of_nat_Suc)
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1317	done
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1318
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1319	lemma nat_le_real_less: "((n::nat) <= m) = (real n < real m + 1)"
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1320	apply (subgoal_tac "real m + 1 = real (Suc m)")
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1321	apply (simp add: less_Suc_eq_le)
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1322	apply (simp add: real_of_nat_Suc)
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1323	done
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1324
46670 e9aa6d151329 removing unnecessary assumptions in RealDef; bulwahn parents: 46028 diff changeset	1325	lemma real_of_nat_div_aux: "(real (x::nat)) / (real d) =
16819 00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1326	real (x div d) + (real (x mod d)) / (real d)"
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1327	proof -
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1328	have "x = (x div d) * d + x mod d"
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1329	by auto
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1330	then have "real x = real (x div d) * real d + real(x mod d)"
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1331	by (simp only: real_of_nat_mult [THEN sym] real_of_nat_add [THEN sym])
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1332	then have "real x / real d = \<dots> / real d"
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1333	by simp
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1334	then show ?thesis
46670 e9aa6d151329 removing unnecessary assumptions in RealDef; bulwahn parents: 46028 diff changeset	1335	by (auto simp add: add_divide_distrib algebra_simps)
16819 00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1336	qed
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1337
46670 e9aa6d151329 removing unnecessary assumptions in RealDef; bulwahn parents: 46028 diff changeset	1338	lemma real_of_nat_div: "(d :: nat) dvd n ==>
16819 00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1339	real(n div d) = real n / real d"
46670 e9aa6d151329 removing unnecessary assumptions in RealDef; bulwahn parents: 46028 diff changeset	1340	by (subst real_of_nat_div_aux)
e9aa6d151329 removing unnecessary assumptions in RealDef; bulwahn parents: 46028 diff changeset	1341	(auto simp add: dvd_eq_mod_eq_0 [symmetric])
16819 00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1342
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1343	lemma real_of_nat_div2:
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1344	"0 <= real (n::nat) / real (x) - real (n div x)"
29667 53103fc8ffa3 Replaced group_ and ring_simps by algebra_simps; nipkow parents: 28952 diff changeset	1345	apply (simp add: algebra_simps)
25134 3d4953e88449 Eliminated most of the neq0_conv occurrences. As a result, many nipkow parents: 25112 diff changeset	1346	apply (subst real_of_nat_div_aux)
3d4953e88449 Eliminated most of the neq0_conv occurrences. As a result, many nipkow parents: 25112 diff changeset	1347	apply simp
3d4953e88449 Eliminated most of the neq0_conv occurrences. As a result, many nipkow parents: 25112 diff changeset	1348	apply (subst zero_le_divide_iff)
3d4953e88449 Eliminated most of the neq0_conv occurrences. As a result, many nipkow parents: 25112 diff changeset	1349	apply simp
16819 00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1350	done
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1351
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1352	lemma real_of_nat_div3:
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1353	"real (n::nat) / real (x) - real (n div x) <= 1"
25134 3d4953e88449 Eliminated most of the neq0_conv occurrences. As a result, many nipkow parents: 25112 diff changeset	1354	apply(case_tac "x = 0")
3d4953e88449 Eliminated most of the neq0_conv occurrences. As a result, many nipkow parents: 25112 diff changeset	1355	apply (simp)
29667 53103fc8ffa3 Replaced group_ and ring_simps by algebra_simps; nipkow parents: 28952 diff changeset	1356	apply (simp add: algebra_simps)
25134 3d4953e88449 Eliminated most of the neq0_conv occurrences. As a result, many nipkow parents: 25112 diff changeset	1357	apply (subst real_of_nat_div_aux)
3d4953e88449 Eliminated most of the neq0_conv occurrences. As a result, many nipkow parents: 25112 diff changeset	1358	apply simp
16819 00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1359	done
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1360
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1361	lemma real_of_nat_div4: "real (n div x) <= real (n::nat) / real x"
29667 53103fc8ffa3 Replaced group_ and ring_simps by algebra_simps; nipkow parents: 28952 diff changeset	1362	by (insert real_of_nat_div2 [of n x], simp)
16819 00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1363
14426 de890c247b38 fixed bugs in the setup of arithmetic procedures paulson parents: 14421 diff changeset	1364	lemma real_of_int_of_nat_eq [simp]: "real (of_nat n :: int) = real n"
de890c247b38 fixed bugs in the setup of arithmetic procedures paulson parents: 14421 diff changeset	1365	by (simp add: real_of_int_def real_of_nat_def)
14334 6137d24eef79 tweaking of lemmas in RealDef, RealOrd paulson parents: 14329 diff changeset	1366
16819 00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1367	lemma real_nat_eq_real [simp]: "0 <= x ==> real(nat x) = real x"
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1368	apply (subgoal_tac "real(int(nat x)) = real(nat x)")
00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1369	apply force
44822 2690b6de5021 remove duplicate lemma real_of_int_real_of_nat in favor of real_of_int_of_nat_eq huffman parents: 44766 diff changeset	1370	apply (simp only: real_of_int_of_nat_eq)
16819 00d8f9300d13 Additions to the Real (and Hyperreal) libraries: avigad parents: 16417 diff changeset	1371	done
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1372
35635 90fffd5ff996 add simp rules about Ints, Nats huffman parents: 35344 diff changeset	1373	lemma Nats_real_of_nat [simp]: "real (n::nat) \<in> Nats"
90fffd5ff996 add simp rules about Ints, Nats huffman parents: 35344 diff changeset	1374	unfolding real_of_nat_def by (rule of_nat_in_Nats)
90fffd5ff996 add simp rules about Ints, Nats huffman parents: 35344 diff changeset	1375
90fffd5ff996 add simp rules about Ints, Nats huffman parents: 35344 diff changeset	1376	lemma Ints_real_of_nat [simp]: "real (n::nat) \<in> Ints"
90fffd5ff996 add simp rules about Ints, Nats huffman parents: 35344 diff changeset	1377	unfolding real_of_nat_def by (rule Ints_of_nat)
90fffd5ff996 add simp rules about Ints, Nats huffman parents: 35344 diff changeset	1378
28001 4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1379
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1380	subsection{* Rationals *}
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1381
28091 50f2d6ba024c Streamlined parts of Complex/ex/DenumRat and AFP/Integration/Rats and nipkow parents: 28001 diff changeset	1382	lemma Rats_real_nat[simp]: "real(n::nat) \<in> \<rat>"
