isabelle: src/HOL/Decision_Procs/Ferrack.thy@c845adaecf98 (annotated)

30439 57c68b3af2ea Updated paths in Decision_Procs comments and NEWS hoelzl parents: 30042 diff changeset	1	(* Title: HOL/Decision_Procs/Ferrack.thy
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2	Author: Amine Chaieb
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	3	*)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	4
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	5	theory Ferrack
41413 64cd30d6b0b8 explicit file specifications -- avoid secondary load path; wenzelm parents: 38795 diff changeset	6	imports Complex_Main Dense_Linear_Order "~~/src/HOL/Library/Efficient_Nat"
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	7	uses ("ferrack_tac.ML")
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	8	begin
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	9
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	10	section {* Quantifier elimination for @{text "\<real> (0, 1, +, <)"} *}
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	11
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	12	(*********************************************************************************)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	13	(* SOME GENERAL STUFF< HAS TO BE MOVED IN SOME LIB *)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	14	(*********************************************************************************)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	15
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	16	primrec alluopairs:: "'a list \<Rightarrow> ('a \<times> 'a) list" where
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	17	"alluopairs [] = []"
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	18	\| "alluopairs (x#xs) = (map (Pair x) (x#xs))@(alluopairs xs)"
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	19
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	20	lemma alluopairs_set1: "set (alluopairs xs) \<le> {(x,y). x\<in> set xs \<and> y\<in> set xs}"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	21	by (induct xs, auto)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	22
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	23	lemma alluopairs_set:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	24	"\<lbrakk>x\<in> set xs ; y \<in> set xs\<rbrakk> \<Longrightarrow> (x,y) \<in> set (alluopairs xs) \<or> (y,x) \<in> set (alluopairs xs) "
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	25	by (induct xs, auto)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	26
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	27	lemma alluopairs_ex:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	28	assumes Pc: "\<forall> x y. P x y = P y x"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	29	shows "(\<exists> x \<in> set xs. \<exists> y \<in> set xs. P x y) = (\<exists> (x,y) \<in> set (alluopairs xs). P x y)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	30	proof
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	31	assume "\<exists>x\<in>set xs. \<exists>y\<in>set xs. P x y"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	32	then obtain x y where x: "x \<in> set xs" and y:"y \<in> set xs" and P: "P x y" by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	33	from alluopairs_set[OF x y] P Pc show"\<exists>(x, y)\<in>set (alluopairs xs). P x y"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	34	by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	35	next
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	36	assume "\<exists>(x, y)\<in>set (alluopairs xs). P x y"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	37	then obtain "x" and "y" where xy:"(x,y) \<in> set (alluopairs xs)" and P: "P x y" by blast+
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	38	from xy have "x \<in> set xs \<and> y\<in> set xs" using alluopairs_set1 by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	39	with P show "\<exists>x\<in>set xs. \<exists>y\<in>set xs. P x y" by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	40	qed
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	41
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	42	lemma nth_pos2: "0 < n \<Longrightarrow> (x#xs) ! n = xs ! (n - 1)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	43	using Nat.gr0_conv_Suc
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	44	by clarsimp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	45
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	46
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	47	(*********************************************************************************)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	48	(** SHADOW SYNTAX AND SEMANTICS **)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	49	(*********************************************************************************)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	50
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	51	datatype num = C int \| Bound nat \| CN nat int num \| Neg num \| Add num num\| Sub num num
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	52	\| Mul int num
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	53
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	54	(* A size for num to make inductive proofs simpler*)
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	55	primrec num_size :: "num \<Rightarrow> nat" where
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	56	"num_size (C c) = 1"
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	57	\| "num_size (Bound n) = 1"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	58	\| "num_size (Neg a) = 1 + num_size a"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	59	\| "num_size (Add a b) = 1 + num_size a + num_size b"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	60	\| "num_size (Sub a b) = 3 + num_size a + num_size b"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	61	\| "num_size (Mul c a) = 1 + num_size a"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	62	\| "num_size (CN n c a) = 3 + num_size a "
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	63
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	64	(* Semantics of numeral terms (num) *)
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	65	primrec Inum :: "real list \<Rightarrow> num \<Rightarrow> real" where
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	66	"Inum bs (C c) = (real c)"
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	67	\| "Inum bs (Bound n) = bs!n"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	68	\| "Inum bs (CN n c a) = (real c) * (bs!n) + (Inum bs a)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	69	\| "Inum bs (Neg a) = -(Inum bs a)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	70	\| "Inum bs (Add a b) = Inum bs a + Inum bs b"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	71	\| "Inum bs (Sub a b) = Inum bs a - Inum bs b"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	72	\| "Inum bs (Mul c a) = (real c) * Inum bs a"
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	73	(* FORMULAE *)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	74	datatype fm =
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	75	T\| F\| Lt num\| Le num\| Gt num\| Ge num\| Eq num\| NEq num\|
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	76	NOT fm\| And fm fm\| Or fm fm\| Imp fm fm\| Iff fm fm\| E fm\| A fm
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	77
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	78
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	79	(* A size for fm *)
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	80	fun fmsize :: "fm \<Rightarrow> nat" where
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	81	"fmsize (NOT p) = 1 + fmsize p"
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	82	\| "fmsize (And p q) = 1 + fmsize p + fmsize q"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	83	\| "fmsize (Or p q) = 1 + fmsize p + fmsize q"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	84	\| "fmsize (Imp p q) = 3 + fmsize p + fmsize q"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	85	\| "fmsize (Iff p q) = 3 + 2*(fmsize p + fmsize q)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	86	\| "fmsize (E p) = 1 + fmsize p"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	87	\| "fmsize (A p) = 4+ fmsize p"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	88	\| "fmsize p = 1"
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	89	(* several lemmas about fmsize *)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	90	lemma fmsize_pos: "fmsize p > 0"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	91	by (induct p rule: fmsize.induct) simp_all
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	92
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	93	(* Semantics of formulae (fm) *)
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	94	primrec Ifm ::"real list \<Rightarrow> fm \<Rightarrow> bool" where
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	95	"Ifm bs T = True"
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	96	\| "Ifm bs F = False"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	97	\| "Ifm bs (Lt a) = (Inum bs a < 0)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	98	\| "Ifm bs (Gt a) = (Inum bs a > 0)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	99	\| "Ifm bs (Le a) = (Inum bs a \<le> 0)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	100	\| "Ifm bs (Ge a) = (Inum bs a \<ge> 0)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	101	\| "Ifm bs (Eq a) = (Inum bs a = 0)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	102	\| "Ifm bs (NEq a) = (Inum bs a \<noteq> 0)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	103	\| "Ifm bs (NOT p) = (\<not> (Ifm bs p))"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	104	\| "Ifm bs (And p q) = (Ifm bs p \<and> Ifm bs q)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	105	\| "Ifm bs (Or p q) = (Ifm bs p \<or> Ifm bs q)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	106	\| "Ifm bs (Imp p q) = ((Ifm bs p) \<longrightarrow> (Ifm bs q))"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	107	\| "Ifm bs (Iff p q) = (Ifm bs p = Ifm bs q)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	108	\| "Ifm bs (E p) = (\<exists> x. Ifm (x#bs) p)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	109	\| "Ifm bs (A p) = (\<forall> x. Ifm (x#bs) p)"
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	110
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	111	lemma IfmLeSub: "\<lbrakk> Inum bs s = s' ; Inum bs t = t' \<rbrakk> \<Longrightarrow> Ifm bs (Le (Sub s t)) = (s' \<le> t')"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	112	apply simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	113	done
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	114
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	115	lemma IfmLtSub: "\<lbrakk> Inum bs s = s' ; Inum bs t = t' \<rbrakk> \<Longrightarrow> Ifm bs (Lt (Sub s t)) = (s' < t')"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	116	apply simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	117	done
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	118	lemma IfmEqSub: "\<lbrakk> Inum bs s = s' ; Inum bs t = t' \<rbrakk> \<Longrightarrow> Ifm bs (Eq (Sub s t)) = (s' = t')"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	119	apply simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	120	done
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	121	lemma IfmNOT: " (Ifm bs p = P) \<Longrightarrow> (Ifm bs (NOT p) = (\<not>P))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	122	apply simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	123	done
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	124	lemma IfmAnd: " \<lbrakk> Ifm bs p = P ; Ifm bs q = Q\<rbrakk> \<Longrightarrow> (Ifm bs (And p q) = (P \<and> Q))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	125	apply simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	126	done
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	127	lemma IfmOr: " \<lbrakk> Ifm bs p = P ; Ifm bs q = Q\<rbrakk> \<Longrightarrow> (Ifm bs (Or p q) = (P \<or> Q))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	128	apply simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	129	done
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	130	lemma IfmImp: " \<lbrakk> Ifm bs p = P ; Ifm bs q = Q\<rbrakk> \<Longrightarrow> (Ifm bs (Imp p q) = (P \<longrightarrow> Q))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	131	apply simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	132	done
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	133	lemma IfmIff: " \<lbrakk> Ifm bs p = P ; Ifm bs q = Q\<rbrakk> \<Longrightarrow> (Ifm bs (Iff p q) = (P = Q))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	134	apply simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	135	done
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	136
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	137	lemma IfmE: " (!! x. Ifm (x#bs) p = P x) \<Longrightarrow> (Ifm bs (E p) = (\<exists>x. P x))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	138	apply simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	139	done
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	140	lemma IfmA: " (!! x. Ifm (x#bs) p = P x) \<Longrightarrow> (Ifm bs (A p) = (\<forall>x. P x))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	141	apply simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	142	done
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	143
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	144	fun not:: "fm \<Rightarrow> fm" where
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	145	"not (NOT p) = p"
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	146	\| "not T = F"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	147	\| "not F = T"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	148	\| "not p = NOT p"
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	149	lemma not[simp]: "Ifm bs (not p) = Ifm bs (NOT p)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	150	by (cases p) auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	151
35416 d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 33639 diff changeset	152	definition conj :: "fm \<Rightarrow> fm \<Rightarrow> fm" where
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	153	"conj p q = (if (p = F \<or> q=F) then F else if p=T then q else if q=T then p else
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	154	if p = q then p else And p q)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	155	lemma conj[simp]: "Ifm bs (conj p q) = Ifm bs (And p q)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	156	by (cases "p=F \<or> q=F",simp_all add: conj_def) (cases p,simp_all)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	157
35416 d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 33639 diff changeset	158	definition disj :: "fm \<Rightarrow> fm \<Rightarrow> fm" where
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	159	"disj p q = (if (p = T \<or> q=T) then T else if p=F then q else if q=F then p
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	160	else if p=q then p else Or p q)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	161
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	162	lemma disj[simp]: "Ifm bs (disj p q) = Ifm bs (Or p q)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	163	by (cases "p=T \<or> q=T",simp_all add: disj_def) (cases p,simp_all)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	164
35416 d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 33639 diff changeset	165	definition imp :: "fm \<Rightarrow> fm \<Rightarrow> fm" where
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	166	"imp p q = (if (p = F \<or> q=T \<or> p=q) then T else if p=T then q else if q=F then not p
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	167	else Imp p q)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	168	lemma imp[simp]: "Ifm bs (imp p q) = Ifm bs (Imp p q)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	169	by (cases "p=F \<or> q=T",simp_all add: imp_def)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	170
35416 d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 33639 diff changeset	171	definition iff :: "fm \<Rightarrow> fm \<Rightarrow> fm" where
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	172	"iff p q = (if (p = q) then T else if (p = NOT q \<or> NOT p = q) then F else
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	173	if p=F then not q else if q=F then not p else if p=T then q else if q=T then p else
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	174	Iff p q)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	175	lemma iff[simp]: "Ifm bs (iff p q) = Ifm bs (Iff p q)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	176	by (unfold iff_def,cases "p=q", simp,cases "p=NOT q", simp) (cases "NOT p= q", auto)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	177
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	178	lemma conj_simps:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	179	"conj F Q = F"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	180	"conj P F = F"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	181	"conj T Q = Q"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	182	"conj P T = P"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	183	"conj P P = P"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	184	"P \<noteq> T \<Longrightarrow> P \<noteq> F \<Longrightarrow> Q \<noteq> T \<Longrightarrow> Q \<noteq> F \<Longrightarrow> P \<noteq> Q \<Longrightarrow> conj P Q = And P Q"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	185	by (simp_all add: conj_def)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	186
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	187	lemma disj_simps:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	188	"disj T Q = T"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	189	"disj P T = T"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	190	"disj F Q = Q"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	191	"disj P F = P"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	192	"disj P P = P"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	193	"P \<noteq> T \<Longrightarrow> P \<noteq> F \<Longrightarrow> Q \<noteq> T \<Longrightarrow> Q \<noteq> F \<Longrightarrow> P \<noteq> Q \<Longrightarrow> disj P Q = Or P Q"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	194	by (simp_all add: disj_def)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	195	lemma imp_simps:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	196	"imp F Q = T"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	197	"imp P T = T"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	198	"imp T Q = Q"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	199	"imp P F = not P"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	200	"imp P P = T"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	201	"P \<noteq> T \<Longrightarrow> P \<noteq> F \<Longrightarrow> P \<noteq> Q \<Longrightarrow> Q \<noteq> T \<Longrightarrow> Q \<noteq> F \<Longrightarrow> imp P Q = Imp P Q"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	202	by (simp_all add: imp_def)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	203	lemma trivNOT: "p \<noteq> NOT p" "NOT p \<noteq> p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	204	apply (induct p, auto)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	205	done
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	206
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	207	lemma iff_simps:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	208	"iff p p = T"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	209	"iff p (NOT p) = F"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	210	"iff (NOT p) p = F"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	211	"iff p F = not p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	212	"iff F p = not p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	213	"p \<noteq> NOT T \<Longrightarrow> iff T p = p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	214	"p\<noteq> NOT T \<Longrightarrow> iff p T = p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	215	"p\<noteq>q \<Longrightarrow> p\<noteq> NOT q \<Longrightarrow> q\<noteq> NOT p \<Longrightarrow> p\<noteq> F \<Longrightarrow> q\<noteq> F \<Longrightarrow> p \<noteq> T \<Longrightarrow> q \<noteq> T \<Longrightarrow> iff p q = Iff p q"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	216	using trivNOT
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	217	by (simp_all add: iff_def, cases p, auto)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	218	(* Quantifier freeness *)
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	219	fun qfree:: "fm \<Rightarrow> bool" where
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	220	"qfree (E p) = False"
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	221	\| "qfree (A p) = False"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	222	\| "qfree (NOT p) = qfree p"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	223	\| "qfree (And p q) = (qfree p \<and> qfree q)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	224	\| "qfree (Or p q) = (qfree p \<and> qfree q)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	225	\| "qfree (Imp p q) = (qfree p \<and> qfree q)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	226	\| "qfree (Iff p q) = (qfree p \<and> qfree q)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	227	\| "qfree p = True"
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	228
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	229	(* Boundedness and substitution *)
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	230	primrec numbound0:: "num \<Rightarrow> bool" (* a num is INDEPENDENT of Bound 0 *) where
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	231	"numbound0 (C c) = True"
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	232	\| "numbound0 (Bound n) = (n>0)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	233	\| "numbound0 (CN n c a) = (n\<noteq>0 \<and> numbound0 a)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	234	\| "numbound0 (Neg a) = numbound0 a"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	235	\| "numbound0 (Add a b) = (numbound0 a \<and> numbound0 b)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	236	\| "numbound0 (Sub a b) = (numbound0 a \<and> numbound0 b)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	237	\| "numbound0 (Mul i a) = numbound0 a"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	238
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	239	lemma numbound0_I:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	240	assumes nb: "numbound0 a"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	241	shows "Inum (b#bs) a = Inum (b'#bs) a"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	242	using nb
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	243	by (induct a) (simp_all add: nth_pos2)
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	244
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	245	primrec bound0:: "fm \<Rightarrow> bool" (* A Formula is independent of Bound 0 *) where
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	246	"bound0 T = True"
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	247	\| "bound0 F = True"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	248	\| "bound0 (Lt a) = numbound0 a"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	249	\| "bound0 (Le a) = numbound0 a"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	250	\| "bound0 (Gt a) = numbound0 a"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	251	\| "bound0 (Ge a) = numbound0 a"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	252	\| "bound0 (Eq a) = numbound0 a"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	253	\| "bound0 (NEq a) = numbound0 a"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	254	\| "bound0 (NOT p) = bound0 p"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	255	\| "bound0 (And p q) = (bound0 p \<and> bound0 q)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	256	\| "bound0 (Or p q) = (bound0 p \<and> bound0 q)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	257	\| "bound0 (Imp p q) = ((bound0 p) \<and> (bound0 q))"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	258	\| "bound0 (Iff p q) = (bound0 p \<and> bound0 q)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	259	\| "bound0 (E p) = False"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	260	\| "bound0 (A p) = False"
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	261
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	262	lemma bound0_I:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	263	assumes bp: "bound0 p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	264	shows "Ifm (b#bs) p = Ifm (b'#bs) p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	265	using bp numbound0_I[where b="b" and bs="bs" and b'="b'"]
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	266	by (induct p) (auto simp add: nth_pos2)
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	267
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	268	lemma not_qf[simp]: "qfree p \<Longrightarrow> qfree (not p)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	269	by (cases p, auto)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	270	lemma not_bn[simp]: "bound0 p \<Longrightarrow> bound0 (not p)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	271	by (cases p, auto)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	272
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	273
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	274	lemma conj_qf[simp]: "\<lbrakk>qfree p ; qfree q\<rbrakk> \<Longrightarrow> qfree (conj p q)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	275	using conj_def by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	276	lemma conj_nb[simp]: "\<lbrakk>bound0 p ; bound0 q\<rbrakk> \<Longrightarrow> bound0 (conj p q)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	277	using conj_def by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	278
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	279	lemma disj_qf[simp]: "\<lbrakk>qfree p ; qfree q\<rbrakk> \<Longrightarrow> qfree (disj p q)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	280	using disj_def by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	281	lemma disj_nb[simp]: "\<lbrakk>bound0 p ; bound0 q\<rbrakk> \<Longrightarrow> bound0 (disj p q)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	282	using disj_def by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	283
