isabelle: src/HOL/ex/Dedekind_Real.thy@fdc301f592c4 (annotated)

36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1	(* Title: HOL/ex/Dedekind_Real.thy
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2	Author: Jacques D. Fleuriot, University of Cambridge
36794 f736a853864f add more credits to ex/Dedekind_Real.thy huffman parents: 36793 diff changeset	3	Conversion to Isar and new proofs by Lawrence C Paulson, 2003/4
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	4
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	5	The positive reals as Dedekind sections of positive
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	6	rationals. Fundamentals of Abstract Analysis [Gleason- p. 121]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	7	provides some of the definitions.
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	8	*)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	9
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	10	theory Dedekind_Real
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	11	imports Rat Lubs
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	12	begin
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	13
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	14	section {* Positive real numbers *}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	15
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	16	text{Could be generalized and moved to @{text Groups}}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	17	lemma add_eq_exists: "\<exists>x. a+x = (b::rat)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	18	by (rule_tac x="b-a" in exI, simp)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	19
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	20	definition
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	21	cut :: "rat set => bool" where
37765 26bdfb7b680b dropped superfluous [code del]s haftmann parents: 37388 diff changeset	22	"cut A = ({} \<subset> A &
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	23	A < {r. 0 < r} &
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	24	(\<forall>y \<in> A. ((\<forall>z. 0<z & z < y --> z \<in> A) & (\<exists>u \<in> A. y < u))))"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	25
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	26	lemma interval_empty_iff:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	27	"{y. (x::'a::dense_linorder) < y \<and> y < z} = {} \<longleftrightarrow> \<not> x < z"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	28	by (auto dest: dense)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	29
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	30
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	31	lemma cut_of_rat:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	32	assumes q: "0 < q" shows "cut {r::rat. 0 < r & r < q}" (is "cut ?A")
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	33	proof -
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	34	from q have pos: "?A < {r. 0 < r}" by force
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	35	have nonempty: "{} \<subset> ?A"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	36	proof
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	37	show "{} \<subseteq> ?A" by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	38	show "{} \<noteq> ?A"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	39	by (force simp only: q eq_commute [of "{}"] interval_empty_iff)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	40	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	41	show ?thesis
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	42	by (simp add: cut_def pos nonempty,
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	43	blast dest: dense intro: order_less_trans)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	44	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	45
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	46
45694 4a8743618257 prefer typedef without extra definition and alternative name; wenzelm parents: 41541 diff changeset	47	definition "preal = {A. cut A}"
4a8743618257 prefer typedef without extra definition and alternative name; wenzelm parents: 41541 diff changeset	48
4a8743618257 prefer typedef without extra definition and alternative name; wenzelm parents: 41541 diff changeset	49	typedef (open) preal = preal
4a8743618257 prefer typedef without extra definition and alternative name; wenzelm parents: 41541 diff changeset	50	unfolding preal_def by (blast intro: cut_of_rat [OF zero_less_one])
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	51
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	52	definition
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	53	psup :: "preal set => preal" where
37765 26bdfb7b680b dropped superfluous [code del]s haftmann parents: 37388 diff changeset	54	"psup P = Abs_preal (\<Union>X \<in> P. Rep_preal X)"
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	55
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	56	definition
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	57	add_set :: "[rat set,rat set] => rat set" where
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	58	"add_set A B = {w. \<exists>x \<in> A. \<exists>y \<in> B. w = x + y}"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	59
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	60	definition
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	61	diff_set :: "[rat set,rat set] => rat set" where
37765 26bdfb7b680b dropped superfluous [code del]s haftmann parents: 37388 diff changeset	62	"diff_set A B = {w. \<exists>x. 0 < w & 0 < x & x \<notin> B & x + w \<in> A}"
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	63
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	64	definition
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	65	mult_set :: "[rat set,rat set] => rat set" where
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	66	"mult_set A B = {w. \<exists>x \<in> A. \<exists>y \<in> B. w = x * y}"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	67
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	68	definition
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	69	inverse_set :: "rat set => rat set" where
37765 26bdfb7b680b dropped superfluous [code del]s haftmann parents: 37388 diff changeset	70	"inverse_set A = {x. \<exists>y. 0 < x & x < y & inverse y \<notin> A}"
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	71
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	72	instantiation preal :: "{ord, plus, minus, times, inverse, one}"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	73	begin
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	74
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	75	definition
37765 26bdfb7b680b dropped superfluous [code del]s haftmann parents: 37388 diff changeset	76	preal_less_def:
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	77	"R < S == Rep_preal R < Rep_preal S"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	78
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	79	definition
37765 26bdfb7b680b dropped superfluous [code del]s haftmann parents: 37388 diff changeset	80	preal_le_def:
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	81	"R \<le> S == Rep_preal R \<subseteq> Rep_preal S"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	82
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	83	definition
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	84	preal_add_def:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	85	"R + S == Abs_preal (add_set (Rep_preal R) (Rep_preal S))"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	86
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	87	definition
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	88	preal_diff_def:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	89	"R - S == Abs_preal (diff_set (Rep_preal R) (Rep_preal S))"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	90
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	91	definition
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	92	preal_mult_def:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	93	"R * S == Abs_preal (mult_set (Rep_preal R) (Rep_preal S))"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	94
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	95	definition
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	96	preal_inverse_def:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	97	"inverse R == Abs_preal (inverse_set (Rep_preal R))"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	98
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	99	definition "R / S = R * inverse (S\<Colon>preal)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	100
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	101	definition
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	102	preal_one_def:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	103	"1 == Abs_preal {x. 0 < x & x < 1}"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	104
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	105	instance ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	106
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	107	end
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	108
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	109
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	110	text{Reduces equality on abstractions to equality on representatives}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	111	declare Abs_preal_inject [simp]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	112	declare Abs_preal_inverse [simp]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	113
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	114	lemma rat_mem_preal: "0 < q ==> {r::rat. 0 < r & r < q} \<in> preal"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	115	by (simp add: preal_def cut_of_rat)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	116
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	117	lemma preal_nonempty: "A \<in> preal ==> \<exists>x\<in>A. 0 < x"
46905 6b1c0a80a57a prefer abs_def over def_raw; wenzelm parents: 45694 diff changeset	118	unfolding preal_def cut_def [abs_def] by blast
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	119
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	120	lemma preal_Ex_mem: "A \<in> preal \<Longrightarrow> \<exists>x. x \<in> A"
45694 4a8743618257 prefer typedef without extra definition and alternative name; wenzelm parents: 41541 diff changeset	121	apply (drule preal_nonempty)
4a8743618257 prefer typedef without extra definition and alternative name; wenzelm parents: 41541 diff changeset	122	apply fast
4a8743618257 prefer typedef without extra definition and alternative name; wenzelm parents: 41541 diff changeset	123	done
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	124
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	125	lemma preal_imp_psubset_positives: "A \<in> preal ==> A < {r. 0 < r}"
45694 4a8743618257 prefer typedef without extra definition and alternative name; wenzelm parents: 41541 diff changeset	126	by (force simp add: preal_def cut_def)
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	127
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	128	lemma preal_exists_bound: "A \<in> preal ==> \<exists>x. 0 < x & x \<notin> A"
45694 4a8743618257 prefer typedef without extra definition and alternative name; wenzelm parents: 41541 diff changeset	129	apply (drule preal_imp_psubset_positives)
4a8743618257 prefer typedef without extra definition and alternative name; wenzelm parents: 41541 diff changeset	130	apply auto
4a8743618257 prefer typedef without extra definition and alternative name; wenzelm parents: 41541 diff changeset	131	done
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	132
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	133	lemma preal_exists_greater: "[\| A \<in> preal; y \<in> A \|] ==> \<exists>u \<in> A. y < u"
46905 6b1c0a80a57a prefer abs_def over def_raw; wenzelm parents: 45694 diff changeset	134	unfolding preal_def cut_def [abs_def] by blast
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	135
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	136	lemma preal_downwards_closed: "[\| A \<in> preal; y \<in> A; 0 < z; z < y \|] ==> z \<in> A"
46905 6b1c0a80a57a prefer abs_def over def_raw; wenzelm parents: 45694 diff changeset	137	unfolding preal_def cut_def [abs_def] by blast
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	138
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	139	text{Relaxing the final premise}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	140	lemma preal_downwards_closed':
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	141	"[\| A \<in> preal; y \<in> A; 0 < z; z \<le> y \|] ==> z \<in> A"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	142	apply (simp add: order_le_less)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	143	apply (blast intro: preal_downwards_closed)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	144	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	145
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	146	text{*A positive fraction not in a positive real is an upper bound.
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	147	Gleason p. 122 - Remark (1)*}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	148
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	149	lemma not_in_preal_ub:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	150	assumes A: "A \<in> preal"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	151	and notx: "x \<notin> A"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	152	and y: "y \<in> A"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	153	and pos: "0 < x"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	154	shows "y < x"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	155	proof (cases rule: linorder_cases)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	156	assume "x<y"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	157	with notx show ?thesis
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	158	by (simp add: preal_downwards_closed [OF A y] pos)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	159	next
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	160	assume "x=y"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	161	with notx and y show ?thesis by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	162	next
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	163	assume "y<x"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	164	thus ?thesis .
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	165	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	166
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	167	text {* preal lemmas instantiated to @{term "Rep_preal X"} *}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	168
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	169	lemma mem_Rep_preal_Ex: "\<exists>x. x \<in> Rep_preal X"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	170	by (rule preal_Ex_mem [OF Rep_preal])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	171
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	172	lemma Rep_preal_exists_bound: "\<exists>x>0. x \<notin> Rep_preal X"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	173	by (rule preal_exists_bound [OF Rep_preal])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	174
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	175	lemmas not_in_Rep_preal_ub = not_in_preal_ub [OF Rep_preal]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	176
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	177
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	178	subsection{Properties of Ordering}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	179
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	180	instance preal :: order
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	181	proof
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	182	fix w :: preal
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	183	show "w \<le> w" by (simp add: preal_le_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	184	next
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	185	fix i j k :: preal
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	186	assume "i \<le> j" and "j \<le> k"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	187	then show "i \<le> k" by (simp add: preal_le_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	188	next
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	189	fix z w :: preal
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	190	assume "z \<le> w" and "w \<le> z"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	191	then show "z = w" by (simp add: preal_le_def Rep_preal_inject)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	192	next
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	193	fix z w :: preal
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	194	show "z < w \<longleftrightarrow> z \<le> w \<and> \<not> w \<le> z"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	195	by (auto simp add: preal_le_def preal_less_def Rep_preal_inject)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	196	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	197
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	198	lemma preal_imp_pos: "[\|A \<in> preal; r \<in> A\|] ==> 0 < r"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	199	by (insert preal_imp_psubset_positives, blast)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	200
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	201	instance preal :: linorder
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	202	proof
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	203	fix x y :: preal
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	204	show "x <= y \| y <= x"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	205	apply (auto simp add: preal_le_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	206	apply (rule ccontr)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	207	apply (blast dest: not_in_Rep_preal_ub intro: preal_imp_pos [OF Rep_preal]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	208	elim: order_less_asym)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	209	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	210	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	211
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	212	instantiation preal :: distrib_lattice
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	213	begin
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	214
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	215	definition
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	216	"(inf \<Colon> preal \<Rightarrow> preal \<Rightarrow> preal) = min"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	217
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	218	definition
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	219	"(sup \<Colon> preal \<Rightarrow> preal \<Rightarrow> preal) = max"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	220
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	221	instance
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	222	by intro_classes
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	223	(auto simp add: inf_preal_def sup_preal_def min_max.sup_inf_distrib1)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	224
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	225	end
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	226
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	227	subsection{Properties of Addition}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	228
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	229	lemma preal_add_commute: "(x::preal) + y = y + x"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	230	apply (unfold preal_add_def add_set_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	231	apply (rule_tac f = Abs_preal in arg_cong)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	232	apply (force simp add: add_commute)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	233	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	234
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	235	text{*Lemmas for proving that addition of two positive reals gives
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	236	a positive real*}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	237
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	238	text{Part 1 of Dedekind sections definition}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	239	lemma add_set_not_empty:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	240	"[\|A \<in> preal; B \<in> preal\|] ==> {} \<subset> add_set A B"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	241	apply (drule preal_nonempty)+
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	242	apply (auto simp add: add_set_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	243	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	244
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	245	text{*Part 2 of Dedekind sections definition. A structured version of
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	246	this proof is @{text preal_not_mem_mult_set_Ex} below.*}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	247	lemma preal_not_mem_add_set_Ex:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	248	"[\|A \<in> preal; B \<in> preal\|] ==> \<exists>q>0. q \<notin> add_set A B"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	249	apply (insert preal_exists_bound [of A] preal_exists_bound [of B], auto)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	250	apply (rule_tac x = "x+xa" in exI)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	251	apply (simp add: add_set_def, clarify)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	252	apply (drule (3) not_in_preal_ub)+
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	253	apply (force dest: add_strict_mono)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	254	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	255
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	256	lemma add_set_not_rat_set:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	257	assumes A: "A \<in> preal"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	258	and B: "B \<in> preal"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	259	shows "add_set A B < {r. 0 < r}"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	260	proof
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	261	from preal_imp_pos [OF A] preal_imp_pos [OF B]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	262	show "add_set A B \<subseteq> {r. 0 < r}" by (force simp add: add_set_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	263	next
