isabelle: src/HOL/Presburger.thy@45cd7db985b3 (annotated)

23148 ef3fa1386102 fixed title; wenzelm parents: 23146 diff changeset	1	(* Title: HOL/Presburger.thy
13876 68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	2	ID: $Id$
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	3	Author: Amine Chaieb, TU Muenchen
13876 68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	4	*)
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	5
15131 c69542757a4d New theory header syntax. nipkow parents: 15013 diff changeset	6	theory Presburger
23164 69e55066dbca moved Integ files to canonical place; wenzelm parents: 23148 diff changeset	7	imports NatSimprocs SetInterval
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	8	uses "Tools/Presburger/cooper_data" "Tools/Presburger/qelim"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	9	"Tools/Presburger/generated_cooper.ML"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	10	("Tools/Presburger/cooper.ML") ("Tools/Presburger/presburger.ML")
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	11
15131 c69542757a4d New theory header syntax. nipkow parents: 15013 diff changeset	12	begin
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	13	setup {* Cooper_Data.setup*}
13876 68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	14
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	15	section{* The @{text "-\<infinity>"} and @{text "+\<infinity>"} Properties *}
13876 68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	16
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	17	lemma minf:
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	18	"\<lbrakk>\<exists>(z ::'a::linorder).\<forall>x<z. P x = P' x; \<exists>z.\<forall>x<z. Q x = Q' x\<rbrakk>
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	19	\<Longrightarrow> \<exists>z.\<forall>x<z. (P x \<and> Q x) = (P' x \<and> Q' x)"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	20	"\<lbrakk>\<exists>(z ::'a::linorder).\<forall>x<z. P x = P' x; \<exists>z.\<forall>x<z. Q x = Q' x\<rbrakk>
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	21	\<Longrightarrow> \<exists>z.\<forall>x<z. (P x \<or> Q x) = (P' x \<or> Q' x)"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	22	"\<exists>(z ::'a::{linorder}).\<forall>x<z.(x = t) = False"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	23	"\<exists>(z ::'a::{linorder}).\<forall>x<z.(x \<noteq> t) = True"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	24	"\<exists>(z ::'a::{linorder}).\<forall>x<z.(x < t) = True"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	25	"\<exists>(z ::'a::{linorder}).\<forall>x<z.(x \<le> t) = True"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	26	"\<exists>(z ::'a::{linorder}).\<forall>x<z.(x > t) = False"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	27	"\<exists>(z ::'a::{linorder}).\<forall>x<z.(x \<ge> t) = False"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	28	"\<exists>z.\<forall>(x::'a::{linorder,plus,times})<z. (d dvd x + s) = (d dvd x + s)"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	29	"\<exists>z.\<forall>(x::'a::{linorder,plus,times})<z. (\<not> d dvd x + s) = (\<not> d dvd x + s)"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	30	"\<exists>z.\<forall>x<z. F = F"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	31	by ((erule exE, erule exE,rule_tac x="min z za" in exI,simp)+, (rule_tac x="t" in exI,fastsimp)+) simp_all
13876 68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	32
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	33	lemma pinf:
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	34	"\<lbrakk>\<exists>(z ::'a::linorder).\<forall>x>z. P x = P' x; \<exists>z.\<forall>x>z. Q x = Q' x\<rbrakk>
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	35	\<Longrightarrow> \<exists>z.\<forall>x>z. (P x \<and> Q x) = (P' x \<and> Q' x)"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	36	"\<lbrakk>\<exists>(z ::'a::linorder).\<forall>x>z. P x = P' x; \<exists>z.\<forall>x>z. Q x = Q' x\<rbrakk>
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	37	\<Longrightarrow> \<exists>z.\<forall>x>z. (P x \<or> Q x) = (P' x \<or> Q' x)"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	38	"\<exists>(z ::'a::{linorder}).\<forall>x>z.(x = t) = False"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	39	"\<exists>(z ::'a::{linorder}).\<forall>x>z.(x \<noteq> t) = True"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	40	"\<exists>(z ::'a::{linorder}).\<forall>x>z.(x < t) = False"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	41	"\<exists>(z ::'a::{linorder}).\<forall>x>z.(x \<le> t) = False"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	42	"\<exists>(z ::'a::{linorder}).\<forall>x>z.(x > t) = True"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	43	"\<exists>(z ::'a::{linorder}).\<forall>x>z.(x \<ge> t) = True"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	44	"\<exists>z.\<forall>(x::'a::{linorder,plus,times})>z. (d dvd x + s) = (d dvd x + s)"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	45	"\<exists>z.\<forall>(x::'a::{linorder,plus,times})>z. (\<not> d dvd x + s) = (\<not> d dvd x + s)"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	46	"\<exists>z.\<forall>x>z. F = F"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	47	by ((erule exE, erule exE,rule_tac x="max z za" in exI,simp)+,(rule_tac x="t" in exI,fastsimp)+) simp_all
13876 68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	48
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	49	lemma inf_period:
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	50	"\<lbrakk>\<forall>x k. P x = P (x - kD); \<forall>x k. Q x = Q (x - kD)\<rbrakk>
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	51	\<Longrightarrow> \<forall>x k. (P x \<and> Q x) = (P (x - kD) \<and> Q (x - kD))"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	52	"\<lbrakk>\<forall>x k. P x = P (x - kD); \<forall>x k. Q x = Q (x - kD)\<rbrakk>
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	53	\<Longrightarrow> \<forall>x k. (P x \<or> Q x) = (P (x - kD) \<or> Q (x - kD))"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	54	"(d::'a::{comm_ring}) dvd D \<Longrightarrow> \<forall>x k. (d dvd x + t) = (d dvd (x - k*D) + t)"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	55	"(d::'a::{comm_ring}) dvd D \<Longrightarrow> \<forall>x k. (\<not>d dvd x + t) = (\<not>d dvd (x - k*D) + t)"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	56	"\<forall>x k. F = F"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	57	by simp_all
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	58	(clarsimp simp add: dvd_def, rule iffI, clarsimp,rule_tac x = "kb - ka*k" in exI,
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	59	simp add: ring_eq_simps, clarsimp,rule_tac x = "kb + ka*k" in exI,simp add: ring_eq_simps)+
13876 68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	60
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	61	section{* The A and B sets *}
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	62	lemma bset:
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	63	"\<lbrakk>\<forall>x.(\<forall>j \<in> {1 .. D}. \<forall>b\<in>B. x \<noteq> b + j)\<longrightarrow> P x \<longrightarrow> P(x - D) ;
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	64	\<forall>x.(\<forall>j\<in>{1 .. D}. \<forall>b\<in>B. x \<noteq> b + j)\<longrightarrow> Q x \<longrightarrow> Q(x - D)\<rbrakk> \<Longrightarrow>
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	65	\<forall>x.(\<forall>j\<in>{1 .. D}. \<forall>b\<in>B. x \<noteq> b + j) \<longrightarrow> (P x \<and> Q x) \<longrightarrow> (P(x - D) \<and> Q (x - D))"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	66	"\<lbrakk>\<forall>x.(\<forall>j\<in>{1 .. D}. \<forall>b\<in>B. x \<noteq> b + j)\<longrightarrow> P x \<longrightarrow> P(x - D) ;
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	67	\<forall>x.(\<forall>j\<in>{1 .. D}. \<forall>b\<in>B. x \<noteq> b + j)\<longrightarrow> Q x \<longrightarrow> Q(x - D)\<rbrakk> \<Longrightarrow>