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	284	lemma imp_qf[simp]: "\<lbrakk>qfree p ; qfree q\<rbrakk> \<Longrightarrow> qfree (imp p q)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	285	using imp_def by (cases "p=F \<or> q=T",simp_all add: imp_def)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	286	lemma imp_nb[simp]: "\<lbrakk>bound0 p ; bound0 q\<rbrakk> \<Longrightarrow> bound0 (imp p q)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	287	using imp_def by (cases "p=F \<or> q=T \<or> p=q",simp_all add: imp_def)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	288
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	289	lemma iff_qf[simp]: "\<lbrakk>qfree p ; qfree q\<rbrakk> \<Longrightarrow> qfree (iff p q)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	290	by (unfold iff_def,cases "p=q", auto)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	291	lemma iff_nb[simp]: "\<lbrakk>bound0 p ; bound0 q\<rbrakk> \<Longrightarrow> bound0 (iff p q)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	292	using iff_def by (unfold iff_def,cases "p=q", auto)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	293
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	294	fun decrnum:: "num \<Rightarrow> num" where
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	295	"decrnum (Bound n) = Bound (n - 1)"
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	296	\| "decrnum (Neg a) = Neg (decrnum a)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	297	\| "decrnum (Add a b) = Add (decrnum a) (decrnum b)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	298	\| "decrnum (Sub a b) = Sub (decrnum a) (decrnum b)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	299	\| "decrnum (Mul c a) = Mul c (decrnum a)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	300	\| "decrnum (CN n c a) = CN (n - 1) c (decrnum a)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	301	\| "decrnum a = a"
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	302
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	303	fun decr :: "fm \<Rightarrow> fm" where
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	304	"decr (Lt a) = Lt (decrnum a)"
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	305	\| "decr (Le a) = Le (decrnum a)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	306	\| "decr (Gt a) = Gt (decrnum a)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	307	\| "decr (Ge a) = Ge (decrnum a)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	308	\| "decr (Eq a) = Eq (decrnum a)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	309	\| "decr (NEq a) = NEq (decrnum a)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	310	\| "decr (NOT p) = NOT (decr p)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	311	\| "decr (And p q) = conj (decr p) (decr q)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	312	\| "decr (Or p q) = disj (decr p) (decr q)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	313	\| "decr (Imp p q) = imp (decr p) (decr q)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	314	\| "decr (Iff p q) = iff (decr p) (decr q)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	315	\| "decr p = p"
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	316
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	317	lemma decrnum: assumes nb: "numbound0 t"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	318	shows "Inum (x#bs) t = Inum bs (decrnum t)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	319	using nb by (induct t rule: decrnum.induct, simp_all add: nth_pos2)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	320
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	321	lemma decr: assumes nb: "bound0 p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	322	shows "Ifm (x#bs) p = Ifm bs (decr p)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	323	using nb
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	324	by (induct p rule: decr.induct, simp_all add: nth_pos2 decrnum)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	325
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	326	lemma decr_qf: "bound0 p \<Longrightarrow> qfree (decr p)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	327	by (induct p, simp_all)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	328
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	329	fun isatom :: "fm \<Rightarrow> bool" (* test for atomicity *) where
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	330	"isatom T = True"
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	331	\| "isatom F = True"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	332	\| "isatom (Lt a) = True"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	333	\| "isatom (Le a) = True"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	334	\| "isatom (Gt a) = True"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	335	\| "isatom (Ge a) = True"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	336	\| "isatom (Eq a) = True"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	337	\| "isatom (NEq a) = True"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	338	\| "isatom p = False"
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	339
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	340	lemma bound0_qf: "bound0 p \<Longrightarrow> qfree p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	341	by (induct p, simp_all)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	342
35416 d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 33639 diff changeset	343	definition djf :: "('a \<Rightarrow> fm) \<Rightarrow> 'a \<Rightarrow> fm \<Rightarrow> fm" where
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	344	"djf f p q = (if q=T then T else if q=F then f p else
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	345	(let fp = f p in case fp of T \<Rightarrow> T \| F \<Rightarrow> q \| _ \<Rightarrow> Or (f p) q))"
35416 d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 33639 diff changeset	346	definition evaldjf :: "('a \<Rightarrow> fm) \<Rightarrow> 'a list \<Rightarrow> fm" where
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	347	"evaldjf f ps = foldr (djf f) ps F"
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	348
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	349	lemma djf_Or: "Ifm bs (djf f p q) = Ifm bs (Or (f p) q)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	350	by (cases "q=T", simp add: djf_def,cases "q=F",simp add: djf_def)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	351	(cases "f p", simp_all add: Let_def djf_def)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	352
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	353
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	354	lemma djf_simps:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	355	"djf f p T = T"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	356	"djf f p F = f p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	357	"q\<noteq>T \<Longrightarrow> q\<noteq>F \<Longrightarrow> djf f p q = (let fp = f p in case fp of T \<Rightarrow> T \| F \<Rightarrow> q \| _ \<Rightarrow> Or (f p) q)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	358	by (simp_all add: djf_def)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	359
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	360	lemma evaldjf_ex: "Ifm bs (evaldjf f ps) = (\<exists> p \<in> set ps. Ifm bs (f p))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	361	by(induct ps, simp_all add: evaldjf_def djf_Or)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	362
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	363	lemma evaldjf_bound0:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	364	assumes nb: "\<forall> x\<in> set xs. bound0 (f x)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	365	shows "bound0 (evaldjf f xs)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	366	using nb by (induct xs, auto simp add: evaldjf_def djf_def Let_def) (case_tac "f a", auto)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	367
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	368	lemma evaldjf_qf:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	369	assumes nb: "\<forall> x\<in> set xs. qfree (f x)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	370	shows "qfree (evaldjf f xs)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	371	using nb by (induct xs, auto simp add: evaldjf_def djf_def Let_def) (case_tac "f a", auto)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	372
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	373	fun disjuncts :: "fm \<Rightarrow> fm list" where
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	374	"disjuncts (Or p q) = disjuncts p @ disjuncts q"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	375	\| "disjuncts F = []"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	376	\| "disjuncts p = [p]"
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	377
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	378	lemma disjuncts: "(\<exists> q\<in> set (disjuncts p). Ifm bs q) = Ifm bs p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	379	by(induct p rule: disjuncts.induct, auto)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	380
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	381	lemma disjuncts_nb: "bound0 p \<Longrightarrow> \<forall> q\<in> set (disjuncts p). bound0 q"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	382	proof-
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	383	assume nb: "bound0 p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	384	hence "list_all bound0 (disjuncts p)" by (induct p rule:disjuncts.induct,auto)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	385	thus ?thesis by (simp only: list_all_iff)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	386	qed
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	387
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	388	lemma disjuncts_qf: "qfree p \<Longrightarrow> \<forall> q\<in> set (disjuncts p). qfree q"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	389	proof-
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	390	assume qf: "qfree p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	391	hence "list_all qfree (disjuncts p)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	392	by (induct p rule: disjuncts.induct, auto)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	393	thus ?thesis by (simp only: list_all_iff)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	394	qed
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	395
35416 d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 33639 diff changeset	396	definition DJ :: "(fm \<Rightarrow> fm) \<Rightarrow> fm \<Rightarrow> fm" where
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	397	"DJ f p = evaldjf f (disjuncts p)"
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	398
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	399	lemma DJ: assumes fdj: "\<forall> p q. Ifm bs (f (Or p q)) = Ifm bs (Or (f p) (f q))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	400	and fF: "f F = F"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	401	shows "Ifm bs (DJ f p) = Ifm bs (f p)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	402	proof-
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	403	have "Ifm bs (DJ f p) = (\<exists> q \<in> set (disjuncts p). Ifm bs (f q))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	404	by (simp add: DJ_def evaldjf_ex)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	405	also have "\<dots> = Ifm bs (f p)" using fdj fF by (induct p rule: disjuncts.induct, auto)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	406	finally show ?thesis .
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	407	qed
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	408
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	409	lemma DJ_qf: assumes
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	410	fqf: "\<forall> p. qfree p \<longrightarrow> qfree (f p)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	411	shows "\<forall>p. qfree p \<longrightarrow> qfree (DJ f p) "
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	412	proof(clarify)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	413	fix p assume qf: "qfree p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	414	have th: "DJ f p = evaldjf f (disjuncts p)" by (simp add: DJ_def)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	415	from disjuncts_qf[OF qf] have "\<forall> q\<in> set (disjuncts p). qfree q" .
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	416	with fqf have th':"\<forall> q\<in> set (disjuncts p). qfree (f q)" by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	417
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	418	from evaldjf_qf[OF th'] th show "qfree (DJ f p)" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	419	qed
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	420
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	421	lemma DJ_qe: assumes qe: "\<forall> bs p. qfree p \<longrightarrow> qfree (qe p) \<and> (Ifm bs (qe p) = Ifm bs (E p))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	422	shows "\<forall> bs p. qfree p \<longrightarrow> qfree (DJ qe p) \<and> (Ifm bs ((DJ qe p)) = Ifm bs (E p))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	423	proof(clarify)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	424	fix p::fm and bs
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	425	assume qf: "qfree p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	426	from qe have qth: "\<forall> p. qfree p \<longrightarrow> qfree (qe p)" by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	427	from DJ_qf[OF qth] qf have qfth:"qfree (DJ qe p)" by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	428	have "Ifm bs (DJ qe p) = (\<exists> q\<in> set (disjuncts p). Ifm bs (qe q))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	429	by (simp add: DJ_def evaldjf_ex)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	430	also have "\<dots> = (\<exists> q \<in> set(disjuncts p). Ifm bs (E q))" using qe disjuncts_qf[OF qf] by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	431	also have "\<dots> = Ifm bs (E p)" by (induct p rule: disjuncts.induct, auto)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	432	finally show "qfree (DJ qe p) \<and> Ifm bs (DJ qe p) = Ifm bs (E p)" using qfth by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	433	qed
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	434	(* Simplification *)
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	435
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	436	fun maxcoeff:: "num \<Rightarrow> int" where
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	437	"maxcoeff (C i) = abs i"
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	438	\| "maxcoeff (CN n c t) = max (abs c) (maxcoeff t)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	439	\| "maxcoeff t = 1"
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	440
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	441	lemma maxcoeff_pos: "maxcoeff t \<ge> 0"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	442	by (induct t rule: maxcoeff.induct, auto)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	443
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	444	fun numgcdh:: "num \<Rightarrow> int \<Rightarrow> int" where
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30684 diff changeset	445	"numgcdh (C i) = (\<lambda>g. gcd i g)"
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	446	\| "numgcdh (CN n c t) = (\<lambda>g. gcd c (numgcdh t g))"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	447	\| "numgcdh t = (\<lambda>g. 1)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	448
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	449	definition numgcd :: "num \<Rightarrow> int" where
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	450	"numgcd t = numgcdh t (maxcoeff t)"
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	451
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	452	fun reducecoeffh:: "num \<Rightarrow> int \<Rightarrow> num" where
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	453	"reducecoeffh (C i) = (\<lambda> g. C (i div g))"
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	454	\| "reducecoeffh (CN n c t) = (\<lambda> g. CN n (c div g) (reducecoeffh t g))"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	455	\| "reducecoeffh t = (\<lambda>g. t)"
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	456
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	457	definition reducecoeff :: "num \<Rightarrow> num" where
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	458	"reducecoeff t =
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	459	(let g = numgcd t in
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	460	if g = 0 then C 0 else if g=1 then t else reducecoeffh t g)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	461
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	462	fun dvdnumcoeff:: "num \<Rightarrow> int \<Rightarrow> bool" where
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	463	"dvdnumcoeff (C i) = (\<lambda> g. g dvd i)"
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	464	\| "dvdnumcoeff (CN n c t) = (\<lambda> g. g dvd c \<and> (dvdnumcoeff t g))"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	465	\| "dvdnumcoeff t = (\<lambda>g. False)"
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	466
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	467	lemma dvdnumcoeff_trans:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	468	assumes gdg: "g dvd g'" and dgt':"dvdnumcoeff t g'"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	469	shows "dvdnumcoeff t g"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	470	using dgt' gdg
30042 31039ee583fa Removed subsumed lemmas nipkow parents: 29823 diff changeset	471	by (induct t rule: dvdnumcoeff.induct, simp_all add: gdg dvd_trans[OF gdg])
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	472
30042 31039ee583fa Removed subsumed lemmas nipkow parents: 29823 diff changeset	473	declare dvd_trans [trans add]
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	474
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	475	lemma natabs0: "(nat (abs x) = 0) = (x = 0)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	476	by arith
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	477
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	478	lemma numgcd0:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	479	assumes g0: "numgcd t = 0"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	480	shows "Inum bs t = 0"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	481	using g0[simplified numgcd_def]
32642 026e7c6a6d08 be more cautious wrt. simp rules: inf_absorb1, inf_absorb2, sup_absorb1, sup_absorb2 are no simp rules by default any longer haftmann parents: 32441 diff changeset	482	by (induct t rule: numgcdh.induct, auto simp add: natabs0 maxcoeff_pos min_max.sup_absorb2)
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	483
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	484	lemma numgcdh_pos: assumes gp: "g \<ge> 0" shows "numgcdh t g \<ge> 0"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	485	using gp
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30684 diff changeset	486	by (induct t rule: numgcdh.induct, auto)
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	487
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	488	lemma numgcd_pos: "numgcd t \<ge>0"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	489	by (simp add: numgcd_def numgcdh_pos maxcoeff_pos)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	490
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	491	lemma reducecoeffh:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	492	assumes gt: "dvdnumcoeff t g" and gp: "g > 0"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	493	shows "real g *(Inum bs (reducecoeffh t g)) = Inum bs t"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	494	using gt
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	495	proof (induct t rule: reducecoeffh.induct)
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	496	case (1 i)
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	497	hence gd: "g dvd i" by simp
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	498	from gp have gnz: "g \<noteq> 0" by simp
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	499	with assms show ?case by (simp add: real_of_int_div[OF gnz gd])
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	500	next
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	501	case (2 n c t)
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	502	hence gd: "g dvd c" by simp
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	503	from gp have gnz: "g \<noteq> 0" by simp
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	504	from assms 2 show ?case by (simp add: real_of_int_div[OF gnz gd] algebra_simps)
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	505	qed (auto simp add: numgcd_def gp)
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	506
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	507	fun ismaxcoeff:: "num \<Rightarrow> int \<Rightarrow> bool" where
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	508	"ismaxcoeff (C i) = (\<lambda> x. abs i \<le> x)"
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	509	\| "ismaxcoeff (CN n c t) = (\<lambda>x. abs c \<le> x \<and> (ismaxcoeff t x))"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	510	\| "ismaxcoeff t = (\<lambda>x. True)"
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	511
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	512	lemma ismaxcoeff_mono: "ismaxcoeff t c \<Longrightarrow> c \<le> c' \<Longrightarrow> ismaxcoeff t c'"
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	513	by (induct t rule: ismaxcoeff.induct) auto
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	514
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	515	lemma maxcoeff_ismaxcoeff: "ismaxcoeff t (maxcoeff t)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	516	proof (induct t rule: maxcoeff.induct)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	517	case (2 n c t)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	518	hence H:"ismaxcoeff t (maxcoeff t)" .
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	519	have thh: "maxcoeff t \<le> max (abs c) (maxcoeff t)" by simp
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	520	from ismaxcoeff_mono[OF H thh] show ?case by simp
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	521	qed simp_all
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	522
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30684 diff changeset	523	lemma zgcd_gt1: "gcd i j > (1::int) \<Longrightarrow> ((abs i > 1 \<and> abs j > 1) \<or> (abs i = 0 \<and> abs j > 1) \<or> (abs i > 1 \<and> abs j = 0))"
1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30684 diff changeset	524	apply (cases "abs i = 0", simp_all add: gcd_int_def)
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	525	apply (cases "abs j = 0", simp_all)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	526	apply (cases "abs i = 1", simp_all)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	527	apply (cases "abs j = 1", simp_all)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	528	apply auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	529	done
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	530	lemma numgcdh0:"numgcdh t m = 0 \<Longrightarrow> m =0"
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30684 diff changeset	531	by (induct t rule: numgcdh.induct, auto)
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	532
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	533	lemma dvdnumcoeff_aux:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	534	assumes "ismaxcoeff t m" and mp:"m \<ge> 0" and "numgcdh t m > 1"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	535	shows "dvdnumcoeff t (numgcdh t m)"
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	536	using assms
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	537	proof(induct t rule: numgcdh.induct)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	538	case (2 n c t)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	539	let ?g = "numgcdh t m"
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	540	from 2 have th:"gcd c ?g > 1" by simp
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	541	from zgcd_gt1[OF th] numgcdh_pos[OF mp, where t="t"]
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	542	have "(abs c > 1 \<and> ?g > 1) \<or> (abs c = 0 \<and> ?g > 1) \<or> (abs c > 1 \<and> ?g = 0)" by simp
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	543	moreover {assume "abs c > 1" and gp: "?g > 1" with 2
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	544	have th: "dvdnumcoeff t ?g" by simp
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30684 diff changeset	545	have th': "gcd c ?g dvd ?g" by simp
1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30684 diff changeset	546	from dvdnumcoeff_trans[OF th' th] have ?case by simp }
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	547	moreover {assume "abs c = 0 \<and> ?g > 1"
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	548	with 2 have th: "dvdnumcoeff t ?g" by simp
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30684 diff changeset	549	have th': "gcd c ?g dvd ?g" by simp
1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30684 diff changeset	550	from dvdnumcoeff_trans[OF th' th] have ?case by simp
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	551	hence ?case by simp }
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	552	moreover {assume "abs c > 1" and g0:"?g = 0"
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	553	from numgcdh0[OF g0] have "m=0". with 2 g0 have ?case by simp }
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	554	ultimately show ?case by blast
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30684 diff changeset	555	qed auto
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	556
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	557	lemma dvdnumcoeff_aux2:
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	558	assumes "numgcd t > 1"
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	559	shows "dvdnumcoeff t (numgcd t) \<and> numgcd t > 0"
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	560	using assms
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	561	proof (simp add: numgcd_def)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	562	let ?mc = "maxcoeff t"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	563	let ?g = "numgcdh t ?mc"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	564	have th1: "ismaxcoeff t ?mc" by (rule maxcoeff_ismaxcoeff)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	565	have th2: "?mc \<ge> 0" by (rule maxcoeff_pos)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	566	assume H: "numgcdh t ?mc > 1"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	567	from dvdnumcoeff_aux[OF th1 th2 H] show "dvdnumcoeff t ?g" .