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	264	show "add_set A B \<noteq> {r. 0 < r}"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	265	by (insert preal_not_mem_add_set_Ex [OF A B], blast)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	266	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	267
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	268	text{Part 3 of Dedekind sections definition}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	269	lemma add_set_lemma3:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	270	"[\|A \<in> preal; B \<in> preal; u \<in> add_set A B; 0 < z; z < u\|]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	271	==> z \<in> add_set A B"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	272	proof (unfold add_set_def, clarify)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	273	fix x::rat and y::rat
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	274	assume A: "A \<in> preal"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	275	and B: "B \<in> preal"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	276	and [simp]: "0 < z"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	277	and zless: "z < x + y"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	278	and x: "x \<in> A"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	279	and y: "y \<in> B"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	280	have xpos [simp]: "0<x" by (rule preal_imp_pos [OF A x])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	281	have ypos [simp]: "0<y" by (rule preal_imp_pos [OF B y])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	282	have xypos [simp]: "0 < x+y" by (simp add: pos_add_strict)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	283	let ?f = "z/(x+y)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	284	have fless: "?f < 1" by (simp add: zless pos_divide_less_eq)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	285	show "\<exists>x' \<in> A. \<exists>y'\<in>B. z = x' + y'"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	286	proof (intro bexI)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	287	show "z = x?f + y?f"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	288	by (simp add: left_distrib [symmetric] divide_inverse mult_ac
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	289	order_less_imp_not_eq2)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	290	next
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	291	show "y * ?f \<in> B"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	292	proof (rule preal_downwards_closed [OF B y])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	293	show "0 < y * ?f"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	294	by (simp add: divide_inverse zero_less_mult_iff)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	295	next
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	296	show "y * ?f < y"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	297	by (insert mult_strict_left_mono [OF fless ypos], simp)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	298	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	299	next
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	300	show "x * ?f \<in> A"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	301	proof (rule preal_downwards_closed [OF A x])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	302	show "0 < x * ?f"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	303	by (simp add: divide_inverse zero_less_mult_iff)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	304	next
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	305	show "x * ?f < x"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	306	by (insert mult_strict_left_mono [OF fless xpos], simp)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	307	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	308	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	309	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	310
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	311	text{Part 4 of Dedekind sections definition}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	312	lemma add_set_lemma4:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	313	"[\|A \<in> preal; B \<in> preal; y \<in> add_set A B\|] ==> \<exists>u \<in> add_set A B. y < u"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	314	apply (auto simp add: add_set_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	315	apply (frule preal_exists_greater [of A], auto)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	316	apply (rule_tac x="u + y" in exI)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	317	apply (auto intro: add_strict_left_mono)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	318	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	319
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	320	lemma mem_add_set:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	321	"[\|A \<in> preal; B \<in> preal\|] ==> add_set A B \<in> preal"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	322	apply (simp (no_asm_simp) add: preal_def cut_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	323	apply (blast intro!: add_set_not_empty add_set_not_rat_set
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	324	add_set_lemma3 add_set_lemma4)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	325	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	326
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	327	lemma preal_add_assoc: "((x::preal) + y) + z = x + (y + z)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	328	apply (simp add: preal_add_def mem_add_set Rep_preal)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	329	apply (force simp add: add_set_def add_ac)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	330	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	331
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	332	instance preal :: ab_semigroup_add
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	333	proof
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	334	fix a b c :: preal
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	335	show "(a + b) + c = a + (b + c)" by (rule preal_add_assoc)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	336	show "a + b = b + a" by (rule preal_add_commute)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	337	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	338
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	339
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	340	subsection{Properties of Multiplication}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	341
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	342	text{Proofs essentially same as for addition}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	343
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	344	lemma preal_mult_commute: "(x::preal) * y = y * x"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	345	apply (unfold preal_mult_def mult_set_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	346	apply (rule_tac f = Abs_preal in arg_cong)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	347	apply (force simp add: mult_commute)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	348	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	349
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	350	text{Multiplication of two positive reals gives a positive real.}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	351
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	352	text{Lemmas for proving positive reals multiplication set in @{typ preal}}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	353
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	354	text{Part 1 of Dedekind sections definition}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	355	lemma mult_set_not_empty:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	356	"[\|A \<in> preal; B \<in> preal\|] ==> {} \<subset> mult_set A B"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	357	apply (insert preal_nonempty [of A] preal_nonempty [of B])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	358	apply (auto simp add: mult_set_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	359	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	360
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	361	text{Part 2 of Dedekind sections definition}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	362	lemma preal_not_mem_mult_set_Ex:
41541 1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	363	assumes A: "A \<in> preal"
1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	364	and B: "B \<in> preal"
1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	365	shows "\<exists>q. 0 < q & q \<notin> mult_set A B"
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	366	proof -
41541 1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	367	from preal_exists_bound [OF A] obtain x where 1 [simp]: "0 < x" "x \<notin> A" by blast
1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	368	from preal_exists_bound [OF B] obtain y where 2 [simp]: "0 < y" "y \<notin> B" by blast
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	369	show ?thesis
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	370	proof (intro exI conjI)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	371	show "0 < x*y" by (simp add: mult_pos_pos)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	372	show "x * y \<notin> mult_set A B"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	373	proof -
41541 1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	374	{
1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	375	fix u::rat and v::rat
1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	376	assume u: "u \<in> A" and v: "v \<in> B" and xy: "xy = uv"
1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	377	moreover from A B 1 2 u v have "u<x" and "v<y" by (blast dest: not_in_preal_ub)+
1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	378	moreover
1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	379	from A B 1 2 u v have "0\<le>v"
1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	380	by (blast intro: preal_imp_pos [OF B] order_less_imp_le)
1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	381	moreover
1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	382	from A B 1 `u < x` `v < y` `0 \<le> v`
1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	383	have "uv < xy" by (blast intro: mult_strict_mono)
1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	384	ultimately have False by force
1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	385	}
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	386	thus ?thesis by (auto simp add: mult_set_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	387	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	388	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	389	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	390
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	391	lemma mult_set_not_rat_set:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	392	assumes A: "A \<in> preal"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	393	and B: "B \<in> preal"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	394	shows "mult_set A B < {r. 0 < r}"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	395	proof
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	396	show "mult_set A B \<subseteq> {r. 0 < r}"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	397	by (force simp add: mult_set_def
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	398	intro: preal_imp_pos [OF A] preal_imp_pos [OF B] mult_pos_pos)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	399	show "mult_set A B \<noteq> {r. 0 < r}"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	400	using preal_not_mem_mult_set_Ex [OF A B] by blast
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	401	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	402
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	403
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	404
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	405	text{Part 3 of Dedekind sections definition}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	406	lemma mult_set_lemma3:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	407	"[\|A \<in> preal; B \<in> preal; u \<in> mult_set A B; 0 < z; z < u\|]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	408	==> z \<in> mult_set A B"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	409	proof (unfold mult_set_def, clarify)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	410	fix x::rat and y::rat
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	411	assume A: "A \<in> preal"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	412	and B: "B \<in> preal"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	413	and [simp]: "0 < z"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	414	and zless: "z < x * y"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	415	and x: "x \<in> A"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	416	and y: "y \<in> B"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	417	have [simp]: "0<y" by (rule preal_imp_pos [OF B y])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	418	show "\<exists>x' \<in> A. \<exists>y' \<in> B. z = x' * y'"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	419	proof
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	420	show "\<exists>y'\<in>B. z = (z/y) * y'"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	421	proof
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	422	show "z = (z/y)*y"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	423	by (simp add: divide_inverse mult_commute [of y] mult_assoc
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	424	order_less_imp_not_eq2)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	425	show "y \<in> B" by fact
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	426	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	427	next
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	428	show "z/y \<in> A"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	429	proof (rule preal_downwards_closed [OF A x])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	430	show "0 < z/y"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	431	by (simp add: zero_less_divide_iff)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	432	show "z/y < x" by (simp add: pos_divide_less_eq zless)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	433	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	434	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	435	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	436
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	437	text{Part 4 of Dedekind sections definition}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	438	lemma mult_set_lemma4:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	439	"[\|A \<in> preal; B \<in> preal; y \<in> mult_set A B\|] ==> \<exists>u \<in> mult_set A B. y < u"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	440	apply (auto simp add: mult_set_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	441	apply (frule preal_exists_greater [of A], auto)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	442	apply (rule_tac x="u * y" in exI)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	443	apply (auto intro: preal_imp_pos [of A] preal_imp_pos [of B]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	444	mult_strict_right_mono)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	445	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	446
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	447
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	448	lemma mem_mult_set:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	449	"[\|A \<in> preal; B \<in> preal\|] ==> mult_set A B \<in> preal"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	450	apply (simp (no_asm_simp) add: preal_def cut_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	451	apply (blast intro!: mult_set_not_empty mult_set_not_rat_set
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	452	mult_set_lemma3 mult_set_lemma4)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	453	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	454
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	455	lemma preal_mult_assoc: "((x::preal) * y) * z = x * (y * z)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	456	apply (simp add: preal_mult_def mem_mult_set Rep_preal)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	457	apply (force simp add: mult_set_def mult_ac)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	458	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	459
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	460	instance preal :: ab_semigroup_mult
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	461	proof
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	462	fix a b c :: preal
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	463	show "(a * b) * c = a * (b * c)" by (rule preal_mult_assoc)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	464	show "a * b = b * a" by (rule preal_mult_commute)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	465	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	466
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	467
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	468	text{* Positive real 1 is the multiplicative identity element *}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	469
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	470	lemma preal_mult_1: "(1::preal) * z = z"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	471	proof (induct z)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	472	fix A :: "rat set"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	473	assume A: "A \<in> preal"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	474	have "{w. \<exists>u. 0 < u \<and> u < 1 & (\<exists>v \<in> A. w = u * v)} = A" (is "?lhs = A")
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	475	proof
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	476	show "?lhs \<subseteq> A"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	477	proof clarify
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	478	fix x::rat and u::rat and v::rat
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	479	assume upos: "0<u" and "u<1" and v: "v \<in> A"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	480	have vpos: "0<v" by (rule preal_imp_pos [OF A v])
41541 1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	481	hence "uv < 1v" by (simp only: mult_strict_right_mono upos `u < 1` v)
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	482	thus "u * v \<in> A"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	483	by (force intro: preal_downwards_closed [OF A v] mult_pos_pos
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	484	upos vpos)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	485	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	486	next
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	487	show "A \<subseteq> ?lhs"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	488	proof clarify
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	489	fix x::rat
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	490	assume x: "x \<in> A"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	491	have xpos: "0<x" by (rule preal_imp_pos [OF A x])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	492	from preal_exists_greater [OF A x]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	493	obtain v where v: "v \<in> A" and xlessv: "x < v" ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	494	have vpos: "0<v" by (rule preal_imp_pos [OF A v])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	495	show "\<exists>u. 0 < u \<and> u < 1 \<and> (\<exists>v\<in>A. x = u * v)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	496	proof (intro exI conjI)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	497	show "0 < x/v"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	498	by (simp add: zero_less_divide_iff xpos vpos)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	499	show "x / v < 1"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	500	by (simp add: pos_divide_less_eq vpos xlessv)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	501	show "\<exists>v'\<in>A. x = (x / v) * v'"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	502	proof
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	503	show "x = (x/v)*v"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	504	by (simp add: divide_inverse mult_assoc vpos
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	505	order_less_imp_not_eq2)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	506	show "v \<in> A" by fact
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	507	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	508	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	509	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	510	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	511	thus "1 * Abs_preal A = Abs_preal A"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	512	by (simp add: preal_one_def preal_mult_def mult_set_def
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	513	rat_mem_preal A)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	514	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	515
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	516	instance preal :: comm_monoid_mult
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	517	by intro_classes (rule preal_mult_1)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	518
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	519
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	520	subsection{Distribution of Multiplication across Addition}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	521
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	522	lemma mem_Rep_preal_add_iff:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	523	"(z \<in> Rep_preal(R+S)) = (\<exists>x \<in> Rep_preal R. \<exists>y \<in> Rep_preal S. z = x + y)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	524	apply (simp add: preal_add_def mem_add_set Rep_preal)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	525	apply (simp add: add_set_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	526	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	527
