isabelle: src/ZF/Arith.ML@771b1f6422a8 (annotated)

1793 09fff2f0d727 New example of GCDs and divides relation paulson parents: 1708 diff changeset	1	(* Title: ZF/Arith.ML
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	2	ID: $Id$
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 760 diff changeset	3	Author: Lawrence C Paulson, Cambridge University Computer Laboratory
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	4	Copyright 1992 University of Cambridge
a5a9c433f639 Initial revision clasohm parents: diff changeset	5
1609 5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	6	Arithmetic operators and their definitions
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	7
a5a9c433f639 Initial revision clasohm parents: diff changeset	8	Proofs about elementary arithmetic: addition, multiplication, etc.
a5a9c433f639 Initial revision clasohm parents: diff changeset	9
a5a9c433f639 Initial revision clasohm parents: diff changeset	10	Could prove def_rec_0, def_rec_succ...
a5a9c433f639 Initial revision clasohm parents: diff changeset	11	*)
a5a9c433f639 Initial revision clasohm parents: diff changeset	12
a5a9c433f639 Initial revision clasohm parents: diff changeset	13	open Arith;
a5a9c433f639 Initial revision clasohm parents: diff changeset	14
a5a9c433f639 Initial revision clasohm parents: diff changeset	15	(*"Difference" is subtraction of natural numbers.
a5a9c433f639 Initial revision clasohm parents: diff changeset	16	There are no negative numbers; we have
a5a9c433f639 Initial revision clasohm parents: diff changeset	17	m #- n = 0 iff m<=n and m #- n = succ(k) iff m>n.
a5a9c433f639 Initial revision clasohm parents: diff changeset	18	Also, rec(m, 0, %z w.z) is pred(m).
a5a9c433f639 Initial revision clasohm parents: diff changeset	19	*)
a5a9c433f639 Initial revision clasohm parents: diff changeset	20
a5a9c433f639 Initial revision clasohm parents: diff changeset	21	( rec -- better than nat_rec; the succ case has no type requirement! )
a5a9c433f639 Initial revision clasohm parents: diff changeset	22
a5a9c433f639 Initial revision clasohm parents: diff changeset	23	val rec_trans = rec_def RS def_transrec RS trans;
a5a9c433f639 Initial revision clasohm parents: diff changeset	24
a5a9c433f639 Initial revision clasohm parents: diff changeset	25	goal Arith.thy "rec(0,a,b) = a";
a5a9c433f639 Initial revision clasohm parents: diff changeset	26	by (rtac rec_trans 1);
a5a9c433f639 Initial revision clasohm parents: diff changeset	27	by (rtac nat_case_0 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	28	qed "rec_0";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	29
a5a9c433f639 Initial revision clasohm parents: diff changeset	30	goal Arith.thy "rec(succ(m),a,b) = b(m, rec(m,a,b))";
a5a9c433f639 Initial revision clasohm parents: diff changeset	31	by (rtac rec_trans 1);
2469 b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	32	by (Simp_tac 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	33	qed "rec_succ";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	34
2469 b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	35	Addsimps [rec_0, rec_succ];
b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	36
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	37	val major::prems = goal Arith.thy
a5a9c433f639 Initial revision clasohm parents: diff changeset	38	"[\| n: nat; \
a5a9c433f639 Initial revision clasohm parents: diff changeset	39	\ a: C(0); \
a5a9c433f639 Initial revision clasohm parents: diff changeset	40	\ !!m z. [\| m: nat; z: C(m) \|] ==> b(m,z): C(succ(m)) \
a5a9c433f639 Initial revision clasohm parents: diff changeset	41	\ \|] ==> rec(n,a,b) : C(n)";
a5a9c433f639 Initial revision clasohm parents: diff changeset	42	by (rtac (major RS nat_induct) 1);
a5a9c433f639 Initial revision clasohm parents: diff changeset	43	by (ALLGOALS
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	44	(asm_simp_tac (simpset() addsimps prems)));
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	45	qed "rec_type";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	46
2469 b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	47	Addsimps [rec_type, nat_0_le, nat_le_refl];
25 3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	48	val nat_typechecks = [rec_type, nat_0I, nat_1I, nat_succI, Ord_nat];
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	49
1708 8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	50	goal Arith.thy "!!k. [\| 0<k; k: nat \|] ==> EX j: nat. k = succ(j)";
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	51	by (etac rev_mp 1);
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	52	by (etac nat_induct 1);
2469 b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	53	by (Simp_tac 1);
3016 15763781afb0 Conversion to use blast_tac paulson parents: 2637 diff changeset	54	by (Blast_tac 1);
1708 8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	55	val lemma = result();
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	56
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	57	(* [\| 0 < k; k: nat; !!j. [\| j: nat; k = succ(j) \|] ==> Q \|] ==> Q *)
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	58	bind_thm ("zero_lt_natE", lemma RS bexE);
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	59
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	60
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	61	( Addition )
a5a9c433f639 Initial revision clasohm parents: diff changeset	62
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	63	qed_goalw "add_type" Arith.thy [add_def]
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	64	"[\| m:nat; n:nat \|] ==> m #+ n : nat"
a5a9c433f639 Initial revision clasohm parents: diff changeset	65	(fn prems=> [ (typechk_tac (prems@nat_typechecks@ZF_typechecks)) ]);
a5a9c433f639 Initial revision clasohm parents: diff changeset	66
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	67	qed_goalw "add_0" Arith.thy [add_def]
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	68	"0 #+ n = n"
a5a9c433f639 Initial revision clasohm parents: diff changeset	69	(fn _ => [ (rtac rec_0 1) ]);
a5a9c433f639 Initial revision clasohm parents: diff changeset	70
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	71	qed_goalw "add_succ" Arith.thy [add_def]
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	72	"succ(m) #+ n = succ(m #+ n)"
a5a9c433f639 Initial revision clasohm parents: diff changeset	73	(fn _=> [ (rtac rec_succ 1) ]);
a5a9c433f639 Initial revision clasohm parents: diff changeset	74
2469 b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	75	Addsimps [add_0, add_succ];
b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	76
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	77	( Multiplication )
a5a9c433f639 Initial revision clasohm parents: diff changeset	78
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	79	qed_goalw "mult_type" Arith.thy [mult_def]
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	80	"[\| m:nat; n:nat \|] ==> m #* n : nat"
a5a9c433f639 Initial revision clasohm parents: diff changeset	81	(fn prems=>
a5a9c433f639 Initial revision clasohm parents: diff changeset	82	[ (typechk_tac (prems@[add_type]@nat_typechecks@ZF_typechecks)) ]);
a5a9c433f639 Initial revision clasohm parents: diff changeset	83