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	68	\<forall>x.(\<forall>j\<in>{1 .. D}. \<forall>b\<in>B. x \<noteq> b + j)\<longrightarrow> (P x \<or> Q x) \<longrightarrow> (P(x - D) \<or> Q (x - D))"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	69	"\<lbrakk>D>0; t - 1\<in> B\<rbrakk> \<Longrightarrow> (\<forall>x.(\<forall>j\<in>{1 .. D}. \<forall>b\<in>B. x \<noteq> b + j)\<longrightarrow> (x = t) \<longrightarrow> (x - D = t))"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	70	"\<lbrakk>D>0 ; t \<in> B\<rbrakk> \<Longrightarrow>(\<forall>(x::int).(\<forall>j\<in>{1 .. D}. \<forall>b\<in>B. x \<noteq> b + j)\<longrightarrow> (x \<noteq> t) \<longrightarrow> (x - D \<noteq> t))"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	71	"D>0 \<Longrightarrow> (\<forall>(x::int).(\<forall>j\<in>{1 .. D}. \<forall>b\<in>B. x \<noteq> b + j)\<longrightarrow> (x < t) \<longrightarrow> (x - D < t))"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	72	"D>0 \<Longrightarrow> (\<forall>(x::int).(\<forall>j\<in>{1 .. D}. \<forall>b\<in>B. x \<noteq> b + j)\<longrightarrow> (x \<le> t) \<longrightarrow> (x - D \<le> t))"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	73	"\<lbrakk>D>0 ; t \<in> B\<rbrakk> \<Longrightarrow>(\<forall>(x::int).(\<forall>j\<in>{1 .. D}. \<forall>b\<in>B. x \<noteq> b + j)\<longrightarrow> (x > t) \<longrightarrow> (x - D > t))"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	74	"\<lbrakk>D>0 ; t - 1 \<in> B\<rbrakk> \<Longrightarrow>(\<forall>(x::int).(\<forall>j\<in>{1 .. D}. \<forall>b\<in>B. x \<noteq> b + j)\<longrightarrow> (x \<ge> t) \<longrightarrow> (x - D \<ge> t))"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	75	"d dvd D \<Longrightarrow>(\<forall>(x::int).(\<forall>j\<in>{1 .. D}. \<forall>b\<in>B. x \<noteq> b + j)\<longrightarrow> (d dvd x+t) \<longrightarrow> (d dvd (x - D) + t))"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	76	"d dvd D \<Longrightarrow>(\<forall>(x::int).(\<forall>j\<in>{1 .. D}. \<forall>b\<in>B. x \<noteq> b + j)\<longrightarrow> (\<not>d dvd x+t) \<longrightarrow> (\<not> d dvd (x - D) + t))"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	77	"\<forall>x.(\<forall>j\<in>{1 .. D}. \<forall>b\<in>B. x \<noteq> b + j) \<longrightarrow> F \<longrightarrow> F"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	78	proof (blast, blast)
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	79	assume dp: "D > 0" and tB: "t - 1\<in> B"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	80	show "(\<forall>x.(\<forall>j\<in>{1 .. D}. \<forall>b\<in>B. x \<noteq> b + j)\<longrightarrow> (x = t) \<longrightarrow> (x - D = t))"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	81	apply (rule allI, rule impI,erule ballE[where x="1"],erule ballE[where x="t - 1"])
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	82	using dp tB by simp_all
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	83	next
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	84	assume dp: "D > 0" and tB: "t \<in> B"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	85	show "(\<forall>x.(\<forall>j\<in>{1 .. D}. \<forall>b\<in>B. x \<noteq> b + j)\<longrightarrow> (x \<noteq> t) \<longrightarrow> (x - D \<noteq> t))"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	86	apply (rule allI, rule impI,erule ballE[where x="D"],erule ballE[where x="t"])
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	87	using dp tB by simp_all
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	88	next
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	89	assume dp: "D > 0" thus "(\<forall>x.(\<forall>j\<in>{1 .. D}. \<forall>b\<in>B. x \<noteq> b + j)\<longrightarrow> (x < t) \<longrightarrow> (x - D < t))" by arith
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	90	next
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	91	assume dp: "D > 0" thus "\<forall>x.(\<forall>j\<in>{1 .. D}. \<forall>b\<in>B. x \<noteq> b + j)\<longrightarrow> (x \<le> t) \<longrightarrow> (x - D \<le> t)" by arith
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	92	next
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	93	assume dp: "D > 0" and tB:"t \<in> B"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	94	{fix x assume nob: "\<forall>j\<in>{1 .. D}. \<forall>b\<in>B. x \<noteq> b + j" and g: "x > t" and ng: "\<not> (x - D) > t"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	95	hence "x -t \<le> D" and "1 \<le> x - t" by simp+
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	96	hence "\<exists>j \<in> {1 .. D}. x - t = j" by auto
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	97	hence "\<exists>j \<in> {1 .. D}. x = t + j" by (simp add: ring_eq_simps)
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	98	with nob tB have "False" by simp}
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	99	thus "\<forall>x.(\<forall>j\<in>{1 .. D}. \<forall>b\<in>B. x \<noteq> b + j)\<longrightarrow> (x > t) \<longrightarrow> (x - D > t)" by blast
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	100	next
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	101	assume dp: "D > 0" and tB:"t - 1\<in> B"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	102	{fix x assume nob: "\<forall>j\<in>{1 .. D}. \<forall>b\<in>B. x \<noteq> b + j" and g: "x \<ge> t" and ng: "\<not> (x - D) \<ge> t"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	103	hence "x - (t - 1) \<le> D" and "1 \<le> x - (t - 1)" by simp+
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	104	hence "\<exists>j \<in> {1 .. D}. x - (t - 1) = j" by auto
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	105	hence "\<exists>j \<in> {1 .. D}. x = (t - 1) + j" by (simp add: ring_eq_simps)
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	106	with nob tB have "False" by simp}
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	107	thus "\<forall>x.(\<forall>j\<in>{1 .. D}. \<forall>b\<in>B. x \<noteq> b + j)\<longrightarrow> (x \<ge> t) \<longrightarrow> (x - D \<ge> t)" by blast
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	108	next
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	109	assume d: "d dvd D"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	110	{fix x assume H: "d dvd x + t" with d have "d dvd (x - D) + t"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	111	by (clarsimp simp add: dvd_def,rule_tac x= "ka - k" in exI,simp add: ring_eq_simps)}
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	112	thus "\<forall>(x::int).(\<forall>j\<in>{1 .. D}. \<forall>b\<in>B. x \<noteq> b + j)\<longrightarrow> (d dvd x+t) \<longrightarrow> (d dvd (x - D) + t)" by simp
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	113	next
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	114	assume d: "d dvd D"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	115	{fix x assume H: "\<not>(d dvd x + t)" with d have "\<not>d dvd (x - D) + t"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	116	by (clarsimp simp add: dvd_def,erule_tac x= "ka + k" in allE,simp add: ring_eq_simps)}
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	117	thus "\<forall>(x::int).(\<forall>j\<in>{1 .. D}. \<forall>b\<in>B. x \<noteq> b + j)\<longrightarrow> (\<not>d dvd x+t) \<longrightarrow> (\<not>d dvd (x - D) + t)" by auto
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	118	qed blast
13876 68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	119
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	120	lemma aset:
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	121	"\<lbrakk>\<forall>x.(\<forall>j\<in>{1 .. D}. \<forall>b\<in>A. x \<noteq> b - j)\<longrightarrow> P x \<longrightarrow> P(x + D) ;
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	122	\<forall>x.(\<forall>j\<in>{1 .. D}. \<forall>b\<in>A. x \<noteq> b - j)\<longrightarrow> Q x \<longrightarrow> Q(x + D)\<rbrakk> \<Longrightarrow>
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	123	\<forall>x.(\<forall>j\<in>{1 .. D}. \<forall>b\<in>A. x \<noteq> b - j) \<longrightarrow> (P x \<and> Q x) \<longrightarrow> (P(x + D) \<and> Q (x + D))"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	124	"\<lbrakk>\<forall>x.(\<forall>j\<in>{1 .. D}. \<forall>b\<in>A. x \<noteq> b - j)\<longrightarrow> P x \<longrightarrow> P(x + D) ;
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	125	\<forall>x.(\<forall>j\<in>{1 .. D}. \<forall>b\<in>A. x \<noteq> b - j)\<longrightarrow> Q x \<longrightarrow> Q(x + D)\<rbrakk> \<Longrightarrow>