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	528	lemma mem_Rep_preal_mult_iff:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	529	"(z \<in> Rep_preal(RS)) = (\<exists>x \<in> Rep_preal R. \<exists>y \<in> Rep_preal S. z = x y)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	530	apply (simp add: preal_mult_def mem_mult_set Rep_preal)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	531	apply (simp add: mult_set_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	532	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	533
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	534	lemma distrib_subset1:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	535	"Rep_preal (w * (x + y)) \<subseteq> Rep_preal (w * x + w * y)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	536	apply (auto simp add: Bex_def mem_Rep_preal_add_iff mem_Rep_preal_mult_iff)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	537	apply (force simp add: right_distrib)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	538	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	539
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	540	lemma preal_add_mult_distrib_mean:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	541	assumes a: "a \<in> Rep_preal w"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	542	and b: "b \<in> Rep_preal w"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	543	and d: "d \<in> Rep_preal x"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	544	and e: "e \<in> Rep_preal y"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	545	shows "\<exists>c \<in> Rep_preal w. a * d + b * e = c * (d + e)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	546	proof
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	547	let ?c = "(ad + be)/(d+e)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	548	have [simp]: "0<a" "0<b" "0<d" "0<e" "0<d+e"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	549	by (blast intro: preal_imp_pos [OF Rep_preal] a b d e pos_add_strict)+
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	550	have cpos: "0 < ?c"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	551	by (simp add: zero_less_divide_iff zero_less_mult_iff pos_add_strict)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	552	show "a * d + b * e = ?c * (d + e)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	553	by (simp add: divide_inverse mult_assoc order_less_imp_not_eq2)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	554	show "?c \<in> Rep_preal w"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	555	proof (cases rule: linorder_le_cases)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	556	assume "a \<le> b"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	557	hence "?c \<le> b"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	558	by (simp add: pos_divide_le_eq right_distrib mult_right_mono
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	559	order_less_imp_le)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	560	thus ?thesis by (rule preal_downwards_closed' [OF Rep_preal b cpos])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	561	next
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	562	assume "b \<le> a"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	563	hence "?c \<le> a"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	564	by (simp add: pos_divide_le_eq right_distrib mult_right_mono
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	565	order_less_imp_le)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	566	thus ?thesis by (rule preal_downwards_closed' [OF Rep_preal a cpos])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	567	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	568	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	569
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	570	lemma distrib_subset2:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	571	"Rep_preal (w * x + w * y) \<subseteq> Rep_preal (w * (x + y))"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	572	apply (auto simp add: Bex_def mem_Rep_preal_add_iff mem_Rep_preal_mult_iff)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	573	apply (drule_tac w=w and x=x and y=y in preal_add_mult_distrib_mean, auto)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	574	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	575
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	576	lemma preal_add_mult_distrib2: "(w * ((x::preal) + y)) = (w * x) + (w * y)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	577	apply (rule Rep_preal_inject [THEN iffD1])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	578	apply (rule equalityI [OF distrib_subset1 distrib_subset2])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	579	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	580
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	581	lemma preal_add_mult_distrib: "(((x::preal) + y) * w) = (x * w) + (y * w)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	582	by (simp add: preal_mult_commute preal_add_mult_distrib2)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	583
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	584	instance preal :: comm_semiring
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	585	by intro_classes (rule preal_add_mult_distrib)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	586
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	587
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	588	subsection{Existence of Inverse, a Positive Real}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	589
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	590	lemma mem_inv_set_ex:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	591	assumes A: "A \<in> preal" shows "\<exists>x y. 0 < x & x < y & inverse y \<notin> A"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	592	proof -
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	593	from preal_exists_bound [OF A]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	594	obtain x where [simp]: "0<x" "x \<notin> A" by blast
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	595	show ?thesis
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	596	proof (intro exI conjI)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	597	show "0 < inverse (x+1)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	598	by (simp add: order_less_trans [OF _ less_add_one])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	599	show "inverse(x+1) < inverse x"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	600	by (simp add: less_imp_inverse_less less_add_one)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	601	show "inverse (inverse x) \<notin> A"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	602	by (simp add: order_less_imp_not_eq2)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	603	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	604	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	605
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	606	text{Part 1 of Dedekind sections definition}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	607	lemma inverse_set_not_empty:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	608	"A \<in> preal ==> {} \<subset> inverse_set A"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	609	apply (insert mem_inv_set_ex [of A])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	610	apply (auto simp add: inverse_set_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	611	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	612
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	613	text{Part 2 of Dedekind sections definition}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	614
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	615	lemma preal_not_mem_inverse_set_Ex:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	616	assumes A: "A \<in> preal" shows "\<exists>q. 0 < q & q \<notin> inverse_set A"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	617	proof -
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	618	from preal_nonempty [OF A]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	619	obtain x where x: "x \<in> A" and xpos [simp]: "0<x" ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	620	show ?thesis
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	621	proof (intro exI conjI)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	622	show "0 < inverse x" by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	623	show "inverse x \<notin> inverse_set A"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	624	proof -
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	625	{ fix y::rat
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	626	assume ygt: "inverse x < y"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	627	have [simp]: "0 < y" by (simp add: order_less_trans [OF _ ygt])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	628	have iyless: "inverse y < x"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	629	by (simp add: inverse_less_imp_less [of x] ygt)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	630	have "inverse y \<in> A"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	631	by (simp add: preal_downwards_closed [OF A x] iyless)}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	632	thus ?thesis by (auto simp add: inverse_set_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	633	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	634	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	635	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	636
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	637	lemma inverse_set_not_rat_set:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	638	assumes A: "A \<in> preal" shows "inverse_set A < {r. 0 < r}"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	639	proof
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	640	show "inverse_set A \<subseteq> {r. 0 < r}" by (force simp add: inverse_set_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	641	next
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	642	show "inverse_set A \<noteq> {r. 0 < r}"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	643	by (insert preal_not_mem_inverse_set_Ex [OF A], blast)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	644	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	645
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	646	text{Part 3 of Dedekind sections definition}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	647	lemma inverse_set_lemma3:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	648	"[\|A \<in> preal; u \<in> inverse_set A; 0 < z; z < u\|]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	649	==> z \<in> inverse_set A"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	650	apply (auto simp add: inverse_set_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	651	apply (auto intro: order_less_trans)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	652	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	653
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	654	text{Part 4 of Dedekind sections definition}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	655	lemma inverse_set_lemma4:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	656	"[\|A \<in> preal; y \<in> inverse_set A\|] ==> \<exists>u \<in> inverse_set A. y < u"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	657	apply (auto simp add: inverse_set_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	658	apply (drule dense [of y])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	659	apply (blast intro: order_less_trans)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	660	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	661
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	662
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	663	lemma mem_inverse_set:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	664	"A \<in> preal ==> inverse_set A \<in> preal"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	665	apply (simp (no_asm_simp) add: preal_def cut_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	666	apply (blast intro!: inverse_set_not_empty inverse_set_not_rat_set
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	667	inverse_set_lemma3 inverse_set_lemma4)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	668	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	669
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	670
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	671	subsection{Gleason's Lemma 9-3.4, page 122}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	672
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	673	lemma Gleason9_34_exists:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	674	assumes A: "A \<in> preal"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	675	and "\<forall>x\<in>A. x + u \<in> A"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	676	and "0 \<le> z"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	677	shows "\<exists>b\<in>A. b + (of_int z) * u \<in> A"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	678	proof (cases z rule: int_cases)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	679	case (nonneg n)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	680	show ?thesis
41541 1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	681	proof (simp add: nonneg, induct n)
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	682	case 0
41541 1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	683	from preal_nonempty [OF A]
1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	684	show ?case by force
1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	685	next
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	686	case (Suc k)
41541 1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	687	then obtain b where b: "b \<in> A" "b + of_nat k * u \<in> A" ..
1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	688	hence "b + of_int (int k)*u + u \<in> A" by (simp add: assms)
1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	689	thus ?case by (force simp add: algebra_simps b)
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	690	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	691	next
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	692	case (neg n)
41541 1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	693	with assms show ?thesis by simp
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	694	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	695
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	696	lemma Gleason9_34_contra:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	697	assumes A: "A \<in> preal"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	698	shows "[\|\<forall>x\<in>A. x + u \<in> A; 0 < u; 0 < y; y \<notin> A\|] ==> False"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	699	proof (induct u, induct y)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	700	fix a::int and b::int
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	701	fix c::int and d::int
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	702	assume bpos [simp]: "0 < b"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	703	and dpos [simp]: "0 < d"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	704	and closed: "\<forall>x\<in>A. x + (Fract c d) \<in> A"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	705	and upos: "0 < Fract c d"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	706	and ypos: "0 < Fract a b"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	707	and notin: "Fract a b \<notin> A"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	708	have cpos [simp]: "0 < c"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	709	by (simp add: zero_less_Fract_iff [OF dpos, symmetric] upos)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	710	have apos [simp]: "0 < a"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	711	by (simp add: zero_less_Fract_iff [OF bpos, symmetric] ypos)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	712	let ?k = "a*d"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	713	have frle: "Fract a b \<le> Fract ?k 1 * (Fract c d)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	714	proof -
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	715	have "?thesis = ((a * d * b * d) \<le> c * b * (a * d * b * d))"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	716	by (simp add: order_less_imp_not_eq2 mult_ac)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	717	moreover
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	718	have "(1 * (a * d * b * d)) \<le> c * b * (a * d * b * d)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	719	by (rule mult_mono,
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	720	simp_all add: int_one_le_iff_zero_less zero_less_mult_iff
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	721	order_less_imp_le)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	722	ultimately
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	723	show ?thesis by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	724	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	725	have k: "0 \<le> ?k" by (simp add: order_less_imp_le zero_less_mult_iff)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	726	from Gleason9_34_exists [OF A closed k]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	727	obtain z where z: "z \<in> A"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	728	and mem: "z + of_int ?k * Fract c d \<in> A" ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	729	have less: "z + of_int ?k * Fract c d < Fract a b"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	730	by (rule not_in_preal_ub [OF A notin mem ypos])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	731	have "0<z" by (rule preal_imp_pos [OF A z])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	732	with frle and less show False by (simp add: Fract_of_int_eq)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	733	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	734
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	735
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	736	lemma Gleason9_34:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	737	assumes A: "A \<in> preal"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	738	and upos: "0 < u"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	739	shows "\<exists>r \<in> A. r + u \<notin> A"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	740	proof (rule ccontr, simp)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	741	assume closed: "\<forall>r\<in>A. r + u \<in> A"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	742	from preal_exists_bound [OF A]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	743	obtain y where y: "y \<notin> A" and ypos: "0 < y" by blast
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	744	show False
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	745	by (rule Gleason9_34_contra [OF A closed upos ypos y])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	746	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	747
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	748
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	749
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	750	subsection{Gleason's Lemma 9-3.6}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	751
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	752	lemma lemma_gleason9_36:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	753	assumes A: "A \<in> preal"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	754	and x: "1 < x"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	755	shows "\<exists>r \<in> A. r*x \<notin> A"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	756	proof -
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	757	from preal_nonempty [OF A]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	758	obtain y where y: "y \<in> A" and ypos: "0<y" ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	759	show ?thesis
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	760	proof (rule classical)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	761	assume "~(\<exists>r\<in>A. r * x \<notin> A)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	762	with y have ymem: "y * x \<in> A" by blast
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	763	from ypos mult_strict_left_mono [OF x]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	764	have yless: "y < y*x" by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	765	let ?d = "y*x - y"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	766	from yless have dpos: "0 < ?d" and eq: "y + ?d = y*x" by auto
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	767	from Gleason9_34 [OF A dpos]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	768	obtain r where r: "r\<in>A" and notin: "r + ?d \<notin> A" ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	769	have rpos: "0<r" by (rule preal_imp_pos [OF A r])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	770	with dpos have rdpos: "0 < r + ?d" by arith
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	771	have "~ (r + ?d \<le> y + ?d)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	772	proof
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	773	assume le: "r + ?d \<le> y + ?d"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	774	from ymem have yd: "y + ?d \<in> A" by (simp add: eq)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	775	have "r + ?d \<in> A" by (rule preal_downwards_closed' [OF A yd rdpos le])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	776	with notin show False by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	777	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	778	hence "y < r" by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	779	with ypos have dless: "?d < (r * ?d)/y"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	780	by (simp add: pos_less_divide_eq mult_commute [of ?d]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	781	mult_strict_right_mono dpos)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	782	have "r + ?d < r*x"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	783	proof -
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	784	have "r + ?d < r + (r * ?d)/y" by (simp add: dless)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	785	also with ypos have "... = (r/y) * (y + ?d)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	786	by (simp only: algebra_simps divide_inverse, simp)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	787	also have "... = r*x" using ypos
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	788	by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	789	finally show "r + ?d < r*x" .