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	84	qed_goalw "mult_0" Arith.thy [mult_def]
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	85	"0 #* n = 0"
a5a9c433f639 Initial revision clasohm parents: diff changeset	86	(fn _ => [ (rtac rec_0 1) ]);
a5a9c433f639 Initial revision clasohm parents: diff changeset	87
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	88	qed_goalw "mult_succ" Arith.thy [mult_def]
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	89	"succ(m) #* n = n #+ (m #* n)"
a5a9c433f639 Initial revision clasohm parents: diff changeset	90	(fn _ => [ (rtac rec_succ 1) ]);
a5a9c433f639 Initial revision clasohm parents: diff changeset	91
2469 b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	92	Addsimps [mult_0, mult_succ];
b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	93
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	94	( Difference )
a5a9c433f639 Initial revision clasohm parents: diff changeset	95
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	96	qed_goalw "diff_type" Arith.thy [diff_def]
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	97	"[\| m:nat; n:nat \|] ==> m #- n : nat"
a5a9c433f639 Initial revision clasohm parents: diff changeset	98	(fn prems=> [ (typechk_tac (prems@nat_typechecks@ZF_typechecks)) ]);
a5a9c433f639 Initial revision clasohm parents: diff changeset	99
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	100	qed_goalw "diff_0" Arith.thy [diff_def]
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	101	"m #- 0 = m"
a5a9c433f639 Initial revision clasohm parents: diff changeset	102	(fn _ => [ (rtac rec_0 1) ]);
a5a9c433f639 Initial revision clasohm parents: diff changeset	103
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	104	qed_goalw "diff_0_eq_0" Arith.thy [diff_def]
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	105	"n:nat ==> 0 #- n = 0"
a5a9c433f639 Initial revision clasohm parents: diff changeset	106	(fn [prem]=>
a5a9c433f639 Initial revision clasohm parents: diff changeset	107	[ (rtac (prem RS nat_induct) 1),
2469 b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	108	(ALLGOALS (Asm_simp_tac)) ]);
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	109
a5a9c433f639 Initial revision clasohm parents: diff changeset	110	(*Must simplify BEFORE the induction!! (Else we get a critical pair)
a5a9c433f639 Initial revision clasohm parents: diff changeset	111	succ(m) #- succ(n) rewrites to pred(succ(m) #- n) *)
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	112	qed_goalw "diff_succ_succ" Arith.thy [diff_def]
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	113	"[\| m:nat; n:nat \|] ==> succ(m) #- succ(n) = m #- n"
a5a9c433f639 Initial revision clasohm parents: diff changeset	114	(fn prems=>
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	115	[ (asm_simp_tac (simpset() addsimps prems) 1),
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	116	(nat_ind_tac "n" prems 1),
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	117	(ALLGOALS (asm_simp_tac (simpset() addsimps prems))) ]);
2469 b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	118
b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	119	Addsimps [diff_0, diff_0_eq_0, diff_succ_succ];
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	120
a5a9c433f639 Initial revision clasohm parents: diff changeset	121	val prems = goal Arith.thy
25 3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	122	"[\| m:nat; n:nat \|] ==> m #- n le m";
3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	123	by (rtac (prems MRS diff_induct) 1);
3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	124	by (etac leE 3);
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	125	by (ALLGOALS
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	126	(asm_simp_tac (simpset() addsimps (prems @ [le_iff, nat_into_Ord]))));
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	127	qed "diff_le_self";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	128
a5a9c433f639 Initial revision clasohm parents: diff changeset	129	(* Simplification over add, mult, diff *)
a5a9c433f639 Initial revision clasohm parents: diff changeset	130
a5a9c433f639 Initial revision clasohm parents: diff changeset	131	val arith_typechecks = [add_type, mult_type, diff_type];
2469 b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	132	Addsimps arith_typechecks;
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	133
a5a9c433f639 Initial revision clasohm parents: diff changeset	134
a5a9c433f639 Initial revision clasohm parents: diff changeset	135	(* Addition *)
a5a9c433f639 Initial revision clasohm parents: diff changeset	136
a5a9c433f639 Initial revision clasohm parents: diff changeset	137	(Associative law for addition)
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	138	qed_goal "add_assoc" Arith.thy
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	139	"m:nat ==> (m #+ n) #+ k = m #+ (n #+ k)"
a5a9c433f639 Initial revision clasohm parents: diff changeset	140	(fn prems=>
a5a9c433f639 Initial revision clasohm parents: diff changeset	141	[ (nat_ind_tac "m" prems 1),
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	142	(ALLGOALS (asm_simp_tac (simpset() addsimps prems))) ]);
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	143
a5a9c433f639 Initial revision clasohm parents: diff changeset	144	(*The following two lemmas are used for add_commute and sometimes
a5a9c433f639 Initial revision clasohm parents: diff changeset	145	elsewhere, since they are safe for rewriting.*)
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	146	qed_goal "add_0_right" Arith.thy
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	147	"m:nat ==> m #+ 0 = m"
a5a9c433f639 Initial revision clasohm parents: diff changeset	148	(fn prems=>
a5a9c433f639 Initial revision clasohm parents: diff changeset	149	[ (nat_ind_tac "m" prems 1),
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	150	(ALLGOALS (asm_simp_tac (simpset() addsimps prems))) ]);
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	151
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	152	qed_goal "add_succ_right" Arith.thy
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	153	"m:nat ==> m #+ succ(n) = succ(m #+ n)"
a5a9c433f639 Initial revision clasohm parents: diff changeset	154	(fn prems=>
a5a9c433f639 Initial revision clasohm parents: diff changeset	155	[ (nat_ind_tac "m" prems 1),
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	156	(ALLGOALS (asm_simp_tac (simpset() addsimps prems))) ]);
2469 b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	157
b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	158	Addsimps [add_0_right, add_succ_right];
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	159
a5a9c433f639 Initial revision clasohm parents: diff changeset	160	(Commutative law for addition)
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	161	qed_goal "add_commute" Arith.thy
435 ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 127 diff changeset	162	"!!m n. [\| m:nat; n:nat \|] ==> m #+ n = n #+ m"
ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 127 diff changeset	163	(fn _ =>
ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 127 diff changeset	164	[ (nat_ind_tac "n" [] 1),
2469 b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	165	(ALLGOALS Asm_simp_tac) ]);
