isabelle: src/HOL/List.ML@c4b5cbfb90dd (annotated)

1465 5d7a7e439cec expanded tabs clasohm parents: 1419 diff changeset	1	(* Title: HOL/List
923 ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	2	ID: $Id$
1465 5d7a7e439cec expanded tabs clasohm parents: 1419 diff changeset	3	Author: Tobias Nipkow
923 ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	4	Copyright 1994 TU Muenchen
ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	5
ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	6	List lemmas
ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	7	*)
ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	8
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	9	Goal "!x. xs ~= x#xs";
3040 7d48671753da Introduced a generic "induct_tac" which picks up the right induction scheme nipkow parents: 3011 diff changeset	10	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	11	by Auto_tac;
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	12	qed_spec_mp "not_Cons_self";
3574 5995ab73d790 Added a few lemmas. nipkow parents: 3571 diff changeset	13	bind_thm("not_Cons_self2",not_Cons_self RS not_sym);
5995ab73d790 Added a few lemmas. nipkow parents: 3571 diff changeset	14	Addsimps [not_Cons_self,not_Cons_self2];
923 ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	15
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	16	Goal "(xs ~= []) = (? y ys. xs = y#ys)";
3040 7d48671753da Introduced a generic "induct_tac" which picks up the right induction scheme nipkow parents: 3011 diff changeset	17	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	18	by Auto_tac;
923 ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	19	qed "neq_Nil_conv";
ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	20
4830 bd73675adbed Added a few lemmas. nipkow parents: 4686 diff changeset	21	(* Induction over the length of a list: *)
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	22	val [prem] = Goal
4911 6195e4468c54 Removed duplicate list_length_induct nipkow parents: 4830 diff changeset	23	"(!!xs. (!ys. length ys < length xs --> P ys) ==> P xs) ==> P(xs)";
5132 24f992a25adc isatool expandshort; wenzelm parents: 5129 diff changeset	24	by (rtac measure_induct 1 THEN etac prem 1);
4911 6195e4468c54 Removed duplicate list_length_induct nipkow parents: 4830 diff changeset	25	qed "length_induct";
6195e4468c54 Removed duplicate list_length_induct nipkow parents: 4830 diff changeset	26
923 ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	27
3468 1f972dc8eafb New laws for the "lists" operator paulson parents: 3467 diff changeset	28	( "lists": the list-forming operator over sets )
3342 ec3b55fcb165 New operator "lists" for formalizing sets of lists paulson parents: 3292 diff changeset	29
5043 3fdc881e8ff9 goal -> Goal nipkow parents: 4935 diff changeset	30	Goalw lists.defs "A<=B ==> lists A <= lists B";
3342 ec3b55fcb165 New operator "lists" for formalizing sets of lists paulson parents: 3292 diff changeset	31	by (rtac lfp_mono 1);
ec3b55fcb165 New operator "lists" for formalizing sets of lists paulson parents: 3292 diff changeset	32	by (REPEAT (ares_tac basic_monos 1));
ec3b55fcb165 New operator "lists" for formalizing sets of lists paulson parents: 3292 diff changeset	33	qed "lists_mono";
3196 c522bc46aea7 Added pred_list for TFL paulson parents: 3040 diff changeset	34
6141 a6922171b396 removal of the (thm list) argument of mk_cases paulson parents: 6073 diff changeset	35	val listsE = lists.mk_cases "x#l : lists A";
3468 1f972dc8eafb New laws for the "lists" operator paulson parents: 3467 diff changeset	36	AddSEs [listsE];
1f972dc8eafb New laws for the "lists" operator paulson parents: 3467 diff changeset	37	AddSIs lists.intrs;
1f972dc8eafb New laws for the "lists" operator paulson parents: 3467 diff changeset	38
5043 3fdc881e8ff9 goal -> Goal nipkow parents: 4935 diff changeset	39	Goal "l: lists A ==> l: lists B --> l: lists (A Int B)";
3468 1f972dc8eafb New laws for the "lists" operator paulson parents: 3467 diff changeset	40	by (etac lists.induct 1);
1f972dc8eafb New laws for the "lists" operator paulson parents: 3467 diff changeset	41	by (ALLGOALS Blast_tac);
1f972dc8eafb New laws for the "lists" operator paulson parents: 3467 diff changeset	42	qed_spec_mp "lists_IntI";
1f972dc8eafb New laws for the "lists" operator paulson parents: 3467 diff changeset	43
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	44	Goal "lists (A Int B) = lists A Int lists B";
4423 a129b817b58a expandshort; wenzelm parents: 4132 diff changeset	45	by (rtac (mono_Int RS equalityI) 1);
4089 96fba19bcbe2 isatool fixclasimp; wenzelm parents: 4069 diff changeset	46	by (simp_tac (simpset() addsimps [mono_def, lists_mono]) 1);
96fba19bcbe2 isatool fixclasimp; wenzelm parents: 4069 diff changeset	47	by (blast_tac (claset() addSIs [lists_IntI]) 1);
3468 1f972dc8eafb New laws for the "lists" operator paulson parents: 3467 diff changeset	48	qed "lists_Int_eq";
1f972dc8eafb New laws for the "lists" operator paulson parents: 3467 diff changeset	49	Addsimps [lists_Int_eq];
1f972dc8eafb New laws for the "lists" operator paulson parents: 3467 diff changeset	50
3196 c522bc46aea7 Added pred_list for TFL paulson parents: 3040 diff changeset	51
4643 1b40fcac5a09 New induction schemas for lists (length and snoc). nipkow parents: 4628 diff changeset	52	( Case analysis )
1b40fcac5a09 New induction schemas for lists (length and snoc). nipkow parents: 4628 diff changeset	53	section "Case analysis";
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	54
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	55	val prems = Goal "[\| P([]); !!x xs. P(x#xs) \|] ==> P(xs)";
3457 a8ab7c64817c Ran expandshort paulson parents: 3383 diff changeset	56	by (induct_tac "xs" 1);
a8ab7c64817c Ran expandshort paulson parents: 3383 diff changeset	57	by (REPEAT(resolve_tac prems 1));
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	58	qed "list_cases";
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	59
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	60	Goal "(xs=[] --> P([])) & (!y ys. xs=y#ys --> P(y#ys)) --> P(xs)";
3040 7d48671753da Introduced a generic "induct_tac" which picks up the right induction scheme nipkow parents: 3011 diff changeset	61	by (induct_tac "xs" 1);
2891 d8f254ad1ab9 Calls Blast_tac paulson parents: 2739 diff changeset	62	by (Blast_tac 1);
d8f254ad1ab9 Calls Blast_tac paulson parents: 2739 diff changeset	63	by (Blast_tac 1);
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	64	bind_thm("list_eq_cases",
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	65	impI RSN (2,allI RSN (2,allI RSN (2,impI RS (conjI RS (result() RS mp))))));
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	66
3860 a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	67	( length )
a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	68	(* needs to come before "@" because of thm append_eq_append_conv *)
a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	69
a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	70	section "length";
a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	71
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	72	Goal "length(xs@ys) = length(xs)+length(ys)";
3860 a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	73	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	74	by Auto_tac;
3860 a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	75	qed"length_append";
a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	76	Addsimps [length_append];
a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	77
5129 99ffd3dfb180 Converted to Auto_tac nipkow parents: 5122 diff changeset	78	Goal "length (map f xs) = length xs";
99ffd3dfb180 Converted to Auto_tac nipkow parents: 5122 diff changeset	79	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	80	by Auto_tac;
3860 a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	81	qed "length_map";
a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	82	Addsimps [length_map];
a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	83
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	84	Goal "length(rev xs) = length(xs)";
3860 a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	85	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	86	by Auto_tac;
3860 a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	87	qed "length_rev";
a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	88	Addsimps [length_rev];
a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	89
7028 6ea3b385e731 Modifid length_tl nipkow parents: 6831 diff changeset	90	Goal "length(tl xs) = (length xs) - 1";
4423 a129b817b58a expandshort; wenzelm parents: 4132 diff changeset	91	by (exhaust_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	92	by Auto_tac;
3896 ee8ebb74ec00 Various new lemmas. Improved conversion of equations to rewrite rules: nipkow parents: 3860 diff changeset	93	qed "length_tl";
ee8ebb74ec00 Various new lemmas. Improved conversion of equations to rewrite rules: nipkow parents: 3860 diff changeset	94	Addsimps [length_tl];
ee8ebb74ec00 Various new lemmas. Improved conversion of equations to rewrite rules: nipkow parents: 3860 diff changeset	95
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	96	Goal "(length xs = 0) = (xs = [])";
3860 a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	97	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	98	by Auto_tac;
3860 a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	99	qed "length_0_conv";
a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	100	AddIffs [length_0_conv];
a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	101
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	102	Goal "(0 = length xs) = (xs = [])";
3860 a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	103	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	104	by Auto_tac;
3860 a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	105	qed "zero_length_conv";
a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	106	AddIffs [zero_length_conv];
a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	107
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	108	Goal "(0 < length xs) = (xs ~= [])";
3860 a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	109	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	110	by Auto_tac;
3860 a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	111	qed "length_greater_0_conv";
a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	112	AddIffs [length_greater_0_conv];
a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	113
5296 bdef7d349d27 added length_Suc_conv, finite_set oheimb parents: 5283 diff changeset	114	Goal "(length xs = Suc n) = (? y ys. xs = y#ys & length ys = n)";
bdef7d349d27 added length_Suc_conv, finite_set oheimb parents: 5283 diff changeset	115	by (induct_tac "xs" 1);
6813 bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	116	by Auto_tac;
5296 bdef7d349d27 added length_Suc_conv, finite_set oheimb parents: 5283 diff changeset	117	qed "length_Suc_conv";
bdef7d349d27 added length_Suc_conv, finite_set oheimb parents: 5283 diff changeset	118
923 ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	119	( @ - append )
ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	120
3467 a0797ba03dfe More concat lemmas. nipkow parents: 3465 diff changeset	121	section "@ - append";
a0797ba03dfe More concat lemmas. nipkow parents: 3465 diff changeset	122
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	123	Goal "(xs@ys)@zs = xs@(ys@zs)";
3040 7d48671753da Introduced a generic "induct_tac" which picks up the right induction scheme nipkow parents: 3011 diff changeset	124	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	125	by Auto_tac;
923 ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	126	qed "append_assoc";
2512 0231e4f467f2 Got rid of Alls in List. nipkow parents: 1985 diff changeset	127	Addsimps [append_assoc];
923 ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	128