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	568	qed
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	569
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	570	lemma reducecoeff: "real (numgcd t) * (Inum bs (reducecoeff t)) = Inum bs t"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	571	proof-
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	572	let ?g = "numgcd t"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	573	have "?g \<ge> 0" by (simp add: numgcd_pos)
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32642 diff changeset	574	hence "?g = 0 \<or> ?g = 1 \<or> ?g > 1" by auto
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	575	moreover {assume "?g = 0" hence ?thesis by (simp add: numgcd0)}
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	576	moreover {assume "?g = 1" hence ?thesis by (simp add: reducecoeff_def)}
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	577	moreover { assume g1:"?g > 1"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	578	from dvdnumcoeff_aux2[OF g1] have th1:"dvdnumcoeff t ?g" and g0: "?g > 0" by blast+
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	579	from reducecoeffh[OF th1 g0, where bs="bs"] g1 have ?thesis
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	580	by (simp add: reducecoeff_def Let_def)}
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	581	ultimately show ?thesis by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	582	qed
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	583
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	584	lemma reducecoeffh_numbound0: "numbound0 t \<Longrightarrow> numbound0 (reducecoeffh t g)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	585	by (induct t rule: reducecoeffh.induct, auto)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	586
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	587	lemma reducecoeff_numbound0: "numbound0 t \<Longrightarrow> numbound0 (reducecoeff t)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	588	using reducecoeffh_numbound0 by (simp add: reducecoeff_def Let_def)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	589
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	590	consts
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	591	numadd:: "num \<times> num \<Rightarrow> num"
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	592
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	593	recdef numadd "measure (\<lambda> (t,s). size t + size s)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	594	"numadd (CN n1 c1 r1,CN n2 c2 r2) =
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	595	(if n1=n2 then
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	596	(let c = c1 + c2
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	597	in (if c=0 then numadd(r1,r2) else CN n1 c (numadd (r1,r2))))
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	598	else if n1 \<le> n2 then (CN n1 c1 (numadd (r1,CN n2 c2 r2)))
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	599	else (CN n2 c2 (numadd (CN n1 c1 r1,r2))))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	600	"numadd (CN n1 c1 r1,t) = CN n1 c1 (numadd (r1, t))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	601	"numadd (t,CN n2 c2 r2) = CN n2 c2 (numadd (t,r2))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	602	"numadd (C b1, C b2) = C (b1+b2)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	603	"numadd (a,b) = Add a b"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	604
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	605	lemma numadd[simp]: "Inum bs (numadd (t,s)) = Inum bs (Add t s)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	606	apply (induct t s rule: numadd.induct, simp_all add: Let_def)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	607	apply (case_tac "c1+c2 = 0",case_tac "n1 \<le> n2", simp_all)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	608	apply (case_tac "n1 = n2", simp_all add: algebra_simps)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	609	by (simp only: left_distrib[symmetric],simp)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	610
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	611	lemma numadd_nb[simp]: "\<lbrakk> numbound0 t ; numbound0 s\<rbrakk> \<Longrightarrow> numbound0 (numadd (t,s))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	612	by (induct t s rule: numadd.induct, auto simp add: Let_def)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	613
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	614	fun nummul:: "num \<Rightarrow> int \<Rightarrow> num" where
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	615	"nummul (C j) = (\<lambda> i. C (i*j))"
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	616	\| "nummul (CN n c a) = (\<lambda> i. CN n (i*c) (nummul a i))"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	617	\| "nummul t = (\<lambda> i. Mul i t)"
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	618
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	619	lemma nummul[simp]: "\<And> i. Inum bs (nummul t i) = Inum bs (Mul i t)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	620	by (induct t rule: nummul.induct, auto simp add: algebra_simps)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	621
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	622	lemma nummul_nb[simp]: "\<And> i. numbound0 t \<Longrightarrow> numbound0 (nummul t i)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	623	by (induct t rule: nummul.induct, auto )
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	624
35416 d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 33639 diff changeset	625	definition numneg :: "num \<Rightarrow> num" where
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	626	"numneg t = nummul t (- 1)"
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	627
35416 d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 33639 diff changeset	628	definition numsub :: "num \<Rightarrow> num \<Rightarrow> num" where
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	629	"numsub s t = (if s = t then C 0 else numadd (s,numneg t))"
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	630
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	631	lemma numneg[simp]: "Inum bs (numneg t) = Inum bs (Neg t)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	632	using numneg_def by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	633
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	634	lemma numneg_nb[simp]: "numbound0 t \<Longrightarrow> numbound0 (numneg t)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	635	using numneg_def by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	636
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	637	lemma numsub[simp]: "Inum bs (numsub a b) = Inum bs (Sub a b)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	638	using numsub_def by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	639
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	640	lemma numsub_nb[simp]: "\<lbrakk> numbound0 t ; numbound0 s\<rbrakk> \<Longrightarrow> numbound0 (numsub t s)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	641	using numsub_def by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	642
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	643	primrec simpnum:: "num \<Rightarrow> num" where
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	644	"simpnum (C j) = C j"
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	645	\| "simpnum (Bound n) = CN n 1 (C 0)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	646	\| "simpnum (Neg t) = numneg (simpnum t)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	647	\| "simpnum (Add t s) = numadd (simpnum t,simpnum s)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	648	\| "simpnum (Sub t s) = numsub (simpnum t) (simpnum s)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	649	\| "simpnum (Mul i t) = (if i = 0 then (C 0) else nummul (simpnum t) i)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	650	\| "simpnum (CN n c t) = (if c = 0 then simpnum t else numadd (CN n c (C 0),simpnum t))"
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	651
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	652	lemma simpnum_ci[simp]: "Inum bs (simpnum t) = Inum bs t"
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	653	by (induct t) simp_all
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	654
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	655	lemma simpnum_numbound0[simp]:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	656	"numbound0 t \<Longrightarrow> numbound0 (simpnum t)"
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	657	by (induct t) simp_all
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	658
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	659	fun nozerocoeff:: "num \<Rightarrow> bool" where
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	660	"nozerocoeff (C c) = True"
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	661	\| "nozerocoeff (CN n c t) = (c\<noteq>0 \<and> nozerocoeff t)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	662	\| "nozerocoeff t = True"
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	663
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	664	lemma numadd_nz : "nozerocoeff a \<Longrightarrow> nozerocoeff b \<Longrightarrow> nozerocoeff (numadd (a,b))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	665	by (induct a b rule: numadd.induct,auto simp add: Let_def)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	666
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	667	lemma nummul_nz : "\<And> i. i\<noteq>0 \<Longrightarrow> nozerocoeff a \<Longrightarrow> nozerocoeff (nummul a i)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	668	by (induct a rule: nummul.induct,auto simp add: Let_def numadd_nz)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	669
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	670	lemma numneg_nz : "nozerocoeff a \<Longrightarrow> nozerocoeff (numneg a)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	671	by (simp add: numneg_def nummul_nz)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	672
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	673	lemma numsub_nz: "nozerocoeff a \<Longrightarrow> nozerocoeff b \<Longrightarrow> nozerocoeff (numsub a b)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	674	by (simp add: numsub_def numneg_nz numadd_nz)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	675
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	676	lemma simpnum_nz: "nozerocoeff (simpnum t)"
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	677	by(induct t) (simp_all add: numadd_nz numneg_nz numsub_nz nummul_nz)
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	678
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	679	lemma maxcoeff_nz: "nozerocoeff t \<Longrightarrow> maxcoeff t = 0 \<Longrightarrow> t = C 0"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	680	proof (induct t rule: maxcoeff.induct)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	681	case (2 n c t)
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	682	hence cnz: "c \<noteq>0" and mx: "max (abs c) (maxcoeff t) = 0" by simp_all
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	683	have "max (abs c) (maxcoeff t) \<ge> abs c" by simp
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	684	with cnz have "max (abs c) (maxcoeff t) > 0" by arith
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	685	with 2 show ?case by simp
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	686	qed auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	687
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	688	lemma numgcd_nz: assumes nz: "nozerocoeff t" and g0: "numgcd t = 0" shows "t = C 0"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	689	proof-
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	690	from g0 have th:"numgcdh t (maxcoeff t) = 0" by (simp add: numgcd_def)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	691	from numgcdh0[OF th] have th:"maxcoeff t = 0" .
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	692	from maxcoeff_nz[OF nz th] show ?thesis .
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	693	qed
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	694
35416 d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 33639 diff changeset	695	definition simp_num_pair :: "(num \<times> int) \<Rightarrow> num \<times> int" where
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	696	"simp_num_pair = (\<lambda> (t,n). (if n = 0 then (C 0, 0) else
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	697	(let t' = simpnum t ; g = numgcd t' in
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30684 diff changeset	698	if g > 1 then (let g' = gcd n g in
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	699	if g' = 1 then (t',n)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	700	else (reducecoeffh t' g', n div g'))
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	701	else (t',n))))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	702
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	703	lemma simp_num_pair_ci:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	704	shows "((\<lambda> (t,n). Inum bs t / real n) (simp_num_pair (t,n))) = ((\<lambda> (t,n). Inum bs t / real n) (t,n))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	705	(is "?lhs = ?rhs")
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	706	proof-
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	707	let ?t' = "simpnum t"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	708	let ?g = "numgcd ?t'"
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30684 diff changeset	709	let ?g' = "gcd n ?g"
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	710	{assume nz: "n = 0" hence ?thesis by (simp add: Let_def simp_num_pair_def)}
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	711	moreover
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	712	{ assume nnz: "n \<noteq> 0"
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	713	{assume "\<not> ?g > 1" hence ?thesis by (simp add: Let_def simp_num_pair_def simpnum_ci) }
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	714	moreover
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	715	{assume g1:"?g>1" hence g0: "?g > 0" by simp
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30684 diff changeset	716	from g1 nnz have gp0: "?g' \<noteq> 0" by simp
31952 40501bb2d57c renamed lemmas: nat_xyz/int_xyz -> xyz_nat/xyz_int nipkow parents: 31706 diff changeset	717	hence g'p: "?g' > 0" using gcd_ge_0_int[where x="n" and y="numgcd ?t'"] by arith
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	718	hence "?g'= 1 \<or> ?g' > 1" by arith
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	719	moreover {assume "?g'=1" hence ?thesis by (simp add: Let_def simp_num_pair_def simpnum_ci)}
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	720	moreover {assume g'1:"?g'>1"
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32642 diff changeset	721	from dvdnumcoeff_aux2[OF g1] have th1:"dvdnumcoeff ?t' ?g" ..
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32642 diff changeset	722	let ?tt = "reducecoeffh ?t' ?g'"
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32642 diff changeset	723	let ?t = "Inum bs ?tt"
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32642 diff changeset	724	have gpdg: "?g' dvd ?g" by simp
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32642 diff changeset	725	have gpdd: "?g' dvd n" by simp
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32642 diff changeset	726	have gpdgp: "?g' dvd ?g'" by simp
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32642 diff changeset	727	from reducecoeffh[OF dvdnumcoeff_trans[OF gpdg th1] g'p]
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32642 diff changeset	728	have th2:"real ?g' * ?t = Inum bs ?t'" by simp
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	729	from g1 g'1 have "?lhs = ?t / real (n div ?g')" by (simp add: simp_num_pair_def Let_def)
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32642 diff changeset	730	also have "\<dots> = (real ?g' * ?t) / (real ?g' * (real (n div ?g')))" by simp
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32642 diff changeset	731	also have "\<dots> = (Inum bs ?t' / real n)"
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32642 diff changeset	732	using real_of_int_div[OF gp0 gpdd] th2 gp0 by simp
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	733	finally have "?lhs = Inum bs t / real n" by simp
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	734	then have ?thesis by (simp add: simp_num_pair_def) }
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	735	ultimately have ?thesis by blast }
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	736	ultimately have ?thesis by blast }
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	737	ultimately show ?thesis by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	738	qed
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	739
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	740	lemma simp_num_pair_l: assumes tnb: "numbound0 t" and np: "n >0" and tn: "simp_num_pair (t,n) = (t',n')"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	741	shows "numbound0 t' \<and> n' >0"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	742	proof-
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	743	let ?t' = "simpnum t"
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	744	let ?g = "numgcd ?t'"
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30684 diff changeset	745	let ?g' = "gcd n ?g"
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	746	{ assume nz: "n = 0" hence ?thesis using assms by (simp add: Let_def simp_num_pair_def) }
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	747	moreover
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	748	{ assume nnz: "n \<noteq> 0"
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	749	{ assume "\<not> ?g > 1" hence ?thesis using assms
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	750	by (auto simp add: Let_def simp_num_pair_def simpnum_numbound0) }
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	751	moreover
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	752	{ assume g1:"?g>1" hence g0: "?g > 0" by simp
31706 1db0c8f235fb new GCD library, courtesy of Jeremy Avigad huffman parents: 30684 diff changeset	753	from g1 nnz have gp0: "?g' \<noteq> 0" by simp
31952 40501bb2d57c renamed lemmas: nat_xyz/int_xyz -> xyz_nat/xyz_int nipkow parents: 31706 diff changeset	754	hence g'p: "?g' > 0" using gcd_ge_0_int[where x="n" and y="numgcd ?t'"] by arith
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	755	hence "?g'= 1 \<or> ?g' > 1" by arith
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	756	moreover {
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	757	assume "?g' = 1" hence ?thesis using assms g1
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	758	by (auto simp add: Let_def simp_num_pair_def simpnum_numbound0) }
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	759	moreover {
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	760	assume g'1: "?g' > 1"
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32642 diff changeset	761	have gpdg: "?g' dvd ?g" by simp
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	762	have gpdd: "?g' dvd n" by simp
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32642 diff changeset	763	have gpdgp: "?g' dvd ?g'" by simp
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32642 diff changeset	764	from zdvd_imp_le[OF gpdd np] have g'n: "?g' \<le> n" .