435 ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 127 diff changeset	166
437 435875e4b21d modifications for cardinal arithmetic lcp parents: 435 diff changeset	167	(for a/c rewriting)
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	168	qed_goal "add_left_commute" Arith.thy
437 435875e4b21d modifications for cardinal arithmetic lcp parents: 435 diff changeset	169	"!!m n k. [\| m:nat; n:nat \|] ==> m#+(n#+k)=n#+(m#+k)"
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	170	(fn _ => [asm_simp_tac(simpset() addsimps [add_assoc RS sym, add_commute]) 1]);
435 ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 127 diff changeset	171
ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 127 diff changeset	172	(Addition is an AC-operator)
ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 127 diff changeset	173	val add_ac = [add_assoc, add_commute, add_left_commute];
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	174
a5a9c433f639 Initial revision clasohm parents: diff changeset	175	(Cancellation law on the left)
437 435875e4b21d modifications for cardinal arithmetic lcp parents: 435 diff changeset	176	val [eqn,knat] = goal Arith.thy
435875e4b21d modifications for cardinal arithmetic lcp parents: 435 diff changeset	177	"[\| k #+ m = k #+ n; k:nat \|] ==> m=n";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	178	by (rtac (eqn RS rev_mp) 1);
a5a9c433f639 Initial revision clasohm parents: diff changeset	179	by (nat_ind_tac "k" [knat] 1);
2469 b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	180	by (ALLGOALS (Simp_tac));
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	181	qed "add_left_cancel";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	182
a5a9c433f639 Initial revision clasohm parents: diff changeset	183	(* Multiplication *)
a5a9c433f639 Initial revision clasohm parents: diff changeset	184
a5a9c433f639 Initial revision clasohm parents: diff changeset	185	(right annihilation in product)
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	186	qed_goal "mult_0_right" Arith.thy
435 ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 127 diff changeset	187	"!!m. m:nat ==> m #* 0 = 0"
ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 127 diff changeset	188	(fn _=>
ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 127 diff changeset	189	[ (nat_ind_tac "m" [] 1),
2469 b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	190	(ALLGOALS (Asm_simp_tac)) ]);
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	191
a5a9c433f639 Initial revision clasohm parents: diff changeset	192	(right successor law for multiplication)
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	193	qed_goal "mult_succ_right" Arith.thy
6 8ce8c4d13d4d Installation of new simplifier for ZF. Deleted all congruence rules not lcp parents: 0 diff changeset	194	"!!m n. [\| m:nat; n:nat \|] ==> m #* succ(n) = m #+ (m #* n)"
435 ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 127 diff changeset	195	(fn _ =>
6 8ce8c4d13d4d Installation of new simplifier for ZF. Deleted all congruence rules not lcp parents: 0 diff changeset	196	[ (nat_ind_tac "m" [] 1),
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	197	(ALLGOALS (asm_simp_tac (simpset() addsimps add_ac))) ]);
2469 b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	198
b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	199	Addsimps [mult_0_right, mult_succ_right];
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	200
1793 09fff2f0d727 New example of GCDs and divides relation paulson parents: 1708 diff changeset	201	goal Arith.thy "!!n. n:nat ==> 1 #* n = n";
2469 b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	202	by (Asm_simp_tac 1);
1793 09fff2f0d727 New example of GCDs and divides relation paulson parents: 1708 diff changeset	203	qed "mult_1";
09fff2f0d727 New example of GCDs and divides relation paulson parents: 1708 diff changeset	204
09fff2f0d727 New example of GCDs and divides relation paulson parents: 1708 diff changeset	205	goal Arith.thy "!!n. n:nat ==> n #* 1 = n";
2469 b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	206	by (Asm_simp_tac 1);
1793 09fff2f0d727 New example of GCDs and divides relation paulson parents: 1708 diff changeset	207	qed "mult_1_right";
09fff2f0d727 New example of GCDs and divides relation paulson parents: 1708 diff changeset	208
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	209	(Commutative law for multiplication)
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	210	qed_goal "mult_commute" Arith.thy
2469 b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	211	"!!m n. [\| m:nat; n:nat \|] ==> m #* n = n #* m"
b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	212	(fn _=>
b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	213	[ (nat_ind_tac "m" [] 1),
b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	214	(ALLGOALS Asm_simp_tac) ]);
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	215
a5a9c433f639 Initial revision clasohm parents: diff changeset	216	(addition distributes over multiplication)
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	217	qed_goal "add_mult_distrib" Arith.thy
14 1c0926788772 ex/{bin.ML,comb.ML,prop.ML}: replaced NewSext by Syntax.simple_sext lcp parents: 6 diff changeset	218	"!!m n. [\| m:nat; k:nat \|] ==> (m #+ n) #* k = (m #* k) #+ (n #* k)"
1c0926788772 ex/{bin.ML,comb.ML,prop.ML}: replaced NewSext by Syntax.simple_sext lcp parents: 6 diff changeset	219	(fn _=>
1c0926788772 ex/{bin.ML,comb.ML,prop.ML}: replaced NewSext by Syntax.simple_sext lcp parents: 6 diff changeset	220	[ (etac nat_induct 1),
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	221	(ALLGOALS (asm_simp_tac (simpset() addsimps [add_assoc RS sym]))) ]);
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	222
a5a9c433f639 Initial revision clasohm parents: diff changeset	223	(Distributive law on the left; requires an extra typing premise)
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	224	qed_goal "add_mult_distrib_left" Arith.thy
435 ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 127 diff changeset	225	"!!m. [\| m:nat; n:nat; k:nat \|] ==> k #* (m #+ n) = (k #* m) #+ (k #* n)"
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	226	(fn prems=>
435 ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 127 diff changeset	227	[ (nat_ind_tac "m" [] 1),
2469 b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	228	(Asm_simp_tac 1),
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	229	(asm_simp_tac (simpset() addsimps add_ac) 1) ]);
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	230
a5a9c433f639 Initial revision clasohm parents: diff changeset	231	(Associative law for multiplication)
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	232	qed_goal "mult_assoc" Arith.thy
14 1c0926788772 ex/{bin.ML,comb.ML,prop.ML}: replaced NewSext by Syntax.simple_sext lcp parents: 6 diff changeset	233	"!!m n k. [\| m:nat; n:nat; k:nat \|] ==> (m #* n) #* k = m #* (n #* k)"
1c0926788772 ex/{bin.ML,comb.ML,prop.ML}: replaced NewSext by Syntax.simple_sext lcp parents: 6 diff changeset	234	(fn _=>
1c0926788772 ex/{bin.ML,comb.ML,prop.ML}: replaced NewSext by Syntax.simple_sext lcp parents: 6 diff changeset	235	[ (etac nat_induct 1),