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	129	Goal "xs @ [] = xs";
3040 7d48671753da Introduced a generic "induct_tac" which picks up the right induction scheme nipkow parents: 3011 diff changeset	130	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	131	by Auto_tac;
923 ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	132	qed "append_Nil2";
2512 0231e4f467f2 Got rid of Alls in List. nipkow parents: 1985 diff changeset	133	Addsimps [append_Nil2];
923 ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	134
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	135	Goal "(xs@ys = []) = (xs=[] & ys=[])";
3040 7d48671753da Introduced a generic "induct_tac" which picks up the right induction scheme nipkow parents: 3011 diff changeset	136	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	137	by Auto_tac;
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	138	qed "append_is_Nil_conv";
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	139	AddIffs [append_is_Nil_conv];
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	140
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	141	Goal "([] = xs@ys) = (xs=[] & ys=[])";
3040 7d48671753da Introduced a generic "induct_tac" which picks up the right induction scheme nipkow parents: 3011 diff changeset	142	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	143	by Auto_tac;
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	144	qed "Nil_is_append_conv";
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	145	AddIffs [Nil_is_append_conv];
923 ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	146
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	147	Goal "(xs @ ys = xs) = (ys=[])";
3574 5995ab73d790 Added a few lemmas. nipkow parents: 3571 diff changeset	148	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	149	by Auto_tac;
3574 5995ab73d790 Added a few lemmas. nipkow parents: 3571 diff changeset	150	qed "append_self_conv";
5995ab73d790 Added a few lemmas. nipkow parents: 3571 diff changeset	151
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	152	Goal "(xs = xs @ ys) = (ys=[])";
3574 5995ab73d790 Added a few lemmas. nipkow parents: 3571 diff changeset	153	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	154	by Auto_tac;
3574 5995ab73d790 Added a few lemmas. nipkow parents: 3571 diff changeset	155	qed "self_append_conv";
5995ab73d790 Added a few lemmas. nipkow parents: 3571 diff changeset	156	AddIffs [append_self_conv,self_append_conv];
5995ab73d790 Added a few lemmas. nipkow parents: 3571 diff changeset	157
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	158	Goal "!ys. length xs = length ys \| length us = length vs \
3860 a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	159	\ --> (xs@us = ys@vs) = (xs=ys & us=vs)";
4423 a129b817b58a expandshort; wenzelm parents: 4132 diff changeset	160	by (induct_tac "xs" 1);
a129b817b58a expandshort; wenzelm parents: 4132 diff changeset	161	by (rtac allI 1);
a129b817b58a expandshort; wenzelm parents: 4132 diff changeset	162	by (exhaust_tac "ys" 1);
a129b817b58a expandshort; wenzelm parents: 4132 diff changeset	163	by (Asm_simp_tac 1);
5641 5266f09db46c length_Suc_conv is no longer given to AddIffs paulson parents: 5537 diff changeset	164	by (Force_tac 1);
4423 a129b817b58a expandshort; wenzelm parents: 4132 diff changeset	165	by (rtac allI 1);
a129b817b58a expandshort; wenzelm parents: 4132 diff changeset	166	by (exhaust_tac "ys" 1);
5641 5266f09db46c length_Suc_conv is no longer given to AddIffs paulson parents: 5537 diff changeset	167	by (Force_tac 1);
4423 a129b817b58a expandshort; wenzelm parents: 4132 diff changeset	168	by (Asm_simp_tac 1);
3860 a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	169	qed_spec_mp "append_eq_append_conv";
a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	170	Addsimps [append_eq_append_conv];
a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	171
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	172	Goal "(xs @ ys = xs @ zs) = (ys=zs)";
3896 ee8ebb74ec00 Various new lemmas. Improved conversion of equations to rewrite rules: nipkow parents: 3860 diff changeset	173	by (Simp_tac 1);
ee8ebb74ec00 Various new lemmas. Improved conversion of equations to rewrite rules: nipkow parents: 3860 diff changeset	174	qed "same_append_eq";
3860 a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	175
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	176	Goal "(xs @ [x] = ys @ [y]) = (xs = ys & x = y)";
3896 ee8ebb74ec00 Various new lemmas. Improved conversion of equations to rewrite rules: nipkow parents: 3860 diff changeset	177	by (Simp_tac 1);
ee8ebb74ec00 Various new lemmas. Improved conversion of equations to rewrite rules: nipkow parents: 3860 diff changeset	178	qed "append1_eq_conv";
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	179
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	180	Goal "(ys @ xs = zs @ xs) = (ys=zs)";
3896 ee8ebb74ec00 Various new lemmas. Improved conversion of equations to rewrite rules: nipkow parents: 3860 diff changeset	181	by (Simp_tac 1);
ee8ebb74ec00 Various new lemmas. Improved conversion of equations to rewrite rules: nipkow parents: 3860 diff changeset	182	qed "append_same_eq";
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	183
3896 ee8ebb74ec00 Various new lemmas. Improved conversion of equations to rewrite rules: nipkow parents: 3860 diff changeset	184	AddSIs
ee8ebb74ec00 Various new lemmas. Improved conversion of equations to rewrite rules: nipkow parents: 3860 diff changeset	185	[same_append_eq RS iffD2, append1_eq_conv RS iffD2, append_same_eq RS iffD2];
ee8ebb74ec00 Various new lemmas. Improved conversion of equations to rewrite rules: nipkow parents: 3860 diff changeset	186	AddSDs
ee8ebb74ec00 Various new lemmas. Improved conversion of equations to rewrite rules: nipkow parents: 3860 diff changeset	187	[same_append_eq RS iffD1, append1_eq_conv RS iffD1, append_same_eq RS iffD1];
3571 f1c8fa0f0bf9 List.ML: added lemmas by Stefan Merz. nipkow parents: 3468 diff changeset	188
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	189	Goal "(xs @ ys = ys) = (xs=[])";
5132 24f992a25adc isatool expandshort; wenzelm parents: 5129 diff changeset	190	by (cut_inst_tac [("zs","[]")] append_same_eq 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	191	by Auto_tac;
4647 42af8ae6e2c1 Added some lemmas. nipkow parents: 4643 diff changeset	192	qed "append_self_conv2";
42af8ae6e2c1 Added some lemmas. nipkow parents: 4643 diff changeset	193
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	194	Goal "(ys = xs @ ys) = (xs=[])";
5132 24f992a25adc isatool expandshort; wenzelm parents: 5129 diff changeset	195	by (simp_tac (simpset() addsimps
4647 42af8ae6e2c1 Added some lemmas. nipkow parents: 4643 diff changeset	196	[simplify (simpset()) (read_instantiate[("ys","[]")]append_same_eq)]) 1);
5132 24f992a25adc isatool expandshort; wenzelm parents: 5129 diff changeset	197	by (Blast_tac 1);
4647 42af8ae6e2c1 Added some lemmas. nipkow parents: 4643 diff changeset	198	qed "self_append_conv2";
42af8ae6e2c1 Added some lemmas. nipkow parents: 4643 diff changeset	199	AddIffs [append_self_conv2,self_append_conv2];
42af8ae6e2c1 Added some lemmas. nipkow parents: 4643 diff changeset	200
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	201	Goal "xs ~= [] --> hd xs # tl xs = xs";
3457 a8ab7c64817c Ran expandshort paulson parents: 3383 diff changeset	202	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	203	by Auto_tac;
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	204	qed_spec_mp "hd_Cons_tl";
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	205	Addsimps [hd_Cons_tl];
923 ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	206
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	207	Goal "hd(xs@ys) = (if xs=[] then hd ys else hd xs)";
3040 7d48671753da Introduced a generic "induct_tac" which picks up the right induction scheme nipkow parents: 3011 diff changeset	208	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	209	by Auto_tac;
1327 6c29cfab679c added new arithmetic lemmas and the functions take and drop. nipkow parents: 1301 diff changeset	210	qed "hd_append";
923 ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	211
5043 3fdc881e8ff9 goal -> Goal nipkow parents: 4935 diff changeset	212	Goal "xs ~= [] ==> hd(xs @ ys) = hd xs";
4089 96fba19bcbe2 isatool fixclasimp; wenzelm parents: 4069 diff changeset	213	by (asm_simp_tac (simpset() addsimps [hd_append]
5183 89f162de39cf Adapted to new datatype package. berghofe parents: 5162 diff changeset	214	addsplits [list.split]) 1);
3571 f1c8fa0f0bf9 List.ML: added lemmas by Stefan Merz. nipkow parents: 3468 diff changeset	215	qed "hd_append2";
f1c8fa0f0bf9 List.ML: added lemmas by Stefan Merz. nipkow parents: 3468 diff changeset	216	Addsimps [hd_append2];
f1c8fa0f0bf9 List.ML: added lemmas by Stefan Merz. nipkow parents: 3468 diff changeset	217
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	218	Goal "tl(xs@ys) = (case xs of [] => tl(ys) \| z#zs => zs@ys)";
5183 89f162de39cf Adapted to new datatype package. berghofe parents: 5162 diff changeset	219	by (simp_tac (simpset() addsplits [list.split]) 1);
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	220	qed "tl_append";
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	221
5043 3fdc881e8ff9 goal -> Goal nipkow parents: 4935 diff changeset	222	Goal "xs ~= [] ==> tl(xs @ ys) = (tl xs) @ ys";
4089 96fba19bcbe2 isatool fixclasimp; wenzelm parents: 4069 diff changeset	223	by (asm_simp_tac (simpset() addsimps [tl_append]
5183 89f162de39cf Adapted to new datatype package. berghofe parents: 5162 diff changeset	224	addsplits [list.split]) 1);
3571 f1c8fa0f0bf9 List.ML: added lemmas by Stefan Merz. nipkow parents: 3468 diff changeset	225	qed "tl_append2";
f1c8fa0f0bf9 List.ML: added lemmas by Stefan Merz. nipkow parents: 3468 diff changeset	226	Addsimps [tl_append2];
f1c8fa0f0bf9 List.ML: added lemmas by Stefan Merz. nipkow parents: 3468 diff changeset	227
5272 95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	228	(* trivial rules for solving @-equations automatically *)
95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	229
95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	230	Goal "xs = ys ==> xs = [] @ ys";
5318 72bf8039b53f expandshort paulson parents: 5316 diff changeset	231	by (Asm_simp_tac 1);
5272 95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	232	qed "eq_Nil_appendI";
95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	233
95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	234	Goal "[\| x#xs1 = ys; xs = xs1 @ zs \|] ==> x#xs = ys@zs";
5318 72bf8039b53f expandshort paulson parents: 5316 diff changeset	235	by (dtac sym 1);
72bf8039b53f expandshort paulson parents: 5316 diff changeset	236	by (Asm_simp_tac 1);
5272 95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	237	qed "Cons_eq_appendI";
95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	238
95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	239	Goal "[\| xs@xs1 = zs; ys = xs1 @ us \|] ==> xs@ys = zs@us";
5318 72bf8039b53f expandshort paulson parents: 5316 diff changeset	240	by (dtac sym 1);
72bf8039b53f expandshort paulson parents: 5316 diff changeset	241	by (Asm_simp_tac 1);
5272 95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	242	qed "append_eq_appendI";
95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	243
4830 bd73675adbed Added a few lemmas. nipkow parents: 4686 diff changeset	244
5427 26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	245	(***
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	246	Simplification procedure for all list equalities.
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	247	Currently only tries to rearranges @ to see if
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	248	- both lists end in a singleton list,
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	249	- or both lists end in the same list.