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32642 diff changeset	765	from zdiv_mono1[OF g'n g'p, simplified zdiv_self[OF gp0]]
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32642 diff changeset	766	have "n div ?g' >0" by simp
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	767	hence ?thesis using assms g1 g'1
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	768	by(auto simp add: simp_num_pair_def Let_def reducecoeffh_numbound0 simpnum_numbound0) }
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	769	ultimately have ?thesis by blast }
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	770	ultimately have ?thesis by blast }
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	771	ultimately show ?thesis by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	772	qed
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	773
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	774	fun simpfm :: "fm \<Rightarrow> fm" where
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	775	"simpfm (And p q) = conj (simpfm p) (simpfm q)"
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	776	\| "simpfm (Or p q) = disj (simpfm p) (simpfm q)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	777	\| "simpfm (Imp p q) = imp (simpfm p) (simpfm q)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	778	\| "simpfm (Iff p q) = iff (simpfm p) (simpfm q)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	779	\| "simpfm (NOT p) = not (simpfm p)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	780	\| "simpfm (Lt a) = (let a' = simpnum a in case a' of C v \<Rightarrow> if (v < 0) then T else F
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	781	\| _ \<Rightarrow> Lt a')"
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	782	\| "simpfm (Le a) = (let a' = simpnum a in case a' of C v \<Rightarrow> if (v \<le> 0) then T else F \| _ \<Rightarrow> Le a')"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	783	\| "simpfm (Gt a) = (let a' = simpnum a in case a' of C v \<Rightarrow> if (v > 0) then T else F \| _ \<Rightarrow> Gt a')"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	784	\| "simpfm (Ge a) = (let a' = simpnum a in case a' of C v \<Rightarrow> if (v \<ge> 0) then T else F \| _ \<Rightarrow> Ge a')"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	785	\| "simpfm (Eq a) = (let a' = simpnum a in case a' of C v \<Rightarrow> if (v = 0) then T else F \| _ \<Rightarrow> Eq a')"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	786	\| "simpfm (NEq a) = (let a' = simpnum a in case a' of C v \<Rightarrow> if (v \<noteq> 0) then T else F \| _ \<Rightarrow> NEq a')"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	787	\| "simpfm p = p"
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	788	lemma simpfm: "Ifm bs (simpfm p) = Ifm bs p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	789	proof(induct p rule: simpfm.induct)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	790	case (6 a) let ?sa = "simpnum a" from simpnum_ci have sa: "Inum bs ?sa = Inum bs a" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	791	{fix v assume "?sa = C v" hence ?case using sa by simp }
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	792	moreover {assume "\<not> (\<exists> v. ?sa = C v)" hence ?case using sa
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	793	by (cases ?sa, simp_all add: Let_def)}
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	794	ultimately show ?case by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	795	next
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	796	case (7 a) let ?sa = "simpnum a"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	797	from simpnum_ci have sa: "Inum bs ?sa = Inum bs a" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	798	{fix v assume "?sa = C v" hence ?case using sa by simp }
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	799	moreover {assume "\<not> (\<exists> v. ?sa = C v)" hence ?case using sa
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	800	by (cases ?sa, simp_all add: Let_def)}
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	801	ultimately show ?case by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	802	next
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	803	case (8 a) let ?sa = "simpnum a"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	804	from simpnum_ci have sa: "Inum bs ?sa = Inum bs a" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	805	{fix v assume "?sa = C v" hence ?case using sa by simp }
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	806	moreover {assume "\<not> (\<exists> v. ?sa = C v)" hence ?case using sa
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	807	by (cases ?sa, simp_all add: Let_def)}
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	808	ultimately show ?case by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	809	next
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	810	case (9 a) let ?sa = "simpnum a"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	811	from simpnum_ci have sa: "Inum bs ?sa = Inum bs a" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	812	{fix v assume "?sa = C v" hence ?case using sa by simp }
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	813	moreover {assume "\<not> (\<exists> v. ?sa = C v)" hence ?case using sa
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	814	by (cases ?sa, simp_all add: Let_def)}
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	815	ultimately show ?case by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	816	next
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	817	case (10 a) let ?sa = "simpnum a"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	818	from simpnum_ci have sa: "Inum bs ?sa = Inum bs a" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	819	{fix v assume "?sa = C v" hence ?case using sa by simp }
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	820	moreover {assume "\<not> (\<exists> v. ?sa = C v)" hence ?case using sa
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	821	by (cases ?sa, simp_all add: Let_def)}
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	822	ultimately show ?case by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	823	next
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	824	case (11 a) let ?sa = "simpnum a"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	825	from simpnum_ci have sa: "Inum bs ?sa = Inum bs a" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	826	{fix v assume "?sa = C v" hence ?case using sa by simp }
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	827	moreover {assume "\<not> (\<exists> v. ?sa = C v)" hence ?case using sa
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	828	by (cases ?sa, simp_all add: Let_def)}
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	829	ultimately show ?case by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	830	qed (induct p rule: simpfm.induct, simp_all add: conj disj imp iff not)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	831
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	832
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	833	lemma simpfm_bound0: "bound0 p \<Longrightarrow> bound0 (simpfm p)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	834	proof(induct p rule: simpfm.induct)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	835	case (6 a) hence nb: "numbound0 a" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	836	hence "numbound0 (simpnum a)" by (simp only: simpnum_numbound0[OF nb])
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	837	thus ?case by (cases "simpnum a", auto simp add: Let_def)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	838	next
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	839	case (7 a) hence nb: "numbound0 a" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	840	hence "numbound0 (simpnum a)" by (simp only: simpnum_numbound0[OF nb])
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	841	thus ?case by (cases "simpnum a", auto simp add: Let_def)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	842	next
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	843	case (8 a) hence nb: "numbound0 a" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	844	hence "numbound0 (simpnum a)" by (simp only: simpnum_numbound0[OF nb])
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	845	thus ?case by (cases "simpnum a", auto simp add: Let_def)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	846	next
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	847	case (9 a) hence nb: "numbound0 a" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	848	hence "numbound0 (simpnum a)" by (simp only: simpnum_numbound0[OF nb])
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	849	thus ?case by (cases "simpnum a", auto simp add: Let_def)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	850	next
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	851	case (10 a) hence nb: "numbound0 a" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	852	hence "numbound0 (simpnum a)" by (simp only: simpnum_numbound0[OF nb])
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	853	thus ?case by (cases "simpnum a", auto simp add: Let_def)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	854	next
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	855	case (11 a) hence nb: "numbound0 a" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	856	hence "numbound0 (simpnum a)" by (simp only: simpnum_numbound0[OF nb])
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	857	thus ?case by (cases "simpnum a", auto simp add: Let_def)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	858	qed(auto simp add: disj_def imp_def iff_def conj_def not_bn)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	859
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	860	lemma simpfm_qf: "qfree p \<Longrightarrow> qfree (simpfm p)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	861	by (induct p rule: simpfm.induct, auto simp add: disj_qf imp_qf iff_qf conj_qf not_qf Let_def)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	862	(case_tac "simpnum a",auto)+
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	863
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	864	consts prep :: "fm \<Rightarrow> fm"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	865	recdef prep "measure fmsize"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	866	"prep (E T) = T"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	867	"prep (E F) = F"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	868	"prep (E (Or p q)) = disj (prep (E p)) (prep (E q))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	869	"prep (E (Imp p q)) = disj (prep (E (NOT p))) (prep (E q))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	870	"prep (E (Iff p q)) = disj (prep (E (And p q))) (prep (E (And (NOT p) (NOT q))))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	871	"prep (E (NOT (And p q))) = disj (prep (E (NOT p))) (prep (E(NOT q)))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	872	"prep (E (NOT (Imp p q))) = prep (E (And p (NOT q)))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	873	"prep (E (NOT (Iff p q))) = disj (prep (E (And p (NOT q)))) (prep (E(And (NOT p) q)))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	874	"prep (E p) = E (prep p)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	875	"prep (A (And p q)) = conj (prep (A p)) (prep (A q))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	876	"prep (A p) = prep (NOT (E (NOT p)))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	877	"prep (NOT (NOT p)) = prep p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	878	"prep (NOT (And p q)) = disj (prep (NOT p)) (prep (NOT q))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	879	"prep (NOT (A p)) = prep (E (NOT p))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	880	"prep (NOT (Or p q)) = conj (prep (NOT p)) (prep (NOT q))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	881	"prep (NOT (Imp p q)) = conj (prep p) (prep (NOT q))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	882	"prep (NOT (Iff p q)) = disj (prep (And p (NOT q))) (prep (And (NOT p) q))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	883	"prep (NOT p) = not (prep p)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	884	"prep (Or p q) = disj (prep p) (prep q)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	885	"prep (And p q) = conj (prep p) (prep q)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	886	"prep (Imp p q) = prep (Or (NOT p) q)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	887	"prep (Iff p q) = disj (prep (And p q)) (prep (And (NOT p) (NOT q)))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	888	"prep p = p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	889	(hints simp add: fmsize_pos)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	890	lemma prep: "\<And> bs. Ifm bs (prep p) = Ifm bs p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	891	by (induct p rule: prep.induct, auto)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	892
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	893	(* Generic quantifier elimination *)
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	894	function (sequential) qelim :: "fm \<Rightarrow> (fm \<Rightarrow> fm) \<Rightarrow> fm" where
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	895	"qelim (E p) = (\<lambda> qe. DJ qe (qelim p qe))"
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	896	\| "qelim (A p) = (\<lambda> qe. not (qe ((qelim (NOT p) qe))))"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	897	\| "qelim (NOT p) = (\<lambda> qe. not (qelim p qe))"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	898	\| "qelim (And p q) = (\<lambda> qe. conj (qelim p qe) (qelim q qe))"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	899	\| "qelim (Or p q) = (\<lambda> qe. disj (qelim p qe) (qelim q qe))"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	900	\| "qelim (Imp p q) = (\<lambda> qe. imp (qelim p qe) (qelim q qe))"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	901	\| "qelim (Iff p q) = (\<lambda> qe. iff (qelim p qe) (qelim q qe))"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	902	\| "qelim p = (\<lambda> y. simpfm p)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	903	by pat_completeness auto
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	904	termination qelim by (relation "measure fmsize") simp_all
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	905
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	906	lemma qelim_ci:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	907	assumes qe_inv: "\<forall> bs p. qfree p \<longrightarrow> qfree (qe p) \<and> (Ifm bs (qe p) = Ifm bs (E p))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	908	shows "\<And> bs. qfree (qelim p qe) \<and> (Ifm bs (qelim p qe) = Ifm bs p)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	909	using qe_inv DJ_qe[OF qe_inv]
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	910	by(induct p rule: qelim.induct)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	911	(auto simp add: not disj conj iff imp not_qf disj_qf conj_qf imp_qf iff_qf
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	912	simpfm simpfm_qf simp del: simpfm.simps)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	913
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	914	fun minusinf:: "fm \<Rightarrow> fm" (* Virtual substitution of -\<infinity>*) where
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	915	"minusinf (And p q) = conj (minusinf p) (minusinf q)"
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	916	\| "minusinf (Or p q) = disj (minusinf p) (minusinf q)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	917	\| "minusinf (Eq (CN 0 c e)) = F"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	918	\| "minusinf (NEq (CN 0 c e)) = T"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	919	\| "minusinf (Lt (CN 0 c e)) = T"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	920	\| "minusinf (Le (CN 0 c e)) = T"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	921	\| "minusinf (Gt (CN 0 c e)) = F"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	922	\| "minusinf (Ge (CN 0 c e)) = F"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	923	\| "minusinf p = p"
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	924
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	925	fun plusinf:: "fm \<Rightarrow> fm" (* Virtual substitution of +\<infinity>*) where
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	926	"plusinf (And p q) = conj (plusinf p) (plusinf q)"
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	927	\| "plusinf (Or p q) = disj (plusinf p) (plusinf q)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	928	\| "plusinf (Eq (CN 0 c e)) = F"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	929	\| "plusinf (NEq (CN 0 c e)) = T"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	930	\| "plusinf (Lt (CN 0 c e)) = F"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	931	\| "plusinf (Le (CN 0 c e)) = F"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	932	\| "plusinf (Gt (CN 0 c e)) = T"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	933	\| "plusinf (Ge (CN 0 c e)) = T"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	934	\| "plusinf p = p"
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	935
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	936	fun isrlfm :: "fm \<Rightarrow> bool" (* Linearity test for fm *) where
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	937	"isrlfm (And p q) = (isrlfm p \<and> isrlfm q)"
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	938	\| "isrlfm (Or p q) = (isrlfm p \<and> isrlfm q)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	939	\| "isrlfm (Eq (CN 0 c e)) = (c>0 \<and> numbound0 e)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	940	\| "isrlfm (NEq (CN 0 c e)) = (c>0 \<and> numbound0 e)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	941	\| "isrlfm (Lt (CN 0 c e)) = (c>0 \<and> numbound0 e)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	942	\| "isrlfm (Le (CN 0 c e)) = (c>0 \<and> numbound0 e)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	943	\| "isrlfm (Gt (CN 0 c e)) = (c>0 \<and> numbound0 e)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	944	\| "isrlfm (Ge (CN 0 c e)) = (c>0 \<and> numbound0 e)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	945	\| "isrlfm p = (isatom p \<and> (bound0 p))"
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	946
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	947	(* splits the bounded from the unbounded part*)
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	948	function (sequential) rsplit0 :: "num \<Rightarrow> int \<times> num" where
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	949	"rsplit0 (Bound 0) = (1,C 0)"
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	950	\| "rsplit0 (Add a b) = (let (ca,ta) = rsplit0 a ; (cb,tb) = rsplit0 b
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	951	in (ca+cb, Add ta tb))"
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	952	\| "rsplit0 (Sub a b) = rsplit0 (Add a (Neg b))"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	953	\| "rsplit0 (Neg a) = (let (c,t) = rsplit0 a in (-c,Neg t))"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	954	\| "rsplit0 (Mul c a) = (let (ca,ta) = rsplit0 a in (c*ca,Mul c ta))"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	955	\| "rsplit0 (CN 0 c a) = (let (ca,ta) = rsplit0 a in (c+ca,ta))"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	956	\| "rsplit0 (CN n c a) = (let (ca,ta) = rsplit0 a in (ca,CN n c ta))"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	957	\| "rsplit0 t = (0,t)"
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	958	by pat_completeness auto
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	959	termination rsplit0 by (relation "measure num_size") simp_all
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	960
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	961	lemma rsplit0:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	962	shows "Inum bs ((split (CN 0)) (rsplit0 t)) = Inum bs t \<and> numbound0 (snd (rsplit0 t))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	963	proof (induct t rule: rsplit0.induct)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	964	case (2 a b)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	965	let ?sa = "rsplit0 a" let ?sb = "rsplit0 b"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	966	let ?ca = "fst ?sa" let ?cb = "fst ?sb"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	967	let ?ta = "snd ?sa" let ?tb = "snd ?sb"
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	968	from 2 have nb: "numbound0 (snd(rsplit0 (Add a b)))"
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	969	by (cases "rsplit0 a") (auto simp add: Let_def split_def)
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	970	have "Inum bs ((split (CN 0)) (rsplit0 (Add a b))) =
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	971	Inum bs ((split (CN 0)) ?sa)+Inum bs ((split (CN 0)) ?sb)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	972	by (simp add: Let_def split_def algebra_simps)
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	973	also have "\<dots> = Inum bs a + Inum bs b" using 2 by (cases "rsplit0 a") auto
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	974	finally show ?case using nb by simp
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	975	qed (auto simp add: Let_def split_def algebra_simps, simp add: right_distrib[symmetric])
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	976
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	977	(* Linearize a formula*)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	978	definition
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	979	lt :: "int \<Rightarrow> num \<Rightarrow> fm"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	980	where
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	981	"lt c t = (if c = 0 then (Lt t) else if c > 0 then (Lt (CN 0 c t))
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	982	else (Gt (CN 0 (-c) (Neg t))))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	983
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	984	definition
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	985	le :: "int \<Rightarrow> num \<Rightarrow> fm"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	986	where
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	987	"le c t = (if c = 0 then (Le t) else if c > 0 then (Le (CN 0 c t))
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	988	else (Ge (CN 0 (-c) (Neg t))))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	989
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	990	definition
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	991	gt :: "int \<Rightarrow> num \<Rightarrow> fm"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	992	where
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	993	"gt c t = (if c = 0 then (Gt t) else if c > 0 then (Gt (CN 0 c t))
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	994	else (Lt (CN 0 (-c) (Neg t))))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	995
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	996	definition
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	997	ge :: "int \<Rightarrow> num \<Rightarrow> fm"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	998	where
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	999	"ge c t = (if c = 0 then (Ge t) else if c > 0 then (Ge (CN 0 c t))
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1000	else (Le (CN 0 (-c) (Neg t))))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1001
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1002	definition
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1003	eq :: "int \<Rightarrow> num \<Rightarrow> fm"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1004	where
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1005	"eq c t = (if c = 0 then (Eq t) else if c > 0 then (Eq (CN 0 c t))
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1006	else (Eq (CN 0 (-c) (Neg t))))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1007
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1008	definition
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1009	neq :: "int \<Rightarrow> num \<Rightarrow> fm"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1010	where
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1011	"neq c t = (if c = 0 then (NEq t) else if c > 0 then (NEq (CN 0 c t))
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1012	else (NEq (CN 0 (-c) (Neg t))))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1013
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1014	lemma lt: "numnoabs t \<Longrightarrow> Ifm bs (split lt (rsplit0 t)) = Ifm bs (Lt t) \<and> isrlfm (split lt (rsplit0 t))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1015	using rsplit0[where bs = "bs" and t="t"]
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1016	by (auto simp add: lt_def split_def,cases "snd(rsplit0 t)",auto,case_tac "nat",auto)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1017
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1018	lemma le: "numnoabs t \<Longrightarrow> Ifm bs (split le (rsplit0 t)) = Ifm bs (Le t) \<and> isrlfm (split le (rsplit0 t))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1019	using rsplit0[where bs = "bs" and t="t"]
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1020	by (auto simp add: le_def split_def) (cases "snd(rsplit0 t)",auto,case_tac "nat",auto)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1021
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1022	lemma gt: "numnoabs t \<Longrightarrow> Ifm bs (split gt (rsplit0 t)) = Ifm bs (Gt t) \<and> isrlfm (split gt (rsplit0 t))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1023	using rsplit0[where bs = "bs" and t="t"]
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1024	by (auto simp add: gt_def split_def) (cases "snd(rsplit0 t)",auto,case_tac "nat",auto)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1025
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1026	lemma ge: "numnoabs t \<Longrightarrow> Ifm bs (split ge (rsplit0 t)) = Ifm bs (Ge t) \<and> isrlfm (split ge (rsplit0 t))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1027	using rsplit0[where bs = "bs" and t="t"]
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1028	by (auto simp add: ge_def split_def) (cases "snd(rsplit0 t)",auto,case_tac "nat",auto)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1029
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1030	lemma eq: "numnoabs t \<Longrightarrow> Ifm bs (split eq (rsplit0 t)) = Ifm bs (Eq t) \<and> isrlfm (split eq (rsplit0 t))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1031	using rsplit0[where bs = "bs" and t="t"]
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1032	by (auto simp add: eq_def split_def) (cases "snd(rsplit0 t)",auto,case_tac "nat",auto)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1033
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1034	lemma neq: "numnoabs t \<Longrightarrow> Ifm bs (split neq (rsplit0 t)) = Ifm bs (NEq t) \<and> isrlfm (split neq (rsplit0 t))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1035	using rsplit0[where bs = "bs" and t="t"]
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1036	by (auto simp add: neq_def split_def) (cases "snd(rsplit0 t)",auto,case_tac "nat",auto)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1037
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1038	lemma conj_lin: "isrlfm p \<Longrightarrow> isrlfm q \<Longrightarrow> isrlfm (conj p q)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1039	by (auto simp add: conj_def)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1040	lemma disj_lin: "isrlfm p \<Longrightarrow> isrlfm q \<Longrightarrow> isrlfm (disj p q)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1041	by (auto simp add: disj_def)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1042
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1043	consts rlfm :: "fm \<Rightarrow> fm"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1044	recdef rlfm "measure fmsize"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1045	"rlfm (And p q) = conj (rlfm p) (rlfm q)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1046	"rlfm (Or p q) = disj (rlfm p) (rlfm q)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1047	"rlfm (Imp p q) = disj (rlfm (NOT p)) (rlfm q)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1048	"rlfm (Iff p q) = disj (conj (rlfm p) (rlfm q)) (conj (rlfm (NOT p)) (rlfm (NOT q)))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1049	"rlfm (Lt a) = split lt (rsplit0 a)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1050	"rlfm (Le a) = split le (rsplit0 a)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1051	"rlfm (Gt a) = split gt (rsplit0 a)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1052	"rlfm (Ge a) = split ge (rsplit0 a)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1053	"rlfm (Eq a) = split eq (rsplit0 a)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1054	"rlfm (NEq a) = split neq (rsplit0 a)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1055	"rlfm (NOT (And p q)) = disj (rlfm (NOT p)) (rlfm (NOT q))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1056	"rlfm (NOT (Or p q)) = conj (rlfm (NOT p)) (rlfm (NOT q))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1057	"rlfm (NOT (Imp p q)) = conj (rlfm p) (rlfm (NOT q))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1058	"rlfm (NOT (Iff p q)) = disj (conj(rlfm p) (rlfm(NOT q))) (conj(rlfm(NOT p)) (rlfm q))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1059	"rlfm (NOT (NOT p)) = rlfm p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1060	"rlfm (NOT T) = F"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1061	"rlfm (NOT F) = T"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1062	"rlfm (NOT (Lt a)) = rlfm (Ge a)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1063	"rlfm (NOT (Le a)) = rlfm (Gt a)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1064	"rlfm (NOT (Gt a)) = rlfm (Le a)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1065	"rlfm (NOT (Ge a)) = rlfm (Lt a)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1066	"rlfm (NOT (Eq a)) = rlfm (NEq a)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1067	"rlfm (NOT (NEq a)) = rlfm (Eq a)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1068	"rlfm p = p" (hints simp add: fmsize_pos)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1069