50f2d6ba024c Streamlined parts of Complex/ex/DenumRat and AFP/Integration/Rats and nipkow parents: 28001 diff changeset	1383	by (simp add: real_eq_of_nat)
50f2d6ba024c Streamlined parts of Complex/ex/DenumRat and AFP/Integration/Rats and nipkow parents: 28001 diff changeset	1384
50f2d6ba024c Streamlined parts of Complex/ex/DenumRat and AFP/Integration/Rats and nipkow parents: 28001 diff changeset	1385
28001 4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1386	lemma Rats_eq_int_div_int:
28091 50f2d6ba024c Streamlined parts of Complex/ex/DenumRat and AFP/Integration/Rats and nipkow parents: 28001 diff changeset	1387	"\<rat> = { real(i::int)/real(j::int) \|i j. j \<noteq> 0}" (is "_ = ?S")
28001 4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1388	proof
28091 50f2d6ba024c Streamlined parts of Complex/ex/DenumRat and AFP/Integration/Rats and nipkow parents: 28001 diff changeset	1389	show "\<rat> \<subseteq> ?S"
28001 4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1390	proof
28091 50f2d6ba024c Streamlined parts of Complex/ex/DenumRat and AFP/Integration/Rats and nipkow parents: 28001 diff changeset	1391	fix x::real assume "x : \<rat>"
28001 4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1392	then obtain r where "x = of_rat r" unfolding Rats_def ..
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1393	have "of_rat r : ?S"
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1394	by (cases r)(auto simp add:of_rat_rat real_eq_of_int)
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1395	thus "x : ?S" using `x = of_rat r` by simp
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1396	qed
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1397	next
28091 50f2d6ba024c Streamlined parts of Complex/ex/DenumRat and AFP/Integration/Rats and nipkow parents: 28001 diff changeset	1398	show "?S \<subseteq> \<rat>"
28001 4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1399	proof(auto simp:Rats_def)
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1400	fix i j :: int assume "j \<noteq> 0"
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1401	hence "real i / real j = of_rat(Fract i j)"
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1402	by (simp add:of_rat_rat real_eq_of_int)
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1403	thus "real i / real j \<in> range of_rat" by blast
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1404	qed
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1405	qed
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1406
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1407	lemma Rats_eq_int_div_nat:
28091 50f2d6ba024c Streamlined parts of Complex/ex/DenumRat and AFP/Integration/Rats and nipkow parents: 28001 diff changeset	1408	"\<rat> = { real(i::int)/real(n::nat) \|i n. n \<noteq> 0}"
28001 4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1409	proof(auto simp:Rats_eq_int_div_int)
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1410	fix i j::int assume "j \<noteq> 0"
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1411	show "EX (i'::int) (n::nat). real i/real j = real i'/real n \<and> 0<n"
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1412	proof cases
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1413	assume "j>0"
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1414	hence "real i/real j = real i/real(nat j) \<and> 0<nat j"
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1415	by (simp add: real_eq_of_int real_eq_of_nat of_nat_nat)
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1416	thus ?thesis by blast
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1417	next
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1418	assume "~ j>0"
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1419	hence "real i/real j = real(-i)/real(nat(-j)) \<and> 0<nat(-j)" using `j\<noteq>0`
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1420	by (simp add: real_eq_of_int real_eq_of_nat of_nat_nat)
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1421	thus ?thesis by blast
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1422	qed
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1423	next
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1424	fix i::int and n::nat assume "0 < n"
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1425	hence "real i/real n = real i/real(int n) \<and> int n \<noteq> 0" by simp
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1426	thus "\<exists>(i'::int) j::int. real i/real n = real i'/real j \<and> j \<noteq> 0" by blast
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1427	qed
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1428
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1429	lemma Rats_abs_nat_div_natE:
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1430	assumes "x \<in> \<rat>"
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 31641 diff changeset	1431	obtains m n :: nat
1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 31641 diff changeset	1432	where "n \<noteq> 0" and "\<bar>x\<bar> = real m / real n" and "gcd m n = 1"
28001 4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1433	proof -
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1434	from `x \<in> \<rat>` obtain i::int and n::nat where "n \<noteq> 0" and "x = real i / real n"
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1435	by(auto simp add: Rats_eq_int_div_nat)
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1436	hence "\<bar>x\<bar> = real(nat(abs i)) / real n" by simp
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1437	then obtain m :: nat where x_rat: "\<bar>x\<bar> = real m / real n" by blast
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1438	let ?gcd = "gcd m n"
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 31641 diff changeset	1439	from `n\<noteq>0` have gcd: "?gcd \<noteq> 0" by simp
28001 4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1440	let ?k = "m div ?gcd"
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1441	let ?l = "n div ?gcd"
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1442	let ?gcd' = "gcd ?k ?l"
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1443	have "?gcd dvd m" .. then have gcd_k: "?gcd * ?k = m"
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1444	by (rule dvd_mult_div_cancel)
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1445	have "?gcd dvd n" .. then have gcd_l: "?gcd * ?l = n"
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1446	by (rule dvd_mult_div_cancel)
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1447	from `n\<noteq>0` and gcd_l have "?l \<noteq> 0" by (auto iff del: neq0_conv)
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1448	moreover
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1449	have "\<bar>x\<bar> = real ?k / real ?l"
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1450	proof -
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1451	from gcd have "real ?k / real ?l =
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1452	real (?gcd * ?k) / real (?gcd * ?l)" by simp
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1453	also from gcd_k and gcd_l have "\<dots> = real m / real n" by simp
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1454	also from x_rat have "\<dots> = \<bar>x\<bar>" ..