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	126	\<forall>x.(\<forall>j\<in>{1 .. D}. \<forall>b\<in>A. x \<noteq> b - j)\<longrightarrow> (P x \<or> Q x) \<longrightarrow> (P(x + D) \<or> Q (x + D))"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	127	"\<lbrakk>D>0; t + 1\<in> A\<rbrakk> \<Longrightarrow> (\<forall>x.(\<forall>j\<in>{1 .. D}. \<forall>b\<in>A. x \<noteq> b - j)\<longrightarrow> (x = t) \<longrightarrow> (x + D = t))"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	128	"\<lbrakk>D>0 ; t \<in> A\<rbrakk> \<Longrightarrow>(\<forall>(x::int).(\<forall>j\<in>{1 .. D}. \<forall>b\<in>A. x \<noteq> b - j)\<longrightarrow> (x \<noteq> t) \<longrightarrow> (x + D \<noteq> t))"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	129	"\<lbrakk>D>0; t\<in> A\<rbrakk> \<Longrightarrow>(\<forall>(x::int). (\<forall>j\<in>{1 .. D}. \<forall>b\<in>A. x \<noteq> b - j)\<longrightarrow> (x < t) \<longrightarrow> (x + D < t))"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	130	"\<lbrakk>D>0; t + 1 \<in> A\<rbrakk> \<Longrightarrow> (\<forall>(x::int).(\<forall>j\<in>{1 .. D}. \<forall>b\<in>A. x \<noteq> b - j)\<longrightarrow> (x \<le> t) \<longrightarrow> (x + D \<le> t))"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	131	"D>0 \<Longrightarrow>(\<forall>(x::int).(\<forall>j\<in>{1 .. D}. \<forall>b\<in>A. x \<noteq> b - j)\<longrightarrow> (x > t) \<longrightarrow> (x + D > t))"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	132	"D>0 \<Longrightarrow>(\<forall>(x::int).(\<forall>j\<in>{1 .. D}. \<forall>b\<in>A. x \<noteq> b - j)\<longrightarrow> (x \<ge> t) \<longrightarrow> (x + D \<ge> t))"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	133	"d dvd D \<Longrightarrow>(\<forall>(x::int).(\<forall>j\<in>{1 .. D}. \<forall>b\<in>A. x \<noteq> b - j)\<longrightarrow> (d dvd x+t) \<longrightarrow> (d dvd (x + D) + t))"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	134	"d dvd D \<Longrightarrow>(\<forall>(x::int).(\<forall>j\<in>{1 .. D}. \<forall>b\<in>A. x \<noteq> b - j)\<longrightarrow> (\<not>d dvd x+t) \<longrightarrow> (\<not> d dvd (x + D) + t))"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	135	"\<forall>x.(\<forall>j\<in>{1 .. D}. \<forall>b\<in>A. x \<noteq> b - j) \<longrightarrow> F \<longrightarrow> F"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	136	proof (blast, blast)
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	137	assume dp: "D > 0" and tA: "t + 1 \<in> A"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	138	show "(\<forall>x.(\<forall>j\<in>{1 .. D}. \<forall>b\<in>A. x \<noteq> b - j)\<longrightarrow> (x = t) \<longrightarrow> (x + D = t))"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	139	apply (rule allI, rule impI,erule ballE[where x="1"],erule ballE[where x="t + 1"])
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	140	using dp tA by simp_all
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	141	next
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	142	assume dp: "D > 0" and tA: "t \<in> A"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	143	show "(\<forall>x.(\<forall>j\<in>{1 .. D}. \<forall>b\<in>A. x \<noteq> b - j)\<longrightarrow> (x \<noteq> t) \<longrightarrow> (x + D \<noteq> t))"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	144	apply (rule allI, rule impI,erule ballE[where x="D"],erule ballE[where x="t"])
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	145	using dp tA by simp_all
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	146	next
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	147	assume dp: "D > 0" thus "(\<forall>x.(\<forall>j\<in>{1 .. D}. \<forall>b\<in>A. x \<noteq> b - j)\<longrightarrow> (x > t) \<longrightarrow> (x + D > t))" by arith
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	148	next
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	149	assume dp: "D > 0" thus "\<forall>x.(\<forall>j\<in>{1 .. D}. \<forall>b\<in>A. x \<noteq> b - j)\<longrightarrow> (x \<ge> t) \<longrightarrow> (x + D \<ge> t)" by arith
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	150	next
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	151	assume dp: "D > 0" and tA:"t \<in> A"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	152	{fix x assume nob: "\<forall>j\<in>{1 .. D}. \<forall>b\<in>A. x \<noteq> b - j" and g: "x < t" and ng: "\<not> (x + D) < t"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	153	hence "t - x \<le> D" and "1 \<le> t - x" by simp+
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	154	hence "\<exists>j \<in> {1 .. D}. t - x = j" by auto
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	155	hence "\<exists>j \<in> {1 .. D}. x = t - j" by (auto simp add: ring_eq_simps)
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	156	with nob tA have "False" by simp}
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	157	thus "\<forall>x.(\<forall>j\<in>{1 .. D}. \<forall>b\<in>A. x \<noteq> b - j)\<longrightarrow> (x < t) \<longrightarrow> (x + D < t)" by blast
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	158	next
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	159	assume dp: "D > 0" and tA:"t + 1\<in> A"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	160	{fix x assume nob: "\<forall>j\<in>{1 .. D}. \<forall>b\<in>A. x \<noteq> b - j" and g: "x \<le> t" and ng: "\<not> (x + D) \<le> t"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	161	hence "(t + 1) - x \<le> D" and "1 \<le> (t + 1) - x" by (simp_all add: ring_eq_simps)
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	162	hence "\<exists>j \<in> {1 .. D}. (t + 1) - x = j" by auto
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	163	hence "\<exists>j \<in> {1 .. D}. x = (t + 1) - j" by (auto simp add: ring_eq_simps)
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	164	with nob tA have "False" by simp}
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	165	thus "\<forall>x.(\<forall>j\<in>{1 .. D}. \<forall>b\<in>A. x \<noteq> b - j)\<longrightarrow> (x \<le> t) \<longrightarrow> (x + D \<le> t)" by blast
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	166	next
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	167	assume d: "d dvd D"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	168	{fix x assume H: "d dvd x + t" with d have "d dvd (x + D) + t"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	169	by (clarsimp simp add: dvd_def,rule_tac x= "ka + k" in exI,simp add: ring_eq_simps)}
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	170	thus "\<forall>(x::int).(\<forall>j\<in>{1 .. D}. \<forall>b\<in>A. x \<noteq> b - j)\<longrightarrow> (d dvd x+t) \<longrightarrow> (d dvd (x + D) + t)" by simp
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	171	next
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	172	assume d: "d dvd D"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	173	{fix x assume H: "\<not>(d dvd x + t)" with d have "\<not>d dvd (x + D) + t"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	174	by (clarsimp simp add: dvd_def,erule_tac x= "ka - k" in allE,simp add: ring_eq_simps)}
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	175	thus "\<forall>(x::int).(\<forall>j\<in>{1 .. D}. \<forall>b\<in>A. x \<noteq> b - j)\<longrightarrow> (\<not>d dvd x+t) \<longrightarrow> (\<not>d dvd (x + D) + t)" by auto
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	176	qed blast
14577 dbb95b825244 tuned document; wenzelm parents: 14485 diff changeset	177
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	178	section{* Cooper's Theorem @{text "-\<infinity>"} and @{text "+\<infinity>"} Version *}
13876 68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	179
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	180	subsection{* First some trivial facts about periodic sets or predicates *}
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	181	lemma periodic_finite_ex:
13876 68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	182	assumes dpos: "(0::int) < d" and modd: "ALL x k. P x = P(x - k*d)"
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	183	shows "(EX x. P x) = (EX j : {1..d}. P j)"
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	184	(is "?LHS = ?RHS")
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	185	proof
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	186	assume ?LHS
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	187	then obtain x where P: "P x" ..