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1070	lemma rlfm_I:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1071	assumes qfp: "qfree p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1072	shows "(Ifm bs (rlfm p) = Ifm bs p) \<and> isrlfm (rlfm p)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1073	using qfp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1074	by (induct p rule: rlfm.induct, auto simp add: lt le gt ge eq neq conj disj conj_lin disj_lin)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1075
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1076	(* Operations needed for Ferrante and Rackoff *)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1077	lemma rminusinf_inf:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1078	assumes lp: "isrlfm p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1079	shows "\<exists> z. \<forall> x < z. Ifm (x#bs) (minusinf p) = Ifm (x#bs) p" (is "\<exists> z. \<forall> x. ?P z x p")
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1080	using lp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1081	proof (induct p rule: minusinf.induct)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1082	case (1 p q) thus ?case by (auto,rule_tac x= "min z za" in exI) auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1083	next
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1084	case (2 p q) thus ?case by (auto,rule_tac x= "min z za" in exI) auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1085	next
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1086	case (3 c e)
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1087	from 3 have nb: "numbound0 e" by simp
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1088	from 3 have cp: "real c > 0" by simp
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1089	fix a
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1090	let ?e="Inum (a#bs) e"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1091	let ?z = "(- ?e) / real c"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1092	{fix x
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1093	assume xz: "x < ?z"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1094	hence "(real c * x < - ?e)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1095	by (simp only: pos_less_divide_eq[OF cp, where a="x" and b="- ?e"] mult_ac)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1096	hence "real c * x + ?e < 0" by arith
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1097	hence "real c * x + ?e \<noteq> 0" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1098	with xz have "?P ?z x (Eq (CN 0 c e))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1099	using numbound0_I[OF nb, where b="x" and bs="bs" and b'="a"] by simp }
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1100	hence "\<forall> x < ?z. ?P ?z x (Eq (CN 0 c e))" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1101	thus ?case by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1102	next
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1103	case (4 c e)
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1104	from 4 have nb: "numbound0 e" by simp
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1105	from 4 have cp: "real c > 0" by simp
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1106	fix a
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1107	let ?e="Inum (a#bs) e"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1108	let ?z = "(- ?e) / real c"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1109	{fix x
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1110	assume xz: "x < ?z"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1111	hence "(real c * x < - ?e)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1112	by (simp only: pos_less_divide_eq[OF cp, where a="x" and b="- ?e"] mult_ac)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1113	hence "real c * x + ?e < 0" by arith
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1114	hence "real c * x + ?e \<noteq> 0" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1115	with xz have "?P ?z x (NEq (CN 0 c e))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1116	using numbound0_I[OF nb, where b="x" and bs="bs" and b'="a"] by simp }
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1117	hence "\<forall> x < ?z. ?P ?z x (NEq (CN 0 c e))" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1118	thus ?case by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1119	next
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1120	case (5 c e)
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1121	from 5 have nb: "numbound0 e" by simp
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1122	from 5 have cp: "real c > 0" by simp
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1123	fix a
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1124	let ?e="Inum (a#bs) e"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1125	let ?z = "(- ?e) / real c"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1126	{fix x
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1127	assume xz: "x < ?z"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1128	hence "(real c * x < - ?e)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1129	by (simp only: pos_less_divide_eq[OF cp, where a="x" and b="- ?e"] mult_ac)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1130	hence "real c * x + ?e < 0" by arith
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1131	with xz have "?P ?z x (Lt (CN 0 c e))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1132	using numbound0_I[OF nb, where b="x" and bs="bs" and b'="a"] by simp }
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1133	hence "\<forall> x < ?z. ?P ?z x (Lt (CN 0 c e))" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1134	thus ?case by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1135	next
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1136	case (6 c e)
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1137	from 6 have nb: "numbound0 e" by simp
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1138	from lp 6 have cp: "real c > 0" by simp
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1139	fix a
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1140	let ?e="Inum (a#bs) e"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1141	let ?z = "(- ?e) / real c"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1142	{fix x
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1143	assume xz: "x < ?z"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1144	hence "(real c * x < - ?e)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1145	by (simp only: pos_less_divide_eq[OF cp, where a="x" and b="- ?e"] mult_ac)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1146	hence "real c * x + ?e < 0" by arith
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1147	with xz have "?P ?z x (Le (CN 0 c e))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1148	using numbound0_I[OF nb, where b="x" and bs="bs" and b'="a"] by simp }
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1149	hence "\<forall> x < ?z. ?P ?z x (Le (CN 0 c e))" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1150	thus ?case by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1151	next
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1152	case (7 c e)
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1153	from 7 have nb: "numbound0 e" by simp
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1154	from 7 have cp: "real c > 0" by simp
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1155	fix a
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1156	let ?e="Inum (a#bs) e"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1157	let ?z = "(- ?e) / real c"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1158	{fix x
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1159	assume xz: "x < ?z"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1160	hence "(real c * x < - ?e)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1161	by (simp only: pos_less_divide_eq[OF cp, where a="x" and b="- ?e"] mult_ac)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1162	hence "real c * x + ?e < 0" by arith
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1163	with xz have "?P ?z x (Gt (CN 0 c e))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1164	using numbound0_I[OF nb, where b="x" and bs="bs" and b'="a"] by simp }
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1165	hence "\<forall> x < ?z. ?P ?z x (Gt (CN 0 c e))" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1166	thus ?case by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1167	next
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1168	case (8 c e)
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1169	from 8 have nb: "numbound0 e" by simp
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1170	from 8 have cp: "real c > 0" by simp
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1171	fix a
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1172	let ?e="Inum (a#bs) e"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1173	let ?z = "(- ?e) / real c"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1174	{fix x
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1175	assume xz: "x < ?z"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1176	hence "(real c * x < - ?e)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1177	by (simp only: pos_less_divide_eq[OF cp, where a="x" and b="- ?e"] mult_ac)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1178	hence "real c * x + ?e < 0" by arith
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1179	with xz have "?P ?z x (Ge (CN 0 c e))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1180	using numbound0_I[OF nb, where b="x" and bs="bs" and b'="a"] by simp }
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1181	hence "\<forall> x < ?z. ?P ?z x (Ge (CN 0 c e))" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1182	thus ?case by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1183	qed simp_all
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1184
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1185	lemma rplusinf_inf:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1186	assumes lp: "isrlfm p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1187	shows "\<exists> z. \<forall> x > z. Ifm (x#bs) (plusinf p) = Ifm (x#bs) p" (is "\<exists> z. \<forall> x. ?P z x p")
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1188	using lp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1189	proof (induct p rule: isrlfm.induct)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1190	case (1 p q) thus ?case by (auto,rule_tac x= "max z za" in exI) auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1191	next
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1192	case (2 p q) thus ?case by (auto,rule_tac x= "max z za" in exI) auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1193	next
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1194	case (3 c e)
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1195	from 3 have nb: "numbound0 e" by simp
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1196	from 3 have cp: "real c > 0" by simp
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1197	fix a
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1198	let ?e="Inum (a#bs) e"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1199	let ?z = "(- ?e) / real c"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1200	{fix x
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1201	assume xz: "x > ?z"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1202	with mult_strict_right_mono [OF xz cp] cp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1203	have "(real c * x > - ?e)" by (simp add: mult_ac)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1204	hence "real c * x + ?e > 0" by arith
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1205	hence "real c * x + ?e \<noteq> 0" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1206	with xz have "?P ?z x (Eq (CN 0 c e))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1207	using numbound0_I[OF nb, where b="x" and bs="bs" and b'="a"] by simp }
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1208	hence "\<forall> x > ?z. ?P ?z x (Eq (CN 0 c e))" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1209	thus ?case by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1210	next
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1211	case (4 c e)
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1212	from 4 have nb: "numbound0 e" by simp
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1213	from 4 have cp: "real c > 0" by simp
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1214	fix a
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1215	let ?e="Inum (a#bs) e"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1216	let ?z = "(- ?e) / real c"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1217	{fix x
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1218	assume xz: "x > ?z"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1219	with mult_strict_right_mono [OF xz cp] cp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1220	have "(real c * x > - ?e)" by (simp add: mult_ac)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1221	hence "real c * x + ?e > 0" by arith
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1222	hence "real c * x + ?e \<noteq> 0" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1223	with xz have "?P ?z x (NEq (CN 0 c e))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1224	using numbound0_I[OF nb, where b="x" and bs="bs" and b'="a"] by simp }
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1225	hence "\<forall> x > ?z. ?P ?z x (NEq (CN 0 c e))" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1226	thus ?case by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1227	next
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1228	case (5 c e)
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1229	from 5 have nb: "numbound0 e" by simp
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1230	from 5 have cp: "real c > 0" by simp
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1231	fix a
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1232	let ?e="Inum (a#bs) e"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1233	let ?z = "(- ?e) / real c"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1234	{fix x
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1235	assume xz: "x > ?z"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1236	with mult_strict_right_mono [OF xz cp] cp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1237	have "(real c * x > - ?e)" by (simp add: mult_ac)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1238	hence "real c * x + ?e > 0" by arith
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1239	with xz have "?P ?z x (Lt (CN 0 c e))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1240	using numbound0_I[OF nb, where b="x" and bs="bs" and b'="a"] by simp }
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1241	hence "\<forall> x > ?z. ?P ?z x (Lt (CN 0 c e))" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1242	thus ?case by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1243	next
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1244	case (6 c e)
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1245	from 6 have nb: "numbound0 e" by simp
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1246	from 6 have cp: "real c > 0" by simp
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1247	fix a
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1248	let ?e="Inum (a#bs) e"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1249	let ?z = "(- ?e) / real c"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1250	{fix x
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1251	assume xz: "x > ?z"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1252	with mult_strict_right_mono [OF xz cp] cp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1253	have "(real c * x > - ?e)" by (simp add: mult_ac)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1254	hence "real c * x + ?e > 0" by arith
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1255	with xz have "?P ?z x (Le (CN 0 c e))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1256	using numbound0_I[OF nb, where b="x" and bs="bs" and b'="a"] by simp }
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1257	hence "\<forall> x > ?z. ?P ?z x (Le (CN 0 c e))" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1258	thus ?case by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1259	next
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1260	case (7 c e)
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1261	from 7 have nb: "numbound0 e" by simp
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1262	from 7 have cp: "real c > 0" by simp
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1263	fix a
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1264	let ?e="Inum (a#bs) e"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1265	let ?z = "(- ?e) / real c"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1266	{fix x
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1267	assume xz: "x > ?z"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1268	with mult_strict_right_mono [OF xz cp] cp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1269	have "(real c * x > - ?e)" by (simp add: mult_ac)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1270	hence "real c * x + ?e > 0" by arith
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1271	with xz have "?P ?z x (Gt (CN 0 c e))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1272	using numbound0_I[OF nb, where b="x" and bs="bs" and b'="a"] by simp }
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1273	hence "\<forall> x > ?z. ?P ?z x (Gt (CN 0 c e))" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1274	thus ?case by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1275	next
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1276	case (8 c e)
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1277	from 8 have nb: "numbound0 e" by simp
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1278	from 8 have cp: "real c > 0" by simp
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1279	fix a
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1280	let ?e="Inum (a#bs) e"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1281	let ?z = "(- ?e) / real c"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1282	{fix x
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1283	assume xz: "x > ?z"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1284	with mult_strict_right_mono [OF xz cp] cp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1285	have "(real c * x > - ?e)" by (simp add: mult_ac)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1286	hence "real c * x + ?e > 0" by arith
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1287	with xz have "?P ?z x (Ge (CN 0 c e))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1288	using numbound0_I[OF nb, where b="x" and bs="bs" and b'="a"] by simp }
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1289	hence "\<forall> x > ?z. ?P ?z x (Ge (CN 0 c e))" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1290	thus ?case by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1291	qed simp_all
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1292
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1293	lemma rminusinf_bound0:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1294	assumes lp: "isrlfm p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1295	shows "bound0 (minusinf p)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1296	using lp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1297	by (induct p rule: minusinf.induct) simp_all
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1298
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1299	lemma rplusinf_bound0:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1300	assumes lp: "isrlfm p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1301	shows "bound0 (plusinf p)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1302	using lp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1303	by (induct p rule: plusinf.induct) simp_all
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1304
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1305	lemma rminusinf_ex:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1306	assumes lp: "isrlfm p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1307	and ex: "Ifm (a#bs) (minusinf p)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1308	shows "\<exists> x. Ifm (x#bs) p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1309	proof-
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1310	from bound0_I [OF rminusinf_bound0[OF lp], where b="a" and bs ="bs"] ex
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1311	have th: "\<forall> x. Ifm (x#bs) (minusinf p)" by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1312	from rminusinf_inf[OF lp, where bs="bs"]
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1313	obtain z where z_def: "\<forall>x<z. Ifm (x # bs) (minusinf p) = Ifm (x # bs) p" by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1314	from th have "Ifm ((z - 1)#bs) (minusinf p)" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1315	moreover have "z - 1 < z" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1316	ultimately show ?thesis using z_def by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1317	qed
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1318
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1319	lemma rplusinf_ex:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1320	assumes lp: "isrlfm p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1321	and ex: "Ifm (a#bs) (plusinf p)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1322	shows "\<exists> x. Ifm (x#bs) p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1323	proof-
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1324	from bound0_I [OF rplusinf_bound0[OF lp], where b="a" and bs ="bs"] ex
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1325	have th: "\<forall> x. Ifm (x#bs) (plusinf p)" by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1326	from rplusinf_inf[OF lp, where bs="bs"]
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1327	obtain z where z_def: "\<forall>x>z. Ifm (x # bs) (plusinf p) = Ifm (x # bs) p" by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1328	from th have "Ifm ((z + 1)#bs) (plusinf p)" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1329	moreover have "z + 1 > z" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1330	ultimately show ?thesis using z_def by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1331	qed
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1332
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1333	consts
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1334	uset:: "fm \<Rightarrow> (num \<times> int) list"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1335	usubst :: "fm \<Rightarrow> (num \<times> int) \<Rightarrow> fm "
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1336	recdef uset "measure size"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1337	"uset (And p q) = (uset p @ uset q)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1338	"uset (Or p q) = (uset p @ uset q)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1339	"uset (Eq (CN 0 c e)) = [(Neg e,c)]"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1340	"uset (NEq (CN 0 c e)) = [(Neg e,c)]"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1341	"uset (Lt (CN 0 c e)) = [(Neg e,c)]"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1342	"uset (Le (CN 0 c e)) = [(Neg e,c)]"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1343	"uset (Gt (CN 0 c e)) = [(Neg e,c)]"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1344	"uset (Ge (CN 0 c e)) = [(Neg e,c)]"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1345	"uset p = []"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1346	recdef usubst "measure size"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1347	"usubst (And p q) = (\<lambda> (t,n). And (usubst p (t,n)) (usubst q (t,n)))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1348	"usubst (Or p q) = (\<lambda> (t,n). Or (usubst p (t,n)) (usubst q (t,n)))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1349	"usubst (Eq (CN 0 c e)) = (\<lambda> (t,n). Eq (Add (Mul c t) (Mul n e)))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1350	"usubst (NEq (CN 0 c e)) = (\<lambda> (t,n). NEq (Add (Mul c t) (Mul n e)))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1351	"usubst (Lt (CN 0 c e)) = (\<lambda> (t,n). Lt (Add (Mul c t) (Mul n e)))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1352	"usubst (Le (CN 0 c e)) = (\<lambda> (t,n). Le (Add (Mul c t) (Mul n e)))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1353	"usubst (Gt (CN 0 c e)) = (\<lambda> (t,n). Gt (Add (Mul c t) (Mul n e)))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1354	"usubst (Ge (CN 0 c e)) = (\<lambda> (t,n). Ge (Add (Mul c t) (Mul n e)))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1355	"usubst p = (\<lambda> (t,n). p)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1356
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1357	lemma usubst_I: assumes lp: "isrlfm p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1358	and np: "real n > 0" and nbt: "numbound0 t"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1359	shows "(Ifm (x#bs) (usubst p (t,n)) = Ifm (((Inum (x#bs) t)/(real n))#bs) p) \<and> bound0 (usubst p (t,n))" (is "(?I x (usubst p (t,n)) = ?I ?u p) \<and> ?B p" is "(_ = ?I (?t/?n) p) \<and> _" is "(_ = ?I (?N x t /_) p) \<and> _")
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1360	using lp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1361	proof(induct p rule: usubst.induct)
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1362	case (5 c e) with assms have cp: "c >0" and nb: "numbound0 e" by simp_all
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1363	have "?I ?u (Lt (CN 0 c e)) = (real c *(?t/?n) + (?N x e) < 0)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1364	using numbound0_I[OF nb, where bs="bs" and b="?u" and b'="x"] by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1365	also have "\<dots> = (?n(real c (?t/?n)) + ?n*(?N x e) < 0)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1366	by (simp only: pos_less_divide_eq[OF np, where a="real c *(?t/?n) + (?N x e)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1367	and b="0", simplified divide_zero_left]) (simp only: algebra_simps)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1368	also have "\<dots> = (real c ?t + ?n (?N x e) < 0)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1369	using np by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1370	finally show ?case using nbt nb by (simp add: algebra_simps)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1371	next
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1372	case (6 c e) with assms have cp: "c >0" and nb: "numbound0 e" by simp_all
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1373	have "?I ?u (Le (CN 0 c e)) = (real c *(?t/?n) + (?N x e) \<le> 0)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1374	using numbound0_I[OF nb, where bs="bs" and b="?u" and b'="x"] by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1375	also have "\<dots> = (?n(real c (?t/?n)) + ?n*(?N x e) \<le> 0)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1376	by (simp only: pos_le_divide_eq[OF np, where a="real c *(?t/?n) + (?N x e)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1377	and b="0", simplified divide_zero_left]) (simp only: algebra_simps)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1378	also have "\<dots> = (real c ?t + ?n (?N x e) \<le> 0)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1379	using np by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1380	finally show ?case using nbt nb by (simp add: algebra_simps)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1381	next
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1382	case (7 c e) with assms have cp: "c >0" and nb: "numbound0 e" by simp_all