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	250	***)
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	251	local
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	252
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	253	val list_eq_pattern =
6394 3d9fd50fcc43 Theory.sign_of; wenzelm parents: 6306 diff changeset	254	Thm.read_cterm (Theory.sign_of List.thy) ("(xs::'a list) = ys",HOLogic.boolT);
5427 26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	255
7224 e41e64476f9b 'a list: Nil, Cons; wenzelm parents: 7032 diff changeset	256	fun last (cons as Const("List.list.Cons",_) $ _ $ xs) =
e41e64476f9b 'a list: Nil, Cons; wenzelm parents: 7032 diff changeset	257	(case xs of Const("List.list.Nil",_) => cons \| _ => last xs)
5427 26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	258	\| last (Const("List.op @",_) $ _ $ ys) = last ys
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	259	\| last t = t;
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	260
7224 e41e64476f9b 'a list: Nil, Cons; wenzelm parents: 7032 diff changeset	261	fun list1 (Const("List.list.Cons",_) $ _ $ Const("List.list.Nil",_)) = true
5427 26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	262	\| list1 _ = false;
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	263
7224 e41e64476f9b 'a list: Nil, Cons; wenzelm parents: 7032 diff changeset	264	fun butlast ((cons as Const("List.list.Cons",_) $ x) $ xs) =
e41e64476f9b 'a list: Nil, Cons; wenzelm parents: 7032 diff changeset	265	(case xs of Const("List.list.Nil",_) => xs \| _ => cons $ butlast xs)
5427 26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	266	\| butlast ((app as Const("List.op @",_) $ xs) $ ys) = app $ butlast ys
7224 e41e64476f9b 'a list: Nil, Cons; wenzelm parents: 7032 diff changeset	267	\| butlast xs = Const("List.list.Nil",fastype_of xs);
5427 26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	268
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	269	val rearr_tac =
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	270	simp_tac (HOL_basic_ss addsimps [append_assoc,append_Nil,append_Cons]);
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	271
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	272	fun list_eq sg _ (F as (eq as Const(_,eqT)) $ lhs $ rhs) =
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	273	let
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	274	val lastl = last lhs and lastr = last rhs
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	275	fun rearr conv =
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	276	let val lhs1 = butlast lhs and rhs1 = butlast rhs
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	277	val Type(_,listT::_) = eqT
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	278	val appT = [listT,listT] ---> listT
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	279	val app = Const("List.op @",appT)
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	280	val F2 = eq $ (app$lhs1$lastl) $ (app$rhs1$lastr)
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	281	val ct = cterm_of sg (HOLogic.mk_Trueprop(HOLogic.mk_eq(F,F2)))
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	282	val thm = prove_goalw_cterm [] ct (K [rearr_tac 1])
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	283	handle ERROR =>
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	284	error("The error(s) above occurred while trying to prove " ^
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	285	string_of_cterm ct)
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	286	in Some((conv RS (thm RS trans)) RS eq_reflection) end
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	287
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	288	in if list1 lastl andalso list1 lastr
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	289	then rearr append1_eq_conv
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	290	else
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	291	if lastl aconv lastr
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	292	then rearr append_same_eq
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	293	else None
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	294	end;
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	295	in
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	296	val list_eq_simproc = mk_simproc "list_eq" [list_eq_pattern] list_eq;
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	297	end;
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	298
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	299	Addsimprocs [list_eq_simproc];
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	300
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	301
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	302	( map )
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	303
3467 a0797ba03dfe More concat lemmas. nipkow parents: 3465 diff changeset	304	section "map";
a0797ba03dfe More concat lemmas. nipkow parents: 3465 diff changeset	305
5278 a903b66822e2 even more tidying of Goal commands paulson parents: 5272 diff changeset	306	Goal "(!x. x : set xs --> f x = g x) --> map f xs = map g xs";
3457 a8ab7c64817c Ran expandshort paulson parents: 3383 diff changeset	307	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	308	by Auto_tac;
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	309	bind_thm("map_ext", impI RS (allI RS (result() RS mp)));
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	310
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	311	Goal "map (%x. x) = (%xs. xs)";
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	312	by (rtac ext 1);
3040 7d48671753da Introduced a generic "induct_tac" which picks up the right induction scheme nipkow parents: 3011 diff changeset	313	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	314	by Auto_tac;
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	315	qed "map_ident";
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	316	Addsimps[map_ident];
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	317
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	318	Goal "map f (xs@ys) = map f xs @ map f ys";
3040 7d48671753da Introduced a generic "induct_tac" which picks up the right induction scheme nipkow parents: 3011 diff changeset	319	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	320	by Auto_tac;
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	321	qed "map_append";
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	322	Addsimps[map_append];
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	323
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	324	Goalw [o_def] "map (f o g) xs = map f (map g xs)";
3040 7d48671753da Introduced a generic "induct_tac" which picks up the right induction scheme nipkow parents: 3011 diff changeset	325	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	326	by Auto_tac;
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	327	qed "map_compose";
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	328	Addsimps[map_compose];
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	329
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	330	Goal "rev(map f xs) = map f (rev xs)";
3040 7d48671753da Introduced a generic "induct_tac" which picks up the right induction scheme nipkow parents: 3011 diff changeset	331	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	332	by Auto_tac;
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	333	qed "rev_map";
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	334
3589 244daa75f890 Added function `replicate' and lemmas map_cong and set_replicate. nipkow parents: 3586 diff changeset	335	(* a congruence rule for map: *)
6451 bc943acc5fda tidied paulson parents: 6433 diff changeset	336	Goal "xs=ys ==> (!x. x : set ys --> f x = g x) --> map f xs = map g ys";
4423 a129b817b58a expandshort; wenzelm parents: 4132 diff changeset	337	by (hyp_subst_tac 1);
a129b817b58a expandshort; wenzelm parents: 4132 diff changeset	338	by (induct_tac "ys" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	339	by Auto_tac;
6451 bc943acc5fda tidied paulson parents: 6433 diff changeset	340	bind_thm("map_cong", impI RSN (2,allI RSN (2, result() RS mp)));
3589 244daa75f890 Added function `replicate' and lemmas map_cong and set_replicate. nipkow parents: 3586 diff changeset	341
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	342	Goal "(map f xs = []) = (xs = [])";
8009 29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	343	by (exhaust_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	344	by Auto_tac;
3860 a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	345	qed "map_is_Nil_conv";
a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	346	AddIffs [map_is_Nil_conv];
a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	347
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	348	Goal "([] = map f xs) = (xs = [])";
8009 29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	349	by (exhaust_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	350	by Auto_tac;
3860 a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	351	qed "Nil_is_map_conv";
a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	352	AddIffs [Nil_is_map_conv];
a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	353
8009 29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	354	Goal "(map f xs = y#ys) = (? x xs'. xs = x#xs' & f x = y & map f xs' = ys)";
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	355	by (exhaust_tac "xs" 1);
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	356	by (ALLGOALS Asm_simp_tac);
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	357	qed "map_eq_Cons";
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	358
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	359	Goal "!xs. map f xs = map f ys --> (!x y. f x = f y --> x=y) --> xs=ys";
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	360	by (induct_tac "ys" 1);
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	361	by (Asm_simp_tac 1);
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	362	by (fast_tac (claset() addss (simpset() addsimps [map_eq_Cons])) 1);
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	363	qed_spec_mp "map_injective";
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	364
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	365	Goal "inj f ==> inj (map f)";
8064 357652a08ee0 expandshort paulson parents: 8009 diff changeset	366	by (blast_tac (claset() addDs [map_injective,injD] addIs [injI]) 1);
8009 29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	367	qed "inj_mapI";
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	368
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	369	Goalw [inj_on_def] "inj (map f) ==> inj f";
8064 357652a08ee0 expandshort paulson parents: 8009 diff changeset	370	by (Clarify_tac 1);
357652a08ee0 expandshort paulson parents: 8009 diff changeset	371	by (eres_inst_tac [("x","[x]")] ballE 1);
357652a08ee0 expandshort paulson parents: 8009 diff changeset	372	by (eres_inst_tac [("x","[y]")] ballE 1);
357652a08ee0 expandshort paulson parents: 8009 diff changeset	373	by (Asm_full_simp_tac 1);
357652a08ee0 expandshort paulson parents: 8009 diff changeset	374	by (Blast_tac 1);
357652a08ee0 expandshort paulson parents: 8009 diff changeset	375	by (Blast_tac 1);
8009 29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	376	qed "inj_mapD";
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	377
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	378	Goal "inj (map f) = inj f";
8064 357652a08ee0 expandshort paulson parents: 8009 diff changeset	379	by (blast_tac (claset() addDs [inj_mapD] addIs [inj_mapI]) 1);
8009 29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	380	qed "inj_map";
3860 a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	381
1169 5873833cf37f Added function rev and its properties length_rev, etc. lcp parents: 995 diff changeset	382	( rev )
5873833cf37f Added function rev and its properties length_rev, etc. lcp parents: 995 diff changeset	383
3467 a0797ba03dfe More concat lemmas. nipkow parents: 3465 diff changeset	384	section "rev";
a0797ba03dfe More concat lemmas. nipkow parents: 3465 diff changeset	385
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	386	Goal "rev(xs@ys) = rev(ys) @ rev(xs)";
3040 7d48671753da Introduced a generic "induct_tac" which picks up the right induction scheme nipkow parents: 3011 diff changeset	387	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	388	by Auto_tac;
1169 5873833cf37f Added function rev and its properties length_rev, etc. lcp parents: 995 diff changeset	389	qed "rev_append";
2512 0231e4f467f2 Got rid of Alls in List. nipkow parents: 1985 diff changeset	390	Addsimps[rev_append];
1169 5873833cf37f Added function rev and its properties length_rev, etc. lcp parents: 995 diff changeset	391
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	392	Goal "rev(rev l) = l";
3040 7d48671753da Introduced a generic "induct_tac" which picks up the right induction scheme nipkow parents: 3011 diff changeset	393	by (induct_tac "l" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	394	by Auto_tac;