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	188	have "x mod d = x - (x div d)*d" by(simp add:zmod_zdiv_equality mult_ac eq_diff_eq)
13876 68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	189	hence Pmod: "P x = P(x mod d)" using modd by simp
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	190	show ?RHS
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	191	proof (cases)
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	192	assume "x mod d = 0"
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	193	hence "P 0" using P Pmod by simp
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	194	moreover have "P 0 = P(0 - (-1)*d)" using modd by blast
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	195	ultimately have "P d" by simp
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	196	moreover have "d : {1..d}" using dpos by(simp add:atLeastAtMost_iff)
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	197	ultimately show ?RHS ..
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	198	next
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	199	assume not0: "x mod d \<noteq> 0"
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	200	have "P(x mod d)" using dpos P Pmod by(simp add:pos_mod_sign pos_mod_bound)
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	201	moreover have "x mod d : {1..d}"
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	202	proof -
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	203	have "0 \<le> x mod d" by(rule pos_mod_sign)
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	204	moreover have "x mod d < d" by(rule pos_mod_bound)
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	205	ultimately show ?thesis using not0 by(simp add:atLeastAtMost_iff)
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	206	qed
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	207	ultimately show ?RHS ..
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	208	qed
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	209	qed auto
13876 68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	210
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	211	subsection{* The @{text "-\<infinity>"} Version*}
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	212
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	213	lemma decr_lemma: "0 < (d::int) \<Longrightarrow> x - (abs(x-z)+1) * d < z"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	214	by(induct rule: int_gr_induct,simp_all add:int_distrib)
14577 dbb95b825244 tuned document; wenzelm parents: 14485 diff changeset	215
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	216	lemma incr_lemma: "0 < (d::int) \<Longrightarrow> z < x + (abs(x-z)+1) * d"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	217	by(induct rule: int_gr_induct, simp_all add:int_distrib)
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	218
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	219	theorem int_induct[case_names base step1 step2]:
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	220	assumes
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	221	base: "P(k::int)" and step1: "\<And>i. \<lbrakk>k \<le> i; P i\<rbrakk> \<Longrightarrow> P(i+1)" and
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	222	step2: "\<And>i. \<lbrakk>k \<ge> i; P i\<rbrakk> \<Longrightarrow> P(i - 1)"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	223	shows "P i"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	224	proof -
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	225	have "i \<le> k \<or> i\<ge> k" by arith
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	226	thus ?thesis using prems int_ge_induct[where P="P" and k="k" and i="i"] int_le_induct[where P="P" and k="k" and i="i"] by blast
13876 68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	227	qed
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	228
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	229	lemma decr_mult_lemma:
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	230	assumes dpos: "(0::int) < d" and minus: "\<forall>x. P x \<longrightarrow> P(x - d)" and knneg: "0 <= k"
13876 68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	231	shows "ALL x. P x \<longrightarrow> P(x - k*d)"
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	232	using knneg
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	233	proof (induct rule:int_ge_induct)
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	234	case base thus ?case by simp
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	235	next
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	236	case (step i)
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	237	{fix x
13876 68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	238	have "P x \<longrightarrow> P (x - i * d)" using step.hyps by blast
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	239	also have "\<dots> \<longrightarrow> P(x - (i + 1) * d)" using minus[THEN spec, of "x - i * d"]
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14577 diff changeset	240	by (simp add:int_distrib OrderedGroup.diff_diff_eq[symmetric])
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	241	ultimately have "P x \<longrightarrow> P(x - (i + 1) * d)" by blast}
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	242	thus ?case ..
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	243	qed
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	244
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	245	lemma minusinfinity:
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	246	assumes "0 < d" and
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	247	P1eqP1: "ALL x k. P1 x = P1(x - k*d)" and ePeqP1: "EX z::int. ALL x. x < z \<longrightarrow> (P x = P1 x)"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	248	shows "(EX x. P1 x) \<longrightarrow> (EX x. P x)"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	249	proof
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	250	assume eP1: "EX x. P1 x"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	251	then obtain x where P1: "P1 x" ..
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	252	from ePeqP1 obtain z where P1eqP: "ALL x. x < z \<longrightarrow> (P x = P1 x)" ..
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	253	let ?w = "x - (abs(x-z)+1) * d"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	254	have w: "?w < z" by(rule decr_lemma)
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	255	have "P1 x = P1 ?w" using P1eqP1 by blast
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	256	also have "\<dots> = P(?w)" using w P1eqP by blast
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	257	finally have "P ?w" using P1 by blast
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	258	thus "EX x. P x" ..
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	259	qed
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	260
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	261	lemma cpmi:
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	262	assumes dp: "0 < D" and p1:"\<exists>z. \<forall> x< z. P x = P' x"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	263	and nb:"\<forall>x.(\<forall> j\<in> {1..D}. \<forall>(b::int) \<in> B. x \<noteq> b+j) --> P (x) --> P (x - D)"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	264	and pd: "\<forall> x k. P' x = P' (x-k*D)"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	265	shows "(\<exists>x. P x) = ((\<exists> j\<in> {1..D} . P' j) \| (\<exists> j \<in> {1..D}.\<exists> b\<in> B. P (b+j)))"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	266	(is "?L = (?R1 \<or> ?R2)")
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	267	proof-
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	268	{assume "?R2" hence "?L" by blast}
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	269	moreover
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	270	{assume H:"?R1" hence "?L" using minusinfinity[OF dp pd p1] periodic_finite_ex[OF dp pd] by simp}
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	271	moreover
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	272	{ fix x
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	273	assume P: "P x" and H: "\<not> ?R2"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	274	{fix y assume "\<not> (\<exists>j\<in>{1..D}. \<exists>b\<in>B. P (b + j))" and P: "P y"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	275	hence "~(EX (j::int) : {1..D}. EX (b::int) : B. y = b+j)" by auto
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	276	with nb P have "P (y - D)" by auto }
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	277	hence "ALL x.~(EX (j::int) : {1..D}. EX (b::int) : B. P(b+j)) --> P (x) --> P (x - D)" by blast
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	278	with H P have th: " \<forall>x. P x \<longrightarrow> P (x - D)" by auto
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	279	from p1 obtain z where z: "ALL x. x < z --> (P x = P' x)" by blast
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	280	let ?y = "x - (\<bar>x - z\<bar> + 1)*D"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	281	have zp: "0 <= (\<bar>x - z\<bar> + 1)" by arith
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	282	from dp have yz: "?y < z" using decr_lemma[OF dp] by simp
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	283	from z[rule_format, OF yz] decr_mult_lemma[OF dp th zp, rule_format, OF P] have th2: " P' ?y" by auto
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	284	with periodic_finite_ex[OF dp pd]
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	285	have "?R1" by blast}
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	286	ultimately show ?thesis by blast
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	287	qed
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	288
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	289	subsection {* The @{text "+\<infinity>"} Version*}
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	290
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	291	lemma plusinfinity:
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	292	assumes "(0::int) < d" and
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	293	P1eqP1: "\<forall>x k. P' x = P'(x - k*d)" and ePeqP1: "\<exists> z. \<forall> x>z. P x = P' x"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	294	shows "(\<exists> x. P' x) \<longrightarrow> (\<exists> x. P x)"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	295	proof
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	296	assume eP1: "EX x. P' x"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	297	then obtain x where P1: "P' x" ..