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	236	(ALLGOALS (asm_simp_tac (simpset() addsimps [add_mult_distrib]))) ]);
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	237
437 435875e4b21d modifications for cardinal arithmetic lcp parents: 435 diff changeset	238	(for a/c rewriting)
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	239	qed_goal "mult_left_commute" Arith.thy
437 435875e4b21d modifications for cardinal arithmetic lcp parents: 435 diff changeset	240	"!!m n k. [\| m:nat; n:nat; k:nat \|] ==> m #* (n #* k) = n #* (m #* k)"
435875e4b21d modifications for cardinal arithmetic lcp parents: 435 diff changeset	241	(fn _ => [rtac (mult_commute RS trans) 1,
435875e4b21d modifications for cardinal arithmetic lcp parents: 435 diff changeset	242	rtac (mult_assoc RS trans) 3,
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 760 diff changeset	243	rtac (mult_commute RS subst_context) 6,
6bcb44e4d6e5 expanded tabs clasohm parents: 760 diff changeset	244	REPEAT (ares_tac [mult_type] 1)]);
437 435875e4b21d modifications for cardinal arithmetic lcp parents: 435 diff changeset	245
435875e4b21d modifications for cardinal arithmetic lcp parents: 435 diff changeset	246	val mult_ac = [mult_assoc,mult_commute,mult_left_commute];
435875e4b21d modifications for cardinal arithmetic lcp parents: 435 diff changeset	247
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	248
a5a9c433f639 Initial revision clasohm parents: diff changeset	249	(* Difference *)
a5a9c433f639 Initial revision clasohm parents: diff changeset	250
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	251	qed_goal "diff_self_eq_0" Arith.thy
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	252	"m:nat ==> m #- m = 0"
a5a9c433f639 Initial revision clasohm parents: diff changeset	253	(fn prems=>
a5a9c433f639 Initial revision clasohm parents: diff changeset	254	[ (nat_ind_tac "m" prems 1),
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	255	(ALLGOALS (asm_simp_tac (simpset() addsimps prems))) ]);
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	256
25 3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	257	(Addition is the inverse of subtraction)
3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	258	goal Arith.thy "!!m n. [\| n le m; m:nat \|] ==> n #+ (m#-n) = m";
3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	259	by (forward_tac [lt_nat_in_nat] 1);
127 eec6bb9c58ea Misc modifs such as expandshort lcp parents: 25 diff changeset	260	by (etac nat_succI 1);
25 3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	261	by (etac rev_mp 1);
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	262	by (res_inst_tac [("m","m"),("n","n")] diff_induct 1);
2469 b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	263	by (ALLGOALS Asm_simp_tac);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	264	qed "add_diff_inverse";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	265
1609 5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	266	(Proof is IDENTICAL to that above)
5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	267	goal Arith.thy "!!m n. [\| n le m; m:nat \|] ==> succ(m) #- n = succ(m#-n)";
5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	268	by (forward_tac [lt_nat_in_nat] 1);
5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	269	by (etac nat_succI 1);
5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	270	by (etac rev_mp 1);
5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	271	by (res_inst_tac [("m","m"),("n","n")] diff_induct 1);
2469 b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	272	by (ALLGOALS Asm_simp_tac);
1609 5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	273	qed "diff_succ";
5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	274
1708 8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	275	( Subtraction is the inverse of addition. )
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	276
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	277	val [mnat,nnat] = goal Arith.thy
437 435875e4b21d modifications for cardinal arithmetic lcp parents: 435 diff changeset	278	"[\| m:nat; n:nat \|] ==> (n#+m) #- n = m";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	279	by (rtac (nnat RS nat_induct) 1);
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	280	by (ALLGOALS (asm_simp_tac (simpset() addsimps [mnat])));
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	281	qed "diff_add_inverse";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	282
437 435875e4b21d modifications for cardinal arithmetic lcp parents: 435 diff changeset	283	goal Arith.thy
435875e4b21d modifications for cardinal arithmetic lcp parents: 435 diff changeset	284	"!!m n. [\| m:nat; n:nat \|] ==> (m#+n) #- n = m";
435875e4b21d modifications for cardinal arithmetic lcp parents: 435 diff changeset	285	by (res_inst_tac [("m1","m")] (add_commute RS ssubst) 1);
435875e4b21d modifications for cardinal arithmetic lcp parents: 435 diff changeset	286	by (REPEAT (ares_tac [diff_add_inverse] 1));
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	287	qed "diff_add_inverse2";
437 435875e4b21d modifications for cardinal arithmetic lcp parents: 435 diff changeset	288
1708 8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	289	goal Arith.thy
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	290	"!!k. [\| k:nat; m: nat; n: nat \|] ==> (k#+m) #- (k#+n) = m #- n";
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	291	by (nat_ind_tac "k" [] 1);
2469 b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	292	by (ALLGOALS Asm_simp_tac);
1708 8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	293	qed "diff_cancel";
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	294
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	295	goal Arith.thy
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	296	"!!n. [\| k:nat; m: nat; n: nat \|] ==> (m#+k) #- (n#+k) = m #- n";
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	297	val add_commute_k = read_instantiate [("n","k")] add_commute;
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	298	by (asm_simp_tac (simpset() addsimps [add_commute_k, diff_cancel]) 1);
1708 8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	299	qed "diff_cancel2";
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	300
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	301	val [mnat,nnat] = goal Arith.thy
a5a9c433f639 Initial revision clasohm parents: diff changeset	302	"[\| m:nat; n:nat \|] ==> n #- (n#+m) = 0";
a5a9c433f639 Initial revision clasohm parents: diff changeset	303	by (rtac (nnat RS nat_induct) 1);
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	304	by (ALLGOALS (asm_simp_tac (simpset() addsimps [mnat])));
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	305	qed "diff_add_0";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	306
1708 8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	307	( Difference distributes over multiplication )
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	308
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	309	goal Arith.thy
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	310	"!!m n. [\| m:nat; n: nat; k:nat \|] ==> (m #- n) #* k = (m #* k) #- (n #* k)";
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	311	by (res_inst_tac [("m","m"),("n","n")] diff_induct 1);