1169 5873833cf37f Added function rev and its properties length_rev, etc. lcp parents: 995 diff changeset	395	qed "rev_rev_ident";
2512 0231e4f467f2 Got rid of Alls in List. nipkow parents: 1985 diff changeset	396	Addsimps[rev_rev_ident];
1169 5873833cf37f Added function rev and its properties length_rev, etc. lcp parents: 995 diff changeset	397
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	398	Goal "(rev xs = []) = (xs = [])";
4423 a129b817b58a expandshort; wenzelm parents: 4132 diff changeset	399	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	400	by Auto_tac;
3860 a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	401	qed "rev_is_Nil_conv";
a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	402	AddIffs [rev_is_Nil_conv];
a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	403
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	404	Goal "([] = rev xs) = (xs = [])";
4423 a129b817b58a expandshort; wenzelm parents: 4132 diff changeset	405	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	406	by Auto_tac;
3860 a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	407	qed "Nil_is_rev_conv";
a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	408	AddIffs [Nil_is_rev_conv];
a29ab43f7174 More lemmas, esp. ~Bex and ~Ball conversions. nipkow parents: 3842 diff changeset	409
6820 41d9b7bbf968 rev=rev lemma. nipkow parents: 6813 diff changeset	410	Goal "!ys. (rev xs = rev ys) = (xs = ys)";
6831 799859f2e657 expandshort paulson parents: 6820 diff changeset	411	by (induct_tac "xs" 1);
6820 41d9b7bbf968 rev=rev lemma. nipkow parents: 6813 diff changeset	412	by (Force_tac 1);
6831 799859f2e657 expandshort paulson parents: 6820 diff changeset	413	by (rtac allI 1);
799859f2e657 expandshort paulson parents: 6820 diff changeset	414	by (exhaust_tac "ys" 1);
6820 41d9b7bbf968 rev=rev lemma. nipkow parents: 6813 diff changeset	415	by (Asm_simp_tac 1);
41d9b7bbf968 rev=rev lemma. nipkow parents: 6813 diff changeset	416	by (Force_tac 1);
41d9b7bbf968 rev=rev lemma. nipkow parents: 6813 diff changeset	417	qed_spec_mp "rev_is_rev_conv";
41d9b7bbf968 rev=rev lemma. nipkow parents: 6813 diff changeset	418	AddIffs [rev_is_rev_conv];
41d9b7bbf968 rev=rev lemma. nipkow parents: 6813 diff changeset	419
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	420	val prems = Goal "[\| P []; !!x xs. P xs ==> P(xs@[x]) \|] ==> P xs";
5132 24f992a25adc isatool expandshort; wenzelm parents: 5129 diff changeset	421	by (stac (rev_rev_ident RS sym) 1);
6162 484adda70b65 expandshort paulson parents: 6141 diff changeset	422	by (res_inst_tac [("list", "rev xs")] list.induct 1);
5132 24f992a25adc isatool expandshort; wenzelm parents: 5129 diff changeset	423	by (ALLGOALS Simp_tac);
24f992a25adc isatool expandshort; wenzelm parents: 5129 diff changeset	424	by (resolve_tac prems 1);
24f992a25adc isatool expandshort; wenzelm parents: 5129 diff changeset	425	by (eresolve_tac prems 1);
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	426	qed "rev_induct";
1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	427
5272 95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	428	fun rev_induct_tac xs = res_inst_tac [("xs",xs)] rev_induct;
95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	429
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	430	Goal "(xs = [] --> P) --> (!ys y. xs = ys@[y] --> P) --> P";
5132 24f992a25adc isatool expandshort; wenzelm parents: 5129 diff changeset	431	by (res_inst_tac [("xs","xs")] rev_induct 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	432	by Auto_tac;
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	433	bind_thm ("rev_exhaust",
1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	434	impI RSN (2,allI RSN (2,allI RSN (2,impI RS (result() RS mp RS mp)))));
1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	435
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	436
3465 e85c24717cad set_of_list -> set nipkow parents: 3457 diff changeset	437	( set )
1812 debfc40b7756 Addition of setOfList paulson parents: 1760 diff changeset	438
3467 a0797ba03dfe More concat lemmas. nipkow parents: 3465 diff changeset	439	section "set";
a0797ba03dfe More concat lemmas. nipkow parents: 3465 diff changeset	440
7032 d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: 7028 diff changeset	441	Goal "finite (set xs)";
d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: 7028 diff changeset	442	by (induct_tac "xs" 1);
d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: 7028 diff changeset	443	by Auto_tac;
d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: 7028 diff changeset	444	qed "finite_set";
d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: 7028 diff changeset	445	AddIffs [finite_set];
5296 bdef7d349d27 added length_Suc_conv, finite_set oheimb parents: 5283 diff changeset	446
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	447	Goal "set (xs@ys) = (set xs Un set ys)";
3040 7d48671753da Introduced a generic "induct_tac" which picks up the right induction scheme nipkow parents: 3011 diff changeset	448	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	449	by Auto_tac;
3647 a64c8fbcd98f Renamed theorems of the form set_of_list_XXX to set_XXX paulson parents: 3589 diff changeset	450	qed "set_append";
a64c8fbcd98f Renamed theorems of the form set_of_list_XXX to set_XXX paulson parents: 3589 diff changeset	451	Addsimps[set_append];
1812 debfc40b7756 Addition of setOfList paulson parents: 1760 diff changeset	452
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	453	Goal "set l <= set (x#l)";
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	454	by Auto_tac;
3647 a64c8fbcd98f Renamed theorems of the form set_of_list_XXX to set_XXX paulson parents: 3589 diff changeset	455	qed "set_subset_Cons";
1936 979e8b4f5fa5 Proved set_of_list_subset_Cons paulson parents: 1908 diff changeset	456
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	457	Goal "(set xs = {}) = (xs = [])";
3457 a8ab7c64817c Ran expandshort paulson parents: 3383 diff changeset	458	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	459	by Auto_tac;
3647 a64c8fbcd98f Renamed theorems of the form set_of_list_XXX to set_XXX paulson parents: 3589 diff changeset	460	qed "set_empty";
a64c8fbcd98f Renamed theorems of the form set_of_list_XXX to set_XXX paulson parents: 3589 diff changeset	461	Addsimps [set_empty];
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	462
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	463	Goal "set(rev xs) = set(xs)";
3457 a8ab7c64817c Ran expandshort paulson parents: 3383 diff changeset	464	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	465	by Auto_tac;
3647 a64c8fbcd98f Renamed theorems of the form set_of_list_XXX to set_XXX paulson parents: 3589 diff changeset	466	qed "set_rev";
a64c8fbcd98f Renamed theorems of the form set_of_list_XXX to set_XXX paulson parents: 3589 diff changeset	467	Addsimps [set_rev];
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	468
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	469	Goal "set(map f xs) = f``(set xs)";
3457 a8ab7c64817c Ran expandshort paulson parents: 3383 diff changeset	470	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	471	by Auto_tac;
3647 a64c8fbcd98f Renamed theorems of the form set_of_list_XXX to set_XXX paulson parents: 3589 diff changeset	472	qed "set_map";
a64c8fbcd98f Renamed theorems of the form set_of_list_XXX to set_XXX paulson parents: 3589 diff changeset	473	Addsimps [set_map];
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	474
6433 228237ec56e5 Added new thms. nipkow parents: 6408 diff changeset	475	Goal "set(filter P xs) = {x. x : set xs & P x}";
6813 bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	476	by (induct_tac "xs" 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	477	by Auto_tac;
6433 228237ec56e5 Added new thms. nipkow parents: 6408 diff changeset	478	qed "set_filter";
228237ec56e5 Added new thms. nipkow parents: 6408 diff changeset	479	Addsimps [set_filter];
8009 29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	480
6433 228237ec56e5 Added new thms. nipkow parents: 6408 diff changeset	481	Goal "set[i..j(] = {k. i <= k & k < j}";
6813 bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	482	by (induct_tac "j" 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	483	by Auto_tac;
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	484	by (arith_tac 1);
6433 228237ec56e5 Added new thms. nipkow parents: 6408 diff changeset	485	qed "set_upt";
228237ec56e5 Added new thms. nipkow parents: 6408 diff changeset	486	Addsimps [set_upt];
228237ec56e5 Added new thms. nipkow parents: 6408 diff changeset	487
228237ec56e5 Added new thms. nipkow parents: 6408 diff changeset	488	Goal "!i < size xs. set(xs[i := x]) <= insert x (set xs)";
6813 bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	489	by (induct_tac "xs" 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	490	by (Simp_tac 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	491	by (asm_simp_tac (simpset() addsplits [nat.split]) 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	492	by (Blast_tac 1);
6433 228237ec56e5 Added new thms. nipkow parents: 6408 diff changeset	493	qed_spec_mp "set_list_update_subset";
4605 579e0ef2df6b Added `remdups' nipkow parents: 4502 diff changeset	494
5272 95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	495	Goal "(x : set xs) = (? ys zs. xs = ys@x#zs)";
5318 72bf8039b53f expandshort paulson parents: 5316 diff changeset	496	by (induct_tac "xs" 1);
72bf8039b53f expandshort paulson parents: 5316 diff changeset	497	by (Simp_tac 1);
72bf8039b53f expandshort paulson parents: 5316 diff changeset	498	by (Asm_simp_tac 1);
72bf8039b53f expandshort paulson parents: 5316 diff changeset	499	by (rtac iffI 1);
72bf8039b53f expandshort paulson parents: 5316 diff changeset	500	by (blast_tac (claset() addIs [eq_Nil_appendI,Cons_eq_appendI]) 1);
72bf8039b53f expandshort paulson parents: 5316 diff changeset	501	by (REPEAT(etac exE 1));
72bf8039b53f expandshort paulson parents: 5316 diff changeset	502	by (exhaust_tac "ys" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	503	by Auto_tac;
5272 95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	504	qed "in_set_conv_decomp";
95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	505
8009 29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	506
5272 95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	507	(* eliminate `lists' in favour of `set' *)
95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	508
95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	509	Goal "(xs : lists A) = (!x : set xs. x : A)";
5318 72bf8039b53f expandshort paulson parents: 5316 diff changeset	510	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	511	by Auto_tac;
5272 95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	512	qed "in_lists_conv_set";
95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	513
95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	514	bind_thm("in_listsD",in_lists_conv_set RS iffD1);
95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	515	AddSDs [in_listsD];
95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	516	bind_thm("in_listsI",in_lists_conv_set RS iffD2);
95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	517	AddSIs [in_listsI];
1812 debfc40b7756 Addition of setOfList paulson parents: 1760 diff changeset	518
5518 654ead0ba4f7 re-added mem and list_all oheimb parents: 5448 diff changeset	519	( mem )
654ead0ba4f7 re-added mem and list_all oheimb parents: 5448 diff changeset	520
654ead0ba4f7 re-added mem and list_all oheimb parents: 5448 diff changeset	521	section "mem";
654ead0ba4f7 re-added mem and list_all oheimb parents: 5448 diff changeset	522
654ead0ba4f7 re-added mem and list_all oheimb parents: 5448 diff changeset	523	Goal "(x mem xs) = (x: set xs)";
654ead0ba4f7 re-added mem and list_all oheimb parents: 5448 diff changeset	524	by (induct_tac "xs" 1);
654ead0ba4f7 re-added mem and list_all oheimb parents: 5448 diff changeset	525	by Auto_tac;
654ead0ba4f7 re-added mem and list_all oheimb parents: 5448 diff changeset	526	qed "set_mem_eq";
654ead0ba4f7 re-added mem and list_all oheimb parents: 5448 diff changeset	527
654ead0ba4f7 re-added mem and list_all oheimb parents: 5448 diff changeset	528
923 ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	529	( list_all )
ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	530
3467 a0797ba03dfe More concat lemmas. nipkow parents: 3465 diff changeset	531	section "list_all";
a0797ba03dfe More concat lemmas. nipkow parents: 3465 diff changeset	532
5518 654ead0ba4f7 re-added mem and list_all oheimb parents: 5448 diff changeset	533	Goal "list_all P xs = (!x:set xs. P x)";
654ead0ba4f7 re-added mem and list_all oheimb parents: 5448 diff changeset	534	by (induct_tac "xs" 1);
654ead0ba4f7 re-added mem and list_all oheimb parents: 5448 diff changeset	535	by Auto_tac;
654ead0ba4f7 re-added mem and list_all oheimb parents: 5448 diff changeset	536	qed "list_all_conv";
654ead0ba4f7 re-added mem and list_all oheimb parents: 5448 diff changeset	537
5443 e2459d18ff47 changed constants mem and list_all to mere translations oheimb parents: 5427 diff changeset	538	Goal "list_all P (xs@ys) = (list_all P xs & list_all P ys)";