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	298	from ePeqP1 obtain z where P1eqP: "\<forall>x>z. P x = P' x" ..
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	299	let ?w' = "x + (abs(x-z)+1) * d"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	300	let ?w = "x - (-(abs(x-z) + 1))*d"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	301	have ww'[simp]: "?w = ?w'" by (simp add: ring_eq_simps)
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	302	have w: "?w > z" by(simp only: ww', rule incr_lemma)
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	303	hence "P' x = P' ?w" using P1eqP1 by blast
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	304	also have "\<dots> = P(?w)" using w P1eqP by blast
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	305	finally have "P ?w" using P1 by blast
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	306	thus "EX x. P x" ..
13876 68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	307	qed
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	308
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	309	lemma incr_mult_lemma:
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	310	assumes dpos: "(0::int) < d" and plus: "ALL x::int. P x \<longrightarrow> P(x + d)" and knneg: "0 <= k"
13876 68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	311	shows "ALL x. P x \<longrightarrow> P(x + k*d)"
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	312	using knneg
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	313	proof (induct rule:int_ge_induct)
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	314	case base thus ?case by simp
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	315	next
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	316	case (step i)
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	317	{fix x
13876 68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	318	have "P x \<longrightarrow> P (x + i * d)" using step.hyps by blast
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	319	also have "\<dots> \<longrightarrow> P(x + (i + 1) * d)" using plus[THEN spec, of "x + i * d"]
13876 68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	320	by (simp add:int_distrib zadd_ac)
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	321	ultimately have "P x \<longrightarrow> P(x + (i + 1) * d)" by blast}
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	322	thus ?case ..
13876 68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	323	qed
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	324
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	325	lemma cppi:
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	326	assumes dp: "0 < D" and p1:"\<exists>z. \<forall> x> z. P x = P' x"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	327	and nb:"\<forall>x.(\<forall> j\<in> {1..D}. \<forall>(b::int) \<in> A. x \<noteq> b - j) --> P (x) --> P (x + D)"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	328	and pd: "\<forall> x k. P' x= P' (x-k*D)"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	329	shows "(\<exists>x. P x) = ((\<exists> j\<in> {1..D} . P' j) \| (\<exists> j \<in> {1..D}.\<exists> b\<in> A. P (b - j)))" (is "?L = (?R1 \<or> ?R2)")
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	330	proof-
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	331	{assume "?R2" hence "?L" by blast}
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	332	moreover
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	333	{assume H:"?R1" hence "?L" using plusinfinity[OF dp pd p1] periodic_finite_ex[OF dp pd] by simp}
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	334	moreover
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	335	{ fix x
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	336	assume P: "P x" and H: "\<not> ?R2"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	337	{fix y assume "\<not> (\<exists>j\<in>{1..D}. \<exists>b\<in>A. P (b - j))" and P: "P y"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	338	hence "~(EX (j::int) : {1..D}. EX (b::int) : A. y = b - j)" by auto
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	339	with nb P have "P (y + D)" by auto }
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	340	hence "ALL x.~(EX (j::int) : {1..D}. EX (b::int) : A. P(b-j)) --> P (x) --> P (x + D)" by blast
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	341	with H P have th: " \<forall>x. P x \<longrightarrow> P (x + D)" by auto
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	342	from p1 obtain z where z: "ALL x. x > z --> (P x = P' x)" by blast
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	343	let ?y = "x + (\<bar>x - z\<bar> + 1)*D"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	344	have zp: "0 <= (\<bar>x - z\<bar> + 1)" by arith
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	345	from dp have yz: "?y > z" using incr_lemma[OF dp] by simp
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	346	from z[rule_format, OF yz] incr_mult_lemma[OF dp th zp, rule_format, OF P] have th2: " P' ?y" by auto
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	347	with periodic_finite_ex[OF dp pd]
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	348	have "?R1" by blast}
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	349	ultimately show ?thesis by blast
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	350	qed
13876 68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	351
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	352	lemma simp_from_to: "{i..j::int} = (if j < i then {} else insert i {i+1..j})"
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	353	apply(simp add:atLeastAtMost_def atLeast_def atMost_def)
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	354	apply(fastsimp)
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	355	done
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	356
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	357	theorem unity_coeff_ex: "(\<exists>(x::'a::{semiring_0}). P (l * x)) \<equiv> (\<exists>x. l dvd (x + 0) \<and> P x)"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	358	apply (rule eq_reflection[symmetric])
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	359	apply (rule iffI)
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	360	defer
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	361	apply (erule exE)
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	362	apply (rule_tac x = "l * x" in exI)
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	363	apply (simp add: dvd_def)
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	364	apply (rule_tac x="x" in exI, simp)
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	365	apply (erule exE)
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	366	apply (erule conjE)
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	367	apply (erule dvdE)
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	368	apply (rule_tac x = k in exI)
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	369	apply simp
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	370	done
13876 68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	371
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	372	lemma zdvd_mono: assumes not0: "(k::int) \<noteq> 0"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	373	shows "((m::int) dvd t) \<equiv> (km dvd kt)"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	374	using not0 by (simp add: dvd_def)
13876 68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	375
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	376	lemma all_not_ex: "(ALL x. P x) = (~ (EX x. ~ P x ))"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	377	by blast
13876 68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	378
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	379	lemma uminus_dvd_conv: "(d dvd (t::int)) \<equiv> (-d dvd t)" "(d dvd (t::int)) \<equiv> (d dvd -t)"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	380	by simp_all
14577 dbb95b825244 tuned document; wenzelm parents: 14485 diff changeset	381	text {* \bigskip Theorems for transforming predicates on nat to predicates on @{text int}*}
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	382	lemma all_nat: "(\<forall>x::nat. P x) = (\<forall>x::int. 0 <= x \<longrightarrow> P (nat x))"
13876 68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	383	by (simp split add: split_nat)
68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	384
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	385	lemma ex_nat: "(\<exists>x::nat. P x) = (\<exists>x::int. 0 <= x \<and> P (nat x))"
23365 f31794033ae1 removed constant int :: nat => int; huffman parents: 23333 diff changeset	386	apply (auto split add: split_nat)
f31794033ae1 removed constant int :: nat => int; huffman parents: 23333 diff changeset	387	apply (rule_tac x="int x" in exI, simp)
f31794033ae1 removed constant int :: nat => int; huffman parents: 23333 diff changeset	388	apply (rule_tac x = "nat x" in exI,erule_tac x = "nat x" in allE, simp)
f31794033ae1 removed constant int :: nat => int; huffman parents: 23333 diff changeset	389	done
13876 68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	390
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	391	lemma zdiff_int_split: "P (int (x - y)) =
13876 68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	392	((y \<le> x \<longrightarrow> P (int x - int y)) \<and> (x < y \<longrightarrow> P 0))"
23365 f31794033ae1 removed constant int :: nat => int; huffman parents: 23333 diff changeset	393	by (case_tac "y \<le> x", simp_all)
13876 68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	394
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	395	lemma number_of1: "(0::int) <= number_of n \<Longrightarrow> (0::int) <= number_of (n BIT b)" by simp