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	312	by (ALLGOALS (asm_simp_tac (simpset() addsimps [diff_cancel])));
1708 8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	313	qed "diff_mult_distrib" ;
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	314
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	315	goal Arith.thy
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	316	"!!m. [\| m:nat; n: nat; k:nat \|] ==> k #* (m #- n) = (k #* m) #- (k #* n)";
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	317	val mult_commute_k = read_instantiate [("m","k")] mult_commute;
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	318	by (asm_simp_tac (simpset() addsimps
1793 09fff2f0d727 New example of GCDs and divides relation paulson parents: 1708 diff changeset	319	[mult_commute_k, diff_mult_distrib]) 1);
1708 8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	320	qed "diff_mult_distrib2" ;
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	321
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	322	(* Remainder *)
a5a9c433f639 Initial revision clasohm parents: diff changeset	323
25 3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	324	goal Arith.thy "!!m n. [\| 0<n; n le m; m:nat \|] ==> m #- n < m";
3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	325	by (forward_tac [lt_nat_in_nat] 1 THEN etac nat_succI 1);
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	326	by (etac rev_mp 1);
a5a9c433f639 Initial revision clasohm parents: diff changeset	327	by (etac rev_mp 1);
a5a9c433f639 Initial revision clasohm parents: diff changeset	328	by (res_inst_tac [("m","m"),("n","n")] diff_induct 1);
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	329	by (ALLGOALS (asm_simp_tac (simpset() addsimps [diff_le_self,diff_succ_succ])));
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	330	qed "div_termination";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	331
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 760 diff changeset	332	val div_rls = (for mod and div)
25 3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	333	nat_typechecks @
3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	334	[Ord_transrec_type, apply_type, div_termination RS ltD, if_type,
435 ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 127 diff changeset	335	nat_into_Ord, not_lt_iff_le RS iffD1];
25 3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	336
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	337	val div_ss = (simpset()) addsimps [nat_into_Ord, div_termination RS ltD,
2493 bdeb5024353a Removal of sum_cs and eq_cs paulson parents: 2469 diff changeset	338	not_lt_iff_le RS iffD2];
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	339
a5a9c433f639 Initial revision clasohm parents: diff changeset	340	(Type checking depends upon termination!)
25 3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	341	goalw Arith.thy [mod_def] "!!m n. [\| 0<n; m:nat; n:nat \|] ==> m mod n : nat";
3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	342	by (REPEAT (ares_tac div_rls 1 ORELSE etac lt_trans 1));
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	343	qed "mod_type";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	344
25 3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	345	goal Arith.thy "!!m n. [\| 0<n; m<n \|] ==> m mod n = m";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	346	by (rtac (mod_def RS def_transrec RS trans) 1);
25 3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	347	by (asm_simp_tac div_ss 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	348	qed "mod_less";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	349
25 3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	350	goal Arith.thy "!!m n. [\| 0<n; n le m; m:nat \|] ==> m mod n = (m#-n) mod n";
3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	351	by (forward_tac [lt_nat_in_nat] 1 THEN etac nat_succI 1);
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	352	by (rtac (mod_def RS def_transrec RS trans) 1);
25 3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	353	by (asm_simp_tac div_ss 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	354	qed "mod_geq";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	355
2469 b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	356	Addsimps [mod_type, mod_less, mod_geq];
b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	357
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	358	(* Quotient *)
a5a9c433f639 Initial revision clasohm parents: diff changeset	359
a5a9c433f639 Initial revision clasohm parents: diff changeset	360	(Type checking depends upon termination!)
25 3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	361	goalw Arith.thy [div_def]
3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	362	"!!m n. [\| 0<n; m:nat; n:nat \|] ==> m div n : nat";
3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	363	by (REPEAT (ares_tac div_rls 1 ORELSE etac lt_trans 1));
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	364	qed "div_type";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	365
25 3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	366	goal Arith.thy "!!m n. [\| 0<n; m<n \|] ==> m div n = 0";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	367	by (rtac (div_def RS def_transrec RS trans) 1);
25 3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	368	by (asm_simp_tac div_ss 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	369	qed "div_less";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	370
25 3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	371	goal Arith.thy
3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	372	"!!m n. [\| 0<n; n le m; m:nat \|] ==> m div n = succ((m#-n) div n)";
3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	373	by (forward_tac [lt_nat_in_nat] 1 THEN etac nat_succI 1);
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	374	by (rtac (div_def RS def_transrec RS trans) 1);
25 3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	375	by (asm_simp_tac div_ss 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	376	qed "div_geq";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	377
2469 b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	378	Addsimps [div_type, div_less, div_geq];
b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	379
1609 5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	380	(A key result)
25 3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	381	goal Arith.thy
3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	382	"!!m n. [\| 0<n; m:nat; n:nat \|] ==> (m div n)#*n #+ m mod n = m";
3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	383	by (etac complete_induct 1);
437 435875e4b21d modifications for cardinal arithmetic lcp parents: 435 diff changeset	384	by (excluded_middle_tac "x<n" 1);
25 3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	385	(case x<n)
2469 b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	386	by (Asm_simp_tac 2);
25 3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	387	(case n le x)
3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	388	by (asm_full_simp_tac
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	389	(simpset() addsimps [not_lt_iff_le, nat_into_Ord, add_assoc,