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1383	have "?I ?u (Gt (CN 0 c e)) = (real c *(?t/?n) + (?N x e) > 0)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1384	using numbound0_I[OF nb, where bs="bs" and b="?u" and b'="x"] by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1385	also have "\<dots> = (?n(real c (?t/?n)) + ?n*(?N x e) > 0)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1386	by (simp only: pos_divide_less_eq[OF np, where a="real c *(?t/?n) + (?N x e)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1387	and b="0", simplified divide_zero_left]) (simp only: algebra_simps)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1388	also have "\<dots> = (real c ?t + ?n (?N x e) > 0)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1389	using np by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1390	finally show ?case using nbt nb by (simp add: algebra_simps)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1391	next
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1392	case (8 c e) with assms have cp: "c >0" and nb: "numbound0 e" by simp_all
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1393	have "?I ?u (Ge (CN 0 c e)) = (real c *(?t/?n) + (?N x e) \<ge> 0)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1394	using numbound0_I[OF nb, where bs="bs" and b="?u" and b'="x"] by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1395	also have "\<dots> = (?n(real c (?t/?n)) + ?n*(?N x e) \<ge> 0)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1396	by (simp only: pos_divide_le_eq[OF np, where a="real c *(?t/?n) + (?N x e)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1397	and b="0", simplified divide_zero_left]) (simp only: algebra_simps)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1398	also have "\<dots> = (real c ?t + ?n (?N x e) \<ge> 0)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1399	using np by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1400	finally show ?case using nbt nb by (simp add: algebra_simps)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1401	next
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1402	case (3 c e) with assms have cp: "c >0" and nb: "numbound0 e" by simp_all
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1403	from np have np: "real n \<noteq> 0" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1404	have "?I ?u (Eq (CN 0 c e)) = (real c *(?t/?n) + (?N x e) = 0)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1405	using numbound0_I[OF nb, where bs="bs" and b="?u" and b'="x"] by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1406	also have "\<dots> = (?n(real c (?t/?n)) + ?n*(?N x e) = 0)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1407	by (simp only: nonzero_eq_divide_eq[OF np, where a="real c *(?t/?n) + (?N x e)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1408	and b="0", simplified divide_zero_left]) (simp only: algebra_simps)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1409	also have "\<dots> = (real c ?t + ?n (?N x e) = 0)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1410	using np by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1411	finally show ?case using nbt nb by (simp add: algebra_simps)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1412	next
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1413	case (4 c e) with assms have cp: "c >0" and nb: "numbound0 e" by simp_all
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1414	from np have np: "real n \<noteq> 0" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1415	have "?I ?u (NEq (CN 0 c e)) = (real c *(?t/?n) + (?N x e) \<noteq> 0)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1416	using numbound0_I[OF nb, where bs="bs" and b="?u" and b'="x"] by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1417	also have "\<dots> = (?n(real c (?t/?n)) + ?n*(?N x e) \<noteq> 0)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1418	by (simp only: nonzero_eq_divide_eq[OF np, where a="real c *(?t/?n) + (?N x e)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1419	and b="0", simplified divide_zero_left]) (simp only: algebra_simps)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1420	also have "\<dots> = (real c ?t + ?n (?N x e) \<noteq> 0)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1421	using np by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1422	finally show ?case using nbt nb by (simp add: algebra_simps)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1423	qed(simp_all add: nbt numbound0_I[where bs ="bs" and b="(Inum (x#bs) t)/ real n" and b'="x"] nth_pos2)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1424
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1425	lemma uset_l:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1426	assumes lp: "isrlfm p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1427	shows "\<forall> (t,k) \<in> set (uset p). numbound0 t \<and> k >0"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1428	using lp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1429	by(induct p rule: uset.induct,auto)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1430
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1431	lemma rminusinf_uset:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1432	assumes lp: "isrlfm p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1433	and nmi: "\<not> (Ifm (a#bs) (minusinf p))" (is "\<not> (Ifm (a#bs) (?M p))")
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1434	and ex: "Ifm (x#bs) p" (is "?I x p")
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1435	shows "\<exists> (s,m) \<in> set (uset p). x \<ge> Inum (a#bs) s / real m" (is "\<exists> (s,m) \<in> ?U p. x \<ge> ?N a s / real m")
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1436	proof-
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1437	have "\<exists> (s,m) \<in> set (uset p). real m * x \<ge> Inum (a#bs) s " (is "\<exists> (s,m) \<in> ?U p. real m *x \<ge> ?N a s")
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1438	using lp nmi ex
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1439	by (induct p rule: minusinf.induct, auto simp add:numbound0_I[where bs="bs" and b="a" and b'="x"] nth_pos2)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1440	then obtain s m where smU: "(s,m) \<in> set (uset p)" and mx: "real m * x \<ge> ?N a s" by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1441	from uset_l[OF lp] smU have mp: "real m > 0" by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1442	from pos_divide_le_eq[OF mp, where a="x" and b="?N a s", symmetric] mx have "x \<ge> ?N a s / real m"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1443	by (auto simp add: mult_commute)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1444	thus ?thesis using smU by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1445	qed
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1446
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1447	lemma rplusinf_uset:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1448	assumes lp: "isrlfm p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1449	and nmi: "\<not> (Ifm (a#bs) (plusinf p))" (is "\<not> (Ifm (a#bs) (?M p))")
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1450	and ex: "Ifm (x#bs) p" (is "?I x p")
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1451	shows "\<exists> (s,m) \<in> set (uset p). x \<le> Inum (a#bs) s / real m" (is "\<exists> (s,m) \<in> ?U p. x \<le> ?N a s / real m")
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1452	proof-
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1453	have "\<exists> (s,m) \<in> set (uset p). real m * x \<le> Inum (a#bs) s " (is "\<exists> (s,m) \<in> ?U p. real m *x \<le> ?N a s")
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1454	using lp nmi ex
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1455	by (induct p rule: minusinf.induct, auto simp add:numbound0_I[where bs="bs" and b="a" and b'="x"] nth_pos2)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1456	then obtain s m where smU: "(s,m) \<in> set (uset p)" and mx: "real m * x \<le> ?N a s" by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1457	from uset_l[OF lp] smU have mp: "real m > 0" by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1458	from pos_le_divide_eq[OF mp, where a="x" and b="?N a s", symmetric] mx have "x \<le> ?N a s / real m"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1459	by (auto simp add: mult_commute)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1460	thus ?thesis using smU by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1461	qed
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1462
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1463	lemma lin_dense:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1464	assumes lp: "isrlfm p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1465	and noS: "\<forall> t. l < t \<and> t< u \<longrightarrow> t \<notin> (\<lambda> (t,n). Inum (x#bs) t / real n) ` set (uset p)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1466	(is "\<forall> t. _ \<and> _ \<longrightarrow> t \<notin> (\<lambda> (t,n). ?N x t / real n ) ` (?U p)")
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1467	and lx: "l < x" and xu:"x < u" and px:" Ifm (x#bs) p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1468	and ly: "l < y" and yu: "y < u"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1469	shows "Ifm (y#bs) p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1470	using lp px noS
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1471	proof (induct p rule: isrlfm.induct)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1472	case (5 c e) hence cp: "real c > 0" and nb: "numbound0 e" by simp+
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1473	from 5 have "x * real c + ?N x e < 0" by (simp add: algebra_simps)
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1474	hence pxc: "x < (- ?N x e) / real c"
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1475	by (simp only: pos_less_divide_eq[OF cp, where a="x" and b="-?N x e"])
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1476	from 5 have noSc:"\<forall> t. l < t \<and> t < u \<longrightarrow> t \<noteq> (- ?N x e) / real c" by auto
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1477	with ly yu have yne: "y \<noteq> - ?N x e / real c" by auto
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1478	hence "y < (- ?N x e) / real c \<or> y > (-?N x e) / real c" by auto
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1479	moreover {assume y: "y < (-?N x e)/ real c"
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1480	hence "y * real c < - ?N x e"
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1481	by (simp add: pos_less_divide_eq[OF cp, where a="y" and b="-?N x e", symmetric])
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1482	hence "real c * y + ?N x e < 0" by (simp add: algebra_simps)
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1483	hence ?case using numbound0_I[OF nb, where bs="bs" and b="x" and b'="y"] by simp}
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1484	moreover {assume y: "y > (- ?N x e) / real c"
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1485	with yu have eu: "u > (- ?N x e) / real c" by auto
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1486	with noSc ly yu have "(- ?N x e) / real c \<le> l" by (cases "(- ?N x e) / real c > l", auto)
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1487	with lx pxc have "False" by auto
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1488	hence ?case by simp }
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1489	ultimately show ?case by blast
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1490	next
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1491	case (6 c e) hence cp: "real c > 0" and nb: "numbound0 e" by simp +
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1492	from 6 have "x * real c + ?N x e \<le> 0" by (simp add: algebra_simps)
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1493	hence pxc: "x \<le> (- ?N x e) / real c"
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1494	by (simp only: pos_le_divide_eq[OF cp, where a="x" and b="-?N x e"])
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1495	from 6 have noSc:"\<forall> t. l < t \<and> t < u \<longrightarrow> t \<noteq> (- ?N x e) / real c" by auto
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1496	with ly yu have yne: "y \<noteq> - ?N x e / real c" by auto
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1497	hence "y < (- ?N x e) / real c \<or> y > (-?N x e) / real c" by auto
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1498	moreover {assume y: "y < (-?N x e)/ real c"
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1499	hence "y * real c < - ?N x e"
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1500	by (simp add: pos_less_divide_eq[OF cp, where a="y" and b="-?N x e", symmetric])
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1501	hence "real c * y + ?N x e < 0" by (simp add: algebra_simps)
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1502	hence ?case using numbound0_I[OF nb, where bs="bs" and b="x" and b'="y"] by simp}
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1503	moreover {assume y: "y > (- ?N x e) / real c"
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1504	with yu have eu: "u > (- ?N x e) / real c" by auto
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1505	with noSc ly yu have "(- ?N x e) / real c \<le> l" by (cases "(- ?N x e) / real c > l", auto)
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1506	with lx pxc have "False" by auto
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1507	hence ?case by simp }
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1508	ultimately show ?case by blast
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1509	next
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1510	case (7 c e) hence cp: "real c > 0" and nb: "numbound0 e" by simp+
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1511	from 7 have "x * real c + ?N x e > 0" by (simp add: algebra_simps)
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1512	hence pxc: "x > (- ?N x e) / real c"
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1513	by (simp only: pos_divide_less_eq[OF cp, where a="x" and b="-?N x e"])
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1514	from 7 have noSc: "\<forall> t. l < t \<and> t < u \<longrightarrow> t \<noteq> (- ?N x e) / real c" by auto
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1515	with ly yu have yne: "y \<noteq> - ?N x e / real c" by auto
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1516	hence "y < (- ?N x e) / real c \<or> y > (-?N x e) / real c" by auto
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1517	moreover {assume y: "y > (-?N x e)/ real c"
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1518	hence "y * real c > - ?N x e"
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1519	by (simp add: pos_divide_less_eq[OF cp, where a="y" and b="-?N x e", symmetric])
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1520	hence "real c * y + ?N x e > 0" by (simp add: algebra_simps)
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1521	hence ?case using numbound0_I[OF nb, where bs="bs" and b="x" and b'="y"] by simp}
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1522	moreover {assume y: "y < (- ?N x e) / real c"
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1523	with ly have eu: "l < (- ?N x e) / real c" by auto
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1524	with noSc ly yu have "(- ?N x e) / real c \<ge> u" by (cases "(- ?N x e) / real c > l", auto)
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1525	with xu pxc have "False" by auto
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1526	hence ?case by simp }
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1527	ultimately show ?case by blast
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1528	next
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1529	case (8 c e) hence cp: "real c > 0" and nb: "numbound0 e" by simp+
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1530	from 8 have "x * real c + ?N x e \<ge> 0" by (simp add: algebra_simps)
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1531	hence pxc: "x \<ge> (- ?N x e) / real c"
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1532	by (simp only: pos_divide_le_eq[OF cp, where a="x" and b="-?N x e"])
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1533	from 8 have noSc:"\<forall> t. l < t \<and> t < u \<longrightarrow> t \<noteq> (- ?N x e) / real c" by auto
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1534	with ly yu have yne: "y \<noteq> - ?N x e / real c" by auto
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1535	hence "y < (- ?N x e) / real c \<or> y > (-?N x e) / real c" by auto
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1536	moreover {assume y: "y > (-?N x e)/ real c"
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1537	hence "y * real c > - ?N x e"
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1538	by (simp add: pos_divide_less_eq[OF cp, where a="y" and b="-?N x e", symmetric])
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1539	hence "real c * y + ?N x e > 0" by (simp add: algebra_simps)
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1540	hence ?case using numbound0_I[OF nb, where bs="bs" and b="x" and b'="y"] by simp}
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1541	moreover {assume y: "y < (- ?N x e) / real c"
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1542	with ly have eu: "l < (- ?N x e) / real c" by auto
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1543	with noSc ly yu have "(- ?N x e) / real c \<ge> u" by (cases "(- ?N x e) / real c > l", auto)
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1544	with xu pxc have "False" by auto
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1545	hence ?case by simp }
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1546	ultimately show ?case by blast
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1547	next
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1548	case (3 c e) hence cp: "real c > 0" and nb: "numbound0 e" by simp+
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1549	from cp have cnz: "real c \<noteq> 0" by simp
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1550	from 3 have "x * real c + ?N x e = 0" by (simp add: algebra_simps)
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1551	hence pxc: "x = (- ?N x e) / real c"
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1552	by (simp only: nonzero_eq_divide_eq[OF cnz, where a="x" and b="-?N x e"])
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1553	from 3 have noSc:"\<forall> t. l < t \<and> t < u \<longrightarrow> t \<noteq> (- ?N x e) / real c" by auto
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1554	with lx xu have yne: "x \<noteq> - ?N x e / real c" by auto
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1555	with pxc show ?case by simp
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1556	next
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1557	case (4 c e) hence cp: "real c > 0" and nb: "numbound0 e" by simp+
41807 ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1558	from cp have cnz: "real c \<noteq> 0" by simp
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1559	from 4 have noSc:"\<forall> t. l < t \<and> t < u \<longrightarrow> t \<noteq> (- ?N x e) / real c" by auto
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1560	with ly yu have yne: "y \<noteq> - ?N x e / real c" by auto
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1561	hence "y* real c \<noteq> -?N x e"
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1562	by (simp only: nonzero_eq_divide_eq[OF cnz, where a="y" and b="-?N x e"]) simp
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1563	hence "y* real c + ?N x e \<noteq> 0" by (simp add: algebra_simps)
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1564	thus ?case using numbound0_I[OF nb, where bs="bs" and b="x" and b'="y"]
ab5d2d81f9fb tuned proofs -- eliminated prems; wenzelm parents: 41413 diff changeset	1565	by (simp add: algebra_simps)
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1566	qed (auto simp add: nth_pos2 numbound0_I[where bs="bs" and b="y" and b'="x"])
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1567
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1568	lemma finite_set_intervals:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1569	assumes px: "P (x::real)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1570	and lx: "l \<le> x" and xu: "x \<le> u"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1571	and linS: "l\<in> S" and uinS: "u \<in> S"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1572	and fS:"finite S" and lS: "\<forall> x\<in> S. l \<le> x" and Su: "\<forall> x\<in> S. x \<le> u"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1573	shows "\<exists> a \<in> S. \<exists> b \<in> S. (\<forall> y. a < y \<and> y < b \<longrightarrow> y \<notin> S) \<and> a \<le> x \<and> x \<le> b \<and> P x"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1574	proof-
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1575	let ?Mx = "{y. y\<in> S \<and> y \<le> x}"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1576	let ?xM = "{y. y\<in> S \<and> x \<le> y}"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1577	let ?a = "Max ?Mx"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1578	let ?b = "Min ?xM"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1579	have MxS: "?Mx \<subseteq> S" by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1580	hence fMx: "finite ?Mx" using fS finite_subset by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1581	from lx linS have linMx: "l \<in> ?Mx" by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1582	hence Mxne: "?Mx \<noteq> {}" by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1583	have xMS: "?xM \<subseteq> S" by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1584	hence fxM: "finite ?xM" using fS finite_subset by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1585	from xu uinS have linxM: "u \<in> ?xM" by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1586	hence xMne: "?xM \<noteq> {}" by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1587	have ax:"?a \<le> x" using Mxne fMx by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1588	have xb:"x \<le> ?b" using xMne fxM by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1589	have "?a \<in> ?Mx" using Max_in[OF fMx Mxne] by simp hence ainS: "?a \<in> S" using MxS by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1590	have "?b \<in> ?xM" using Min_in[OF fxM xMne] by simp hence binS: "?b \<in> S" using xMS by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1591	have noy:"\<forall> y. ?a < y \<and> y < ?b \<longrightarrow> y \<notin> S"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1592	proof(clarsimp)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1593	fix y
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1594	assume ay: "?a < y" and yb: "y < ?b" and yS: "y \<in> S"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1595	from yS have "y\<in> ?Mx \<or> y\<in> ?xM" by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1596	moreover {assume "y \<in> ?Mx" hence "y \<le> ?a" using Mxne fMx by auto with ay have "False" by simp}
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1597	moreover {assume "y \<in> ?xM" hence "y \<ge> ?b" using xMne fxM by auto with yb have "False" by simp}
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1598	ultimately show "False" by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1599	qed
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1600	from ainS binS noy ax xb px show ?thesis by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1601	qed
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1602
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1603	lemma finite_set_intervals2:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1604	assumes px: "P (x::real)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1605	and lx: "l \<le> x" and xu: "x \<le> u"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1606	and linS: "l\<in> S" and uinS: "u \<in> S"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1607	and fS:"finite S" and lS: "\<forall> x\<in> S. l \<le> x" and Su: "\<forall> x\<in> S. x \<le> u"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1608	shows "(\<exists> s\<in> S. P s) \<or> (\<exists> a \<in> S. \<exists> b \<in> S. (\<forall> y. a < y \<and> y < b \<longrightarrow> y \<notin> S) \<and> a < x \<and> x < b \<and> P x)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1609	proof-
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1610	from finite_set_intervals[where P="P", OF px lx xu linS uinS fS lS Su]
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1611	obtain a and b where
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1612	as: "a\<in> S" and bs: "b\<in> S" and noS:"\<forall>y. a < y \<and> y < b \<longrightarrow> y \<notin> S" and axb: "a \<le> x \<and> x \<le> b \<and> P x" by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1613	from axb have "x= a \<or> x= b \<or> (a < x \<and> x < b)" by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1614	thus ?thesis using px as bs noS by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1615	qed
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1616
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1617	lemma rinf_uset:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1618	assumes lp: "isrlfm p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1619	and nmi: "\<not> (Ifm (x#bs) (minusinf p))" (is "\<not> (Ifm (x#bs) (?M p))")
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1620	and npi: "\<not> (Ifm (x#bs) (plusinf p))" (is "\<not> (Ifm (x#bs) (?P p))")
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1621	and ex: "\<exists> x. Ifm (x#bs) p" (is "\<exists> x. ?I x p")
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1622	shows "\<exists> (l,n) \<in> set (uset p). \<exists> (s,m) \<in> set (uset p). ?I ((Inum (x#bs) l / real n + Inum (x#bs) s / real m) / 2) p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1623	proof-
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1624	let ?N = "\<lambda> x t. Inum (x#bs) t"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1625	let ?U = "set (uset p)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1626	from ex obtain a where pa: "?I a p" by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1627	from bound0_I[OF rminusinf_bound0[OF lp], where bs="bs" and b="x" and b'="a"] nmi
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1628	have nmi': "\<not> (?I a (?M p))" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1629	from bound0_I[OF rplusinf_bound0[OF lp], where bs="bs" and b="x" and b'="a"] npi
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1630	have npi': "\<not> (?I a (?P p))" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1631	have "\<exists> (l,n) \<in> set (uset p). \<exists> (s,m) \<in> set (uset p). ?I ((?N a l/real n + ?N a s /real m) / 2) p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1632	proof-
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1633	let ?M = "(\<lambda> (t,c). ?N a t / real c) ` ?U"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1634	have fM: "finite ?M" by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1635	from rminusinf_uset[OF lp nmi pa] rplusinf_uset[OF lp npi pa]
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1636	have "\<exists> (l,n) \<in> set (uset p). \<exists> (s,m) \<in> set (uset p). a \<le> ?N x l / real n \<and> a \<ge> ?N x s / real m" by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1637	then obtain "t" "n" "s" "m" where
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1638	tnU: "(t,n) \<in> ?U" and smU: "(s,m) \<in> ?U"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1639	and xs1: "a \<le> ?N x s / real m" and tx1: "a \<ge> ?N x t / real n" by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1640	from uset_l[OF lp] tnU smU numbound0_I[where bs="bs" and b="x" and b'="a"] xs1 tx1 have xs: "a \<le> ?N a s / real m" and tx: "a \<ge> ?N a t / real n" by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1641	from tnU have Mne: "?M \<noteq> {}" by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1642	hence Une: "?U \<noteq> {}" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1643	let ?l = "Min ?M"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1644	let ?u = "Max ?M"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1645	have linM: "?l \<in> ?M" using fM Mne by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1646	have uinM: "?u \<in> ?M" using fM Mne by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1647	have tnM: "?N a t / real n \<in> ?M" using tnU by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1648	have smM: "?N a s / real m \<in> ?M" using smU by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1649	have lM: "\<forall> t\<in> ?M. ?l \<le> t" using Mne fM by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1650	have Mu: "\<forall> t\<in> ?M. t \<le> ?u" using Mne fM by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1651	have "?l \<le> ?N a t / real n" using tnM Mne by simp hence lx: "?l \<le> a" using tx by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1652	have "?N a s / real m \<le> ?u" using smM Mne by simp hence xu: "a \<le> ?u" using xs by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1653	from finite_set_intervals2[where P="\<lambda> x. ?I x p",OF pa lx xu linM uinM fM lM Mu]
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1654	have "(\<exists> s\<in> ?M. ?I s p) \<or>
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1655	(\<exists> t1\<in> ?M. \<exists> t2 \<in> ?M. (\<forall> y. t1 < y \<and> y < t2 \<longrightarrow> y \<notin> ?M) \<and> t1 < a \<and> a < t2 \<and> ?I a p)" .