3040 7d48671753da Introduced a generic "induct_tac" which picks up the right induction scheme nipkow parents: 3011 diff changeset	539	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	540	by Auto_tac;
2512 0231e4f467f2 Got rid of Alls in List. nipkow parents: 1985 diff changeset	541	qed "list_all_append";
0231e4f467f2 Got rid of Alls in List. nipkow parents: 1985 diff changeset	542	Addsimps [list_all_append];
923 ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	543
ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	544
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	545	( filter )
923 ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	546
3467 a0797ba03dfe More concat lemmas. nipkow parents: 3465 diff changeset	547	section "filter";
a0797ba03dfe More concat lemmas. nipkow parents: 3465 diff changeset	548
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	549	Goal "filter P (xs@ys) = filter P xs @ filter P ys";
3457 a8ab7c64817c Ran expandshort paulson parents: 3383 diff changeset	550	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	551	by Auto_tac;
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	552	qed "filter_append";
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	553	Addsimps [filter_append];
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	554
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	555	Goal "filter (%x. True) xs = xs";
4605 579e0ef2df6b Added `remdups' nipkow parents: 4502 diff changeset	556	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	557	by Auto_tac;
4605 579e0ef2df6b Added `remdups' nipkow parents: 4502 diff changeset	558	qed "filter_True";
579e0ef2df6b Added `remdups' nipkow parents: 4502 diff changeset	559	Addsimps [filter_True];
579e0ef2df6b Added `remdups' nipkow parents: 4502 diff changeset	560
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	561	Goal "filter (%x. False) xs = []";
4605 579e0ef2df6b Added `remdups' nipkow parents: 4502 diff changeset	562	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	563	by Auto_tac;
4605 579e0ef2df6b Added `remdups' nipkow parents: 4502 diff changeset	564	qed "filter_False";
579e0ef2df6b Added `remdups' nipkow parents: 4502 diff changeset	565	Addsimps [filter_False];
579e0ef2df6b Added `remdups' nipkow parents: 4502 diff changeset	566
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	567	Goal "length (filter P xs) <= length xs";
3457 a8ab7c64817c Ran expandshort paulson parents: 3383 diff changeset	568	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	569	by Auto_tac;
4605 579e0ef2df6b Added `remdups' nipkow parents: 4502 diff changeset	570	qed "length_filter";
5443 e2459d18ff47 changed constants mem and list_all to mere translations oheimb parents: 5427 diff changeset	571	Addsimps[length_filter];
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	572
5443 e2459d18ff47 changed constants mem and list_all to mere translations oheimb parents: 5427 diff changeset	573	Goal "set (filter P xs) <= set xs";
e2459d18ff47 changed constants mem and list_all to mere translations oheimb parents: 5427 diff changeset	574	by Auto_tac;
e2459d18ff47 changed constants mem and list_all to mere translations oheimb parents: 5427 diff changeset	575	qed "filter_is_subset";
e2459d18ff47 changed constants mem and list_all to mere translations oheimb parents: 5427 diff changeset	576	Addsimps [filter_is_subset];
e2459d18ff47 changed constants mem and list_all to mere translations oheimb parents: 5427 diff changeset	577
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	578
3467 a0797ba03dfe More concat lemmas. nipkow parents: 3465 diff changeset	579	section "concat";
a0797ba03dfe More concat lemmas. nipkow parents: 3465 diff changeset	580
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	581	Goal "concat(xs@ys) = concat(xs)@concat(ys)";
3040 7d48671753da Introduced a generic "induct_tac" which picks up the right induction scheme nipkow parents: 3011 diff changeset	582	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	583	by Auto_tac;
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	584	qed"concat_append";
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	585	Addsimps [concat_append];
2512 0231e4f467f2 Got rid of Alls in List. nipkow parents: 1985 diff changeset	586
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	587	Goal "(concat xss = []) = (!xs:set xss. xs=[])";
4423 a129b817b58a expandshort; wenzelm parents: 4132 diff changeset	588	by (induct_tac "xss" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	589	by Auto_tac;
3896 ee8ebb74ec00 Various new lemmas. Improved conversion of equations to rewrite rules: nipkow parents: 3860 diff changeset	590	qed "concat_eq_Nil_conv";
ee8ebb74ec00 Various new lemmas. Improved conversion of equations to rewrite rules: nipkow parents: 3860 diff changeset	591	AddIffs [concat_eq_Nil_conv];
ee8ebb74ec00 Various new lemmas. Improved conversion of equations to rewrite rules: nipkow parents: 3860 diff changeset	592
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	593	Goal "([] = concat xss) = (!xs:set xss. xs=[])";
4423 a129b817b58a expandshort; wenzelm parents: 4132 diff changeset	594	by (induct_tac "xss" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	595	by Auto_tac;
3896 ee8ebb74ec00 Various new lemmas. Improved conversion of equations to rewrite rules: nipkow parents: 3860 diff changeset	596	qed "Nil_eq_concat_conv";
ee8ebb74ec00 Various new lemmas. Improved conversion of equations to rewrite rules: nipkow parents: 3860 diff changeset	597	AddIffs [Nil_eq_concat_conv];
ee8ebb74ec00 Various new lemmas. Improved conversion of equations to rewrite rules: nipkow parents: 3860 diff changeset	598
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	599	Goal "set(concat xs) = Union(set `` set xs)";
3467 a0797ba03dfe More concat lemmas. nipkow parents: 3465 diff changeset	600	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	601	by Auto_tac;
3647 a64c8fbcd98f Renamed theorems of the form set_of_list_XXX to set_XXX paulson parents: 3589 diff changeset	602	qed"set_concat";
a64c8fbcd98f Renamed theorems of the form set_of_list_XXX to set_XXX paulson parents: 3589 diff changeset	603	Addsimps [set_concat];
3467 a0797ba03dfe More concat lemmas. nipkow parents: 3465 diff changeset	604
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	605	Goal "map f (concat xs) = concat (map (map f) xs)";
3467 a0797ba03dfe More concat lemmas. nipkow parents: 3465 diff changeset	606	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	607	by Auto_tac;
3467 a0797ba03dfe More concat lemmas. nipkow parents: 3465 diff changeset	608	qed "map_concat";
a0797ba03dfe More concat lemmas. nipkow parents: 3465 diff changeset	609
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	610	Goal "filter p (concat xs) = concat (map (filter p) xs)";
3467 a0797ba03dfe More concat lemmas. nipkow parents: 3465 diff changeset	611	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	612	by Auto_tac;
3467 a0797ba03dfe More concat lemmas. nipkow parents: 3465 diff changeset	613	qed"filter_concat";
a0797ba03dfe More concat lemmas. nipkow parents: 3465 diff changeset	614
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	615	Goal "rev(concat xs) = concat (map rev (rev xs))";
3467 a0797ba03dfe More concat lemmas. nipkow parents: 3465 diff changeset	616	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	617	by Auto_tac;
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	618	qed "rev_concat";
923 ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	619
ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	620	( nth )
ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	621
3467 a0797ba03dfe More concat lemmas. nipkow parents: 3465 diff changeset	622	section "nth";
a0797ba03dfe More concat lemmas. nipkow parents: 3465 diff changeset	623
6408 5b443d6331ed new definition for nth. pusch parents: 6394 diff changeset	624	Goal "(x#xs)!0 = x";
5b443d6331ed new definition for nth. pusch parents: 6394 diff changeset	625	by Auto_tac;
5b443d6331ed new definition for nth. pusch parents: 6394 diff changeset	626	qed "nth_Cons_0";
5b443d6331ed new definition for nth. pusch parents: 6394 diff changeset	627	Addsimps [nth_Cons_0];
5644 85fd64148873 Nat: added zero_neq_conv nipkow parents: 5641 diff changeset	628
6408 5b443d6331ed new definition for nth. pusch parents: 6394 diff changeset	629	Goal "(x#xs)!(Suc n) = xs!n";
5b443d6331ed new definition for nth. pusch parents: 6394 diff changeset	630	by Auto_tac;
5b443d6331ed new definition for nth. pusch parents: 6394 diff changeset	631	qed "nth_Cons_Suc";
5b443d6331ed new definition for nth. pusch parents: 6394 diff changeset	632	Addsimps [nth_Cons_Suc];
5b443d6331ed new definition for nth. pusch parents: 6394 diff changeset	633
5b443d6331ed new definition for nth. pusch parents: 6394 diff changeset	634	Delsimps (thms "nth.simps");
5b443d6331ed new definition for nth. pusch parents: 6394 diff changeset	635
5b443d6331ed new definition for nth. pusch parents: 6394 diff changeset	636	Goal "!n. (xs@ys)!n = (if n < length xs then xs!n else ys!(n - length xs))";
5b443d6331ed new definition for nth. pusch parents: 6394 diff changeset	637	by (induct_tac "xs" 1);
3457 a8ab7c64817c Ran expandshort paulson parents: 3383 diff changeset	638	by (Asm_simp_tac 1);
a8ab7c64817c Ran expandshort paulson parents: 3383 diff changeset	639	by (rtac allI 1);
6408 5b443d6331ed new definition for nth. pusch parents: 6394 diff changeset	640	by (exhaust_tac "n" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	641	by Auto_tac;
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	642	qed_spec_mp "nth_append";
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	643
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	644	Goal "!n. n < length xs --> (map f xs)!n = f(xs!n)";
3040 7d48671753da Introduced a generic "induct_tac" which picks up the right induction scheme nipkow parents: 3011 diff changeset	645	by (induct_tac "xs" 1);
8118 746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	646	by (Asm_full_simp_tac 1);
1301 42782316d510 Added various thms and tactics. nipkow parents: 1264 diff changeset	647	by (rtac allI 1);
5183 89f162de39cf Adapted to new datatype package. berghofe parents: 5162 diff changeset	648	by (induct_tac "n" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	649	by Auto_tac;
1485 240cc98b94a7 Added qed_spec_mp to avoid renaming of bound vars in 'th RS spec' nipkow parents: 1465 diff changeset	650	qed_spec_mp "nth_map";
1301 42782316d510 Added various thms and tactics. nipkow parents: 1264 diff changeset	651	Addsimps [nth_map];
42782316d510 Added various thms and tactics. nipkow parents: 1264 diff changeset	652
8118 746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	653	Goal "set xs = {xs!i \|i. i < length xs}";
3040 7d48671753da Introduced a generic "induct_tac" which picks up the right induction scheme nipkow parents: 3011 diff changeset	654	by (induct_tac "xs" 1);
8118 746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	655	by (Simp_tac 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	656	by(Asm_simp_tac 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	657	by(Safe_tac);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	658	by(res_inst_tac [("x","0")] exI 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	659	by (Simp_tac 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	660	by(res_inst_tac [("x","Suc i")] exI 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	661	by(Asm_simp_tac 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	662	by(exhaust_tac "i" 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	663	by(Asm_full_simp_tac 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	664	by(rename_tac "j" 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	665	by(res_inst_tac [("x","j")] exI 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	666	by(Asm_simp_tac 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	667	qed "set_conv_nth";
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	668
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	669	Goal "n < length xs ==> Ball (set xs) P --> P(xs!n)";
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	670	by (simp_tac (simpset() addsimps [set_conv_nth]) 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	671	by(Blast_tac 1);
5518 654ead0ba4f7 re-added mem and list_all oheimb parents: 5448 diff changeset	672	qed_spec_mp "list_ball_nth";
1301 42782316d510 Added various thms and tactics. nipkow parents: 1264 diff changeset	673
8118 746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	674	Goal "n < length xs ==> xs!n : set xs";
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	675	by (simp_tac (simpset() addsimps [set_conv_nth]) 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	676	by(Blast_tac 1);
1485 240cc98b94a7 Added qed_spec_mp to avoid renaming of bound vars in 'th RS spec' nipkow parents: 1465 diff changeset	677	qed_spec_mp "nth_mem";
1301 42782316d510 Added various thms and tactics. nipkow parents: 1264 diff changeset	678	Addsimps [nth_mem];
42782316d510 Added various thms and tactics. nipkow parents: 1264 diff changeset	679
8009 29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	680	Goal "(!i. i < length xs --> P(xs!i)) --> (!x : set xs. P x)";