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1455	finally show ?thesis ..
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1456	qed
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1457	moreover
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1458	have "?gcd' = 1"
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1459	proof -
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1460	have "?gcd * ?gcd' = gcd (?gcd * ?k) (?gcd * ?l)"
31952 40501bb2d57c renamed lemmas: nat_xyz/int_xyz -> xyz_nat/xyz_int nipkow parents: 31707 diff changeset	1461	by (rule gcd_mult_distrib_nat)
28001 4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1462	with gcd_k gcd_l have "?gcd * ?gcd' = ?gcd" by simp
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 31641 diff changeset	1463	with gcd show ?thesis by auto
28001 4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1464	qed
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1465	ultimately show ?thesis ..
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1466	qed
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1467
4642317e0deb Defined rationals (Rats) globally in Rational. nipkow parents: 27964 diff changeset	1468
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1469	subsection{Numerals and Arithmetic}
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1470
46028 9f113cdf3d66 attribute code_abbrev superseedes code_unfold_post haftmann parents: 45859 diff changeset	1471	lemma [code_abbrev]:
9f113cdf3d66 attribute code_abbrev superseedes code_unfold_post haftmann parents: 45859 diff changeset	1472	"real_of_int (number_of k) = number_of k"
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1473	unfolding number_of_is_id number_of_real_def ..
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1474
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1475	text{Collapse applications of @{term real} to @{term number_of}}
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1476	lemma real_number_of [simp]: "real (number_of v :: int) = number_of v"
35216 7641e8d831d2 get rid of many duplicate simp rule warnings huffman parents: 35050 diff changeset	1477	by (simp add: real_of_int_def)
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1478
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1479	lemma real_of_nat_number_of [simp]:
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1480	"real (number_of v :: nat) =
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1481	(if neg (number_of v :: int) then 0
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1482	else (number_of v :: real))"
44822 2690b6de5021 remove duplicate lemma real_of_int_real_of_nat in favor of real_of_int_of_nat_eq huffman parents: 44766 diff changeset	1483	by (simp add: real_of_int_of_nat_eq [symmetric])
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1484
31100 6a2e67fe4488 tuned interface of Lin_Arith haftmann parents: 30242 diff changeset	1485	declaration {*
6a2e67fe4488 tuned interface of Lin_Arith haftmann parents: 30242 diff changeset	1486	K (Lin_Arith.add_inj_thms [@{thm real_of_nat_le_iff} RS iffD2, @{thm real_of_nat_inject} RS iffD2]
6a2e67fe4488 tuned interface of Lin_Arith haftmann parents: 30242 diff changeset	1487	(* not needed because x < (y::nat) can be rewritten as Suc x <= y: real_of_nat_less_iff RS iffD2 *)
6a2e67fe4488 tuned interface of Lin_Arith haftmann parents: 30242 diff changeset	1488	#> Lin_Arith.add_inj_thms [@{thm real_of_int_le_iff} RS iffD2, @{thm real_of_int_inject} RS iffD2]
6a2e67fe4488 tuned interface of Lin_Arith haftmann parents: 30242 diff changeset	1489	(* not needed because x < (y::int) can be rewritten as x + 1 <= y: real_of_int_less_iff RS iffD2 *)
6a2e67fe4488 tuned interface of Lin_Arith haftmann parents: 30242 diff changeset	1490	#> Lin_Arith.add_simps [@{thm real_of_nat_zero}, @{thm real_of_nat_Suc}, @{thm real_of_nat_add},
6a2e67fe4488 tuned interface of Lin_Arith haftmann parents: 30242 diff changeset	1491	@{thm real_of_nat_mult}, @{thm real_of_int_zero}, @{thm real_of_one},
6a2e67fe4488 tuned interface of Lin_Arith haftmann parents: 30242 diff changeset	1492	@{thm real_of_int_add}, @{thm real_of_int_minus}, @{thm real_of_int_diff},
6a2e67fe4488 tuned interface of Lin_Arith haftmann parents: 30242 diff changeset	1493	@{thm real_of_int_mult}, @{thm real_of_int_of_nat_eq},
6a2e67fe4488 tuned interface of Lin_Arith haftmann parents: 30242 diff changeset	1494	@{thm real_of_nat_number_of}, @{thm real_number_of}]
36795 e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1495	#> Lin_Arith.add_inj_const (@{const_name real}, @{typ "nat \<Rightarrow> real"})
e05e1283c550 new construction of real numbers using Cauchy sequences huffman parents: 36776 diff changeset	1496	#> Lin_Arith.add_inj_const (@{const_name real}, @{typ "int \<Rightarrow> real"}))
31100 6a2e67fe4488 tuned interface of Lin_Arith haftmann parents: 30242 diff changeset	1497	*}
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1498
19023 5652a536b7e8 * include generalised MVT in HyperReal (contributed by Benjamin Porter) kleing parents: 16973 diff changeset	1499
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1500	subsection{* Simprules combining x+y and 0: ARE THEY NEEDED?*}
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1501
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1502	lemma real_add_minus_iff [simp]: "(x + - a = (0::real)) = (x=a)"
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1503	by arith
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1504
36839 34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1505	text {* FIXME: redundant with @{text add_eq_0_iff} below *}
15085 5693a977a767 removed some [iff] declarations from RealDef.thy, concerning inequalities paulson parents: 15077 diff changeset	1506	lemma real_add_eq_0_iff: "(x+y = (0::real)) = (y = -x)"
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1507	by auto
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1508
15085 5693a977a767 removed some [iff] declarations from RealDef.thy, concerning inequalities paulson parents: 15077 diff changeset	1509	lemma real_add_less_0_iff: "(x+y < (0::real)) = (y < -x)"
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1510	by auto
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1511
15085 5693a977a767 removed some [iff] declarations from RealDef.thy, concerning inequalities paulson parents: 15077 diff changeset	1512	lemma real_0_less_add_iff: "((0::real) < x+y) = (-x < y)"