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 760 diff changeset	390	div_termination RS ltD, add_diff_inverse]) 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	391	qed "mod_div_equality";
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	392
1609 5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	393	(* Further facts about mod (mainly for mutilated checkerboard *)
5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	394
5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	395	goal Arith.thy
5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	396	"!!m n. [\| 0<n; m:nat; n:nat \|] ==> \
5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	397	\ succ(m) mod n = if(succ(m mod n) = n, 0, succ(m mod n))";
5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	398	by (etac complete_induct 1);
5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	399	by (excluded_middle_tac "succ(x)<n" 1);
1623 2b8573c1b1c1 Ran expandshort paulson parents: 1609 diff changeset	400	(* case succ(x) < n *)
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	401	by (asm_simp_tac (simpset() addsimps [mod_less, nat_le_refl RS lt_trans,
1623 2b8573c1b1c1 Ran expandshort paulson parents: 1609 diff changeset	402	succ_neq_self]) 2);
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	403	by (asm_simp_tac (simpset() addsimps [ltD RS mem_imp_not_eq]) 2);
1623 2b8573c1b1c1 Ran expandshort paulson parents: 1609 diff changeset	404	(* case n le succ(x) *)
1609 5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	405	by (asm_full_simp_tac
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	406	(simpset() addsimps [not_lt_iff_le, nat_into_Ord, mod_geq]) 1);
1623 2b8573c1b1c1 Ran expandshort paulson parents: 1609 diff changeset	407	by (etac leE 1);
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	408	by (asm_simp_tac (simpset() addsimps [div_termination RS ltD, diff_succ,
1623 2b8573c1b1c1 Ran expandshort paulson parents: 1609 diff changeset	409	mod_geq]) 1);
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	410	by (asm_simp_tac (simpset() addsimps [mod_less, diff_self_eq_0]) 1);
1609 5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	411	qed "mod_succ";
5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	412
5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	413	goal Arith.thy "!!m n. [\| 0<n; m:nat; n:nat \|] ==> m mod n < n";
5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	414	by (etac complete_induct 1);
5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	415	by (excluded_middle_tac "x<n" 1);
5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	416	(case x<n)
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	417	by (asm_simp_tac (simpset() addsimps [mod_less]) 2);
1609 5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	418	(case n le x)
5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	419	by (asm_full_simp_tac
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	420	(simpset() addsimps [not_lt_iff_le, nat_into_Ord,
1609 5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	421	mod_geq, div_termination RS ltD]) 1);
5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	422	qed "mod_less_divisor";
5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	423
5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	424
5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	425	goal Arith.thy
5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	426	"!!k b. [\| k: nat; b<2 \|] ==> k mod 2 = b \| k mod 2 = if(b=1,0,1)";
5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	427	by (subgoal_tac "k mod 2: 2" 1);
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	428	by (asm_simp_tac (simpset() addsimps [mod_less_divisor RS ltD]) 2);
1623 2b8573c1b1c1 Ran expandshort paulson parents: 1609 diff changeset	429	by (dtac ltD 1);
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	430	by (asm_simp_tac (simpset() setloop split_tac [expand_if]) 1);
3016 15763781afb0 Conversion to use blast_tac paulson parents: 2637 diff changeset	431	by (Blast_tac 1);
1609 5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	432	qed "mod2_cases";
5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	433
5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	434	goal Arith.thy "!!m. m:nat ==> succ(succ(m)) mod 2 = m mod 2";
5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	435	by (subgoal_tac "m mod 2: 2" 1);
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	436	by (asm_simp_tac (simpset() addsimps [mod_less_divisor RS ltD]) 2);
771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	437	by (asm_simp_tac (simpset() addsimps [mod_succ] setloop Step_tac) 1);
1609 5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	438	qed "mod2_succ_succ";
5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	439
5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	440	goal Arith.thy "!!m. m:nat ==> (m#+m) mod 2 = 0";
1623 2b8573c1b1c1 Ran expandshort paulson parents: 1609 diff changeset	441	by (etac nat_induct 1);
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	442	by (simp_tac (simpset() addsimps [mod_less]) 1);
771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	443	by (asm_simp_tac (simpset() addsimps [mod2_succ_succ, add_succ_right]) 1);
1609 5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	444	qed "mod2_add_self";
5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	445
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	446
25 3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	447	(** Additional theorems about "le" **)
0 a5a9c433f639 Initial revision clasohm parents: diff changeset	448
25 3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	449	goal Arith.thy "!!m n. [\| m:nat; n:nat \|] ==> m le m #+ n";
3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	450	by (etac nat_induct 1);
2469 b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	451	by (ALLGOALS Asm_simp_tac);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	452	qed "add_le_self";
14 1c0926788772 ex/{bin.ML,comb.ML,prop.ML}: replaced NewSext by Syntax.simple_sext lcp parents: 6 diff changeset	453
25 3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	454	goal Arith.thy "!!m n. [\| m:nat; n:nat \|] ==> m le n #+ m";
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1793 diff changeset	455	by (stac add_commute 1);
25 3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	456	by (REPEAT (ares_tac [add_le_self] 1));
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	457	qed "add_le_self2";
14 1c0926788772 ex/{bin.ML,comb.ML,prop.ML}: replaced NewSext by Syntax.simple_sext lcp parents: 6 diff changeset	458
1708 8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	459	(* Monotonicity of Addition *)
14 1c0926788772 ex/{bin.ML,comb.ML,prop.ML}: replaced NewSext by Syntax.simple_sext lcp parents: 6 diff changeset	460
1708 8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	461	(strict, in 1st argument; proof is by rule induction on 'less than')
25 3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	462	goal Arith.thy "!!i j k. [\| i<j; j:nat; k:nat \|] ==> i#+k < j#+k";
3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	463	by (forward_tac [lt_nat_in_nat] 1);
127 eec6bb9c58ea Misc modifs such as expandshort lcp parents: 25 diff changeset	464	by (assume_tac 1);