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	396	lemma number_of2: "(0::int) <= Numeral0" by simp
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	397	lemma Suc_plus1: "Suc n = n + 1" by simp
13876 68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	398
14577 dbb95b825244 tuned document; wenzelm parents: 14485 diff changeset	399	text {*
dbb95b825244 tuned document; wenzelm parents: 14485 diff changeset	400	\medskip Specific instances of congruence rules, to prevent
dbb95b825244 tuned document; wenzelm parents: 14485 diff changeset	401	simplifier from looping. *}
13876 68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	402
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	403	theorem imp_le_cong: "(0 <= x \<Longrightarrow> P = P') \<Longrightarrow> (0 <= (x::int) \<longrightarrow> P) = (0 <= x \<longrightarrow> P')" by simp
18202 46af82efd311 presburger method updated to deal better with mod and div, tweo lemmas added to Divides.thy chaieb parents: 17589 diff changeset	404
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	405	theorem conj_le_cong: "(0 <= x \<Longrightarrow> P = P') \<Longrightarrow> (0 <= (x::int) \<and> P) = (0 <= x \<and> P')"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	406	by (simp cong: conj_cong)
20485 3078fd2eec7b got rid of Numeral.bin type haftmann parents: 20217 diff changeset	407	lemma int_eq_number_of_eq:
3078fd2eec7b got rid of Numeral.bin type haftmann parents: 20217 diff changeset	408	"(((number_of v)::int) = (number_of w)) = iszero ((number_of (v + (uminus w)))::int)"
18202 46af82efd311 presburger method updated to deal better with mod and div, tweo lemmas added to Divides.thy chaieb parents: 17589 diff changeset	409	by simp
46af82efd311 presburger method updated to deal better with mod and div, tweo lemmas added to Divides.thy chaieb parents: 17589 diff changeset	410
46af82efd311 presburger method updated to deal better with mod and div, tweo lemmas added to Divides.thy chaieb parents: 17589 diff changeset	411
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	412	use "Tools/Presburger/cooper.ML"
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	413	oracle linzqe_oracle ("term") = Coopereif.cooper_oracle
18202 46af82efd311 presburger method updated to deal better with mod and div, tweo lemmas added to Divides.thy chaieb parents: 17589 diff changeset	414
23146 0bc590051d95 moved Integ files to canonical place; wenzelm parents: 22801 diff changeset	415	use "Tools/Presburger/presburger.ML"
13876 68f4ed8311ac New decision procedure for Presburger arithmetic. berghofe parents: diff changeset	416
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	417	setup {*
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	418	arith_tactic_add
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	419	(mk_arith_tactic "presburger" (fn i => fn st =>
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	420	(warning "Trying Presburger arithmetic ...";
23333 ec5b4ab52026 Method now takes theorems to be added or deleted from a simpset for simplificatio before the core method starts chaieb parents: 23314 diff changeset	421	Presburger.cooper_tac true [] [] ((ProofContext.init o theory_of_thm) st) i st)))
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	422	(* FIXME!!!!!!! get the right context!!*)
6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	423	*}
23333 ec5b4ab52026 Method now takes theorems to be added or deleted from a simpset for simplificatio before the core method starts chaieb parents: 23314 diff changeset	424
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	425	method_setup presburger = {*
23333 ec5b4ab52026 Method now takes theorems to be added or deleted from a simpset for simplificatio before the core method starts chaieb parents: 23314 diff changeset	426	let
ec5b4ab52026 Method now takes theorems to be added or deleted from a simpset for simplificatio before the core method starts chaieb parents: 23314 diff changeset	427	fun keyword k = Scan.lift (Args.$$$ k -- Args.colon) >> K ()
ec5b4ab52026 Method now takes theorems to be added or deleted from a simpset for simplificatio before the core method starts chaieb parents: 23314 diff changeset	428	fun simple_keyword k = Scan.lift (Args.$$$ k) >> K ()
ec5b4ab52026 Method now takes theorems to be added or deleted from a simpset for simplificatio before the core method starts chaieb parents: 23314 diff changeset	429	val addN = "add"
ec5b4ab52026 Method now takes theorems to be added or deleted from a simpset for simplificatio before the core method starts chaieb parents: 23314 diff changeset	430	val delN = "del"
ec5b4ab52026 Method now takes theorems to be added or deleted from a simpset for simplificatio before the core method starts chaieb parents: 23314 diff changeset	431	val elimN = "elim"
ec5b4ab52026 Method now takes theorems to be added or deleted from a simpset for simplificatio before the core method starts chaieb parents: 23314 diff changeset	432	val any_keyword = keyword addN \|\| keyword delN \|\| simple_keyword elimN
ec5b4ab52026 Method now takes theorems to be added or deleted from a simpset for simplificatio before the core method starts chaieb parents: 23314 diff changeset	433	val thms = Scan.repeat (Scan.unless any_keyword Attrib.multi_thm) >> flat;
ec5b4ab52026 Method now takes theorems to be added or deleted from a simpset for simplificatio before the core method starts chaieb parents: 23314 diff changeset	434	in
ec5b4ab52026 Method now takes theorems to be added or deleted from a simpset for simplificatio before the core method starts chaieb parents: 23314 diff changeset	435	fn src => Method.syntax
ec5b4ab52026 Method now takes theorems to be added or deleted from a simpset for simplificatio before the core method starts chaieb parents: 23314 diff changeset	436	((Scan.optional (simple_keyword elimN >> K false) true) --
ec5b4ab52026 Method now takes theorems to be added or deleted from a simpset for simplificatio before the core method starts chaieb parents: 23314 diff changeset	437	(Scan.optional (keyword addN \|-- thms) []) --
ec5b4ab52026 Method now takes theorems to be added or deleted from a simpset for simplificatio before the core method starts chaieb parents: 23314 diff changeset	438	(Scan.optional (keyword delN \|-- thms) [])) src
ec5b4ab52026 Method now takes theorems to be added or deleted from a simpset for simplificatio before the core method starts chaieb parents: 23314 diff changeset	439	#> (fn (((elim, add_ths), del_ths),ctxt) =>
ec5b4ab52026 Method now takes theorems to be added or deleted from a simpset for simplificatio before the core method starts chaieb parents: 23314 diff changeset	440	Method.SIMPLE_METHOD' (Presburger.cooper_tac elim add_ths del_ths ctxt))
ec5b4ab52026 Method now takes theorems to be added or deleted from a simpset for simplificatio before the core method starts chaieb parents: 23314 diff changeset	441	end
23314 6894137e854a A new and cleaned up Theory for QE. for Presburger arithmetic chaieb parents: 23253 diff changeset	442	*} ""
22801 caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	443
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	444	subsection {* Code generator setup *}
20595 db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	445	text {*
22801 caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	446	Presburger arithmetic is convenient to prove some
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	447	of the following code lemmas on integer numerals:
20595 db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	448	*}
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	449
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	450	lemma eq_Pls_Pls:
22744 5cbe966d67a2 Isar definitions are now added explicitly to code theorem table haftmann parents: 22394 diff changeset	451	"Numeral.Pls = Numeral.Pls \<longleftrightarrow> True" by rule+
20595 db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	452
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	453	lemma eq_Pls_Min:
22744 5cbe966d67a2 Isar definitions are now added explicitly to code theorem table haftmann parents: 22394 diff changeset	454	"Numeral.Pls = Numeral.Min \<longleftrightarrow> False"
21454 a1937c51ed88 dropped eq const haftmann parents: 21046 diff changeset	455	unfolding Pls_def Min_def by auto
20595 db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	456
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	457	lemma eq_Pls_Bit0:
21454 a1937c51ed88 dropped eq const haftmann parents: 21046 diff changeset	458	"Numeral.Pls = Numeral.Bit k bit.B0 \<longleftrightarrow> Numeral.Pls = k"
a1937c51ed88 dropped eq const haftmann parents: 21046 diff changeset	459	unfolding Pls_def Bit_def bit.cases by auto
20595 db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	460
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	461	lemma eq_Pls_Bit1:
22744 5cbe966d67a2 Isar definitions are now added explicitly to code theorem table haftmann parents: 22394 diff changeset	462	"Numeral.Pls = Numeral.Bit k bit.B1 \<longleftrightarrow> False"
21454 a1937c51ed88 dropped eq const haftmann parents: 21046 diff changeset	463	unfolding Pls_def Bit_def bit.cases by arith
20595 db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	464
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	465	lemma eq_Min_Pls:
22744 5cbe966d67a2 Isar definitions are now added explicitly to code theorem table haftmann parents: 22394 diff changeset	466	"Numeral.Min = Numeral.Pls \<longleftrightarrow> False"
21454 a1937c51ed88 dropped eq const haftmann parents: 21046 diff changeset	467	unfolding Pls_def Min_def by auto
20595 db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	468