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	790	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	791	with r notin rdpos
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	792	show "\<exists>r\<in>A. r * x \<notin> A" by (blast dest: preal_downwards_closed [OF A])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	793	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	794	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	795
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	796	subsection{Existence of Inverse: Part 2}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	797
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	798	lemma mem_Rep_preal_inverse_iff:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	799	"(z \<in> Rep_preal(inverse R)) =
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	800	(0 < z \<and> (\<exists>y. z < y \<and> inverse y \<notin> Rep_preal R))"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	801	apply (simp add: preal_inverse_def mem_inverse_set Rep_preal)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	802	apply (simp add: inverse_set_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	803	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	804
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	805	lemma Rep_preal_one:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	806	"Rep_preal 1 = {x. 0 < x \<and> x < 1}"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	807	by (simp add: preal_one_def rat_mem_preal)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	808
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	809	lemma subset_inverse_mult_lemma:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	810	assumes xpos: "0 < x" and xless: "x < 1"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	811	shows "\<exists>r u y. 0 < r & r < y & inverse y \<notin> Rep_preal R &
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	812	u \<in> Rep_preal R & x = r * u"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	813	proof -
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	814	from xpos and xless have "1 < inverse x" by (simp add: one_less_inverse_iff)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	815	from lemma_gleason9_36 [OF Rep_preal this]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	816	obtain r where r: "r \<in> Rep_preal R"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	817	and notin: "r * (inverse x) \<notin> Rep_preal R" ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	818	have rpos: "0<r" by (rule preal_imp_pos [OF Rep_preal r])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	819	from preal_exists_greater [OF Rep_preal r]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	820	obtain u where u: "u \<in> Rep_preal R" and rless: "r < u" ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	821	have upos: "0<u" by (rule preal_imp_pos [OF Rep_preal u])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	822	show ?thesis
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	823	proof (intro exI conjI)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	824	show "0 < x/u" using xpos upos
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	825	by (simp add: zero_less_divide_iff)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	826	show "x/u < x/r" using xpos upos rpos
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	827	by (simp add: divide_inverse mult_less_cancel_left rless)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	828	show "inverse (x / r) \<notin> Rep_preal R" using notin
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	829	by (simp add: divide_inverse mult_commute)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	830	show "u \<in> Rep_preal R" by (rule u)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	831	show "x = x / u * u" using upos
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	832	by (simp add: divide_inverse mult_commute)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	833	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	834	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	835
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	836	lemma subset_inverse_mult:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	837	"Rep_preal 1 \<subseteq> Rep_preal(inverse R * R)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	838	apply (auto simp add: Bex_def Rep_preal_one mem_Rep_preal_inverse_iff
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	839	mem_Rep_preal_mult_iff)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	840	apply (blast dest: subset_inverse_mult_lemma)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	841	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	842
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	843	lemma inverse_mult_subset_lemma:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	844	assumes rpos: "0 < r"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	845	and rless: "r < y"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	846	and notin: "inverse y \<notin> Rep_preal R"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	847	and q: "q \<in> Rep_preal R"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	848	shows "r*q < 1"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	849	proof -
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	850	have "q < inverse y" using rpos rless
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	851	by (simp add: not_in_preal_ub [OF Rep_preal notin] q)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	852	hence "r * q < r/y" using rpos
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	853	by (simp add: divide_inverse mult_less_cancel_left)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	854	also have "... \<le> 1" using rpos rless
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	855	by (simp add: pos_divide_le_eq)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	856	finally show ?thesis .
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	857	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	858
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	859	lemma inverse_mult_subset:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	860	"Rep_preal(inverse R * R) \<subseteq> Rep_preal 1"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	861	apply (auto simp add: Bex_def Rep_preal_one mem_Rep_preal_inverse_iff
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	862	mem_Rep_preal_mult_iff)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	863	apply (simp add: zero_less_mult_iff preal_imp_pos [OF Rep_preal])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	864	apply (blast intro: inverse_mult_subset_lemma)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	865	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	866
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	867	lemma preal_mult_inverse: "inverse R * R = (1::preal)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	868	apply (rule Rep_preal_inject [THEN iffD1])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	869	apply (rule equalityI [OF inverse_mult_subset subset_inverse_mult])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	870	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	871
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	872	lemma preal_mult_inverse_right: "R * inverse R = (1::preal)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	873	apply (rule preal_mult_commute [THEN subst])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	874	apply (rule preal_mult_inverse)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	875	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	876
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	877
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	878	text{Theorems needing @{text Gleason9_34}}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	879
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	880	lemma Rep_preal_self_subset: "Rep_preal (R) \<subseteq> Rep_preal(R + S)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	881	proof
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	882	fix r
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	883	assume r: "r \<in> Rep_preal R"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	884	have rpos: "0<r" by (rule preal_imp_pos [OF Rep_preal r])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	885	from mem_Rep_preal_Ex
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	886	obtain y where y: "y \<in> Rep_preal S" ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	887	have ypos: "0<y" by (rule preal_imp_pos [OF Rep_preal y])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	888	have ry: "r+y \<in> Rep_preal(R + S)" using r y
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	889	by (auto simp add: mem_Rep_preal_add_iff)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	890	show "r \<in> Rep_preal(R + S)" using r ypos rpos
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	891	by (simp add: preal_downwards_closed [OF Rep_preal ry])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	892	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	893
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	894	lemma Rep_preal_sum_not_subset: "~ Rep_preal (R + S) \<subseteq> Rep_preal(R)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	895	proof -
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	896	from mem_Rep_preal_Ex
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	897	obtain y where y: "y \<in> Rep_preal S" ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	898	have ypos: "0<y" by (rule preal_imp_pos [OF Rep_preal y])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	899	from Gleason9_34 [OF Rep_preal ypos]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	900	obtain r where r: "r \<in> Rep_preal R" and notin: "r + y \<notin> Rep_preal R" ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	901	have "r + y \<in> Rep_preal (R + S)" using r y
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	902	by (auto simp add: mem_Rep_preal_add_iff)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	903	thus ?thesis using notin by blast
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	904	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	905
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	906	lemma Rep_preal_sum_not_eq: "Rep_preal (R + S) \<noteq> Rep_preal(R)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	907	by (insert Rep_preal_sum_not_subset, blast)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	908
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	909	text{at last, Gleason prop. 9-3.5(iii) page 123}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	910	lemma preal_self_less_add_left: "(R::preal) < R + S"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	911	apply (unfold preal_less_def less_le)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	912	apply (simp add: Rep_preal_self_subset Rep_preal_sum_not_eq [THEN not_sym])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	913	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	914
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	915
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	916	subsection{Subtraction for Positive Reals}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	917
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	918	text{*Gleason prop. 9-3.5(iv), page 123: proving @{prop "A < B ==> \<exists>D. A + D =
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	919	B"}. We define the claimed @{term D} and show that it is a positive real*}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	920
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	921	text{Part 1 of Dedekind sections definition}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	922	lemma diff_set_not_empty:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	923	"R < S ==> {} \<subset> diff_set (Rep_preal S) (Rep_preal R)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	924	apply (auto simp add: preal_less_def diff_set_def elim!: equalityE)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	925	apply (frule_tac x1 = S in Rep_preal [THEN preal_exists_greater])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	926	apply (drule preal_imp_pos [OF Rep_preal], clarify)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	927	apply (cut_tac a=x and b=u in add_eq_exists, force)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	928	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	929
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	930	text{Part 2 of Dedekind sections definition}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	931	lemma diff_set_nonempty:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	932	"\<exists>q. 0 < q & q \<notin> diff_set (Rep_preal S) (Rep_preal R)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	933	apply (cut_tac X = S in Rep_preal_exists_bound)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	934	apply (erule exE)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	935	apply (rule_tac x = x in exI, auto)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	936	apply (simp add: diff_set_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	937	apply (auto dest: Rep_preal [THEN preal_downwards_closed])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	938	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	939
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	940	lemma diff_set_not_rat_set:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	941	"diff_set (Rep_preal S) (Rep_preal R) < {r. 0 < r}" (is "?lhs < ?rhs")
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	942	proof
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	943	show "?lhs \<subseteq> ?rhs" by (auto simp add: diff_set_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	944	show "?lhs \<noteq> ?rhs" using diff_set_nonempty by blast
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	945	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	946
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	947	text{Part 3 of Dedekind sections definition}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	948	lemma diff_set_lemma3:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	949	"[\|R < S; u \<in> diff_set (Rep_preal S) (Rep_preal R); 0 < z; z < u\|]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	950	==> z \<in> diff_set (Rep_preal S) (Rep_preal R)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	951	apply (auto simp add: diff_set_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	952	apply (rule_tac x=x in exI)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	953	apply (drule Rep_preal [THEN preal_downwards_closed], auto)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	954	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	955
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	956	text{Part 4 of Dedekind sections definition}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	957	lemma diff_set_lemma4:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	958	"[\|R < S; y \<in> diff_set (Rep_preal S) (Rep_preal R)\|]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	959	==> \<exists>u \<in> diff_set (Rep_preal S) (Rep_preal R). y < u"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	960	apply (auto simp add: diff_set_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	961	apply (drule Rep_preal [THEN preal_exists_greater], clarify)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	962	apply (cut_tac a="x+y" and b=u in add_eq_exists, clarify)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	963	apply (rule_tac x="y+xa" in exI)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	964	apply (auto simp add: add_ac)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	965	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	966
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	967	lemma mem_diff_set:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	968	"R < S ==> diff_set (Rep_preal S) (Rep_preal R) \<in> preal"
46905 6b1c0a80a57a prefer abs_def over def_raw; wenzelm parents: 45694 diff changeset	969	apply (unfold preal_def cut_def [abs_def])
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	970	apply (blast intro!: diff_set_not_empty diff_set_not_rat_set
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	971	diff_set_lemma3 diff_set_lemma4)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	972	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	973
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	974	lemma mem_Rep_preal_diff_iff:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	975	"R < S ==>
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	976	(z \<in> Rep_preal(S-R)) =
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	977	(\<exists>x. 0 < x & 0 < z & x \<notin> Rep_preal R & x + z \<in> Rep_preal S)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	978	apply (simp add: preal_diff_def mem_diff_set Rep_preal)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	979	apply (force simp add: diff_set_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	980	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	981
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	982
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	983	text{proving that @{term "R + D \<le> S"}}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	984
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	985	lemma less_add_left_lemma:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	986	assumes Rless: "R < S"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	987	and a: "a \<in> Rep_preal R"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	988	and cb: "c + b \<in> Rep_preal S"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	989	and "c \<notin> Rep_preal R"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	990	and "0 < b"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	991	and "0 < c"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	992	shows "a + b \<in> Rep_preal S"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	993	proof -
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	994	have "0<a" by (rule preal_imp_pos [OF Rep_preal a])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	995	moreover
41541 1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	996	have "a < c" using assms by (blast intro: not_in_Rep_preal_ub )
1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	997	ultimately show ?thesis
1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	998	using assms by (simp add: preal_downwards_closed [OF Rep_preal cb])
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	999	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1000
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1001	lemma less_add_left_le1:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1002	"R < (S::preal) ==> R + (S-R) \<le> S"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1003	apply (auto simp add: Bex_def preal_le_def mem_Rep_preal_add_iff
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1004	mem_Rep_preal_diff_iff)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1005	apply (blast intro: less_add_left_lemma)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1006	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1007
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1008	subsection{proving that @{term "S \<le> R + D"} --- trickier}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1009
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1010	lemma lemma_sum_mem_Rep_preal_ex:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1011	"x \<in> Rep_preal S ==> \<exists>e. 0 < e & x + e \<in> Rep_preal S"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1012	apply (drule Rep_preal [THEN preal_exists_greater], clarify)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1013	apply (cut_tac a=x and b=u in add_eq_exists, auto)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1014	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1015
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1016	lemma less_add_left_lemma2:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1017	assumes Rless: "R < S"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1018	and x: "x \<in> Rep_preal S"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1019	and xnot: "x \<notin> Rep_preal R"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1020	shows "\<exists>u v z. 0 < v & 0 < z & u \<in> Rep_preal R & z \<notin> Rep_preal R &
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1021	z + v \<in> Rep_preal S & x = u + v"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1022	proof -