25 3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	465	by (etac succ_lt_induct 1);
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	466	by (ALLGOALS (asm_simp_tac (simpset() addsimps [leI])));
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	467	qed "add_lt_mono1";
14 1c0926788772 ex/{bin.ML,comb.ML,prop.ML}: replaced NewSext by Syntax.simple_sext lcp parents: 6 diff changeset	468
1c0926788772 ex/{bin.ML,comb.ML,prop.ML}: replaced NewSext by Syntax.simple_sext lcp parents: 6 diff changeset	469	(strict, in both arguments)
25 3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	470	goal Arith.thy "!!i j k l. [\| i<j; k<l; j:nat; l:nat \|] ==> i#+k < j#+l";
3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	471	by (rtac (add_lt_mono1 RS lt_trans) 1);
3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	472	by (REPEAT (eresolve_tac [asm_rl, lt_nat_in_nat] 1));
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1793 diff changeset	473	by (EVERY [stac add_commute 1,
639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1793 diff changeset	474	stac add_commute 3,
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 760 diff changeset	475	rtac add_lt_mono1 5]);
25 3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	476	by (REPEAT (eresolve_tac [asm_rl, lt_nat_in_nat] 1));
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	477	qed "add_lt_mono";
14 1c0926788772 ex/{bin.ML,comb.ML,prop.ML}: replaced NewSext by Syntax.simple_sext lcp parents: 6 diff changeset	478
25 3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	479	(A [clumsy] way of lifting < monotonicity to le monotonicity )
435 ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 127 diff changeset	480	val lt_mono::ford::prems = goal Ordinal.thy
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 760 diff changeset	481	"[\| !!i j. [\| i<j; j:k \|] ==> f(i) < f(j); \
6bcb44e4d6e5 expanded tabs clasohm parents: 760 diff changeset	482	\ !!i. i:k ==> Ord(f(i)); \
6bcb44e4d6e5 expanded tabs clasohm parents: 760 diff changeset	483	\ i le j; j:k \
25 3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	484	\ \|] ==> f(i) le f(j)";
14 1c0926788772 ex/{bin.ML,comb.ML,prop.ML}: replaced NewSext by Syntax.simple_sext lcp parents: 6 diff changeset	485	by (cut_facts_tac prems 1);
3016 15763781afb0 Conversion to use blast_tac paulson parents: 2637 diff changeset	486	by (blast_tac (le_cs addSIs [lt_mono,ford] addSEs [leE]) 1);
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	487	qed "Ord_lt_mono_imp_le_mono";
14 1c0926788772 ex/{bin.ML,comb.ML,prop.ML}: replaced NewSext by Syntax.simple_sext lcp parents: 6 diff changeset	488
25 3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	489	(le monotonicity, 1st argument)
14 1c0926788772 ex/{bin.ML,comb.ML,prop.ML}: replaced NewSext by Syntax.simple_sext lcp parents: 6 diff changeset	490	goal Arith.thy
25 3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	491	"!!i j k. [\| i le j; j:nat; k:nat \|] ==> i#+k le j#+k";
3840 e0baea4d485a fixed dots; wenzelm parents: 3736 diff changeset	492	by (res_inst_tac [("f", "%j. j#+k")] Ord_lt_mono_imp_le_mono 1);
435 ca5356bd315a Addition of cardinals and order types, various tidying lcp parents: 127 diff changeset	493	by (REPEAT (ares_tac [add_lt_mono1, add_type RS nat_into_Ord] 1));
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	494	qed "add_le_mono1";
14 1c0926788772 ex/{bin.ML,comb.ML,prop.ML}: replaced NewSext by Syntax.simple_sext lcp parents: 6 diff changeset	495
25 3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	496	(* le monotonicity, BOTH arguments*)
14 1c0926788772 ex/{bin.ML,comb.ML,prop.ML}: replaced NewSext by Syntax.simple_sext lcp parents: 6 diff changeset	497	goal Arith.thy
25 3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	498	"!!i j k. [\| i le j; k le l; j:nat; l:nat \|] ==> i#+k le j#+l";
3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	499	by (rtac (add_le_mono1 RS le_trans) 1);
3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	500	by (REPEAT (eresolve_tac [asm_rl, lt_nat_in_nat, nat_succI] 1));
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1793 diff changeset	501	by (EVERY [stac add_commute 1,
639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1793 diff changeset	502	stac add_commute 3,
1461 6bcb44e4d6e5 expanded tabs clasohm parents: 760 diff changeset	503	rtac add_le_mono1 5]);
25 3ac1c0c0016e ordinal: DEFINITION of < and le to replace : and <= on ordinals! Many lcp parents: 14 diff changeset	504	by (REPEAT (eresolve_tac [asm_rl, lt_nat_in_nat, nat_succI] 1));
760 f0200e91b272 added qed and qed_goal[w] clasohm parents: 437 diff changeset	505	qed "add_le_mono";
1609 5324067d993f New lemmas for Mutilated Checkerboard paulson parents: 1461 diff changeset	506
1708 8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	507	(* Monotonicity of Multiplication *)
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	508
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	509	goal Arith.thy "!!i j k. [\| i le j; j:nat; k:nat \|] ==> i#k le j#k";
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	510	by (forward_tac [lt_nat_in_nat] 1);
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	511	by (nat_ind_tac "k" [] 2);
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	512	by (ALLGOALS (asm_simp_tac (simpset() addsimps [add_le_mono])));
1708 8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	513	qed "mult_le_mono1";
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	514
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	515	(* le monotonicity, BOTH arguments*)
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	516	goal Arith.thy
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	517	"!!i j k. [\| i le j; k le l; j:nat; l:nat \|] ==> i#k le j#l";
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	518	by (rtac (mult_le_mono1 RS le_trans) 1);
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	519	by (REPEAT (eresolve_tac [asm_rl, lt_nat_in_nat, nat_succI] 1));
2033 639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1793 diff changeset	520	by (EVERY [stac mult_commute 1,
639de962ded4 Ran expandshort; used stac instead of ssubst paulson parents: 1793 diff changeset	521	stac mult_commute 3,
1708 8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	522	rtac mult_le_mono1 5]);
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	523	by (REPEAT (eresolve_tac [asm_rl, lt_nat_in_nat, nat_succI] 1));
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	524	qed "mult_le_mono";
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	525
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	526	(strict, in 1st argument; proof is by induction on k>0)
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	527	goal Arith.thy "!!i j k. [\| i<j; 0<k; j:nat; k:nat \|] ==> k#i < k#j";
1793 09fff2f0d727 New example of GCDs and divides relation paulson parents: 1708 diff changeset	528	by (etac zero_lt_natE 1);
1708 8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	529	by (forward_tac [lt_nat_in_nat] 2);
2469 b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	530	by (ALLGOALS Asm_simp_tac);
1708 8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	531	by (nat_ind_tac "x" [] 1);