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	469	lemma eq_Min_Min:
22744 5cbe966d67a2 Isar definitions are now added explicitly to code theorem table haftmann parents: 22394 diff changeset	470	"Numeral.Min = Numeral.Min \<longleftrightarrow> True" by rule+
20595 db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	471
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	472	lemma eq_Min_Bit0:
22744 5cbe966d67a2 Isar definitions are now added explicitly to code theorem table haftmann parents: 22394 diff changeset	473	"Numeral.Min = Numeral.Bit k bit.B0 \<longleftrightarrow> False"
21454 a1937c51ed88 dropped eq const haftmann parents: 21046 diff changeset	474	unfolding Min_def Bit_def bit.cases by arith
20595 db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	475
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	476	lemma eq_Min_Bit1:
21454 a1937c51ed88 dropped eq const haftmann parents: 21046 diff changeset	477	"Numeral.Min = Numeral.Bit k bit.B1 \<longleftrightarrow> Numeral.Min = k"
a1937c51ed88 dropped eq const haftmann parents: 21046 diff changeset	478	unfolding Min_def Bit_def bit.cases by auto
20595 db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	479
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	480	lemma eq_Bit0_Pls:
21454 a1937c51ed88 dropped eq const haftmann parents: 21046 diff changeset	481	"Numeral.Bit k bit.B0 = Numeral.Pls \<longleftrightarrow> Numeral.Pls = k"
a1937c51ed88 dropped eq const haftmann parents: 21046 diff changeset	482	unfolding Pls_def Bit_def bit.cases by auto
20595 db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	483
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	484	lemma eq_Bit1_Pls:
22744 5cbe966d67a2 Isar definitions are now added explicitly to code theorem table haftmann parents: 22394 diff changeset	485	"Numeral.Bit k bit.B1 = Numeral.Pls \<longleftrightarrow> False"
21454 a1937c51ed88 dropped eq const haftmann parents: 21046 diff changeset	486	unfolding Pls_def Bit_def bit.cases by arith
20595 db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	487
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	488	lemma eq_Bit0_Min:
22744 5cbe966d67a2 Isar definitions are now added explicitly to code theorem table haftmann parents: 22394 diff changeset	489	"Numeral.Bit k bit.B0 = Numeral.Min \<longleftrightarrow> False"
21454 a1937c51ed88 dropped eq const haftmann parents: 21046 diff changeset	490	unfolding Min_def Bit_def bit.cases by arith
20595 db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	491
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	492	lemma eq_Bit1_Min:
21454 a1937c51ed88 dropped eq const haftmann parents: 21046 diff changeset	493	"(Numeral.Bit k bit.B1) = Numeral.Min \<longleftrightarrow> Numeral.Min = k"
a1937c51ed88 dropped eq const haftmann parents: 21046 diff changeset	494	unfolding Min_def Bit_def bit.cases by auto
20595 db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	495
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	496	lemma eq_Bit_Bit:
21454 a1937c51ed88 dropped eq const haftmann parents: 21046 diff changeset	497	"Numeral.Bit k1 v1 = Numeral.Bit k2 v2 \<longleftrightarrow>
a1937c51ed88 dropped eq const haftmann parents: 21046 diff changeset	498	v1 = v2 \<and> k1 = k2"
a1937c51ed88 dropped eq const haftmann parents: 21046 diff changeset	499	unfolding Bit_def
20595 db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	500	apply (cases v1)
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	501	apply (cases v2)
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	502	apply auto
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	503	apply arith
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	504	apply (cases v2)
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	505	apply auto
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	506	apply arith
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	507	apply (cases v2)
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	508	apply auto
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	509	done
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	510
22801 caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	511	lemma eq_number_of:
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	512	"(number_of k \<Colon> int) = number_of l \<longleftrightarrow> k = l"
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	513	unfolding number_of_is_id ..
20595 db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	514
22394 54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	515
20595 db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	516	lemma less_eq_Pls_Pls:
22744 5cbe966d67a2 Isar definitions are now added explicitly to code theorem table haftmann parents: 22394 diff changeset	517	"Numeral.Pls \<le> Numeral.Pls \<longleftrightarrow> True" by rule+
20595 db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	518
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	519	lemma less_eq_Pls_Min:
22744 5cbe966d67a2 Isar definitions are now added explicitly to code theorem table haftmann parents: 22394 diff changeset	520	"Numeral.Pls \<le> Numeral.Min \<longleftrightarrow> False"
20595 db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	521	unfolding Pls_def Min_def by auto
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	522
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	523	lemma less_eq_Pls_Bit:
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	524	"Numeral.Pls \<le> Numeral.Bit k v \<longleftrightarrow> Numeral.Pls \<le> k"
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	525	unfolding Pls_def Bit_def by (cases v) auto
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	526
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	527	lemma less_eq_Min_Pls:
22744 5cbe966d67a2 Isar definitions are now added explicitly to code theorem table haftmann parents: 22394 diff changeset	528	"Numeral.Min \<le> Numeral.Pls \<longleftrightarrow> True"
20595 db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	529	unfolding Pls_def Min_def by auto
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	530
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	531	lemma less_eq_Min_Min:
22744 5cbe966d67a2 Isar definitions are now added explicitly to code theorem table haftmann parents: 22394 diff changeset	532	"Numeral.Min \<le> Numeral.Min \<longleftrightarrow> True" by rule+
20595 db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	533
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	534	lemma less_eq_Min_Bit0:
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	535	"Numeral.Min \<le> Numeral.Bit k bit.B0 \<longleftrightarrow> Numeral.Min < k"
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	536	unfolding Min_def Bit_def by auto
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	537
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	538	lemma less_eq_Min_Bit1:
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	539	"Numeral.Min \<le> Numeral.Bit k bit.B1 \<longleftrightarrow> Numeral.Min \<le> k"
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	540	unfolding Min_def Bit_def by auto
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	541
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	542	lemma less_eq_Bit0_Pls:
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	543	"Numeral.Bit k bit.B0 \<le> Numeral.Pls \<longleftrightarrow> k \<le> Numeral.Pls"
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	544	unfolding Pls_def Bit_def by simp
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	545
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	546	lemma less_eq_Bit1_Pls:
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	547	"Numeral.Bit k bit.B1 \<le> Numeral.Pls \<longleftrightarrow> k < Numeral.Pls"
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	548	unfolding Pls_def Bit_def by auto
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	549
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	550	lemma less_eq_Bit_Min:
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	551	"Numeral.Bit k v \<le> Numeral.Min \<longleftrightarrow> k \<le> Numeral.Min"
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	552	unfolding Min_def Bit_def by (cases v) auto
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	553
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	554	lemma less_eq_Bit0_Bit:
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	555	"Numeral.Bit k1 bit.B0 \<le> Numeral.Bit k2 v \<longleftrightarrow> k1 \<le> k2"
22394 54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	556	unfolding Bit_def bit.cases by (cases v) auto
20595 db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	557
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	558	lemma less_eq_Bit_Bit1:
db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	559	"Numeral.Bit k1 v \<le> Numeral.Bit k2 bit.B1 \<longleftrightarrow> k1 \<le> k2"
22394 54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	560	unfolding Bit_def bit.cases by (cases v) auto
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	561
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	562	lemma less_eq_Bit1_Bit0:
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	563	"Numeral.Bit k1 bit.B1 \<le> Numeral.Bit k2 bit.B0 \<longleftrightarrow> k1 < k2"
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	564	unfolding Bit_def by (auto split: bit.split)
20595 db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	565
22801 caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	566	lemma less_eq_number_of:
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	567	"(number_of k \<Colon> int) \<le> number_of l \<longleftrightarrow> k \<le> l"
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	568	unfolding number_of_is_id ..