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1023	have xpos: "0<x" by (rule preal_imp_pos [OF Rep_preal x])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1024	from lemma_sum_mem_Rep_preal_ex [OF x]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1025	obtain e where epos: "0 < e" and xe: "x + e \<in> Rep_preal S" by blast
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1026	from Gleason9_34 [OF Rep_preal epos]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1027	obtain r where r: "r \<in> Rep_preal R" and notin: "r + e \<notin> Rep_preal R" ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1028	with x xnot xpos have rless: "r < x" by (blast intro: not_in_Rep_preal_ub)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1029	from add_eq_exists [of r x]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1030	obtain y where eq: "x = r+y" by auto
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1031	show ?thesis
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1032	proof (intro exI conjI)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1033	show "r \<in> Rep_preal R" by (rule r)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1034	show "r + e \<notin> Rep_preal R" by (rule notin)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1035	show "r + e + y \<in> Rep_preal S" using xe eq by (simp add: add_ac)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1036	show "x = r + y" by (simp add: eq)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1037	show "0 < r + e" using epos preal_imp_pos [OF Rep_preal r]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1038	by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1039	show "0 < y" using rless eq by arith
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1040	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1041	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1042
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1043	lemma less_add_left_le2: "R < (S::preal) ==> S \<le> R + (S-R)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1044	apply (auto simp add: preal_le_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1045	apply (case_tac "x \<in> Rep_preal R")
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1046	apply (cut_tac Rep_preal_self_subset [of R], force)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1047	apply (auto simp add: Bex_def mem_Rep_preal_add_iff mem_Rep_preal_diff_iff)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1048	apply (blast dest: less_add_left_lemma2)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1049	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1050
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1051	lemma less_add_left: "R < (S::preal) ==> R + (S-R) = S"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1052	by (blast intro: antisym [OF less_add_left_le1 less_add_left_le2])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1053
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1054	lemma less_add_left_Ex: "R < (S::preal) ==> \<exists>D. R + D = S"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1055	by (fast dest: less_add_left)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1056
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1057	lemma preal_add_less2_mono1: "R < (S::preal) ==> R + T < S + T"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1058	apply (auto dest!: less_add_left_Ex simp add: preal_add_assoc)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1059	apply (rule_tac y1 = D in preal_add_commute [THEN subst])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1060	apply (auto intro: preal_self_less_add_left simp add: preal_add_assoc [symmetric])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1061	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1062
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1063	lemma preal_add_less2_mono2: "R < (S::preal) ==> T + R < T + S"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1064	by (auto intro: preal_add_less2_mono1 simp add: preal_add_commute [of T])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1065
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1066	lemma preal_add_right_less_cancel: "R + T < S + T ==> R < (S::preal)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1067	apply (insert linorder_less_linear [of R S], auto)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1068	apply (drule_tac R = S and T = T in preal_add_less2_mono1)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1069	apply (blast dest: order_less_trans)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1070	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1071
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1072	lemma preal_add_left_less_cancel: "T + R < T + S ==> R < (S::preal)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1073	by (auto elim: preal_add_right_less_cancel simp add: preal_add_commute [of T])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1074
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1075	lemma preal_add_less_cancel_left: "(T + (R::preal) < T + S) = (R < S)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1076	by (blast intro: preal_add_less2_mono2 preal_add_left_less_cancel)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1077
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1078	lemma preal_add_le_cancel_left: "(T + (R::preal) \<le> T + S) = (R \<le> S)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1079	by (simp add: linorder_not_less [symmetric] preal_add_less_cancel_left)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1080
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1081	lemma preal_add_right_cancel: "(R::preal) + T = S + T ==> R = S"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1082	apply (insert linorder_less_linear [of R S], safe)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1083	apply (drule_tac [!] T = T in preal_add_less2_mono1, auto)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1084	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1085
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1086	lemma preal_add_left_cancel: "C + A = C + B ==> A = (B::preal)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1087	by (auto intro: preal_add_right_cancel simp add: preal_add_commute)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1088
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1089	instance preal :: linordered_cancel_ab_semigroup_add
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1090	proof
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1091	fix a b c :: preal
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1092	show "a + b = a + c \<Longrightarrow> b = c" by (rule preal_add_left_cancel)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1093	show "a \<le> b \<Longrightarrow> c + a \<le> c + b" by (simp only: preal_add_le_cancel_left)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1094	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1095
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1096
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1097	subsection{Completeness of type @{typ preal}}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1098
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1099	text{Prove that supremum is a cut}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1100
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1101	text{Part 1 of Dedekind sections definition}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1102
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1103	lemma preal_sup_set_not_empty:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1104	"P \<noteq> {} ==> {} \<subset> (\<Union>X \<in> P. Rep_preal(X))"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1105	apply auto
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1106	apply (cut_tac X = x in mem_Rep_preal_Ex, auto)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1107	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1108
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1109
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1110	text{Part 2 of Dedekind sections definition}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1111
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1112	lemma preal_sup_not_exists:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1113	"\<forall>X \<in> P. X \<le> Y ==> \<exists>q. 0 < q & q \<notin> (\<Union>X \<in> P. Rep_preal(X))"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1114	apply (cut_tac X = Y in Rep_preal_exists_bound)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1115	apply (auto simp add: preal_le_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1116	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1117
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1118	lemma preal_sup_set_not_rat_set:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1119	"\<forall>X \<in> P. X \<le> Y ==> (\<Union>X \<in> P. Rep_preal(X)) < {r. 0 < r}"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1120	apply (drule preal_sup_not_exists)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1121	apply (blast intro: preal_imp_pos [OF Rep_preal])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1122	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1123
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1124	text{Part 3 of Dedekind sections definition}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1125	lemma preal_sup_set_lemma3:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1126	"[\|P \<noteq> {}; \<forall>X \<in> P. X \<le> Y; u \<in> (\<Union>X \<in> P. Rep_preal(X)); 0 < z; z < u\|]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1127	==> z \<in> (\<Union>X \<in> P. Rep_preal(X))"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1128	by (auto elim: Rep_preal [THEN preal_downwards_closed])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1129
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1130	text{Part 4 of Dedekind sections definition}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1131	lemma preal_sup_set_lemma4:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1132	"[\|P \<noteq> {}; \<forall>X \<in> P. X \<le> Y; y \<in> (\<Union>X \<in> P. Rep_preal(X)) \|]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1133	==> \<exists>u \<in> (\<Union>X \<in> P. Rep_preal(X)). y < u"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1134	by (blast dest: Rep_preal [THEN preal_exists_greater])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1135
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1136	lemma preal_sup:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1137	"[\|P \<noteq> {}; \<forall>X \<in> P. X \<le> Y\|] ==> (\<Union>X \<in> P. Rep_preal(X)) \<in> preal"
46905 6b1c0a80a57a prefer abs_def over def_raw; wenzelm parents: 45694 diff changeset	1138	apply (unfold preal_def cut_def [abs_def])
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1139	apply (blast intro!: preal_sup_set_not_empty preal_sup_set_not_rat_set
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1140	preal_sup_set_lemma3 preal_sup_set_lemma4)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1141	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1142
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1143	lemma preal_psup_le:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1144	"[\| \<forall>X \<in> P. X \<le> Y; x \<in> P \|] ==> x \<le> psup P"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1145	apply (simp (no_asm_simp) add: preal_le_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1146	apply (subgoal_tac "P \<noteq> {}")
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1147	apply (auto simp add: psup_def preal_sup)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1148	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1149
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1150	lemma psup_le_ub: "[\| P \<noteq> {}; \<forall>X \<in> P. X \<le> Y \|] ==> psup P \<le> Y"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1151	apply (simp (no_asm_simp) add: preal_le_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1152	apply (simp add: psup_def preal_sup)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1153	apply (auto simp add: preal_le_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1154	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1155
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1156	text{Supremum property}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1157	lemma preal_complete:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1158	"[\| P \<noteq> {}; \<forall>X \<in> P. X \<le> Y \|] ==> (\<exists>X \<in> P. Z < X) = (Z < psup P)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1159	apply (simp add: preal_less_def psup_def preal_sup)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1160	apply (auto simp add: preal_le_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1161	apply (rename_tac U)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1162	apply (cut_tac x = U and y = Z in linorder_less_linear)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1163	apply (auto simp add: preal_less_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1164	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1165
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1166	section {Defining the Reals from the Positive Reals}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1167
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1168	definition
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1169	realrel :: "((preal * preal) * (preal * preal)) set" where
37765 26bdfb7b680b dropped superfluous [code del]s haftmann parents: 37388 diff changeset	1170	"realrel = {p. \<exists>x1 y1 x2 y2. p = ((x1,y1),(x2,y2)) & x1+y2 = x2+y1}"
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1171
45694 4a8743618257 prefer typedef without extra definition and alternative name; wenzelm parents: 41541 diff changeset	1172	definition "Real = UNIV//realrel"
4a8743618257 prefer typedef without extra definition and alternative name; wenzelm parents: 41541 diff changeset	1173
4a8743618257 prefer typedef without extra definition and alternative name; wenzelm parents: 41541 diff changeset	1174	typedef (open) real = Real
4a8743618257 prefer typedef without extra definition and alternative name; wenzelm parents: 41541 diff changeset	1175	morphisms Rep_Real Abs_Real
4a8743618257 prefer typedef without extra definition and alternative name; wenzelm parents: 41541 diff changeset	1176	unfolding Real_def by (auto simp add: quotient_def)
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1177
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1178	definition
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1179	( these don't use the overloaded "real" function: users don't see them )
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1180	real_of_preal :: "preal => real" where
37765 26bdfb7b680b dropped superfluous [code del]s haftmann parents: 37388 diff changeset	1181	"real_of_preal m = Abs_Real (realrel `` {(m + 1, 1)})"
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1182
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1183	instantiation real :: "{zero, one, plus, minus, uminus, times, inverse, ord, abs, sgn}"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1184	begin
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1185
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1186	definition
37765 26bdfb7b680b dropped superfluous [code del]s haftmann parents: 37388 diff changeset	1187	real_zero_def: "0 = Abs_Real(realrel``{(1, 1)})"
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1188
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1189	definition
37765 26bdfb7b680b dropped superfluous [code del]s haftmann parents: 37388 diff changeset	1190	real_one_def: "1 = Abs_Real(realrel``{(1 + 1, 1)})"
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1191
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1192	definition
37765 26bdfb7b680b dropped superfluous [code del]s haftmann parents: 37388 diff changeset	1193	real_add_def: "z + w =
39910 10097e0a9dbd constant `contents` renamed to `the_elem` haftmann parents: 37765 diff changeset	1194	the_elem (\<Union>(x,y) \<in> Rep_Real(z). \<Union>(u,v) \<in> Rep_Real(w).
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1195	{ Abs_Real(realrel``{(x+u, y+v)}) })"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1196
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1197	definition
39910 10097e0a9dbd constant `contents` renamed to `the_elem` haftmann parents: 37765 diff changeset	1198	real_minus_def: "- r = the_elem (\<Union>(x,y) \<in> Rep_Real(r). { Abs_Real(realrel``{(y,x)}) })"
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1199
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1200	definition
37765 26bdfb7b680b dropped superfluous [code del]s haftmann parents: 37388 diff changeset	1201	real_diff_def: "r - (s::real) = r + - s"
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1202
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1203	definition
37765 26bdfb7b680b dropped superfluous [code del]s haftmann parents: 37388 diff changeset	1204	real_mult_def:
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1205	"z * w =
39910 10097e0a9dbd constant `contents` renamed to `the_elem` haftmann parents: 37765 diff changeset	1206	the_elem (\<Union>(x,y) \<in> Rep_Real(z). \<Union>(u,v) \<in> Rep_Real(w).
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1207	{ Abs_Real(realrel``{(xu + yv, xv + yu)}) })"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1208
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1209	definition
37765 26bdfb7b680b dropped superfluous [code del]s haftmann parents: 37388 diff changeset	1210	real_inverse_def: "inverse (R::real) = (THE S. (R = 0 & S = 0) \| S * R = 1)"
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1211
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1212	definition
37765 26bdfb7b680b dropped superfluous [code del]s haftmann parents: 37388 diff changeset	1213	real_divide_def: "R / (S::real) = R * inverse S"
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1214
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1215	definition
37765 26bdfb7b680b dropped superfluous [code del]s haftmann parents: 37388 diff changeset	1216	real_le_def: "z \<le> (w::real) \<longleftrightarrow>
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1217	(\<exists>x y u v. x+v \<le> u+y & (x,y) \<in> Rep_Real z & (u,v) \<in> Rep_Real w)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1218
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1219	definition
37765 26bdfb7b680b dropped superfluous [code del]s haftmann parents: 37388 diff changeset	1220	real_less_def: "x < (y\<Colon>real) \<longleftrightarrow> x \<le> y \<and> x \<noteq> y"
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1221
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1222	definition
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1223	real_abs_def: "abs (r::real) = (if r < 0 then - r else r)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1224
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1225	definition
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1226	real_sgn_def: "sgn (x::real) = (if x=0 then 0 else if 0<x then 1 else - 1)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1227
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1228	instance ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1229
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1230	end
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1231
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1232	subsection {* Equivalence relation over positive reals *}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1233
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1234	lemma preal_trans_lemma:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1235	assumes "x + y1 = x1 + y"
41541 1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	1236	and "x + y2 = x2 + y"
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1237	shows "x1 + y2 = x2 + (y1::preal)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1238	proof -
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1239	have "(x1 + y2) + x = (x + y2) + x1" by (simp add: add_ac)
41541 1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	1240	also have "... = (x2 + y) + x1" by (simp add: assms)
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1241	also have "... = x2 + (x1 + y)" by (simp add: add_ac)
41541 1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	1242	also have "... = x2 + (x + y1)" by (simp add: assms)
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1243	also have "... = (x2 + y1) + x" by (simp add: add_ac)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1244	finally have "(x1 + y2) + x = (x2 + y1) + x" .