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1513	by auto
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1514
15085 5693a977a767 removed some [iff] declarations from RealDef.thy, concerning inequalities paulson parents: 15077 diff changeset	1515	lemma real_add_le_0_iff: "(x+y \<le> (0::real)) = (y \<le> -x)"
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1516	by auto
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1517
15085 5693a977a767 removed some [iff] declarations from RealDef.thy, concerning inequalities paulson parents: 15077 diff changeset	1518	lemma real_0_le_add_iff: "((0::real) \<le> x+y) = (-x \<le> y)"
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1519	by auto
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1520
36839 34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1521	subsection {* Lemmas about powers *}
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1522
36839 34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1523	text {* FIXME: declare this in Rings.thy or not at all *}
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1524	declare abs_mult_self [simp]
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1525
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1526	(* used by Import/HOL/real.imp *)
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1527	lemma two_realpow_ge_one: "(1::real) \<le> 2 ^ n"
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1528	by simp
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1529
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1530	lemma two_realpow_gt [simp]: "real (n::nat) < 2 ^ n"
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1531	apply (induct "n")
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1532	apply (auto simp add: real_of_nat_Suc)
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1533	apply (subst mult_2)
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1534	apply (erule add_less_le_mono)
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1535	apply (rule two_realpow_ge_one)
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1536	done
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1537
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1538	text {* TODO: no longer real-specific; rename and move elsewhere *}
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1539	lemma realpow_Suc_le_self:
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1540	fixes r :: "'a::linordered_semidom"
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1541	shows "[\| 0 \<le> r; r \<le> 1 \|] ==> r ^ Suc n \<le> r"
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1542	by (insert power_decreasing [of 1 "Suc n" r], simp)
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1543
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1544	text {* TODO: no longer real-specific; rename and move elsewhere *}
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1545	lemma realpow_minus_mult:
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1546	fixes x :: "'a::monoid_mult"
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1547	shows "0 < n \<Longrightarrow> x ^ (n - 1) * x = x ^ n"
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1548	by (simp add: power_commutes split add: nat_diff_split)
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1549
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1550	text {* FIXME: declare this [simp] for all types, or not at all *}
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1551	lemma real_two_squares_add_zero_iff [simp]:
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1552	"(x * x + y * y = 0) = ((x::real) = 0 \<and> y = 0)"
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1553	by (rule sum_squares_eq_zero_iff)
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1554
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1555	text {* FIXME: declare this [simp] for all types, or not at all *}
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1556	lemma realpow_two_sum_zero_iff [simp]:
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1557	"(x ^ 2 + y ^ 2 = (0::real)) = (x = 0 & y = 0)"
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1558	by (rule sum_power2_eq_zero_iff)
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1559
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1560	lemma real_minus_mult_self_le [simp]: "-(u * u) \<le> (x * (x::real))"
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1561	by (rule_tac y = 0 in order_trans, auto)
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1562
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1563	lemma realpow_square_minus_le [simp]: "-(u ^ 2) \<le> (x::real) ^ 2"
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1564	by (auto simp add: power2_eq_square)
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1565
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1566
34dc65df7014 no more RealPow.thy (remaining lemmas moved to RealDef.thy) huffman parents: 36796 diff changeset	1567	subsection{Density of the Reals}
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1568
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1569	lemma real_lbound_gt_zero:
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1570	"[\| (0::real) < d1; 0 < d2 \|] ==> \<exists>e. 0 < e & e < d1 & e < d2"
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1571	apply (rule_tac x = " (min d1 d2) /2" in exI)
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1572	apply (simp add: min_def)
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1573	done
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1574
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1575
35050 9f841f20dca6 renamed OrderedGroup to Groups; split theory Ring_and_Field into Rings Fields haftmann parents: 35032 diff changeset	1576	text{Similar results are proved in @{text Fields}}
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1577	lemma real_less_half_sum: "x < y ==> x < (x+y) / (2::real)"
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1578	by auto
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1579
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1580	lemma real_gt_half_sum: "x < y ==> (x+y)/(2::real) < y"
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1581	by auto
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1582
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1583