8118 746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	681	by (simp_tac (simpset() addsimps [set_conv_nth]) 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	682	by(Blast_tac 1);
8009 29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	683	qed_spec_mp "all_nth_imp_all_set";
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	684
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	685	Goal "(!x : set xs. P x) = (!i. i<length xs --> P (xs ! i))";
8118 746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	686	by (simp_tac (simpset() addsimps [set_conv_nth]) 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	687	by(Blast_tac 1);
8009 29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	688	qed_spec_mp "all_set_conv_all_nth";
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	689
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	690
5077 71043526295f * HOL/List: new function list_update written xs[i:=v] that updates the i-th nipkow parents: 5043 diff changeset	691	( list update )
71043526295f * HOL/List: new function list_update written xs[i:=v] that updates the i-th nipkow parents: 5043 diff changeset	692
71043526295f * HOL/List: new function list_update written xs[i:=v] that updates the i-th nipkow parents: 5043 diff changeset	693	section "list update";
71043526295f * HOL/List: new function list_update written xs[i:=v] that updates the i-th nipkow parents: 5043 diff changeset	694
71043526295f * HOL/List: new function list_update written xs[i:=v] that updates the i-th nipkow parents: 5043 diff changeset	695	Goal "!i. length(xs[i:=x]) = length xs";
71043526295f * HOL/List: new function list_update written xs[i:=v] that updates the i-th nipkow parents: 5043 diff changeset	696	by (induct_tac "xs" 1);
71043526295f * HOL/List: new function list_update written xs[i:=v] that updates the i-th nipkow parents: 5043 diff changeset	697	by (Simp_tac 1);
5183 89f162de39cf Adapted to new datatype package. berghofe parents: 5162 diff changeset	698	by (asm_full_simp_tac (simpset() addsplits [nat.split]) 1);
5077 71043526295f * HOL/List: new function list_update written xs[i:=v] that updates the i-th nipkow parents: 5043 diff changeset	699	qed_spec_mp "length_list_update";
71043526295f * HOL/List: new function list_update written xs[i:=v] that updates the i-th nipkow parents: 5043 diff changeset	700	Addsimps [length_list_update];
71043526295f * HOL/List: new function list_update written xs[i:=v] that updates the i-th nipkow parents: 5043 diff changeset	701
5644 85fd64148873 Nat: added zero_neq_conv nipkow parents: 5641 diff changeset	702	Goal "!i j. i < length xs --> (xs[i:=x])!j = (if i=j then x else xs!j)";
6162 484adda70b65 expandshort paulson parents: 6141 diff changeset	703	by (induct_tac "xs" 1);
484adda70b65 expandshort paulson parents: 6141 diff changeset	704	by (Simp_tac 1);
484adda70b65 expandshort paulson parents: 6141 diff changeset	705	by (auto_tac (claset(), simpset() addsimps [nth_Cons] addsplits [nat.split]));
5644 85fd64148873 Nat: added zero_neq_conv nipkow parents: 5641 diff changeset	706	qed_spec_mp "nth_list_update";
85fd64148873 Nat: added zero_neq_conv nipkow parents: 5641 diff changeset	707
8144 c4b5cbfb90dd optimized xs[i:=x]!j lemmas. nipkow parents: 8118 diff changeset	708	Goal "i < length xs ==> (xs[i:=x])!i = x";
c4b5cbfb90dd optimized xs[i:=x]!j lemmas. nipkow parents: 8118 diff changeset	709	by (asm_simp_tac (simpset() addsimps [nth_list_update]) 1);
c4b5cbfb90dd optimized xs[i:=x]!j lemmas. nipkow parents: 8118 diff changeset	710	qed "nth_list_update_eq";
c4b5cbfb90dd optimized xs[i:=x]!j lemmas. nipkow parents: 8118 diff changeset	711	Addsimps [nth_list_update_eq];
c4b5cbfb90dd optimized xs[i:=x]!j lemmas. nipkow parents: 8118 diff changeset	712
c4b5cbfb90dd optimized xs[i:=x]!j lemmas. nipkow parents: 8118 diff changeset	713	Goal "!i j. i ~= j --> xs[i:=x]!j = xs!j";
c4b5cbfb90dd optimized xs[i:=x]!j lemmas. nipkow parents: 8118 diff changeset	714	by (induct_tac "xs" 1);
c4b5cbfb90dd optimized xs[i:=x]!j lemmas. nipkow parents: 8118 diff changeset	715	by (Simp_tac 1);
c4b5cbfb90dd optimized xs[i:=x]!j lemmas. nipkow parents: 8118 diff changeset	716	by (auto_tac (claset(), simpset() addsimps [nth_Cons] addsplits [nat.split]));
c4b5cbfb90dd optimized xs[i:=x]!j lemmas. nipkow parents: 8118 diff changeset	717	qed_spec_mp "nth_list_update_neq";
c4b5cbfb90dd optimized xs[i:=x]!j lemmas. nipkow parents: 8118 diff changeset	718	Addsimps [nth_list_update_neq];
c4b5cbfb90dd optimized xs[i:=x]!j lemmas. nipkow parents: 8118 diff changeset	719
6433 228237ec56e5 Added new thms. nipkow parents: 6408 diff changeset	720	Goal "!i. i < size xs --> xs[i:=x, i:=y] = xs[i:=y]";
6813 bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	721	by (induct_tac "xs" 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	722	by (Simp_tac 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	723	by (asm_simp_tac (simpset() addsplits [nat.split]) 1);
6433 228237ec56e5 Added new thms. nipkow parents: 6408 diff changeset	724	qed_spec_mp "list_update_overwrite";
228237ec56e5 Added new thms. nipkow parents: 6408 diff changeset	725	Addsimps [list_update_overwrite];
228237ec56e5 Added new thms. nipkow parents: 6408 diff changeset	726
228237ec56e5 Added new thms. nipkow parents: 6408 diff changeset	727	Goal "!i < length xs. (xs[i := x] = xs) = (xs!i = x)";
6813 bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	728	by (induct_tac "xs" 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	729	by (Simp_tac 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	730	by (simp_tac (simpset() addsplits [nat.split]) 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	731	by (Blast_tac 1);
6433 228237ec56e5 Added new thms. nipkow parents: 6408 diff changeset	732	qed_spec_mp "list_update_same_conv";
228237ec56e5 Added new thms. nipkow parents: 6408 diff changeset	733
8009 29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	734	Goal "!i xy xs. length xs = length ys --> \
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	735	\ (zip xs ys)[i:=xy] = zip (xs[i:=fst xy]) (ys[i:=snd xy])";
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	736	by (induct_tac "ys" 1);
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	737	by Auto_tac;
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	738	by (exhaust_tac "xs" 1);
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	739	by (auto_tac (claset(), simpset() addsplits [nat.split]));
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	740	qed_spec_mp "update_zip";
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	741
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	742	Goal "!i. set(xs[i:=x]) <= insert x (set xs)";
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	743	by (induct_tac "xs" 1);
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	744	by (asm_full_simp_tac (simpset() addsimps []) 1);
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	745	by (asm_full_simp_tac (simpset() addsplits [nat.split]) 1);
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	746	by (Fast_tac 1);
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	747	qed_spec_mp "set_update_subset";
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	748
5077 71043526295f * HOL/List: new function list_update written xs[i:=v] that updates the i-th nipkow parents: 5043 diff changeset	749
3896 ee8ebb74ec00 Various new lemmas. Improved conversion of equations to rewrite rules: nipkow parents: 3860 diff changeset	750	( last & butlast )
1327 6c29cfab679c added new arithmetic lemmas and the functions take and drop. nipkow parents: 1301 diff changeset	751
5644 85fd64148873 Nat: added zero_neq_conv nipkow parents: 5641 diff changeset	752	section "last / butlast";
85fd64148873 Nat: added zero_neq_conv nipkow parents: 5641 diff changeset	753
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	754	Goal "last(xs@[x]) = x";
4423 a129b817b58a expandshort; wenzelm parents: 4132 diff changeset	755	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	756	by Auto_tac;
3896 ee8ebb74ec00 Various new lemmas. Improved conversion of equations to rewrite rules: nipkow parents: 3860 diff changeset	757	qed "last_snoc";
ee8ebb74ec00 Various new lemmas. Improved conversion of equations to rewrite rules: nipkow parents: 3860 diff changeset	758	Addsimps [last_snoc];
ee8ebb74ec00 Various new lemmas. Improved conversion of equations to rewrite rules: nipkow parents: 3860 diff changeset	759
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	760	Goal "butlast(xs@[x]) = xs";
4423 a129b817b58a expandshort; wenzelm parents: 4132 diff changeset	761	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	762	by Auto_tac;
3896 ee8ebb74ec00 Various new lemmas. Improved conversion of equations to rewrite rules: nipkow parents: 3860 diff changeset	763	qed "butlast_snoc";
ee8ebb74ec00 Various new lemmas. Improved conversion of equations to rewrite rules: nipkow parents: 3860 diff changeset	764	Addsimps [butlast_snoc];
ee8ebb74ec00 Various new lemmas. Improved conversion of equations to rewrite rules: nipkow parents: 3860 diff changeset	765
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	766	Goal "length(butlast xs) = length xs - 1";
1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	767	by (res_inst_tac [("xs","xs")] rev_induct 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	768	by Auto_tac;
4643 1b40fcac5a09 New induction schemas for lists (length and snoc). nipkow parents: 4628 diff changeset	769	qed "length_butlast";
1b40fcac5a09 New induction schemas for lists (length and snoc). nipkow parents: 4628 diff changeset	770	Addsimps [length_butlast];
1b40fcac5a09 New induction schemas for lists (length and snoc). nipkow parents: 4628 diff changeset	771
5278 a903b66822e2 even more tidying of Goal commands paulson parents: 5272 diff changeset	772	Goal "!ys. butlast (xs@ys) = (if ys=[] then butlast xs else xs@butlast ys)";
4423 a129b817b58a expandshort; wenzelm parents: 4132 diff changeset	773	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	774	by Auto_tac;
3896 ee8ebb74ec00 Various new lemmas. Improved conversion of equations to rewrite rules: nipkow parents: 3860 diff changeset	775	qed_spec_mp "butlast_append";
ee8ebb74ec00 Various new lemmas. Improved conversion of equations to rewrite rules: nipkow parents: 3860 diff changeset	776
8118 746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	777	Goal "xs ~= [] --> butlast xs @ [last xs] = xs";
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	778	by(induct_tac "xs" 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	779	by(ALLGOALS Asm_simp_tac);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	780	qed_spec_mp "append_butlast_last_id";
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	781	Addsimps [append_butlast_last_id];
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	782
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	783	Goal "x:set(butlast xs) --> x:set xs";
4423 a129b817b58a expandshort; wenzelm parents: 4132 diff changeset	784	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	785	by Auto_tac;
3896 ee8ebb74ec00 Various new lemmas. Improved conversion of equations to rewrite rules: nipkow parents: 3860 diff changeset	786	qed_spec_mp "in_set_butlastD";
ee8ebb74ec00 Various new lemmas. Improved conversion of equations to rewrite rules: nipkow parents: 3860 diff changeset	787
5448 40a09282ba14 in_set_butlast_appendI supersedes in_set_butlast_appendI1,2 paulson parents: 5443 diff changeset	788	Goal "x:set(butlast xs) \| x:set(butlast ys) ==> x:set(butlast(xs@ys))";
40a09282ba14 in_set_butlast_appendI supersedes in_set_butlast_appendI1,2 paulson parents: 5443 diff changeset	789	by (auto_tac (claset() addDs [in_set_butlastD],
40a09282ba14 in_set_butlast_appendI supersedes in_set_butlast_appendI1,2 paulson parents: 5443 diff changeset	790	simpset() addsimps [butlast_append]));
40a09282ba14 in_set_butlast_appendI supersedes in_set_butlast_appendI1,2 paulson parents: 5443 diff changeset	791	qed "in_set_butlast_appendI";
3902 265a5d8ab88f Removed comment. nipkow parents: 3896 diff changeset	792
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	793	( take & drop )
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	794	section "take & drop";
1327 6c29cfab679c added new arithmetic lemmas and the functions take and drop. nipkow parents: 1301 diff changeset	795
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	796	Goal "take 0 xs = []";
3040 7d48671753da Introduced a generic "induct_tac" which picks up the right induction scheme nipkow parents: 3011 diff changeset	797	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	798	by Auto_tac;
1327 6c29cfab679c added new arithmetic lemmas and the functions take and drop. nipkow parents: 1301 diff changeset	799	qed "take_0";
6c29cfab679c added new arithmetic lemmas and the functions take and drop. nipkow parents: 1301 diff changeset	800
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	801	Goal "drop 0 xs = xs";
3040 7d48671753da Introduced a generic "induct_tac" which picks up the right induction scheme nipkow parents: 3011 diff changeset	802	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	803	by Auto_tac;