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1656	moreover { fix u assume um: "u\<in> ?M" and pu: "?I u p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1657	hence "\<exists> (tu,nu) \<in> ?U. u = ?N a tu / real nu" by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1658	then obtain "tu" "nu" where tuU: "(tu,nu) \<in> ?U" and tuu:"u= ?N a tu / real nu" by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1659	have "(u + u) / 2 = u" by auto with pu tuu
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1660	have "?I (((?N a tu / real nu) + (?N a tu / real nu)) / 2) p" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1661	with tuU have ?thesis by blast}
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1662	moreover{
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1663	assume "\<exists> t1\<in> ?M. \<exists> t2 \<in> ?M. (\<forall> y. t1 < y \<and> y < t2 \<longrightarrow> y \<notin> ?M) \<and> t1 < a \<and> a < t2 \<and> ?I a p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1664	then obtain t1 and t2 where t1M: "t1 \<in> ?M" and t2M: "t2\<in> ?M"
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32642 diff changeset	1665	and noM: "\<forall> y. t1 < y \<and> y < t2 \<longrightarrow> y \<notin> ?M" and t1x: "t1 < a" and xt2: "a < t2" and px: "?I a p"
69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32642 diff changeset	1666	by blast
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1667	from t1M have "\<exists> (t1u,t1n) \<in> ?U. t1 = ?N a t1u / real t1n" by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1668	then obtain "t1u" "t1n" where t1uU: "(t1u,t1n) \<in> ?U" and t1u: "t1 = ?N a t1u / real t1n" by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1669	from t2M have "\<exists> (t2u,t2n) \<in> ?U. t2 = ?N a t2u / real t2n" by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1670	then obtain "t2u" "t2n" where t2uU: "(t2u,t2n) \<in> ?U" and t2u: "t2 = ?N a t2u / real t2n" by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1671	from t1x xt2 have t1t2: "t1 < t2" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1672	let ?u = "(t1 + t2) / 2"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1673	from less_half_sum[OF t1t2] gt_half_sum[OF t1t2] have t1lu: "t1 < ?u" and ut2: "?u < t2" by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1674	from lin_dense[OF lp noM t1x xt2 px t1lu ut2] have "?I ?u p" .
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1675	with t1uU t2uU t1u t2u have ?thesis by blast}
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1676	ultimately show ?thesis by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1677	qed
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1678	then obtain "l" "n" "s" "m" where lnU: "(l,n) \<in> ?U" and smU:"(s,m) \<in> ?U"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1679	and pu: "?I ((?N a l / real n + ?N a s / real m) / 2) p" by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1680	from lnU smU uset_l[OF lp] have nbl: "numbound0 l" and nbs: "numbound0 s" by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1681	from numbound0_I[OF nbl, where bs="bs" and b="a" and b'="x"]
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1682	numbound0_I[OF nbs, where bs="bs" and b="a" and b'="x"] pu
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1683	have "?I ((?N x l / real n + ?N x s / real m) / 2) p" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1684	with lnU smU
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1685	show ?thesis by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1686	qed
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1687	(* The Ferrante - Rackoff Theorem *)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1688
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1689	theorem fr_eq:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1690	assumes lp: "isrlfm p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1691	shows "(\<exists> x. Ifm (x#bs) p) = ((Ifm (x#bs) (minusinf p)) \<or> (Ifm (x#bs) (plusinf p)) \<or> (\<exists> (t,n) \<in> set (uset p). \<exists> (s,m) \<in> set (uset p). Ifm ((((Inum (x#bs) t)/ real n + (Inum (x#bs) s) / real m) /2)#bs) p))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1692	(is "(\<exists> x. ?I x p) = (?M \<or> ?P \<or> ?F)" is "?E = ?D")
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1693	proof
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1694	assume px: "\<exists> x. ?I x p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1695	have "?M \<or> ?P \<or> (\<not> ?M \<and> \<not> ?P)" by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1696	moreover {assume "?M \<or> ?P" hence "?D" by blast}
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1697	moreover {assume nmi: "\<not> ?M" and npi: "\<not> ?P"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1698	from rinf_uset[OF lp nmi npi] have "?F" using px by blast hence "?D" by blast}
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1699	ultimately show "?D" by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1700	next
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1701	assume "?D"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1702	moreover {assume m:"?M" from rminusinf_ex[OF lp m] have "?E" .}
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1703	moreover {assume p: "?P" from rplusinf_ex[OF lp p] have "?E" . }
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1704	moreover {assume f:"?F" hence "?E" by blast}
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1705	ultimately show "?E" by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1706	qed
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1707
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1708
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1709	lemma fr_equsubst:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1710	assumes lp: "isrlfm p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1711	shows "(\<exists> x. Ifm (x#bs) p) = ((Ifm (x#bs) (minusinf p)) \<or> (Ifm (x#bs) (plusinf p)) \<or> (\<exists> (t,k) \<in> set (uset p). \<exists> (s,l) \<in> set (uset p). Ifm (x#bs) (usubst p (Add(Mul l t) (Mul k s) , 2kl))))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1712	(is "(\<exists> x. ?I x p) = (?M \<or> ?P \<or> ?F)" is "?E = ?D")
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1713	proof
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1714	assume px: "\<exists> x. ?I x p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1715	have "?M \<or> ?P \<or> (\<not> ?M \<and> \<not> ?P)" by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1716	moreover {assume "?M \<or> ?P" hence "?D" by blast}
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1717	moreover {assume nmi: "\<not> ?M" and npi: "\<not> ?P"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1718	let ?f ="\<lambda> (t,n). Inum (x#bs) t / real n"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1719	let ?N = "\<lambda> t. Inum (x#bs) t"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1720	{fix t n s m assume "(t,n)\<in> set (uset p)" and "(s,m) \<in> set (uset p)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1721	with uset_l[OF lp] have tnb: "numbound0 t" and np:"real n > 0" and snb: "numbound0 s" and mp:"real m > 0"
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32642 diff changeset	1722	by auto
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1723	let ?st = "Add (Mul m t) (Mul n s)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1724	from mult_pos_pos[OF np mp] have mnp: "real (2nm) > 0"
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32642 diff changeset	1725	by (simp add: mult_commute)
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1726	from tnb snb have st_nb: "numbound0 ?st" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1727	have st: "(?N t / real n + ?N s / real m)/2 = ?N ?st / real (2nm)"
32960 69916a850301 eliminated hard tabulators, guessing at each author's individual tab-width; wenzelm parents: 32642 diff changeset	1728	using mnp mp np by (simp add: algebra_simps add_divide_distrib)
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1729	from usubst_I[OF lp mnp st_nb, where x="x" and bs="bs"]
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1730	have "?I x (usubst p (?st,2nm)) = ?I ((?N t / real n + ?N s / real m) /2) p" by (simp only: st[symmetric])}
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1731	with rinf_uset[OF lp nmi npi px] have "?F" by blast hence "?D" by blast}
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1732	ultimately show "?D" by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1733	next
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1734	assume "?D"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1735	moreover {assume m:"?M" from rminusinf_ex[OF lp m] have "?E" .}
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1736	moreover {assume p: "?P" from rplusinf_ex[OF lp p] have "?E" . }
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1737	moreover {fix t k s l assume "(t,k) \<in> set (uset p)" and "(s,l) \<in> set (uset p)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1738	and px:"?I x (usubst p (Add (Mul l t) (Mul k s), 2kl))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1739	with uset_l[OF lp] have tnb: "numbound0 t" and np:"real k > 0" and snb: "numbound0 s" and mp:"real l > 0" by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1740	let ?st = "Add (Mul l t) (Mul k s)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1741	from mult_pos_pos[OF np mp] have mnp: "real (2kl) > 0"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1742	by (simp add: mult_commute)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1743	from tnb snb have st_nb: "numbound0 ?st" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1744	from usubst_I[OF lp mnp st_nb, where bs="bs"] px have "?E" by auto}
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1745	ultimately show "?E" by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1746	qed
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1747
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1748
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1749	(* Implement the right hand side of Ferrante and Rackoff's Theorem. *)
35416 d8d7d1b785af replaced a couple of constsdefs by definitions (also some old primrecs by modern ones) haftmann parents: 33639 diff changeset	1750	definition ferrack :: "fm \<Rightarrow> fm" where
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	1751	"ferrack p = (let p' = rlfm (simpfm p); mp = minusinf p'; pp = plusinf p'
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1752	in if (mp = T \<or> pp = T) then T else
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	1753	(let U = remdups(map simp_num_pair
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1754	(map (\<lambda> ((t,n),(s,m)). (Add (Mul m t) (Mul n s) , 2nm))
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1755	(alluopairs (uset p'))))
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1756	in decr (disj mp (disj pp (evaldjf (simpfm o (usubst p')) U)))))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1757
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1758	lemma uset_cong_aux:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1759	assumes Ul: "\<forall> (t,n) \<in> set U. numbound0 t \<and> n >0"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1760	shows "((\<lambda> (t,n). Inum (x#bs) t /real n) ` (set (map (\<lambda> ((t,n),(s,m)). (Add (Mul m t) (Mul n s) , 2nm)) (alluopairs U)))) = ((\<lambda> ((t,n),(s,m)). (Inum (x#bs) t /real n + Inum (x#bs) s /real m)/2) ` (set U \<times> set U))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1761	(is "?lhs = ?rhs")
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1762	proof(auto)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1763	fix t n s m
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1764	assume "((t,n),(s,m)) \<in> set (alluopairs U)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1765	hence th: "((t,n),(s,m)) \<in> (set U \<times> set U)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1766	using alluopairs_set1[where xs="U"] by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1767	let ?N = "\<lambda> t. Inum (x#bs) t"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1768	let ?st= "Add (Mul m t) (Mul n s)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1769	from Ul th have mnz: "m \<noteq> 0" by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1770	from Ul th have nnz: "n \<noteq> 0" by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1771	have st: "(?N t / real n + ?N s / real m)/2 = ?N ?st / real (2nm)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1772	using mnz nnz by (simp add: algebra_simps add_divide_distrib)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1773
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1774	thus "(real m * Inum (x # bs) t + real n * Inum (x # bs) s) /
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1775	(2 * real n * real m)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1776	\<in> (\<lambda>((t, n), s, m).
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1777	(Inum (x # bs) t / real n + Inum (x # bs) s / real m) / 2) `
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1778	(set U \<times> set U)"using mnz nnz th
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1779	apply (auto simp add: th add_divide_distrib algebra_simps split_def image_def)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1780	by (rule_tac x="(s,m)" in bexI,simp_all)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1781	(rule_tac x="(t,n)" in bexI,simp_all)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1782	next
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1783	fix t n s m
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1784	assume tnU: "(t,n) \<in> set U" and smU:"(s,m) \<in> set U"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1785	let ?N = "\<lambda> t. Inum (x#bs) t"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1786	let ?st= "Add (Mul m t) (Mul n s)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1787	from Ul smU have mnz: "m \<noteq> 0" by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1788	from Ul tnU have nnz: "n \<noteq> 0" by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1789	have st: "(?N t / real n + ?N s / real m)/2 = ?N ?st / real (2nm)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1790	using mnz nnz by (simp add: algebra_simps add_divide_distrib)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1791	let ?P = "\<lambda> (t',n') (s',m'). (Inum (x # bs) t / real n + Inum (x # bs) s / real m)/2 = (Inum (x # bs) t' / real n' + Inum (x # bs) s' / real m')/2"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1792	have Pc:"\<forall> a b. ?P a b = ?P b a"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1793	by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1794	from Ul alluopairs_set1 have Up:"\<forall> ((t,n),(s,m)) \<in> set (alluopairs U). n \<noteq> 0 \<and> m \<noteq> 0" by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1795	from alluopairs_ex[OF Pc, where xs="U"] tnU smU
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1796	have th':"\<exists> ((t',n'),(s',m')) \<in> set (alluopairs U). ?P (t',n') (s',m')"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1797	by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1798	then obtain t' n' s' m' where ts'_U: "((t',n'),(s',m')) \<in> set (alluopairs U)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1799	and Pts': "?P (t',n') (s',m')" by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1800	from ts'_U Up have mnz': "m' \<noteq> 0" and nnz': "n'\<noteq> 0" by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1801	let ?st' = "Add (Mul m' t') (Mul n' s')"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1802	have st': "(?N t' / real n' + ?N s' / real m')/2 = ?N ?st' / real (2n'm')"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1803	using mnz' nnz' by (simp add: algebra_simps add_divide_distrib)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1804	from Pts' have
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1805	"(Inum (x # bs) t / real n + Inum (x # bs) s / real m)/2 = (Inum (x # bs) t' / real n' + Inum (x # bs) s' / real m')/2" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1806	also have "\<dots> = ((\<lambda>(t, n). Inum (x # bs) t / real n) ((\<lambda>((t, n), s, m). (Add (Mul m t) (Mul n s), 2 * n * m)) ((t',n'),(s',m'))))" by (simp add: st')
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1807	finally show "(Inum (x # bs) t / real n + Inum (x # bs) s / real m) / 2
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1808	\<in> (\<lambda>(t, n). Inum (x # bs) t / real n) `
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1809	(\<lambda>((t, n), s, m). (Add (Mul m t) (Mul n s), 2 * n * m)) `
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1810	set (alluopairs U)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1811	using ts'_U by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1812	qed
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1813
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1814	lemma uset_cong:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1815	assumes lp: "isrlfm p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1816	and UU': "((\<lambda> (t,n). Inum (x#bs) t /real n) ` U') = ((\<lambda> ((t,n),(s,m)). (Inum (x#bs) t /real n + Inum (x#bs) s /real m)/2) ` (U \<times> U))" (is "?f ` U' = ?g ` (U\<times>U)")
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1817	and U: "\<forall> (t,n) \<in> U. numbound0 t \<and> n > 0"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1818	and U': "\<forall> (t,n) \<in> U'. numbound0 t \<and> n > 0"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1819	shows "(\<exists> (t,n) \<in> U. \<exists> (s,m) \<in> U. Ifm (x#bs) (usubst p (Add (Mul m t) (Mul n s),2nm))) = (\<exists> (t,n) \<in> U'. Ifm (x#bs) (usubst p (t,n)))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1820	(is "?lhs = ?rhs")
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1821	proof
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1822	assume ?lhs
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1823	then obtain t n s m where tnU: "(t,n) \<in> U" and smU:"(s,m) \<in> U" and
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1824	Pst: "Ifm (x#bs) (usubst p (Add (Mul m t) (Mul n s),2nm))" by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1825	let ?N = "\<lambda> t. Inum (x#bs) t"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1826	from tnU smU U have tnb: "numbound0 t" and np: "n > 0"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1827	and snb: "numbound0 s" and mp:"m > 0" by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1828	let ?st= "Add (Mul m t) (Mul n s)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1829	from mult_pos_pos[OF np mp] have mnp: "real (2nm) > 0"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1830	by (simp add: mult_commute real_of_int_mult[symmetric] del: real_of_int_mult)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1831	from tnb snb have stnb: "numbound0 ?st" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1832	have st: "(?N t / real n + ?N s / real m)/2 = ?N ?st / real (2nm)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1833	using mp np by (simp add: algebra_simps add_divide_distrib)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1834	from tnU smU UU' have "?g ((t,n),(s,m)) \<in> ?f ` U'" by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1835	hence "\<exists> (t',n') \<in> U'. ?g ((t,n),(s,m)) = ?f (t',n')"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1836	by auto (rule_tac x="(a,b)" in bexI, auto)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1837	then obtain t' n' where tnU': "(t',n') \<in> U'" and th: "?g ((t,n),(s,m)) = ?f (t',n')" by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1838	from U' tnU' have tnb': "numbound0 t'" and np': "real n' > 0" by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1839	from usubst_I[OF lp mnp stnb, where bs="bs" and x="x"] Pst
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1840	have Pst2: "Ifm (Inum (x # bs) (Add (Mul m t) (Mul n s)) / real (2 * n * m) # bs) p" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1841	from conjunct1[OF usubst_I[OF lp np' tnb', where bs="bs" and x="x"], symmetric] th[simplified split_def fst_conv snd_conv,symmetric] Pst2[simplified st[symmetric]]
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1842	have "Ifm (x # bs) (usubst p (t', n')) " by (simp only: st)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1843	then show ?rhs using tnU' by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1844	next
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1845	assume ?rhs
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1846	then obtain t' n' where tnU': "(t',n') \<in> U'" and Pt': "Ifm (x # bs) (usubst p (t', n'))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1847	by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1848	from tnU' UU' have "?f (t',n') \<in> ?g ` (U\<times>U)" by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1849	hence "\<exists> ((t,n),(s,m)) \<in> (U\<times>U). ?f (t',n') = ?g ((t,n),(s,m))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1850	by auto (rule_tac x="(a,b)" in bexI, auto)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1851	then obtain t n s m where tnU: "(t,n) \<in> U" and smU:"(s,m) \<in> U" and
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1852	th: "?f (t',n') = ?g((t,n),(s,m)) "by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1853	let ?N = "\<lambda> t. Inum (x#bs) t"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1854	from tnU smU U have tnb: "numbound0 t" and np: "n > 0"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1855	and snb: "numbound0 s" and mp:"m > 0" by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1856	let ?st= "Add (Mul m t) (Mul n s)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1857	from mult_pos_pos[OF np mp] have mnp: "real (2nm) > 0"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1858	by (simp add: mult_commute real_of_int_mult[symmetric] del: real_of_int_mult)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1859	from tnb snb have stnb: "numbound0 ?st" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1860	have st: "(?N t / real n + ?N s / real m)/2 = ?N ?st / real (2nm)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1861	using mp np by (simp add: algebra_simps add_divide_distrib)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1862	from U' tnU' have tnb': "numbound0 t'" and np': "real n' > 0" by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1863	from usubst_I[OF lp np' tnb', where bs="bs" and x="x",simplified th[simplified split_def fst_conv snd_conv] st] Pt'
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1864	have Pst2: "Ifm (Inum (x # bs) (Add (Mul m t) (Mul n s)) / real (2 * n * m) # bs) p" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1865	with usubst_I[OF lp mnp stnb, where x="x" and bs="bs"] tnU smU show ?lhs by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1866	qed
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1867
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1868	lemma ferrack:
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1869	assumes qf: "qfree p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1870	shows "qfree (ferrack p) \<and> ((Ifm bs (ferrack p)) = (\<exists> x. Ifm (x#bs) p))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1871	(is "_ \<and> (?rhs = ?lhs)")
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1872	proof-
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1873	let ?I = "\<lambda> x p. Ifm (x#bs) p"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1874	fix x
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1875	let ?N = "\<lambda> t. Inum (x#bs) t"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1876	let ?q = "rlfm (simpfm p)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1877	let ?U = "uset ?q"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1878	let ?Up = "alluopairs ?U"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1879	let ?g = "\<lambda> ((t,n),(s,m)). (Add (Mul m t) (Mul n s) , 2nm)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1880	let ?S = "map ?g ?Up"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1881	let ?SS = "map simp_num_pair ?S"
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	1882	let ?Y = "remdups ?SS"
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1883	let ?f= "(\<lambda> (t,n). ?N t / real n)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1884	let ?h = "\<lambda> ((t,n),(s,m)). (?N t/real n + ?N s/ real m) /2"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1885	let ?F = "\<lambda> p. \<exists> a \<in> set (uset p). \<exists> b \<in> set (uset p). ?I x (usubst p (?g(a,b)))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1886	let ?ep = "evaldjf (simpfm o (usubst ?q)) ?Y"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1887	from rlfm_I[OF simpfm_qf[OF qf]] have lq: "isrlfm ?q" by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1888	from alluopairs_set1[where xs="?U"] have UpU: "set ?Up \<le> (set ?U \<times> set ?U)" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1889	from uset_l[OF lq] have U_l: "\<forall> (t,n) \<in> set ?U. numbound0 t \<and> n > 0" .