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1584	subsection{Absolute Value Function for the Reals}
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1585
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1586	lemma abs_minus_add_cancel: "abs(x + (-y)) = abs (y + (-(x::real)))"
15003 6145dd7538d7 replaced monomorphic abs definitions by abs_if paulson parents: 14754 diff changeset	1587	by (simp add: abs_if)
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1588
23289 0cf371d943b1 remove redundant lemmas huffman parents: 23288 diff changeset	1589	(* FIXME: redundant, but used by Integration/RealRandVar.thy in AFP *)
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1590	lemma abs_le_interval_iff: "(abs x \<le> r) = (-r\<le>x & x\<le>(r::real))"
35050 9f841f20dca6 renamed OrderedGroup to Groups; split theory Ring_and_Field into Rings Fields haftmann parents: 35032 diff changeset	1591	by (force simp add: abs_le_iff)
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1592
44344 49be3e7d4762 remove some over-specific rules from the simpset huffman parents: 44278 diff changeset	1593	lemma abs_add_one_gt_zero: "(0::real) < 1 + abs(x)"
15003 6145dd7538d7 replaced monomorphic abs definitions by abs_if paulson parents: 14754 diff changeset	1594	by (simp add: abs_if)
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1595
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1596	lemma abs_real_of_nat_cancel [simp]: "abs (real x) = real (x::nat)"
22958 b3a5569a81e5 cleaned up huffman parents: 22456 diff changeset	1597	by (rule abs_of_nonneg [OF real_of_nat_ge_zero])
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1598
44344 49be3e7d4762 remove some over-specific rules from the simpset huffman parents: 44278 diff changeset	1599	lemma abs_add_one_not_less_self: "~ abs(x) + (1::real) < x"
20217 25b068a99d2b linear arithmetic splits certain operators (e.g. min, max, abs) webertj parents: 19765 diff changeset	1600	by simp
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1601
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1602	lemma abs_sum_triangle_ineq: "abs ((x::real) + y + (-l + -m)) \<le> abs(x + -l) + abs(y + -m)"
20217 25b068a99d2b linear arithmetic splits certain operators (e.g. min, max, abs) webertj parents: 19765 diff changeset	1603	by simp
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	1604
24534 09b9a47904b7 New code generator setup (taken from Library/Executable_Real.thy, berghofe parents: 24506 diff changeset	1605
27544 5b293a8cf476 improved code generator setup haftmann parents: 27106 diff changeset	1606	subsection {* Implementation of rational real numbers *}
24534 09b9a47904b7 New code generator setup (taken from Library/Executable_Real.thy, berghofe parents: 24506 diff changeset	1607
27544 5b293a8cf476 improved code generator setup haftmann parents: 27106 diff changeset	1608	definition Ratreal :: "rat \<Rightarrow> real" where
5b293a8cf476 improved code generator setup haftmann parents: 27106 diff changeset	1609	[simp]: "Ratreal = of_rat"
24534 09b9a47904b7 New code generator setup (taken from Library/Executable_Real.thy, berghofe parents: 24506 diff changeset	1610
24623 7b2bc73405b8 renamed constructor RealC to Ratreal haftmann parents: 24534 diff changeset	1611	code_datatype Ratreal
24534 09b9a47904b7 New code generator setup (taken from Library/Executable_Real.thy, berghofe parents: 24506 diff changeset	1612
31998 2c7a24f74db9 code attributes use common underscore convention haftmann parents: 31952 diff changeset	1613	lemma Ratreal_number_collapse [code_post]:
27544 5b293a8cf476 improved code generator setup haftmann parents: 27106 diff changeset	1614	"Ratreal 0 = 0"
5b293a8cf476 improved code generator setup haftmann parents: 27106 diff changeset	1615	"Ratreal 1 = 1"
5b293a8cf476 improved code generator setup haftmann parents: 27106 diff changeset	1616	"Ratreal (number_of k) = number_of k"
5b293a8cf476 improved code generator setup haftmann parents: 27106 diff changeset	1617	by simp_all
24534 09b9a47904b7 New code generator setup (taken from Library/Executable_Real.thy, berghofe parents: 24506 diff changeset	1618
31998 2c7a24f74db9 code attributes use common underscore convention haftmann parents: 31952 diff changeset	1619	lemma zero_real_code [code, code_unfold]:
27544 5b293a8cf476 improved code generator setup haftmann parents: 27106 diff changeset	1620	"0 = Ratreal 0"
5b293a8cf476 improved code generator setup haftmann parents: 27106 diff changeset	1621	by simp
24534 09b9a47904b7 New code generator setup (taken from Library/Executable_Real.thy, berghofe parents: 24506 diff changeset	1622
31998 2c7a24f74db9 code attributes use common underscore convention haftmann parents: 31952 diff changeset	1623	lemma one_real_code [code, code_unfold]:
27544 5b293a8cf476 improved code generator setup haftmann parents: 27106 diff changeset	1624	"1 = Ratreal 1"
5b293a8cf476 improved code generator setup haftmann parents: 27106 diff changeset	1625	by simp
5b293a8cf476 improved code generator setup haftmann parents: 27106 diff changeset	1626
31998 2c7a24f74db9 code attributes use common underscore convention haftmann parents: 31952 diff changeset	1627	lemma number_of_real_code [code_unfold]:
27544 5b293a8cf476 improved code generator setup haftmann parents: 27106 diff changeset	1628	"number_of k = Ratreal (number_of k)"
5b293a8cf476 improved code generator setup haftmann parents: 27106 diff changeset	1629	by simp
5b293a8cf476 improved code generator setup haftmann parents: 27106 diff changeset	1630
31998 2c7a24f74db9 code attributes use common underscore convention haftmann parents: 31952 diff changeset	1631	lemma Ratreal_number_of_quotient [code_post]:
27544 5b293a8cf476 improved code generator setup haftmann parents: 27106 diff changeset	1632	"Ratreal (number_of r) / Ratreal (number_of s) = number_of r / number_of s"
5b293a8cf476 improved code generator setup haftmann parents: 27106 diff changeset	1633	by simp
5b293a8cf476 improved code generator setup haftmann parents: 27106 diff changeset	1634
31998 2c7a24f74db9 code attributes use common underscore convention haftmann parents: 31952 diff changeset	1635	lemma Ratreal_number_of_quotient2 [code_post]:
27544 5b293a8cf476 improved code generator setup haftmann parents: 27106 diff changeset	1636	"Ratreal (number_of r / number_of s) = number_of r / number_of s"
5b293a8cf476 improved code generator setup haftmann parents: 27106 diff changeset	1637	unfolding Ratreal_number_of_quotient [symmetric] Ratreal_def of_rat_divide ..