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1245	thus ?thesis by (rule add_right_imp_eq)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1246	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1247
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1248
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1249	lemma realrel_iff [simp]: "(((x1,y1),(x2,y2)) \<in> realrel) = (x1 + y2 = x2 + y1)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1250	by (simp add: realrel_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1251
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1252	lemma equiv_realrel: "equiv UNIV realrel"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1253	apply (auto simp add: equiv_def refl_on_def sym_def trans_def realrel_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1254	apply (blast dest: preal_trans_lemma)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1255	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1256
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1257	text{*Reduces equality of equivalence classes to the @{term realrel} relation:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1258	@{term "(realrel `` {x} = realrel `` {y}) = ((x,y) \<in> realrel)"} *}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1259	lemmas equiv_realrel_iff =
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1260	eq_equiv_class_iff [OF equiv_realrel UNIV_I UNIV_I]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1261
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1262	declare equiv_realrel_iff [simp]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1263
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1264
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1265	lemma realrel_in_real [simp]: "realrel``{(x,y)}: Real"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1266	by (simp add: Real_def realrel_def quotient_def, blast)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1267
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1268	declare Abs_Real_inject [simp]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1269	declare Abs_Real_inverse [simp]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1270
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1271
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1272	text{*Case analysis on the representation of a real number as an equivalence
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1273	class of pairs of positive reals.*}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1274	lemma eq_Abs_Real [case_names Abs_Real, cases type: real]:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1275	"(!!x y. z = Abs_Real(realrel``{(x,y)}) ==> P) ==> P"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1276	apply (rule Rep_Real [of z, unfolded Real_def, THEN quotientE])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1277	apply (drule arg_cong [where f=Abs_Real])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1278	apply (auto simp add: Rep_Real_inverse)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1279	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1280
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1281
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1282	subsection {* Addition and Subtraction *}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1283
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1284	lemma real_add_congruent2_lemma:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1285	"[\|a + ba = aa + b; ab + bc = ac + bb\|]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1286	==> a + ab + (ba + bc) = aa + ac + (b + (bb::preal))"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1287	apply (simp add: add_assoc)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1288	apply (rule add_left_commute [of ab, THEN ssubst])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1289	apply (simp add: add_assoc [symmetric])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1290	apply (simp add: add_ac)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1291	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1292
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1293	lemma real_add:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1294	"Abs_Real (realrel``{(x,y)}) + Abs_Real (realrel``{(u,v)}) =
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1295	Abs_Real (realrel``{(x+u, y+v)})"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1296	proof -
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1297	have "(\<lambda>z w. (\<lambda>(x,y). (\<lambda>(u,v). {Abs_Real (realrel `` {(x+u, y+v)})}) w) z)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1298	respects2 realrel"
40822 98a5faa5aec0 adaptions to changes in Equiv_Relation.thy haftmann parents: 39910 diff changeset	1299	by (auto simp add: congruent2_def, blast intro: real_add_congruent2_lemma)
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1300	thus ?thesis
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1301	by (simp add: real_add_def UN_UN_split_split_eq
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1302	UN_equiv_class2 [OF equiv_realrel equiv_realrel])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1303	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1304
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1305	lemma real_minus: "- Abs_Real(realrel``{(x,y)}) = Abs_Real(realrel `` {(y,x)})"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1306	proof -
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1307	have "(\<lambda>(x,y). {Abs_Real (realrel``{(y,x)})}) respects realrel"
40822 98a5faa5aec0 adaptions to changes in Equiv_Relation.thy haftmann parents: 39910 diff changeset	1308	by (auto simp add: congruent_def add_commute)
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1309	thus ?thesis
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1310	by (simp add: real_minus_def UN_equiv_class [OF equiv_realrel])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1311	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1312
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1313	instance real :: ab_group_add
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1314	proof
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1315	fix x y z :: real
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1316	show "(x + y) + z = x + (y + z)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1317	by (cases x, cases y, cases z, simp add: real_add add_assoc)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1318	show "x + y = y + x"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1319	by (cases x, cases y, simp add: real_add add_commute)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1320	show "0 + x = x"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1321	by (cases x, simp add: real_add real_zero_def add_ac)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1322	show "- x + x = 0"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1323	by (cases x, simp add: real_minus real_add real_zero_def add_commute)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1324	show "x - y = x + - y"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1325	by (simp add: real_diff_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1326	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1327
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1328
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1329	subsection {* Multiplication *}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1330
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1331	lemma real_mult_congruent2_lemma:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1332	"!!(x1::preal). [\| x1 + y2 = x2 + y1 \|] ==>
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1333	x * x1 + y * y1 + (x * y2 + y * x2) =
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1334	x * x2 + y * y2 + (x * y1 + y * x1)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1335	apply (simp add: add_left_commute add_assoc [symmetric])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1336	apply (simp add: add_assoc right_distrib [symmetric])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1337	apply (simp add: add_commute)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1338	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1339
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1340	lemma real_mult_congruent2:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1341	"(%p1 p2.
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1342	(%(x1,y1). (%(x2,y2).
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1343	{ Abs_Real (realrel``{(x1x2 + y1y2, x1y2+y1x2)}) }) p2) p1)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1344	respects2 realrel"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1345	apply (rule congruent2_commuteI [OF equiv_realrel], clarify)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1346	apply (simp add: mult_commute add_commute)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1347	apply (auto simp add: real_mult_congruent2_lemma)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1348	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1349
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1350	lemma real_mult:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1351	"Abs_Real((realrel``{(x1,y1)})) * Abs_Real((realrel``{(x2,y2)})) =
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1352	Abs_Real(realrel `` {(x1x2+y1y2,x1y2+y1x2)})"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1353	by (simp add: real_mult_def UN_UN_split_split_eq
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1354	UN_equiv_class2 [OF equiv_realrel equiv_realrel real_mult_congruent2])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1355
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1356	lemma real_mult_commute: "(z::real) * w = w * z"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1357	by (cases z, cases w, simp add: real_mult add_ac mult_ac)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1358
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1359	lemma real_mult_assoc: "((z1::real) * z2) * z3 = z1 * (z2 * z3)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1360	apply (cases z1, cases z2, cases z3)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1361	apply (simp add: real_mult algebra_simps)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1362	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1363
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1364	lemma real_mult_1: "(1::real) * z = z"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1365	apply (cases z)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1366	apply (simp add: real_mult real_one_def algebra_simps)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1367	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1368
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1369	lemma real_add_mult_distrib: "((z1::real) + z2) * w = (z1 * w) + (z2 * w)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1370	apply (cases z1, cases z2, cases w)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1371	apply (simp add: real_add real_mult algebra_simps)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1372	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1373
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1374	text{one and zero are distinct}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1375	lemma real_zero_not_eq_one: "0 \<noteq> (1::real)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1376	proof -
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1377	have "(1::preal) < 1 + 1"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1378	by (simp add: preal_self_less_add_left)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1379	thus ?thesis
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1380	by (simp add: real_zero_def real_one_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1381	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1382
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1383	instance real :: comm_ring_1
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1384	proof
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1385	fix x y z :: real
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1386	show "(x * y) * z = x * (y * z)" by (rule real_mult_assoc)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1387	show "x * y = y * x" by (rule real_mult_commute)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1388	show "1 * x = x" by (rule real_mult_1)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1389	show "(x + y) * z = x * z + y * z" by (rule real_add_mult_distrib)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1390	show "0 \<noteq> (1::real)" by (rule real_zero_not_eq_one)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1391	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1392
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1393	subsection {* Inverse and Division *}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1394
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1395	lemma real_zero_iff: "Abs_Real (realrel `` {(x, x)}) = 0"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1396	by (simp add: real_zero_def add_commute)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1397
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1398	text{*Instead of using an existential quantifier and constructing the inverse
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1399	within the proof, we could define the inverse explicitly.*}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1400
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1401	lemma real_mult_inverse_left_ex: "x \<noteq> 0 ==> \<exists>y. y*x = (1::real)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1402	apply (simp add: real_zero_def real_one_def, cases x)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1403	apply (cut_tac x = xa and y = y in linorder_less_linear)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1404	apply (auto dest!: less_add_left_Ex simp add: real_zero_iff)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1405	apply (rule_tac
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1406	x = "Abs_Real (realrel``{(1, inverse (D) + 1)})"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1407	in exI)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1408	apply (rule_tac [2]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1409	x = "Abs_Real (realrel``{(inverse (D) + 1, 1)})"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1410	in exI)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1411	apply (auto simp add: real_mult preal_mult_inverse_right algebra_simps)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1412	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1413
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1414	lemma real_mult_inverse_left: "x \<noteq> 0 ==> inverse(x)*x = (1::real)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1415	apply (simp add: real_inverse_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1416	apply (drule real_mult_inverse_left_ex, safe)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1417	apply (rule theI, assumption, rename_tac z)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1418	apply (subgoal_tac "(z * x) * y = z * (x * y)")
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1419	apply (simp add: mult_commute)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1420	apply (rule mult_assoc)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1421	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1422
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1423
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1424	subsection{The Real Numbers form a Field}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1425
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1426	instance real :: field_inverse_zero
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1427	proof
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1428	fix x y z :: real
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1429	show "x \<noteq> 0 ==> inverse x * x = 1" by (rule real_mult_inverse_left)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1430	show "x / y = x * inverse y" by (simp add: real_divide_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1431	show "inverse 0 = (0::real)" by (simp add: real_inverse_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1432	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1433
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1434
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1435	subsection{The @{text "\<le>"} Ordering}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1436
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1437	lemma real_le_refl: "w \<le> (w::real)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1438	by (cases w, force simp add: real_le_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1439
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1440	text{*The arithmetic decision procedure is not set up for type preal.
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1441	This lemma is currently unused, but it could simplify the proofs of the
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1442	following two lemmas.*}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1443	lemma preal_eq_le_imp_le:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1444	assumes eq: "a+b = c+d" and le: "c \<le> a"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1445	shows "b \<le> (d::preal)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1446	proof -
41541 1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	1447	have "c+d \<le> a+d" by (simp add: le)
1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	1448	hence "a+b \<le> a+d" by (simp add: eq)
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1449	thus "b \<le> d" by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1450	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1451
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1452	lemma real_le_lemma:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1453	assumes l: "u1 + v2 \<le> u2 + v1"
41541 1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	1454	and "x1 + v1 = u1 + y1"
1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	1455	and "x2 + v2 = u2 + y2"
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1456	shows "x1 + y2 \<le> x2 + (y1::preal)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1457	proof -
41541 1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	1458	have "(x1+v1) + (u2+y2) = (u1+y1) + (x2+v2)" by (simp add: assms)
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1459	hence "(x1+y2) + (u2+v1) = (x2+y1) + (u1+v2)" by (simp add: add_ac)
41541 1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	1460	also have "... \<le> (x2+y1) + (u2+v1)" by (simp add: assms)
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1461	finally show ?thesis by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1462	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1463
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1464	lemma real_le:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1465	"(Abs_Real(realrel``{(x1,y1)}) \<le> Abs_Real(realrel``{(x2,y2)})) =
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1466	(x1 + y2 \<le> x2 + y1)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1467	apply (simp add: real_le_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1468	apply (auto intro: real_le_lemma)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1469	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1470
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1471	lemma real_le_antisym: "[\| z \<le> w; w \<le> z \|] ==> z = (w::real)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1472	by (cases z, cases w, simp add: real_le)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1473
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1474	lemma real_trans_lemma:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1475	assumes "x + v \<le> u + y"
41541 1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	1476	and "u + v' \<le> u' + v"
1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	1477	and "x2 + v2 = u2 + y2"
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1478	shows "x + v' \<le> u' + (y::preal)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1479	proof -
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1480	have "(x+v') + (u+v) = (x+v) + (u+v')" by (simp add: add_ac)
41541 1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	1481	also have "... \<le> (u+y) + (u+v')" by (simp add: assms)
1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	1482	also have "... \<le> (u+y) + (u'+v)" by (simp add: assms)
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1483	also have "... = (u'+y) + (u+v)" by (simp add: add_ac)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1484	finally show ?thesis by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1485	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1486
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1487	lemma real_le_trans: "[\| i \<le> j; j \<le> k \|] ==> i \<le> (k::real)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1488	apply (cases i, cases j, cases k)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1489	apply (simp add: real_le)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1490	apply (blast intro: real_trans_lemma)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1491	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1492
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1493	instance real :: order
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1494	proof
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1495	fix u v :: real
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1496	show "u < v \<longleftrightarrow> u \<le> v \<and> \<not> v \<le> u"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1497	by (auto simp add: real_less_def intro: real_le_antisym)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1498	qed (assumption \| rule real_le_refl real_le_trans real_le_antisym)+
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1499
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1500	(* Axiom 'linorder_linear' of class 'linorder': *)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1501	lemma real_le_linear: "(z::real) \<le> w \| w \<le> z"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1502	apply (cases z, cases w)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1503	apply (auto simp add: real_le real_zero_def add_ac)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1504	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1505