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	532	by (ALLGOALS (asm_simp_tac (simpset() addsimps [add_lt_mono])));
1708 8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	533	qed "mult_lt_mono2";
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	534
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	535	goal Arith.thy "!!k. [\| m: nat; n: nat \|] ==> 0 < m#*n <-> 0<m & 0<n";
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	536	by (best_tac (claset() addEs [natE] addss (simpset())) 1);
1708 8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	537	qed "zero_lt_mult_iff";
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	538
1793 09fff2f0d727 New example of GCDs and divides relation paulson parents: 1708 diff changeset	539	goal Arith.thy "!!k. [\| m: nat; n: nat \|] ==> m#*n = 1 <-> m=1 & n=1";
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	540	by (best_tac (claset() addEs [natE] addss (simpset())) 1);
1793 09fff2f0d727 New example of GCDs and divides relation paulson parents: 1708 diff changeset	541	qed "mult_eq_1_iff";
09fff2f0d727 New example of GCDs and divides relation paulson parents: 1708 diff changeset	542
1708 8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	543	(Cancellation law for division)
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	544	goal Arith.thy
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	545	"!!k. [\| 0<n; 0<k; k:nat; m:nat; n:nat \|] ==> (k#m) div (k#n) = m div n";
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	546	by (eres_inst_tac [("i","m")] complete_induct 1);
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	547	by (excluded_middle_tac "x<n" 1);
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	548	by (asm_simp_tac (simpset() addsimps [div_less, zero_lt_mult_iff,
1793 09fff2f0d727 New example of GCDs and divides relation paulson parents: 1708 diff changeset	549	mult_lt_mono2]) 2);
1708 8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	550	by (asm_full_simp_tac
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	551	(simpset() addsimps [not_lt_iff_le, nat_into_Ord,
1708 8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	552	zero_lt_mult_iff, le_refl RS mult_le_mono, div_geq,
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	553	diff_mult_distrib2 RS sym,
1793 09fff2f0d727 New example of GCDs and divides relation paulson parents: 1708 diff changeset	554	div_termination RS ltD]) 1);
1708 8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	555	qed "div_cancel";
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	556
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	557	goal Arith.thy
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	558	"!!k. [\| 0<n; 0<k; k:nat; m:nat; n:nat \|] ==> \
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	559	\ (k#m) mod (k#n) = k #* (m mod n)";
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	560	by (eres_inst_tac [("i","m")] complete_induct 1);
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	561	by (excluded_middle_tac "x<n" 1);
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	562	by (asm_simp_tac (simpset() addsimps [mod_less, zero_lt_mult_iff,
1793 09fff2f0d727 New example of GCDs and divides relation paulson parents: 1708 diff changeset	563	mult_lt_mono2]) 2);
1708 8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	564	by (asm_full_simp_tac
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	565	(simpset() addsimps [not_lt_iff_le, nat_into_Ord,
1708 8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	566	zero_lt_mult_iff, le_refl RS mult_le_mono, mod_geq,
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	567	diff_mult_distrib2 RS sym,
1793 09fff2f0d727 New example of GCDs and divides relation paulson parents: 1708 diff changeset	568	div_termination RS ltD]) 1);
1708 8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	569	qed "mult_mod_distrib";
8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	570
1793 09fff2f0d727 New example of GCDs and divides relation paulson parents: 1708 diff changeset	571	( Lemma for gcd )
1708 8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	572
1793 09fff2f0d727 New example of GCDs and divides relation paulson parents: 1708 diff changeset	573	val mono_lemma = (nat_into_Ord RS Ord_0_lt) RSN (2,mult_lt_mono2);
09fff2f0d727 New example of GCDs and divides relation paulson parents: 1708 diff changeset	574
09fff2f0d727 New example of GCDs and divides relation paulson parents: 1708 diff changeset	575	goal Arith.thy "!!m n. [\| m = m#*n; m: nat; n: nat \|] ==> n=1 \| m=0";
09fff2f0d727 New example of GCDs and divides relation paulson parents: 1708 diff changeset	576	by (rtac disjCI 1);
09fff2f0d727 New example of GCDs and divides relation paulson parents: 1708 diff changeset	577	by (dtac sym 1);
09fff2f0d727 New example of GCDs and divides relation paulson parents: 1708 diff changeset	578	by (rtac Ord_linear_lt 1 THEN REPEAT_SOME (ares_tac [nat_into_Ord,nat_1I]));
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	579	by (fast_tac (claset() addss (simpset())) 1);
2469 b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	580	by (fast_tac (le_cs addDs [mono_lemma]
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	581	addss (simpset() addsimps [mult_1_right])) 1);
1793 09fff2f0d727 New example of GCDs and divides relation paulson parents: 1708 diff changeset	582	qed "mult_eq_self_implies_10";
1708 8f782b919043 tidied some proofs paulson parents: 1623 diff changeset	583
2469 b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	584
b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	585	(Thanks to Sten Agerholm)
b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	586	goal Arith.thy (* add_le_elim1 *)
b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	587	"!!m n k. [\|m#+n le m#+k; m:nat; n:nat; k:nat\|] ==> n le k";
2493 bdeb5024353a Removal of sum_cs and eq_cs paulson parents: 2469 diff changeset	588	by (etac rev_mp 1);
3016 15763781afb0 Conversion to use blast_tac paulson parents: 2637 diff changeset	589	by (eres_inst_tac [("n","n")] nat_induct 1);
2469 b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	590	by (Asm_simp_tac 1);
3736 39ee3d31cfbc Much tidying including step_tac -> clarify_tac or safe_tac; sometimes paulson parents: 3207 diff changeset	591	by Safe_tac;
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	592	by (asm_full_simp_tac (simpset() addsimps [not_le_iff_lt,nat_into_Ord]) 1);
2469 b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	593	by (etac lt_asym 1);
b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	594	by (assume_tac 1);
b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	595	by (Asm_full_simp_tac 1);
4091 771b1f6422a8 isatool fixclasimp; wenzelm parents: 3840 diff changeset	596	by (asm_full_simp_tac (simpset() addsimps [le_iff, nat_into_Ord]) 1);
3016 15763781afb0 Conversion to use blast_tac paulson parents: 2637 diff changeset	597	by (Blast_tac 1);
2469 b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	598	qed "add_le_elim1";
b50b8c0eec01 Implicit simpsets and clasets for FOL and ZF paulson parents: 2033 diff changeset	599

author	wenzelm
	Mon, 03 Nov 1997 12:24:13 +0100
changeset 4091	771b1f6422a8
parent 3840	e0baea4d485a
child 4839	a7322db15065
permissions	-rw-r--r--