24534 09b9a47904b7 New code generator setup (taken from Library/Executable_Real.thy, berghofe parents: 24506 diff changeset	1638
38857 97775f3e8722 renamed class/constant eq to equal; tuned some instantiations haftmann parents: 38287 diff changeset	1639	instantiation real :: equal
26513 6f306c8c2c54 explicit class "eq" for operational equality haftmann parents: 25965 diff changeset	1640	begin
6f306c8c2c54 explicit class "eq" for operational equality haftmann parents: 25965 diff changeset	1641
38857 97775f3e8722 renamed class/constant eq to equal; tuned some instantiations haftmann parents: 38287 diff changeset	1642	definition "HOL.equal (x\<Colon>real) y \<longleftrightarrow> x - y = 0"
26513 6f306c8c2c54 explicit class "eq" for operational equality haftmann parents: 25965 diff changeset	1643
38857 97775f3e8722 renamed class/constant eq to equal; tuned some instantiations haftmann parents: 38287 diff changeset	1644	instance proof
97775f3e8722 renamed class/constant eq to equal; tuned some instantiations haftmann parents: 38287 diff changeset	1645	qed (simp add: equal_real_def)
24534 09b9a47904b7 New code generator setup (taken from Library/Executable_Real.thy, berghofe parents: 24506 diff changeset	1646
38857 97775f3e8722 renamed class/constant eq to equal; tuned some instantiations haftmann parents: 38287 diff changeset	1647	lemma real_equal_code [code]:
97775f3e8722 renamed class/constant eq to equal; tuned some instantiations haftmann parents: 38287 diff changeset	1648	"HOL.equal (Ratreal x) (Ratreal y) \<longleftrightarrow> HOL.equal x y"
97775f3e8722 renamed class/constant eq to equal; tuned some instantiations haftmann parents: 38287 diff changeset	1649	by (simp add: equal_real_def equal)
26513 6f306c8c2c54 explicit class "eq" for operational equality haftmann parents: 25965 diff changeset	1650
38857 97775f3e8722 renamed class/constant eq to equal; tuned some instantiations haftmann parents: 38287 diff changeset	1651	lemma [code nbe]:
97775f3e8722 renamed class/constant eq to equal; tuned some instantiations haftmann parents: 38287 diff changeset	1652	"HOL.equal (x::real) x \<longleftrightarrow> True"
97775f3e8722 renamed class/constant eq to equal; tuned some instantiations haftmann parents: 38287 diff changeset	1653	by (rule equal_refl)
28351 abfc66969d1f non left-linear equations for nbe haftmann parents: 28091 diff changeset	1654
26513 6f306c8c2c54 explicit class "eq" for operational equality haftmann parents: 25965 diff changeset	1655	end
24534 09b9a47904b7 New code generator setup (taken from Library/Executable_Real.thy, berghofe parents: 24506 diff changeset	1656
27544 5b293a8cf476 improved code generator setup haftmann parents: 27106 diff changeset	1657	lemma real_less_eq_code [code]: "Ratreal x \<le> Ratreal y \<longleftrightarrow> x \<le> y"
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27544 diff changeset	1658	by (simp add: of_rat_less_eq)
24534 09b9a47904b7 New code generator setup (taken from Library/Executable_Real.thy, berghofe parents: 24506 diff changeset	1659
27544 5b293a8cf476 improved code generator setup haftmann parents: 27106 diff changeset	1660	lemma real_less_code [code]: "Ratreal x < Ratreal y \<longleftrightarrow> x < y"
27652 818666de6c24 refined code generator setup for rational numbers; more simplification rules for rational numbers haftmann parents: 27544 diff changeset	1661	by (simp add: of_rat_less)
24534 09b9a47904b7 New code generator setup (taken from Library/Executable_Real.thy, berghofe parents: 24506 diff changeset	1662
27544 5b293a8cf476 improved code generator setup haftmann parents: 27106 diff changeset	1663	lemma real_plus_code [code]: "Ratreal x + Ratreal y = Ratreal (x + y)"
5b293a8cf476 improved code generator setup haftmann parents: 27106 diff changeset	1664	by (simp add: of_rat_add)
24534 09b9a47904b7 New code generator setup (taken from Library/Executable_Real.thy, berghofe parents: 24506 diff changeset	1665
27544 5b293a8cf476 improved code generator setup haftmann parents: 27106 diff changeset	1666	lemma real_times_code [code]: "Ratreal x * Ratreal y = Ratreal (x * y)"
5b293a8cf476 improved code generator setup haftmann parents: 27106 diff changeset	1667	by (simp add: of_rat_mult)
5b293a8cf476 improved code generator setup haftmann parents: 27106 diff changeset	1668
5b293a8cf476 improved code generator setup haftmann parents: 27106 diff changeset	1669	lemma real_uminus_code [code]: "- Ratreal x = Ratreal (- x)"
5b293a8cf476 improved code generator setup haftmann parents: 27106 diff changeset	1670	by (simp add: of_rat_minus)
24534 09b9a47904b7 New code generator setup (taken from Library/Executable_Real.thy, berghofe parents: 24506 diff changeset	1671
27544 5b293a8cf476 improved code generator setup haftmann parents: 27106 diff changeset	1672	lemma real_minus_code [code]: "Ratreal x - Ratreal y = Ratreal (x - y)"
5b293a8cf476 improved code generator setup haftmann parents: 27106 diff changeset	1673	by (simp add: of_rat_diff)
24534 09b9a47904b7 New code generator setup (taken from Library/Executable_Real.thy, berghofe parents: 24506 diff changeset	1674
27544 5b293a8cf476 improved code generator setup haftmann parents: 27106 diff changeset	1675	lemma real_inverse_code [code]: "inverse (Ratreal x) = Ratreal (inverse x)"
5b293a8cf476 improved code generator setup haftmann parents: 27106 diff changeset	1676	by (simp add: of_rat_inverse)
5b293a8cf476 improved code generator setup haftmann parents: 27106 diff changeset	1677
5b293a8cf476 improved code generator setup haftmann parents: 27106 diff changeset	1678	lemma real_divide_code [code]: "Ratreal x / Ratreal y = Ratreal (x / y)"
5b293a8cf476 improved code generator setup haftmann parents: 27106 diff changeset	1679	by (simp add: of_rat_divide)
24534 09b9a47904b7 New code generator setup (taken from Library/Executable_Real.thy, berghofe parents: 24506 diff changeset	1680