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	804	qed "drop_0";
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	805
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	806	Goal "take (Suc n) (x#xs) = x # take n xs";
1552 6f71b5d46700 Ran expandshort paulson parents: 1485 diff changeset	807	by (Simp_tac 1);
1419 a6a034a47a71 defined take/drop by induction over list rather than nat. nipkow parents: 1327 diff changeset	808	qed "take_Suc_Cons";
1327 6c29cfab679c added new arithmetic lemmas and the functions take and drop. nipkow parents: 1301 diff changeset	809
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	810	Goal "drop (Suc n) (x#xs) = drop n xs";
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	811	by (Simp_tac 1);
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	812	qed "drop_Suc_Cons";
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	813
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	814	Delsimps [take_Cons,drop_Cons];
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	815	Addsimps [take_0,take_Suc_Cons,drop_0,drop_Suc_Cons];
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	816
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	817	Goal "!xs. length(take n xs) = min (length xs) n";
5183 89f162de39cf Adapted to new datatype package. berghofe parents: 5162 diff changeset	818	by (induct_tac "n" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	819	by Auto_tac;
3457 a8ab7c64817c Ran expandshort paulson parents: 3383 diff changeset	820	by (exhaust_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	821	by Auto_tac;
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	822	qed_spec_mp "length_take";
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	823	Addsimps [length_take];
923 ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	824
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	825	Goal "!xs. length(drop n xs) = (length xs - n)";
5183 89f162de39cf Adapted to new datatype package. berghofe parents: 5162 diff changeset	826	by (induct_tac "n" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	827	by Auto_tac;
3457 a8ab7c64817c Ran expandshort paulson parents: 3383 diff changeset	828	by (exhaust_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	829	by Auto_tac;
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	830	qed_spec_mp "length_drop";
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	831	Addsimps [length_drop];
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	832
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	833	Goal "!xs. length xs <= n --> take n xs = xs";
5183 89f162de39cf Adapted to new datatype package. berghofe parents: 5162 diff changeset	834	by (induct_tac "n" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	835	by Auto_tac;
3457 a8ab7c64817c Ran expandshort paulson parents: 3383 diff changeset	836	by (exhaust_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	837	by Auto_tac;
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	838	qed_spec_mp "take_all";
7246 33058867d6eb Added take_all and drop_all to simpset. nipkow parents: 7224 diff changeset	839	Addsimps [take_all];
923 ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	840
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	841	Goal "!xs. length xs <= n --> drop n xs = []";
5183 89f162de39cf Adapted to new datatype package. berghofe parents: 5162 diff changeset	842	by (induct_tac "n" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	843	by Auto_tac;
3457 a8ab7c64817c Ran expandshort paulson parents: 3383 diff changeset	844	by (exhaust_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	845	by Auto_tac;
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	846	qed_spec_mp "drop_all";
7246 33058867d6eb Added take_all and drop_all to simpset. nipkow parents: 7224 diff changeset	847	Addsimps [drop_all];
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	848
5278 a903b66822e2 even more tidying of Goal commands paulson parents: 5272 diff changeset	849	Goal "!xs. take n (xs @ ys) = (take n xs @ take (n - length xs) ys)";
5183 89f162de39cf Adapted to new datatype package. berghofe parents: 5162 diff changeset	850	by (induct_tac "n" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	851	by Auto_tac;
3457 a8ab7c64817c Ran expandshort paulson parents: 3383 diff changeset	852	by (exhaust_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	853	by Auto_tac;
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	854	qed_spec_mp "take_append";
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	855	Addsimps [take_append];
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	856
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	857	Goal "!xs. drop n (xs@ys) = drop n xs @ drop (n - length xs) ys";
5183 89f162de39cf Adapted to new datatype package. berghofe parents: 5162 diff changeset	858	by (induct_tac "n" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	859	by Auto_tac;
3457 a8ab7c64817c Ran expandshort paulson parents: 3383 diff changeset	860	by (exhaust_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	861	by Auto_tac;
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	862	qed_spec_mp "drop_append";
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	863	Addsimps [drop_append];
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	864
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	865	Goal "!xs n. take n (take m xs) = take (min n m) xs";
5183 89f162de39cf Adapted to new datatype package. berghofe parents: 5162 diff changeset	866	by (induct_tac "m" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	867	by Auto_tac;
3457 a8ab7c64817c Ran expandshort paulson parents: 3383 diff changeset	868	by (exhaust_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	869	by Auto_tac;
5183 89f162de39cf Adapted to new datatype package. berghofe parents: 5162 diff changeset	870	by (exhaust_tac "na" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	871	by Auto_tac;
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	872	qed_spec_mp "take_take";
7570 a9391550eea1 Mod because of new solver interface. nipkow parents: 7246 diff changeset	873	Addsimps [take_take];
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	874
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	875	Goal "!xs. drop n (drop m xs) = drop (n + m) xs";
5183 89f162de39cf Adapted to new datatype package. berghofe parents: 5162 diff changeset	876	by (induct_tac "m" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	877	by Auto_tac;
3457 a8ab7c64817c Ran expandshort paulson parents: 3383 diff changeset	878	by (exhaust_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	879	by Auto_tac;
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	880	qed_spec_mp "drop_drop";
7570 a9391550eea1 Mod because of new solver interface. nipkow parents: 7246 diff changeset	881	Addsimps [drop_drop];
923 ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	882
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	883	Goal "!xs n. take n (drop m xs) = drop m (take (n + m) xs)";
5183 89f162de39cf Adapted to new datatype package. berghofe parents: 5162 diff changeset	884	by (induct_tac "m" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	885	by Auto_tac;
3457 a8ab7c64817c Ran expandshort paulson parents: 3383 diff changeset	886	by (exhaust_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	887	by Auto_tac;
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	888	qed_spec_mp "take_drop";
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	889
6813 bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	890	Goal "!xs. take n xs @ drop n xs = xs";
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	891	by (induct_tac "n" 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	892	by Auto_tac;
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	893	by (exhaust_tac "xs" 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	894	by Auto_tac;
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	895	qed_spec_mp "append_take_drop_id";
8118 746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	896	Addsimps [append_take_drop_id];
6813 bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	897
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	898	Goal "!xs. take n (map f xs) = map f (take n xs)";
5183 89f162de39cf Adapted to new datatype package. berghofe parents: 5162 diff changeset	899	by (induct_tac "n" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	900	by Auto_tac;
3457 a8ab7c64817c Ran expandshort paulson parents: 3383 diff changeset	901	by (exhaust_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	902	by Auto_tac;
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	903	qed_spec_mp "take_map";
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	904
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	905	Goal "!xs. drop n (map f xs) = map f (drop n xs)";
5183 89f162de39cf Adapted to new datatype package. berghofe parents: 5162 diff changeset	906	by (induct_tac "n" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	907	by Auto_tac;
3457 a8ab7c64817c Ran expandshort paulson parents: 3383 diff changeset	908	by (exhaust_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	909	by Auto_tac;
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	910	qed_spec_mp "drop_map";
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	911
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	912	Goal "!n i. i < n --> (take n xs)!i = xs!i";
3457 a8ab7c64817c Ran expandshort paulson parents: 3383 diff changeset	913	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	914	by Auto_tac;
3457 a8ab7c64817c Ran expandshort paulson parents: 3383 diff changeset	915	by (exhaust_tac "n" 1);
a8ab7c64817c Ran expandshort paulson parents: 3383 diff changeset	916	by (Blast_tac 1);
a8ab7c64817c Ran expandshort paulson parents: 3383 diff changeset	917	by (exhaust_tac "i" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	918	by Auto_tac;
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	919	qed_spec_mp "nth_take";
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	920	Addsimps [nth_take];
923 ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	921
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	922	Goal "!xs i. n + i <= length xs --> (drop n xs)!i = xs!(n+i)";
5183 89f162de39cf Adapted to new datatype package. berghofe parents: 5162 diff changeset	923	by (induct_tac "n" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	924	by Auto_tac;
3457 a8ab7c64817c Ran expandshort paulson parents: 3383 diff changeset	925	by (exhaust_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	926	by Auto_tac;
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	927	qed_spec_mp "nth_drop";
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	928	Addsimps [nth_drop];
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	929
8118 746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	930
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	931	Goal
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	932	"!zs. (xs@ys = zs) = (xs = take (length xs) zs & ys = drop (length xs) zs)";
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	933	by(induct_tac "xs" 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	934	by(Simp_tac 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	935	by(Asm_full_simp_tac 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	936	by(Clarify_tac 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	937	by(exhaust_tac "zs" 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	938	by(Auto_tac);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	939	qed_spec_mp "append_eq_conv_conj";
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	940
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	941	( takeWhile & dropWhile )
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	942
3467 a0797ba03dfe More concat lemmas. nipkow parents: 3465 diff changeset	943	section "takeWhile & dropWhile";
a0797ba03dfe More concat lemmas. nipkow parents: 3465 diff changeset	944
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	945	Goal "takeWhile P xs @ dropWhile P xs = xs";
3586 2ee1ed79c802 Added a take/dropWhile lemma. nipkow parents: 3585 diff changeset	946	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	947	by Auto_tac;
3586 2ee1ed79c802 Added a take/dropWhile lemma. nipkow parents: 3585 diff changeset	948	qed "takeWhile_dropWhile_id";
2ee1ed79c802 Added a take/dropWhile lemma. nipkow parents: 3585 diff changeset	949	Addsimps [takeWhile_dropWhile_id];
2ee1ed79c802 Added a take/dropWhile lemma. nipkow parents: 3585 diff changeset	950
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	951	Goal "x:set xs & ~P(x) --> takeWhile P (xs @ ys) = takeWhile P xs";
3457 a8ab7c64817c Ran expandshort paulson parents: 3383 diff changeset	952	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	953	by Auto_tac;
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	954	bind_thm("takeWhile_append1", conjI RS (result() RS mp));
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	955	Addsimps [takeWhile_append1];
923 ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	956