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1506	instance real :: linorder
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1507	by (intro_classes, rule real_le_linear)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1508
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1509
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1510	lemma real_le_eq_diff: "(x \<le> y) = (x-y \<le> (0::real))"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1511	apply (cases x, cases y)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1512	apply (auto simp add: real_le real_zero_def real_diff_def real_add real_minus
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1513	add_ac)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1514	apply (simp_all add: add_assoc [symmetric])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1515	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1516
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1517	lemma real_add_left_mono:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1518	assumes le: "x \<le> y" shows "z + x \<le> z + (y::real)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1519	proof -
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1520	have "z + x - (z + y) = (z + -z) + (x - y)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1521	by (simp add: algebra_simps)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1522	with le show ?thesis
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1523	by (simp add: real_le_eq_diff[of x] real_le_eq_diff[of "z+x"] diff_minus)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1524	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1525
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1526	lemma real_sum_gt_zero_less: "(0 < S + (-W::real)) ==> (W < S)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1527	by (simp add: linorder_not_le [symmetric] real_le_eq_diff [of S] diff_minus)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1528
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1529	lemma real_less_sum_gt_zero: "(W < S) ==> (0 < S + (-W::real))"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1530	by (simp add: linorder_not_le [symmetric] real_le_eq_diff [of S] diff_minus)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1531
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1532	lemma real_mult_order: "[\| 0 < x; 0 < y \|] ==> (0::real) < x * y"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1533	apply (cases x, cases y)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1534	apply (simp add: linorder_not_le [where 'a = real, symmetric]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1535	linorder_not_le [where 'a = preal]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1536	real_zero_def real_le real_mult)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1537	--{Reduce to the (simpler) @{text "\<le>"} relation }
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1538	apply (auto dest!: less_add_left_Ex
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1539	simp add: algebra_simps preal_self_less_add_left)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1540	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1541
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1542	lemma real_mult_less_mono2: "[\| (0::real) < z; x < y \|] ==> z * x < z * y"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1543	apply (rule real_sum_gt_zero_less)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1544	apply (drule real_less_sum_gt_zero [of x y])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1545	apply (drule real_mult_order, assumption)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1546	apply (simp add: right_distrib)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1547	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1548
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1549	instantiation real :: distrib_lattice
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1550	begin
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1551
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1552	definition
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1553	"(inf \<Colon> real \<Rightarrow> real \<Rightarrow> real) = min"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1554
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1555	definition
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1556	"(sup \<Colon> real \<Rightarrow> real \<Rightarrow> real) = max"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1557
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1558	instance
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1559	by default (auto simp add: inf_real_def sup_real_def min_max.sup_inf_distrib1)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1560
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1561	end
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1562
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1563
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1564	subsection{The Reals Form an Ordered Field}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1565
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1566	instance real :: linordered_field_inverse_zero
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1567	proof
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1568	fix x y z :: real
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1569	show "x \<le> y ==> z + x \<le> z + y" by (rule real_add_left_mono)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1570	show "x < y ==> 0 < z ==> z * x < z * y" by (rule real_mult_less_mono2)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1571	show "\<bar>x\<bar> = (if x < 0 then -x else x)" by (simp only: real_abs_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1572	show "sgn x = (if x=0 then 0 else if 0<x then 1 else - 1)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1573	by (simp only: real_sgn_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1574	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1575
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1576	text{*The function @{term real_of_preal} requires many proofs, but it seems
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1577	to be essential for proving completeness of the reals from that of the
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1578	positive reals.*}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1579
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1580	lemma real_of_preal_add:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1581	"real_of_preal ((x::preal) + y) = real_of_preal x + real_of_preal y"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1582	by (simp add: real_of_preal_def real_add algebra_simps)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1583
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1584	lemma real_of_preal_mult:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1585	"real_of_preal ((x::preal) * y) = real_of_preal x* real_of_preal y"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1586	by (simp add: real_of_preal_def real_mult algebra_simps)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1587
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1588
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1589	text{Gleason prop 9-4.4 p 127}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1590	lemma real_of_preal_trichotomy:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1591	"\<exists>m. (x::real) = real_of_preal m \| x = 0 \| x = -(real_of_preal m)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1592	apply (simp add: real_of_preal_def real_zero_def, cases x)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1593	apply (auto simp add: real_minus add_ac)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1594	apply (cut_tac x = x and y = y in linorder_less_linear)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1595	apply (auto dest!: less_add_left_Ex simp add: add_assoc [symmetric])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1596	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1597
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1598	lemma real_of_preal_leD:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1599	"real_of_preal m1 \<le> real_of_preal m2 ==> m1 \<le> m2"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1600	by (simp add: real_of_preal_def real_le)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1601
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1602	lemma real_of_preal_lessI: "m1 < m2 ==> real_of_preal m1 < real_of_preal m2"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1603	by (auto simp add: real_of_preal_leD linorder_not_le [symmetric])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1604
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1605	lemma real_of_preal_lessD:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1606	"real_of_preal m1 < real_of_preal m2 ==> m1 < m2"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1607	by (simp add: real_of_preal_def real_le linorder_not_le [symmetric])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1608
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1609	lemma real_of_preal_less_iff [simp]:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1610	"(real_of_preal m1 < real_of_preal m2) = (m1 < m2)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1611	by (blast intro: real_of_preal_lessI real_of_preal_lessD)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1612
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1613	lemma real_of_preal_le_iff:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1614	"(real_of_preal m1 \<le> real_of_preal m2) = (m1 \<le> m2)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1615	by (simp add: linorder_not_less [symmetric])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1616
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1617	lemma real_of_preal_zero_less: "0 < real_of_preal m"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1618	apply (insert preal_self_less_add_left [of 1 m])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1619	apply (auto simp add: real_zero_def real_of_preal_def
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1620	real_less_def real_le_def add_ac)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1621	apply (rule_tac x="m + 1" in exI, rule_tac x="1" in exI)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1622	apply (simp add: add_ac)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1623	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1624
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1625	lemma real_of_preal_minus_less_zero: "- real_of_preal m < 0"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1626	by (simp add: real_of_preal_zero_less)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1627
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1628	lemma real_of_preal_not_minus_gt_zero: "~ 0 < - real_of_preal m"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1629	proof -
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1630	from real_of_preal_minus_less_zero
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1631	show ?thesis by (blast dest: order_less_trans)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1632	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1633
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1634
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1635	subsection{Theorems About the Ordering}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1636
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1637	lemma real_gt_zero_preal_Ex: "(0 < x) = (\<exists>y. x = real_of_preal y)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1638	apply (auto simp add: real_of_preal_zero_less)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1639	apply (cut_tac x = x in real_of_preal_trichotomy)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1640	apply (blast elim!: real_of_preal_not_minus_gt_zero [THEN notE])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1641	done
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1642
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1643	lemma real_gt_preal_preal_Ex:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1644	"real_of_preal z < x ==> \<exists>y. x = real_of_preal y"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1645	by (blast dest!: real_of_preal_zero_less [THEN order_less_trans]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1646	intro: real_gt_zero_preal_Ex [THEN iffD1])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1647
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1648	lemma real_ge_preal_preal_Ex:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1649	"real_of_preal z \<le> x ==> \<exists>y. x = real_of_preal y"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1650	by (blast dest: order_le_imp_less_or_eq real_gt_preal_preal_Ex)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1651
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1652	lemma real_less_all_preal: "y \<le> 0 ==> \<forall>x. y < real_of_preal x"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1653	by (auto elim: order_le_imp_less_or_eq [THEN disjE]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1654	intro: real_of_preal_zero_less [THEN [2] order_less_trans]
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1655	simp add: real_of_preal_zero_less)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1656
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1657	lemma real_less_all_real2: "~ 0 < y ==> \<forall>x. y < real_of_preal x"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1658	by (blast intro!: real_less_all_preal linorder_not_less [THEN iffD1])
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1659
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1660
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1661	subsection {* Completeness of Positive Reals *}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1662
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1663	text {*
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1664	Supremum property for the set of positive reals
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1665
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1666	Let @{text "P"} be a non-empty set of positive reals, with an upper
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1667	bound @{text "y"}. Then @{text "P"} has a least upper bound
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1668	(written @{text "S"}).
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1669
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1670	FIXME: Can the premise be weakened to @{text "\<forall>x \<in> P. x\<le> y"}?
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1671	*}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1672
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1673	lemma posreal_complete:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1674	assumes positive_P: "\<forall>x \<in> P. (0::real) < x"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1675	and not_empty_P: "\<exists>x. x \<in> P"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1676	and upper_bound_Ex: "\<exists>y. \<forall>x \<in> P. x<y"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1677	shows "\<exists>S. \<forall>y. (\<exists>x \<in> P. y < x) = (y < S)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1678	proof (rule exI, rule allI)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1679	fix y
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1680	let ?pP = "{w. real_of_preal w \<in> P}"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1681
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1682	show "(\<exists>x\<in>P. y < x) = (y < real_of_preal (psup ?pP))"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1683	proof (cases "0 < y")
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1684	assume neg_y: "\<not> 0 < y"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1685	show ?thesis
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1686	proof
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1687	assume "\<exists>x\<in>P. y < x"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1688	have "\<forall>x. y < real_of_preal x"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1689	using neg_y by (rule real_less_all_real2)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1690	thus "y < real_of_preal (psup ?pP)" ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1691	next
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1692	assume "y < real_of_preal (psup ?pP)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1693	obtain "x" where x_in_P: "x \<in> P" using not_empty_P ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1694	hence "0 < x" using positive_P by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1695	hence "y < x" using neg_y by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1696	thus "\<exists>x \<in> P. y < x" using x_in_P ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1697	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1698	next
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1699	assume pos_y: "0 < y"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1700
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1701	then obtain py where y_is_py: "y = real_of_preal py"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1702	by (auto simp add: real_gt_zero_preal_Ex)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1703
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1704	obtain a where "a \<in> P" using not_empty_P ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1705	with positive_P have a_pos: "0 < a" ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1706	then obtain pa where "a = real_of_preal pa"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1707	by (auto simp add: real_gt_zero_preal_Ex)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1708	hence "pa \<in> ?pP" using `a \<in> P` by auto
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1709	hence pP_not_empty: "?pP \<noteq> {}" by auto
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1710
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1711	obtain sup where sup: "\<forall>x \<in> P. x < sup"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1712	using upper_bound_Ex ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1713	from this and `a \<in> P` have "a < sup" ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1714	hence "0 < sup" using a_pos by arith
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1715	then obtain possup where "sup = real_of_preal possup"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1716	by (auto simp add: real_gt_zero_preal_Ex)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1717	hence "\<forall>X \<in> ?pP. X \<le> possup"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1718	using sup by (auto simp add: real_of_preal_lessI)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1719	with pP_not_empty have psup: "\<And>Z. (\<exists>X \<in> ?pP. Z < X) = (Z < psup ?pP)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1720	by (rule preal_complete)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1721
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1722	show ?thesis
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1723	proof
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1724	assume "\<exists>x \<in> P. y < x"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1725	then obtain x where x_in_P: "x \<in> P" and y_less_x: "y < x" ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1726	hence "0 < x" using pos_y by arith
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1727	then obtain px where x_is_px: "x = real_of_preal px"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1728	by (auto simp add: real_gt_zero_preal_Ex)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1729
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1730	have py_less_X: "\<exists>X \<in> ?pP. py < X"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1731	proof
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1732	show "py < px" using y_is_py and x_is_px and y_less_x
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1733	by (simp add: real_of_preal_lessI)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1734	show "px \<in> ?pP" using x_in_P and x_is_px by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1735	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1736
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1737	have "(\<exists>X \<in> ?pP. py < X) ==> (py < psup ?pP)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1738	using psup by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1739	hence "py < psup ?pP" using py_less_X by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1740	thus "y < real_of_preal (psup {w. real_of_preal w \<in> P})"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1741	using y_is_py and pos_y by (simp add: real_of_preal_lessI)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1742	next
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1743	assume y_less_psup: "y < real_of_preal (psup ?pP)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1744
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1745	hence "py < psup ?pP" using y_is_py
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1746	by (simp add: real_of_preal_lessI)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1747	then obtain "X" where py_less_X: "py < X" and X_in_pP: "X \<in> ?pP"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1748	using psup by auto
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1749	then obtain x where x_is_X: "x = real_of_preal X"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1750	by (simp add: real_gt_zero_preal_Ex)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1751	hence "y < x" using py_less_X and y_is_py
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1752	by (simp add: real_of_preal_lessI)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1753
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1754	moreover have "x \<in> P" using x_is_X and X_in_pP by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1755
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1756	ultimately show "\<exists> x \<in> P. y < x" ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1757	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1758	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1759	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1760
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1761	text {*
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1762	\medskip Completeness properties using @{text "isUb"}, @{text "isLub"} etc.