43733 a6ca7b83612f adding code equations to execute floor and ceiling on rational and real numbers bulwahn parents: 43732 diff changeset	1681	lemma real_floor_code [code]: "floor (Ratreal x) = floor x"
a6ca7b83612f adding code equations to execute floor and ceiling on rational and real numbers bulwahn parents: 43732 diff changeset	1682	by (metis Ratreal_def floor_le_iff floor_unique le_floor_iff of_int_floor_le of_rat_of_int_eq real_less_eq_code)
a6ca7b83612f adding code equations to execute floor and ceiling on rational and real numbers bulwahn parents: 43732 diff changeset	1683
31203 5c8fb4fd67e0 moved Code_Index, Random and Quickcheck before Main haftmann parents: 31100 diff changeset	1684	definition (in term_syntax)
32657 5f13912245ff Code_Eval(uation) haftmann parents: 32069 diff changeset	1685	valterm_ratreal :: "rat \<times> (unit \<Rightarrow> Code_Evaluation.term) \<Rightarrow> real \<times> (unit \<Rightarrow> Code_Evaluation.term)" where
5f13912245ff Code_Eval(uation) haftmann parents: 32069 diff changeset	1686	[code_unfold]: "valterm_ratreal k = Code_Evaluation.valtermify Ratreal {\<cdot>} k"
31203 5c8fb4fd67e0 moved Code_Index, Random and Quickcheck before Main haftmann parents: 31100 diff changeset	1687
37751 89e16802b6cc nicer xsymbol syntax for fcomp and scomp haftmann parents: 37397 diff changeset	1688	notation fcomp (infixl "\<circ>>" 60)
89e16802b6cc nicer xsymbol syntax for fcomp and scomp haftmann parents: 37397 diff changeset	1689	notation scomp (infixl "\<circ>\<rightarrow>" 60)
31203 5c8fb4fd67e0 moved Code_Index, Random and Quickcheck before Main haftmann parents: 31100 diff changeset	1690
5c8fb4fd67e0 moved Code_Index, Random and Quickcheck before Main haftmann parents: 31100 diff changeset	1691	instantiation real :: random
5c8fb4fd67e0 moved Code_Index, Random and Quickcheck before Main haftmann parents: 31100 diff changeset	1692	begin
5c8fb4fd67e0 moved Code_Index, Random and Quickcheck before Main haftmann parents: 31100 diff changeset	1693
5c8fb4fd67e0 moved Code_Index, Random and Quickcheck before Main haftmann parents: 31100 diff changeset	1694	definition
37751 89e16802b6cc nicer xsymbol syntax for fcomp and scomp haftmann parents: 37397 diff changeset	1695	"Quickcheck.random i = Quickcheck.random i \<circ>\<rightarrow> (\<lambda>r. Pair (valterm_ratreal r))"
31203 5c8fb4fd67e0 moved Code_Index, Random and Quickcheck before Main haftmann parents: 31100 diff changeset	1696
5c8fb4fd67e0 moved Code_Index, Random and Quickcheck before Main haftmann parents: 31100 diff changeset	1697	instance ..
5c8fb4fd67e0 moved Code_Index, Random and Quickcheck before Main haftmann parents: 31100 diff changeset	1698
5c8fb4fd67e0 moved Code_Index, Random and Quickcheck before Main haftmann parents: 31100 diff changeset	1699	end
5c8fb4fd67e0 moved Code_Index, Random and Quickcheck before Main haftmann parents: 31100 diff changeset	1700
37751 89e16802b6cc nicer xsymbol syntax for fcomp and scomp haftmann parents: 37397 diff changeset	1701	no_notation fcomp (infixl "\<circ>>" 60)
89e16802b6cc nicer xsymbol syntax for fcomp and scomp haftmann parents: 37397 diff changeset	1702	no_notation scomp (infixl "\<circ>\<rightarrow>" 60)
31203 5c8fb4fd67e0 moved Code_Index, Random and Quickcheck before Main haftmann parents: 31100 diff changeset	1703
41920 d4fb7a418152 moving exhaustive_generators.ML to Quickcheck directory bulwahn parents: 41792 diff changeset	1704	instantiation real :: exhaustive
41231 2e901158675e adding exhaustive tester instances for numeric types: code_numeral, nat, rat and real bulwahn parents: 41024 diff changeset	1705	begin
2e901158675e adding exhaustive tester instances for numeric types: code_numeral, nat, rat and real bulwahn parents: 41024 diff changeset	1706
2e901158675e adding exhaustive tester instances for numeric types: code_numeral, nat, rat and real bulwahn parents: 41024 diff changeset	1707	definition
45818 53a697f5454a hiding constants and facts in the Quickcheck_Exhaustive and Quickcheck_Narrowing theory; bulwahn parents: 45184 diff changeset	1708	"exhaustive_real f d = Quickcheck_Exhaustive.exhaustive (%r. f (Ratreal r)) d"
42311 eb32a8474a57 rational and real instances for new compilation scheme for exhaustive quickcheck bulwahn parents: 42112 diff changeset	1709
eb32a8474a57 rational and real instances for new compilation scheme for exhaustive quickcheck bulwahn parents: 42112 diff changeset	1710	instance ..
eb32a8474a57 rational and real instances for new compilation scheme for exhaustive quickcheck bulwahn parents: 42112 diff changeset	1711
eb32a8474a57 rational and real instances for new compilation scheme for exhaustive quickcheck bulwahn parents: 42112 diff changeset	1712	end
eb32a8474a57 rational and real instances for new compilation scheme for exhaustive quickcheck bulwahn parents: 42112 diff changeset	1713
eb32a8474a57 rational and real instances for new compilation scheme for exhaustive quickcheck bulwahn parents: 42112 diff changeset	1714	instantiation real :: full_exhaustive
eb32a8474a57 rational and real instances for new compilation scheme for exhaustive quickcheck bulwahn parents: 42112 diff changeset	1715	begin
eb32a8474a57 rational and real instances for new compilation scheme for exhaustive quickcheck bulwahn parents: 42112 diff changeset	1716
eb32a8474a57 rational and real instances for new compilation scheme for exhaustive quickcheck bulwahn parents: 42112 diff changeset	1717	definition
45818 53a697f5454a hiding constants and facts in the Quickcheck_Exhaustive and Quickcheck_Narrowing theory; bulwahn parents: 45184 diff changeset	1718	"full_exhaustive_real f d = Quickcheck_Exhaustive.full_exhaustive (%r. f (valterm_ratreal r)) d"
41231 2e901158675e adding exhaustive tester instances for numeric types: code_numeral, nat, rat and real bulwahn parents: 41024 diff changeset	1719
2e901158675e adding exhaustive tester instances for numeric types: code_numeral, nat, rat and real bulwahn parents: 41024 diff changeset	1720	instance ..