22394 54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	569
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	570
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	571	lemma less_Pls_Pls:
22744 5cbe966d67a2 Isar definitions are now added explicitly to code theorem table haftmann parents: 22394 diff changeset	572	"Numeral.Pls < Numeral.Pls \<longleftrightarrow> False" by auto
22394 54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	573
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	574	lemma less_Pls_Min:
22744 5cbe966d67a2 Isar definitions are now added explicitly to code theorem table haftmann parents: 22394 diff changeset	575	"Numeral.Pls < Numeral.Min \<longleftrightarrow> False"
22394 54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	576	unfolding Pls_def Min_def by auto
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	577
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	578	lemma less_Pls_Bit0:
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	579	"Numeral.Pls < Numeral.Bit k bit.B0 \<longleftrightarrow> Numeral.Pls < k"
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	580	unfolding Pls_def Bit_def by auto
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	581
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	582	lemma less_Pls_Bit1:
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	583	"Numeral.Pls < Numeral.Bit k bit.B1 \<longleftrightarrow> Numeral.Pls \<le> k"
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	584	unfolding Pls_def Bit_def by auto
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	585
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	586	lemma less_Min_Pls:
22744 5cbe966d67a2 Isar definitions are now added explicitly to code theorem table haftmann parents: 22394 diff changeset	587	"Numeral.Min < Numeral.Pls \<longleftrightarrow> True"
22394 54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	588	unfolding Pls_def Min_def by auto
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	589
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	590	lemma less_Min_Min:
22744 5cbe966d67a2 Isar definitions are now added explicitly to code theorem table haftmann parents: 22394 diff changeset	591	"Numeral.Min < Numeral.Min \<longleftrightarrow> False" by auto
22394 54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	592
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	593	lemma less_Min_Bit:
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	594	"Numeral.Min < Numeral.Bit k v \<longleftrightarrow> Numeral.Min < k"
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	595	unfolding Min_def Bit_def by (auto split: bit.split)
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	596
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	597	lemma less_Bit_Pls:
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	598	"Numeral.Bit k v < Numeral.Pls \<longleftrightarrow> k < Numeral.Pls"
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	599	unfolding Pls_def Bit_def by (auto split: bit.split)
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	600
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	601	lemma less_Bit0_Min:
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	602	"Numeral.Bit k bit.B0 < Numeral.Min \<longleftrightarrow> k \<le> Numeral.Min"
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	603	unfolding Min_def Bit_def by auto
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	604
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	605	lemma less_Bit1_Min:
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	606	"Numeral.Bit k bit.B1 < Numeral.Min \<longleftrightarrow> k < Numeral.Min"
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	607	unfolding Min_def Bit_def by auto
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	608
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	609	lemma less_Bit_Bit0:
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	610	"Numeral.Bit k1 v < Numeral.Bit k2 bit.B0 \<longleftrightarrow> k1 < k2"
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	611	unfolding Bit_def by (auto split: bit.split)
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	612
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	613	lemma less_Bit1_Bit:
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	614	"Numeral.Bit k1 bit.B1 < Numeral.Bit k2 v \<longleftrightarrow> k1 < k2"
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	615	unfolding Bit_def by (auto split: bit.split)
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	616
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	617	lemma less_Bit0_Bit1:
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	618	"Numeral.Bit k1 bit.B0 < Numeral.Bit k2 bit.B1 \<longleftrightarrow> k1 \<le> k2"
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	619	unfolding Bit_def bit.cases by auto
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	620
22801 caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	621	lemma less_number_of:
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	622	"(number_of k \<Colon> int) < number_of l \<longleftrightarrow> k < l"
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	623	unfolding number_of_is_id ..
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	624
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	625	lemmas pred_succ_numeral_code [code func] =
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	626	arith_simps(5-12)
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	627
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	628	lemmas plus_numeral_code [code func] =
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	629	arith_simps(13-17)
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	630	arith_simps(26-27)
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	631	arith_extra_simps(1) [where 'a = int]
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	632
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	633	lemmas minus_numeral_code [code func] =
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	634	arith_simps(18-21)
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	635	arith_extra_simps(2) [where 'a = int]
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	636	arith_extra_simps(5) [where 'a = int]
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	637
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	638	lemmas times_numeral_code [code func] =
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	639	arith_simps(22-25)
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	640	arith_extra_simps(4) [where 'a = int]
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	641
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	642	lemmas eq_numeral_code [code func] =
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	643	eq_Pls_Pls eq_Pls_Min eq_Pls_Bit0 eq_Pls_Bit1
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	644	eq_Min_Pls eq_Min_Min eq_Min_Bit0 eq_Min_Bit1
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	645	eq_Bit0_Pls eq_Bit1_Pls eq_Bit0_Min eq_Bit1_Min eq_Bit_Bit
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	646	eq_number_of
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	647
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	648	lemmas less_eq_numeral_code [code func] = less_eq_Pls_Pls less_eq_Pls_Min less_eq_Pls_Bit
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	649	less_eq_Min_Pls less_eq_Min_Min less_eq_Min_Bit0 less_eq_Min_Bit1
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	650	less_eq_Bit0_Pls less_eq_Bit1_Pls less_eq_Bit_Min less_eq_Bit0_Bit less_eq_Bit_Bit1 less_eq_Bit1_Bit0
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	651	less_eq_number_of
caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	652
22394 54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	653	lemmas less_numeral_code [code func] = less_Pls_Pls less_Pls_Min less_Pls_Bit0
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	654	less_Pls_Bit1 less_Min_Pls less_Min_Min less_Min_Bit less_Bit_Pls
54ea68b5a92f tuned code theorems for ord on integers haftmann parents: 22026 diff changeset	655	less_Bit0_Min less_Bit1_Min less_Bit_Bit0 less_Bit1_Bit less_Bit0_Bit1
22801 caffcb450ef4 cleaned up code generator setup for int haftmann parents: 22744 diff changeset	656	less_number_of
20595 db6bedfba498 improved numeral handling for nbe haftmann parents: 20485 diff changeset	657
23365 f31794033ae1 removed constant int :: nat => int; huffman parents: 23333 diff changeset	658	end

author	wenzelm
	Wed, 13 Jun 2007 18:30:16 +0200
changeset 23375	45cd7db985b3
parent 23365	f31794033ae1
child 23389	aaca6a8e5414
permissions	-rw-r--r--