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1763	*}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1764
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1765	lemma posreals_complete:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1766	assumes positive_S: "\<forall>x \<in> S. 0 < x"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1767	and not_empty_S: "\<exists>x. x \<in> S"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1768	and upper_bound_Ex: "\<exists>u. isUb (UNIV::real set) S u"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1769	shows "\<exists>t. isLub (UNIV::real set) S t"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1770	proof
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1771	let ?pS = "{w. real_of_preal w \<in> S}"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1772
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1773	obtain u where "isUb UNIV S u" using upper_bound_Ex ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1774	hence sup: "\<forall>x \<in> S. x \<le> u" by (simp add: isUb_def setle_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1775
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1776	obtain x where x_in_S: "x \<in> S" using not_empty_S ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1777	hence x_gt_zero: "0 < x" using positive_S by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1778	have "x \<le> u" using sup and x_in_S ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1779	hence "0 < u" using x_gt_zero by arith
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1780
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1781	then obtain pu where u_is_pu: "u = real_of_preal pu"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1782	by (auto simp add: real_gt_zero_preal_Ex)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1783
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1784	have pS_less_pu: "\<forall>pa \<in> ?pS. pa \<le> pu"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1785	proof
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1786	fix pa
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1787	assume "pa \<in> ?pS"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1788	then obtain a where "a \<in> S" and "a = real_of_preal pa"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1789	by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1790	moreover hence "a \<le> u" using sup by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1791	ultimately show "pa \<le> pu"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1792	using sup and u_is_pu by (simp add: real_of_preal_le_iff)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1793	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1794
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1795	have "\<forall>y \<in> S. y \<le> real_of_preal (psup ?pS)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1796	proof
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1797	fix y
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1798	assume y_in_S: "y \<in> S"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1799	hence "0 < y" using positive_S by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1800	then obtain py where y_is_py: "y = real_of_preal py"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1801	by (auto simp add: real_gt_zero_preal_Ex)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1802	hence py_in_pS: "py \<in> ?pS" using y_in_S by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1803	with pS_less_pu have "py \<le> psup ?pS"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1804	by (rule preal_psup_le)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1805	thus "y \<le> real_of_preal (psup ?pS)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1806	using y_is_py by (simp add: real_of_preal_le_iff)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1807	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1808
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1809	moreover {
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1810	fix x
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1811	assume x_ub_S: "\<forall>y\<in>S. y \<le> x"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1812	have "real_of_preal (psup ?pS) \<le> x"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1813	proof -
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1814	obtain "s" where s_in_S: "s \<in> S" using not_empty_S ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1815	hence s_pos: "0 < s" using positive_S by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1816
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1817	hence "\<exists> ps. s = real_of_preal ps" by (simp add: real_gt_zero_preal_Ex)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1818	then obtain "ps" where s_is_ps: "s = real_of_preal ps" ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1819	hence ps_in_pS: "ps \<in> {w. real_of_preal w \<in> S}" using s_in_S by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1820
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1821	from x_ub_S have "s \<le> x" using s_in_S ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1822	hence "0 < x" using s_pos by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1823	hence "\<exists> px. x = real_of_preal px" by (simp add: real_gt_zero_preal_Ex)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1824	then obtain "px" where x_is_px: "x = real_of_preal px" ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1825
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1826	have "\<forall>pe \<in> ?pS. pe \<le> px"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1827	proof
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1828	fix pe
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1829	assume "pe \<in> ?pS"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1830	hence "real_of_preal pe \<in> S" by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1831	hence "real_of_preal pe \<le> x" using x_ub_S by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1832	thus "pe \<le> px" using x_is_px by (simp add: real_of_preal_le_iff)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1833	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1834
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1835	moreover have "?pS \<noteq> {}" using ps_in_pS by auto
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1836	ultimately have "(psup ?pS) \<le> px" by (simp add: psup_le_ub)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1837	thus "real_of_preal (psup ?pS) \<le> x" using x_is_px by (simp add: real_of_preal_le_iff)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1838	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1839	}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1840	ultimately show "isLub UNIV S (real_of_preal (psup ?pS))"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1841	by (simp add: isLub_def leastP_def isUb_def setle_def setge_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1842	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1843
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1844	text {*
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1845	\medskip reals Completeness (again!)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1846	*}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1847
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1848	lemma reals_complete:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1849	assumes notempty_S: "\<exists>X. X \<in> S"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1850	and exists_Ub: "\<exists>Y. isUb (UNIV::real set) S Y"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1851	shows "\<exists>t. isLub (UNIV :: real set) S t"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1852	proof -
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1853	obtain X where X_in_S: "X \<in> S" using notempty_S ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1854	obtain Y where Y_isUb: "isUb (UNIV::real set) S Y"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1855	using exists_Ub ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1856	let ?SHIFT = "{z. \<exists>x \<in>S. z = x + (-X) + 1} \<inter> {x. 0 < x}"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1857
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1858	{
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1859	fix x
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1860	assume "isUb (UNIV::real set) S x"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1861	hence S_le_x: "\<forall> y \<in> S. y <= x"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1862	by (simp add: isUb_def setle_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1863	{
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1864	fix s
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1865	assume "s \<in> {z. \<exists>x\<in>S. z = x + - X + 1}"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1866	hence "\<exists> x \<in> S. s = x + -X + 1" ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1867	then obtain x1 where "x1 \<in> S" and "s = x1 + (-X) + 1" ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1868	moreover hence "x1 \<le> x" using S_le_x by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1869	ultimately have "s \<le> x + - X + 1" by arith
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1870	}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1871	then have "isUb (UNIV::real set) ?SHIFT (x + (-X) + 1)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1872	by (auto simp add: isUb_def setle_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1873	} note S_Ub_is_SHIFT_Ub = this
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1874
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1875	hence "isUb UNIV ?SHIFT (Y + (-X) + 1)" using Y_isUb by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1876	hence "\<exists>Z. isUb UNIV ?SHIFT Z" ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1877	moreover have "\<forall>y \<in> ?SHIFT. 0 < y" by auto
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1878	moreover have shifted_not_empty: "\<exists>u. u \<in> ?SHIFT"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1879	using X_in_S and Y_isUb by auto
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1880	ultimately obtain t where t_is_Lub: "isLub UNIV ?SHIFT t"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1881	using posreals_complete [of ?SHIFT] by blast
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1882
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1883	show ?thesis
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1884	proof
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1885	show "isLub UNIV S (t + X + (-1))"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1886	proof (rule isLubI2)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1887	{
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1888	fix x
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1889	assume "isUb (UNIV::real set) S x"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1890	hence "isUb (UNIV::real set) (?SHIFT) (x + (-X) + 1)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1891	using S_Ub_is_SHIFT_Ub by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1892	hence "t \<le> (x + (-X) + 1)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1893	using t_is_Lub by (simp add: isLub_le_isUb)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1894	hence "t + X + -1 \<le> x" by arith
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1895	}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1896	then show "(t + X + -1) <=* Collect (isUb UNIV S)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1897	by (simp add: setgeI)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1898	next
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1899	show "isUb UNIV S (t + X + -1)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1900	proof -
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1901	{
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1902	fix y
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1903	assume y_in_S: "y \<in> S"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1904	have "y \<le> t + X + -1"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1905	proof -
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1906	obtain "u" where u_in_shift: "u \<in> ?SHIFT" using shifted_not_empty ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1907	hence "\<exists> x \<in> S. u = x + - X + 1" by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1908	then obtain "x" where x_and_u: "u = x + - X + 1" ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1909	have u_le_t: "u \<le> t" using u_in_shift and t_is_Lub by (simp add: isLubD2)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1910
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1911	show ?thesis
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1912	proof cases
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1913	assume "y \<le> x"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1914	moreover have "x = u + X + - 1" using x_and_u by arith
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1915	moreover have "u + X + - 1 \<le> t + X + -1" using u_le_t by arith
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1916	ultimately show "y \<le> t + X + -1" by arith
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1917	next
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1918	assume "~(y \<le> x)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1919	hence x_less_y: "x < y" by arith
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1920
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1921	have "x + (-X) + 1 \<in> ?SHIFT" using x_and_u and u_in_shift by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1922	hence "0 < x + (-X) + 1" by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1923	hence "0 < y + (-X) + 1" using x_less_y by arith
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1924	hence "y + (-X) + 1 \<in> ?SHIFT" using y_in_S by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1925	hence "y + (-X) + 1 \<le> t" using t_is_Lub by (simp add: isLubD2)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1926	thus ?thesis by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1927	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1928	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1929	}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1930	then show ?thesis by (simp add: isUb_def setle_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1931	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1932	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1933	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1934	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1935
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1936	text{A version of the same theorem without all those predicates!}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1937	lemma reals_complete2:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1938	fixes S :: "(real set)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1939	assumes "\<exists>y. y\<in>S" and "\<exists>(x::real). \<forall>y\<in>S. y \<le> x"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1940	shows "\<exists>x. (\<forall>y\<in>S. y \<le> x) &
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1941	(\<forall>z. ((\<forall>y\<in>S. y \<le> z) --> x \<le> z))"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1942	proof -
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1943	have "\<exists>x. isLub UNIV S x"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1944	by (rule reals_complete)
41541 1fa4725c4656 eliminated global prems; wenzelm parents: 40822 diff changeset	1945	(auto simp add: isLub_def isUb_def leastP_def setle_def setge_def assms)
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1946	thus ?thesis
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1947	by (metis UNIV_I isLub_isUb isLub_le_isUb isUbD isUb_def setleI)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1948	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1949
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1950
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1951	subsection {* The Archimedean Property of the Reals *}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1952
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1953	theorem reals_Archimedean:
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1954	fixes x :: real
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1955	assumes x_pos: "0 < x"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1956	shows "\<exists>n. inverse (of_nat (Suc n)) < x"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1957	proof (rule ccontr)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1958	assume contr: "\<not> ?thesis"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1959	have "\<forall>n. x * of_nat (Suc n) <= 1"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1960	proof
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1961	fix n
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1962	from contr have "x \<le> inverse (of_nat (Suc n))"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1963	by (simp add: linorder_not_less)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1964	hence "x \<le> (1 / (of_nat (Suc n)))"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1965	by (simp add: inverse_eq_divide)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1966	moreover have "(0::real) \<le> of_nat (Suc n)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1967	by (rule of_nat_0_le_iff)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1968	ultimately have "x * of_nat (Suc n) \<le> (1 / of_nat (Suc n)) * of_nat (Suc n)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1969	by (rule mult_right_mono)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1970	thus "x * of_nat (Suc n) \<le> 1" by (simp del: of_nat_Suc)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1971	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1972	hence "{z. \<exists>n. z = x * (of_nat (Suc n))} *<= 1"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1973	by (simp add: setle_def del: of_nat_Suc, safe, rule spec)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1974	hence "isUb (UNIV::real set) {z. \<exists>n. z = x * (of_nat (Suc n))} 1"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1975	by (simp add: isUbI)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1976	hence "\<exists>Y. isUb (UNIV::real set) {z. \<exists>n. z = x* (of_nat (Suc n))} Y" ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1977	moreover have "\<exists>X. X \<in> {z. \<exists>n. z = x* (of_nat (Suc n))}" by auto
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1978	ultimately have "\<exists>t. isLub UNIV {z. \<exists>n. z = x * of_nat (Suc n)} t"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1979	by (simp add: reals_complete)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1980	then obtain "t" where
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1981	t_is_Lub: "isLub UNIV {z. \<exists>n. z = x * of_nat (Suc n)} t" ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1982
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1983	have "\<forall>n::nat. x * of_nat n \<le> t + - x"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1984	proof
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1985	fix n
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1986	from t_is_Lub have "x * of_nat (Suc n) \<le> t"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1987	by (simp add: isLubD2)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1988	hence "x * (of_nat n) + x \<le> t"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1989	by (simp add: right_distrib)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1990	thus "x * (of_nat n) \<le> t + - x" by arith
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1991	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1992
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1993	hence "\<forall>m. x * of_nat (Suc m) \<le> t + - x" by (simp del: of_nat_Suc)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1994	hence "{z. \<exists>n. z = x * (of_nat (Suc n))} *<= (t + - x)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1995	by (auto simp add: setle_def)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1996	hence "isUb (UNIV::real set) {z. \<exists>n. z = x * (of_nat (Suc n))} (t + (-x))"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1997	by (simp add: isUbI)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1998	hence "t \<le> t + - x"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	1999	using t_is_Lub by (simp add: isLub_le_isUb)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2000	thus False using x_pos by arith
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2001	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2002
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2003	text {*
37388 793618618f78 tuned quotes, antiquotations and whitespace haftmann parents: 36794 diff changeset	2004	There must be other proofs, e.g. @{text Suc} of the largest
36793 27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2005	integer in the cut representing @{text "x"}.
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2006	*}
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2007
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2008	lemma reals_Archimedean2: "\<exists>n. (x::real) < of_nat (n::nat)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2009	proof cases
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2010	assume "x \<le> 0"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2011	hence "x < of_nat (1::nat)" by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2012	thus ?thesis ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2013	next
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2014	assume "\<not> x \<le> 0"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2015	hence x_greater_zero: "0 < x" by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2016	hence "0 < inverse x" by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2017	then obtain n where "inverse (of_nat (Suc n)) < inverse x"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2018	using reals_Archimedean by blast
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2019	hence "inverse (of_nat (Suc n)) * x < inverse x * x"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2020	using x_greater_zero by (rule mult_strict_right_mono)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2021	hence "inverse (of_nat (Suc n)) * x < 1"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2022	using x_greater_zero by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2023	hence "of_nat (Suc n) * (inverse (of_nat (Suc n)) * x) < of_nat (Suc n) * 1"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2024	by (rule mult_strict_left_mono) (simp del: of_nat_Suc)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2025	hence "x < of_nat (Suc n)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2026	by (simp add: algebra_simps del: of_nat_Suc)
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2027	thus "\<exists>(n::nat). x < of_nat n" ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2028	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2029
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2030	instance real :: archimedean_field
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2031	proof
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2032	fix r :: real
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2033	obtain n :: nat where "r < of_nat n"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2034	using reals_Archimedean2 ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2035	then have "r \<le> of_int (int n)"
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2036	by simp
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2037	then show "\<exists>z. r \<le> of_int z" ..
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2038	qed
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2039
27da0a27b76f put construction of reals using Dedekind cuts in HOL/ex huffman parents: diff changeset	2040	end

author	Christian Sternagel
	Thu, 30 Aug 2012 15:44:03 +0900
changeset 49093	fdc301f592c4
parent 47108	2a1953f0d20d
child 49834	b27bbb021df1
permissions	-rw-r--r--