2e901158675e adding exhaustive tester instances for numeric types: code_numeral, nat, rat and real bulwahn parents: 41024 diff changeset	1721
2e901158675e adding exhaustive tester instances for numeric types: code_numeral, nat, rat and real bulwahn parents: 41024 diff changeset	1722	end
2e901158675e adding exhaustive tester instances for numeric types: code_numeral, nat, rat and real bulwahn parents: 41024 diff changeset	1723
43887 442aceb54969 adding narrowing instances for real and rational bulwahn parents: 43733 diff changeset	1724	instantiation real :: narrowing
442aceb54969 adding narrowing instances for real and rational bulwahn parents: 43733 diff changeset	1725	begin
442aceb54969 adding narrowing instances for real and rational bulwahn parents: 43733 diff changeset	1726
442aceb54969 adding narrowing instances for real and rational bulwahn parents: 43733 diff changeset	1727	definition
442aceb54969 adding narrowing instances for real and rational bulwahn parents: 43733 diff changeset	1728	"narrowing = Quickcheck_Narrowing.apply (Quickcheck_Narrowing.cons Ratreal) narrowing"
442aceb54969 adding narrowing instances for real and rational bulwahn parents: 43733 diff changeset	1729
442aceb54969 adding narrowing instances for real and rational bulwahn parents: 43733 diff changeset	1730	instance ..
442aceb54969 adding narrowing instances for real and rational bulwahn parents: 43733 diff changeset	1731
442aceb54969 adding narrowing instances for real and rational bulwahn parents: 43733 diff changeset	1732	end
442aceb54969 adding narrowing instances for real and rational bulwahn parents: 43733 diff changeset	1733
442aceb54969 adding narrowing instances for real and rational bulwahn parents: 43733 diff changeset	1734
45184 426dbd896c9e removing old code generator setup for real numbers; tuned bulwahn parents: 45051 diff changeset	1735	subsection {* Setup for Nitpick *}
24534 09b9a47904b7 New code generator setup (taken from Library/Executable_Real.thy, berghofe parents: 24506 diff changeset	1736
38287 796302ca3611 replace "setup" with "declaration" blanchet parents: 38242 diff changeset	1737	declaration {*
796302ca3611 replace "setup" with "declaration" blanchet parents: 38242 diff changeset	1738	Nitpick_HOL.register_frac_type @{type_name real}
33209 d36ca3960e33 tuned white space; wenzelm parents: 33197 diff changeset	1739	[(@{const_name zero_real_inst.zero_real}, @{const_name Nitpick.zero_frac}),
d36ca3960e33 tuned white space; wenzelm parents: 33197 diff changeset	1740	(@{const_name one_real_inst.one_real}, @{const_name Nitpick.one_frac}),
d36ca3960e33 tuned white space; wenzelm parents: 33197 diff changeset	1741	(@{const_name plus_real_inst.plus_real}, @{const_name Nitpick.plus_frac}),
d36ca3960e33 tuned white space; wenzelm parents: 33197 diff changeset	1742	(@{const_name times_real_inst.times_real}, @{const_name Nitpick.times_frac}),
d36ca3960e33 tuned white space; wenzelm parents: 33197 diff changeset	1743	(@{const_name uminus_real_inst.uminus_real}, @{const_name Nitpick.uminus_frac}),
d36ca3960e33 tuned white space; wenzelm parents: 33197 diff changeset	1744	(@{const_name number_real_inst.number_of_real}, @{const_name Nitpick.number_of_frac}),
d36ca3960e33 tuned white space; wenzelm parents: 33197 diff changeset	1745	(@{const_name inverse_real_inst.inverse_real}, @{const_name Nitpick.inverse_frac}),
45859 36ff12b5663b fixed Nitpick definition of "<" on "real"s blanchet parents: 45818 diff changeset	1746	(@{const_name ord_real_inst.less_real}, @{const_name Nitpick.less_frac}),
33209 d36ca3960e33 tuned white space; wenzelm parents: 33197 diff changeset	1747	(@{const_name ord_real_inst.less_eq_real}, @{const_name Nitpick.less_eq_frac})]
33197 de6285ebcc05 continuation of Nitpick's integration into Isabelle; blanchet parents: 32657 diff changeset	1748	*}
de6285ebcc05 continuation of Nitpick's integration into Isabelle; blanchet parents: 32657 diff changeset	1749
41792 ff3cb0c418b7 renamed "nitpick\_def" to "nitpick_unfold" to reflect its new semantics blanchet parents: 41550 diff changeset	1750	lemmas [nitpick_unfold] = inverse_real_inst.inverse_real
33197 de6285ebcc05 continuation of Nitpick's integration into Isabelle; blanchet parents: 32657 diff changeset	1751	number_real_inst.number_of_real one_real_inst.one_real
37397 18000f9d783e adjust Nitpick's handling of "<" on "rat"s and "reals" blanchet parents: 36977 diff changeset	1752	ord_real_inst.less_real ord_real_inst.less_eq_real plus_real_inst.plus_real
33197 de6285ebcc05 continuation of Nitpick's integration into Isabelle; blanchet parents: 32657 diff changeset	1753	times_real_inst.times_real uminus_real_inst.uminus_real
de6285ebcc05 continuation of Nitpick's integration into Isabelle; blanchet parents: 32657 diff changeset	1754	zero_real_inst.zero_real
de6285ebcc05 continuation of Nitpick's integration into Isabelle; blanchet parents: 32657 diff changeset	1755
5588 a3ab526bb891 Revised version with Abelian group simprocs paulson parents: diff changeset	1756	end

author	paulson
	Fri, 16 Mar 2012 16:29:28 +0000
changeset 46963	67da5904300a
parent 46670	e9aa6d151329
child 47108	2a1953f0d20d
permissions	-rw-r--r--