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1890	from U_l UpU
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1891	have "\<forall> ((t,n),(s,m)) \<in> set ?Up. numbound0 t \<and> n> 0 \<and> numbound0 s \<and> m > 0" by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1892	hence Snb: "\<forall> (t,n) \<in> set ?S. numbound0 t \<and> n > 0 "
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1893	by (auto simp add: mult_pos_pos)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1894	have Y_l: "\<forall> (t,n) \<in> set ?Y. numbound0 t \<and> n > 0"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1895	proof-
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1896	{ fix t n assume tnY: "(t,n) \<in> set ?Y"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1897	hence "(t,n) \<in> set ?SS" by simp
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1898	hence "\<exists> (t',n') \<in> set ?S. simp_num_pair (t',n') = (t,n)"
33639 603320b93668 New list theorems; added map_map to simpset, this is the prefered direction; allow sorting by a key hoelzl parents: 33063 diff changeset	1899	by (auto simp add: split_def simp del: map_map)
603320b93668 New list theorems; added map_map to simpset, this is the prefered direction; allow sorting by a key hoelzl parents: 33063 diff changeset	1900	(rule_tac x="((aa,ba),(ab,bb))" in bexI, simp_all)
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1901	then obtain t' n' where tn'S: "(t',n') \<in> set ?S" and tns: "simp_num_pair (t',n') = (t,n)" by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1902	from tn'S Snb have tnb: "numbound0 t'" and np: "n' > 0" by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1903	from simp_num_pair_l[OF tnb np tns]
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1904	have "numbound0 t \<and> n > 0" . }
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1905	thus ?thesis by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1906	qed
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1907
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1908	have YU: "(?f ` set ?Y) = (?h ` (set ?U \<times> set ?U))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1909	proof-
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1910	from simp_num_pair_ci[where bs="x#bs"] have
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1911	"\<forall>x. (?f o simp_num_pair) x = ?f x" by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1912	hence th: "?f o simp_num_pair = ?f" using ext by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1913	have "(?f ` set ?Y) = ((?f o simp_num_pair) ` set ?S)" by (simp add: image_compose)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1914	also have "\<dots> = (?f ` set ?S)" by (simp add: th)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1915	also have "\<dots> = ((?f o ?g) ` set ?Up)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1916	by (simp only: set_map o_def image_compose[symmetric])
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1917	also have "\<dots> = (?h ` (set ?U \<times> set ?U))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1918	using uset_cong_aux[OF U_l, where x="x" and bs="bs", simplified set_map image_compose[symmetric]] by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1919	finally show ?thesis .
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1920	qed
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1921	have "\<forall> (t,n) \<in> set ?Y. bound0 (simpfm (usubst ?q (t,n)))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1922	proof-
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1923	{ fix t n assume tnY: "(t,n) \<in> set ?Y"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1924	with Y_l have tnb: "numbound0 t" and np: "real n > 0" by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1925	from usubst_I[OF lq np tnb]
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1926	have "bound0 (usubst ?q (t,n))" by simp hence "bound0 (simpfm (usubst ?q (t,n)))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1927	using simpfm_bound0 by simp}
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1928	thus ?thesis by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1929	qed
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1930	hence ep_nb: "bound0 ?ep" using evaldjf_bound0[where xs="?Y" and f="simpfm o (usubst ?q)"] by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1931	let ?mp = "minusinf ?q"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1932	let ?pp = "plusinf ?q"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1933	let ?M = "?I x ?mp"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1934	let ?P = "?I x ?pp"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1935	let ?res = "disj ?mp (disj ?pp ?ep)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1936	from rminusinf_bound0[OF lq] rplusinf_bound0[OF lq] ep_nb
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1937	have nbth: "bound0 ?res" by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1938
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1939	from conjunct1[OF rlfm_I[OF simpfm_qf[OF qf]]] simpfm
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1940
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1941	have th: "?lhs = (\<exists> x. ?I x ?q)" by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1942	from th fr_equsubst[OF lq, where bs="bs" and x="x"] have lhfr: "?lhs = (?M \<or> ?P \<or> ?F ?q)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1943	by (simp only: split_def fst_conv snd_conv)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1944	also have "\<dots> = (?M \<or> ?P \<or> (\<exists> (t,n) \<in> set ?Y. ?I x (simpfm (usubst ?q (t,n)))))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1945	using uset_cong[OF lq YU U_l Y_l] by (simp only: split_def fst_conv snd_conv simpfm)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1946	also have "\<dots> = (Ifm (x#bs) ?res)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1947	using evaldjf_ex[where ps="?Y" and bs = "x#bs" and f="simpfm o (usubst ?q)",symmetric]
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1948	by (simp add: split_def pair_collapse)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1949	finally have lheq: "?lhs = (Ifm bs (decr ?res))" using decr[OF nbth] by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1950	hence lr: "?lhs = ?rhs" apply (unfold ferrack_def Let_def)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1951	by (cases "?mp = T \<or> ?pp = T", auto) (simp add: disj_def)+
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1952	from decr_qf[OF nbth] have "qfree (ferrack p)" by (auto simp add: Let_def ferrack_def)
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1953	with lr show ?thesis by blast
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1954	qed
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1955
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1956	definition linrqe:: "fm \<Rightarrow> fm" where
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1957	"linrqe p = qelim (prep p) ferrack"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1958
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1959	theorem linrqe: "Ifm bs (linrqe p) = Ifm bs p \<and> qfree (linrqe p)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1960	using ferrack qelim_ci prep
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1961	unfolding linrqe_def by auto
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1962
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1963	definition ferrack_test :: "unit \<Rightarrow> fm" where
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1964	"ferrack_test u = linrqe (A (A (Imp (Lt (Sub (Bound 1) (Bound 0)))
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1965	(E (Eq (Sub (Add (Bound 0) (Bound 2)) (Bound 1)))))))"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1966
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1967	ML {* @{code ferrack_test} () *}
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1968
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1969	oracle linr_oracle = {*
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1970	let
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1971
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	1972	fun num_of_term vs (Free vT) = @{code Bound} (find_index (fn vT' => vT = vT') vs)
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1973	\| num_of_term vs @{term "real (0::int)"} = @{code C} 0
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1974	\| num_of_term vs @{term "real (1::int)"} = @{code C} 1
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1975	\| num_of_term vs @{term "0::real"} = @{code C} 0
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1976	\| num_of_term vs @{term "1::real"} = @{code C} 1
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1977	\| num_of_term vs (Bound i) = @{code Bound} i
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1978	\| num_of_term vs (@{term "uminus :: real \<Rightarrow> real"} $ t') = @{code Neg} (num_of_term vs t')
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	1979	\| num_of_term vs (@{term "op + :: real \<Rightarrow> real \<Rightarrow> real"} $ t1 $ t2) =
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	1980	@{code Add} (num_of_term vs t1, num_of_term vs t2)
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	1981	\| num_of_term vs (@{term "op - :: real \<Rightarrow> real \<Rightarrow> real"} $ t1 $ t2) =
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	1982	@{code Sub} (num_of_term vs t1, num_of_term vs t2)
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	1983	\| num_of_term vs (@{term "op * :: real \<Rightarrow> real \<Rightarrow> real"} $ t1 $ t2) = (case num_of_term vs t1
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1984	of @{code C} i => @{code Mul} (i, num_of_term vs t2)
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	1985	\| _ => error "num_of_term: unsupported multiplication")
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	1986	\| num_of_term vs (@{term "real :: int \<Rightarrow> real"} $ (@{term "number_of :: int \<Rightarrow> int"} $ t')) =
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	1987	@{code C} (HOLogic.dest_numeral t')
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	1988	\| num_of_term vs (@{term "number_of :: int \<Rightarrow> real"} $ t') =
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	1989	@{code C} (HOLogic.dest_numeral t')
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	1990	\| num_of_term vs t = error ("num_of_term: unknown term");
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1991
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1992	fun fm_of_term vs @{term True} = @{code T}
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	1993	\| fm_of_term vs @{term False} = @{code F}
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	1994	\| fm_of_term vs (@{term "op < :: real \<Rightarrow> real \<Rightarrow> bool"} $ t1 $ t2) =
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	1995	@{code Lt} (@{code Sub} (num_of_term vs t1, num_of_term vs t2))
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	1996	\| fm_of_term vs (@{term "op \<le> :: real \<Rightarrow> real \<Rightarrow> bool"} $ t1 $ t2) =
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	1997	@{code Le} (@{code Sub} (num_of_term vs t1, num_of_term vs t2))
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	1998	\| fm_of_term vs (@{term "op = :: real \<Rightarrow> real \<Rightarrow> bool"} $ t1 $ t2) =
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	1999	@{code Eq} (@{code Sub} (num_of_term vs t1, num_of_term vs t2))
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	2000	\| fm_of_term vs (@{term "op \<longleftrightarrow> :: bool \<Rightarrow> bool \<Rightarrow> bool"} $ t1 $ t2) =
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	2001	@{code Iff} (fm_of_term vs t1, fm_of_term vs t2)
38795 848be46708dc formerly unnamed infix conjunction and disjunction now named HOL.conj and HOL.disj haftmann parents: 38786 diff changeset	2002	\| fm_of_term vs (@{term HOL.conj} $ t1 $ t2) = @{code And} (fm_of_term vs t1, fm_of_term vs t2)
848be46708dc formerly unnamed infix conjunction and disjunction now named HOL.conj and HOL.disj haftmann parents: 38786 diff changeset	2003	\| fm_of_term vs (@{term HOL.disj} $ t1 $ t2) = @{code Or} (fm_of_term vs t1, fm_of_term vs t2)
38786 e46e7a9cb622 formerly unnamed infix impliciation now named HOL.implies haftmann parents: 38558 diff changeset	2004	\| fm_of_term vs (@{term HOL.implies} $ t1 $ t2) = @{code Imp} (fm_of_term vs t1, fm_of_term vs t2)
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2005	\| fm_of_term vs (@{term "Not"} $ t') = @{code NOT} (fm_of_term vs t')
38558 32ad17fe2b9c tuned quotes haftmann parents: 38549 diff changeset	2006	\| fm_of_term vs (Const (@{const_name Ex}, _) $ Abs (xn, xT, p)) =
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	2007	@{code E} (fm_of_term (("", dummyT) :: vs) p)
38558 32ad17fe2b9c tuned quotes haftmann parents: 38549 diff changeset	2008	\| fm_of_term vs (Const (@{const_name All}, _) $ Abs (xn, xT, p)) =
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	2009	@{code A} (fm_of_term (("", dummyT) :: vs) p)
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2010	\| fm_of_term vs t = error ("fm_of_term : unknown term " ^ Syntax.string_of_term @{context} t);
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2011
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2012	fun term_of_num vs (@{code C} i) = @{term "real :: int \<Rightarrow> real"} $ HOLogic.mk_number HOLogic.intT i
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	2013	\| term_of_num vs (@{code Bound} n) = Free (nth vs n)
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2014	\| term_of_num vs (@{code Neg} t') = @{term "uminus :: real \<Rightarrow> real"} $ term_of_num vs t'
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2015	\| term_of_num vs (@{code Add} (t1, t2)) = @{term "op + :: real \<Rightarrow> real \<Rightarrow> real"} $
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2016	term_of_num vs t1 $ term_of_num vs t2
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2017	\| term_of_num vs (@{code Sub} (t1, t2)) = @{term "op - :: real \<Rightarrow> real \<Rightarrow> real"} $
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2018	term_of_num vs t1 $ term_of_num vs t2
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2019	\| term_of_num vs (@{code Mul} (i, t2)) = @{term "op * :: real \<Rightarrow> real \<Rightarrow> real"} $
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2020	term_of_num vs (@{code C} i) $ term_of_num vs t2
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2021	\| term_of_num vs (@{code CN} (n, i, t)) = term_of_num vs (@{code Add} (@{code Mul} (i, @{code Bound} n), t));
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2022
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2023	fun term_of_fm vs @{code T} = HOLogic.true_const
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2024	\| term_of_fm vs @{code F} = HOLogic.false_const
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2025	\| term_of_fm vs (@{code Lt} t) = @{term "op < :: real \<Rightarrow> real \<Rightarrow> bool"} $
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2026	term_of_num vs t $ @{term "0::real"}
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2027	\| term_of_fm vs (@{code Le} t) = @{term "op \<le> :: real \<Rightarrow> real \<Rightarrow> bool"} $
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2028	term_of_num vs t $ @{term "0::real"}
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2029	\| term_of_fm vs (@{code Gt} t) = @{term "op < :: real \<Rightarrow> real \<Rightarrow> bool"} $
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2030	@{term "0::real"} $ term_of_num vs t
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2031	\| term_of_fm vs (@{code Ge} t) = @{term "op \<le> :: real \<Rightarrow> real \<Rightarrow> bool"} $
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2032	@{term "0::real"} $ term_of_num vs t
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2033	\| term_of_fm vs (@{code Eq} t) = @{term "op = :: real \<Rightarrow> real \<Rightarrow> bool"} $
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2034	term_of_num vs t $ @{term "0::real"}
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2035	\| term_of_fm vs (@{code NEq} t) = term_of_fm vs (@{code NOT} (@{code Eq} t))
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2036	\| term_of_fm vs (@{code NOT} t') = HOLogic.Not $ term_of_fm vs t'
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2037	\| term_of_fm vs (@{code And} (t1, t2)) = HOLogic.conj $ term_of_fm vs t1 $ term_of_fm vs t2
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2038	\| term_of_fm vs (@{code Or} (t1, t2)) = HOLogic.disj $ term_of_fm vs t1 $ term_of_fm vs t2
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2039	\| term_of_fm vs (@{code Imp} (t1, t2)) = HOLogic.imp $ term_of_fm vs t1 $ term_of_fm vs t2
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2040	\| term_of_fm vs (@{code Iff} (t1, t2)) = @{term "op \<longleftrightarrow> :: bool \<Rightarrow> bool \<Rightarrow> bool"} $
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	2041	term_of_fm vs t1 $ term_of_fm vs t2;
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2042
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	2043	in fn (ctxt, t) =>
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2044	let
36853 c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	2045	val vs = Term.add_frees t [];
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	2046	val t' = (term_of_fm vs o @{code linrqe} o fm_of_term vs) t;
c8e4102b08aa modernized specifications; tuned reification haftmann parents: 35416 diff changeset	2047	in (Thm.cterm_of (ProofContext.theory_of ctxt) o HOLogic.mk_Trueprop o HOLogic.mk_eq) (t, t') end
29789 b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2048	end;
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2049	*}
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2050
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2051	use "ferrack_tac.ML"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2052	setup Ferrack_Tac.setup
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2053
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2054	lemma
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2055	fixes x :: real
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2056	shows "2 * x \<le> 2 * x \<and> 2 * x \<le> 2 * x + 1"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2057	apply rferrack
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2058	done
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2059
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2060	lemma
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2061	fixes x :: real
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2062	shows "\<exists>y \<le> x. x = y + 1"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2063	apply rferrack
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2064	done
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2065
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2066	lemma
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2067	fixes x :: real
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2068	shows "\<not> (\<exists>z. x + z = x + z + 1)"
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2069	apply rferrack
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2070	done
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2071
b4534c3e68f6 established session HOL-Reflection haftmann parents: diff changeset	2072	end

author	krauss
	Thu, 24 Feb 2011 20:52:05 +0100
changeset 41838	c845adaecf98
parent 41807	ab5d2d81f9fb
child 41842	d8f76db6a207
permissions	-rw-r--r--