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	957	Goal "(!x:set xs. P(x)) --> takeWhile P (xs @ ys) = xs @ takeWhile P ys";
3457 a8ab7c64817c Ran expandshort paulson parents: 3383 diff changeset	958	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	959	by Auto_tac;
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	960	bind_thm("takeWhile_append2", ballI RS (result() RS mp));
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	961	Addsimps [takeWhile_append2];
1169 5873833cf37f Added function rev and its properties length_rev, etc. lcp parents: 995 diff changeset	962
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	963	Goal "x:set xs & ~P(x) --> dropWhile P (xs @ ys) = (dropWhile P xs)@ys";
3457 a8ab7c64817c Ran expandshort paulson parents: 3383 diff changeset	964	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	965	by Auto_tac;
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	966	bind_thm("dropWhile_append1", conjI RS (result() RS mp));
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	967	Addsimps [dropWhile_append1];
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	968
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	969	Goal "(!x:set xs. P(x)) --> dropWhile P (xs @ ys) = dropWhile P ys";
3457 a8ab7c64817c Ran expandshort paulson parents: 3383 diff changeset	970	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	971	by Auto_tac;
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	972	bind_thm("dropWhile_append2", ballI RS (result() RS mp));
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	973	Addsimps [dropWhile_append2];
450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	974
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	975	Goal "x:set(takeWhile P xs) --> x:set xs & P x";
3457 a8ab7c64817c Ran expandshort paulson parents: 3383 diff changeset	976	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	977	by Auto_tac;
3647 a64c8fbcd98f Renamed theorems of the form set_of_list_XXX to set_XXX paulson parents: 3589 diff changeset	978	qed_spec_mp"set_take_whileD";
2608 450c9b682a92 New class "order" and accompanying changes. nipkow parents: 2512 diff changeset	979
6306 81e7fbf61db2 modified zip nipkow parents: 6162 diff changeset	980	( zip )
81e7fbf61db2 modified zip nipkow parents: 6162 diff changeset	981	section "zip";
81e7fbf61db2 modified zip nipkow parents: 6162 diff changeset	982
81e7fbf61db2 modified zip nipkow parents: 6162 diff changeset	983	Goal "zip [] ys = []";
6813 bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	984	by (induct_tac "ys" 1);
6306 81e7fbf61db2 modified zip nipkow parents: 6162 diff changeset	985	by Auto_tac;
81e7fbf61db2 modified zip nipkow parents: 6162 diff changeset	986	qed "zip_Nil";
81e7fbf61db2 modified zip nipkow parents: 6162 diff changeset	987	Addsimps [zip_Nil];
81e7fbf61db2 modified zip nipkow parents: 6162 diff changeset	988
81e7fbf61db2 modified zip nipkow parents: 6162 diff changeset	989	Goal "zip (x#xs) (y#ys) = (x,y)#zip xs ys";
6813 bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	990	by (Simp_tac 1);
6306 81e7fbf61db2 modified zip nipkow parents: 6162 diff changeset	991	qed "zip_Cons_Cons";
81e7fbf61db2 modified zip nipkow parents: 6162 diff changeset	992	Addsimps [zip_Cons_Cons];
81e7fbf61db2 modified zip nipkow parents: 6162 diff changeset	993
81e7fbf61db2 modified zip nipkow parents: 6162 diff changeset	994	Delsimps(tl (thms"zip.simps"));
4605 579e0ef2df6b Added `remdups' nipkow parents: 4502 diff changeset	995
8118 746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	996	Goal "!xs. length (zip xs ys) = min (length xs) (length ys)";
8009 29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	997	by (induct_tac "ys" 1);
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	998	by (Simp_tac 1);
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	999	by (Clarify_tac 1);
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1000	by (exhaust_tac "xs" 1);
8064 357652a08ee0 expandshort paulson parents: 8009 diff changeset	1001	by (Auto_tac);
8009 29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1002	qed_spec_mp "length_zip";
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1003	Addsimps [length_zip];
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1004
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1005	Goal
8118 746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1006	"!xs. zip (xs@ys) zs = \
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1007	\ zip xs (take (length xs) zs) @ zip ys (drop (length xs) zs)";
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1008	by(induct_tac "zs" 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1009	by(Simp_tac 1);
8064 357652a08ee0 expandshort paulson parents: 8009 diff changeset	1010	by (Clarify_tac 1);
8118 746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1011	by(exhaust_tac "xs" 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1012	by(Asm_simp_tac 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1013	by(Asm_simp_tac 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1014	qed_spec_mp "zip_append1";
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1015
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1016	Goal
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1017	"!ys. zip xs (ys@zs) = \
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1018	\ zip (take (length ys) xs) ys @ zip (drop (length ys) xs) zs";
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1019	by(induct_tac "xs" 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1020	by(Simp_tac 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1021	by (Clarify_tac 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1022	by(exhaust_tac "ys" 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1023	by(Asm_simp_tac 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1024	by(Asm_simp_tac 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1025	qed_spec_mp "zip_append2";
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1026
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1027	Goal
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1028	"[\| length xs = length us; length ys = length vs \|] ==> \
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1029	\ zip (xs@ys) (us@vs) = zip xs us @ zip ys vs";
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1030	by(asm_simp_tac (simpset() addsimps [zip_append1]) 1);
8009 29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1031	qed_spec_mp "zip_append";
8118 746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1032	Addsimps [zip_append];
8009 29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1033
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1034	Goal "!xs. length xs = length ys --> zip (rev xs) (rev ys) = rev (zip xs ys)";
8064 357652a08ee0 expandshort paulson parents: 8009 diff changeset	1035	by (induct_tac "ys" 1);
357652a08ee0 expandshort paulson parents: 8009 diff changeset	1036	by (Asm_full_simp_tac 1);
357652a08ee0 expandshort paulson parents: 8009 diff changeset	1037	by (Asm_full_simp_tac 1);
357652a08ee0 expandshort paulson parents: 8009 diff changeset	1038	by (Clarify_tac 1);
357652a08ee0 expandshort paulson parents: 8009 diff changeset	1039	by (exhaust_tac "xs" 1);
357652a08ee0 expandshort paulson parents: 8009 diff changeset	1040	by (Auto_tac);
8009 29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1041	qed_spec_mp "zip_rev";
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1042
8115 c802042066e8 Forgot to "call" MicroJava in makefile. nipkow parents: 8064 diff changeset	1043
c802042066e8 Forgot to "call" MicroJava in makefile. nipkow parents: 8064 diff changeset	1044	Goal
8009 29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1045	"!i xs. i < length xs --> i < length ys --> (zip xs ys)!i = (xs!i, ys!i)";
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1046	by (induct_tac "ys" 1);
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1047	by (Simp_tac 1);
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1048	by (Clarify_tac 1);
8064 357652a08ee0 expandshort paulson parents: 8009 diff changeset	1049	by (exhaust_tac "xs" 1);
357652a08ee0 expandshort paulson parents: 8009 diff changeset	1050	by (Auto_tac);
8009 29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1051	by (asm_full_simp_tac (simpset() addsimps (thms"nth.simps") addsplits [nat.split]) 1);
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1052	qed_spec_mp "nth_zip";
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1053	Addsimps [nth_zip];
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1054
8118 746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1055	Goal "set(zip xs ys) = {(xs!i,ys!i) \|i. i < min (length xs) (length ys)}";
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1056	by (simp_tac (simpset() addsimps [set_conv_nth]addcongs [rev_conj_cong]) 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1057	qed_spec_mp "set_zip";
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1058
8009 29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1059	Goal
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1060	"length xs = length ys ==> zip (xs[i:=x]) (ys[i:=y]) = (zip xs ys)[i:=(x,y)]";
8064 357652a08ee0 expandshort paulson parents: 8009 diff changeset	1061	by (rtac sym 1);
357652a08ee0 expandshort paulson parents: 8009 diff changeset	1062	by (asm_simp_tac (simpset() addsimps [update_zip]) 1);
8009 29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1063	qed_spec_mp "zip_update";
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1064
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1065	Goal "!j. zip (replicate i x) (replicate j y) = replicate (min i j) (x,y)";
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1066	by (induct_tac "i" 1);
8064 357652a08ee0 expandshort paulson parents: 8009 diff changeset	1067	by (Auto_tac);
8009 29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1068	by (exhaust_tac "j" 1);
8064 357652a08ee0 expandshort paulson parents: 8009 diff changeset	1069	by (Auto_tac);
8009 29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1070	qed "zip_replicate";
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1071	Addsimps [zip_replicate];
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1072
8115 c802042066e8 Forgot to "call" MicroJava in makefile. nipkow parents: 8064 diff changeset	1073	( list_all2 )
c802042066e8 Forgot to "call" MicroJava in makefile. nipkow parents: 8064 diff changeset	1074	section "list_all2";
c802042066e8 Forgot to "call" MicroJava in makefile. nipkow parents: 8064 diff changeset	1075
c802042066e8 Forgot to "call" MicroJava in makefile. nipkow parents: 8064 diff changeset	1076	Goalw [list_all2_def] "list_all2 P xs ys ==> length xs = length ys";
c802042066e8 Forgot to "call" MicroJava in makefile. nipkow parents: 8064 diff changeset	1077	by(Asm_simp_tac 1);
c802042066e8 Forgot to "call" MicroJava in makefile. nipkow parents: 8064 diff changeset	1078	qed "list_all2_lengthD";
c802042066e8 Forgot to "call" MicroJava in makefile. nipkow parents: 8064 diff changeset	1079
c802042066e8 Forgot to "call" MicroJava in makefile. nipkow parents: 8064 diff changeset	1080	Goalw [list_all2_def] "list_all2 P [] ys = (ys=[])";
c802042066e8 Forgot to "call" MicroJava in makefile. nipkow parents: 8064 diff changeset	1081	by (Simp_tac 1);
c802042066e8 Forgot to "call" MicroJava in makefile. nipkow parents: 8064 diff changeset	1082	qed "list_all2_Nil";
c802042066e8 Forgot to "call" MicroJava in makefile. nipkow parents: 8064 diff changeset	1083	AddIffs [list_all2_Nil];
c802042066e8 Forgot to "call" MicroJava in makefile. nipkow parents: 8064 diff changeset	1084
c802042066e8 Forgot to "call" MicroJava in makefile. nipkow parents: 8064 diff changeset	1085	Goalw [list_all2_def] "list_all2 P xs [] = (xs=[])";
c802042066e8 Forgot to "call" MicroJava in makefile. nipkow parents: 8064 diff changeset	1086	by (Simp_tac 1);
c802042066e8 Forgot to "call" MicroJava in makefile. nipkow parents: 8064 diff changeset	1087	qed "list_all2_Nil2";
c802042066e8 Forgot to "call" MicroJava in makefile. nipkow parents: 8064 diff changeset	1088	AddIffs [list_all2_Nil2];
c802042066e8 Forgot to "call" MicroJava in makefile. nipkow parents: 8064 diff changeset	1089
c802042066e8 Forgot to "call" MicroJava in makefile. nipkow parents: 8064 diff changeset	1090	Goalw [list_all2_def]
c802042066e8 Forgot to "call" MicroJava in makefile. nipkow parents: 8064 diff changeset	1091	"list_all2 P (x#xs) (y#ys) = (P x y & list_all2 P xs ys)";
c802042066e8 Forgot to "call" MicroJava in makefile. nipkow parents: 8064 diff changeset	1092	by (Auto_tac);
c802042066e8 Forgot to "call" MicroJava in makefile. nipkow parents: 8064 diff changeset	1093	qed "list_all2_Cons";
c802042066e8 Forgot to "call" MicroJava in makefile. nipkow parents: 8064 diff changeset	1094	AddIffs[list_all2_Cons];
c802042066e8 Forgot to "call" MicroJava in makefile. nipkow parents: 8064 diff changeset	1095
c802042066e8 Forgot to "call" MicroJava in makefile. nipkow parents: 8064 diff changeset	1096	Goalw [list_all2_def]
8118 746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1097	"list_all2 P (x#xs) ys = (? z zs. ys = z#zs & P x z & list_all2 P xs zs)";
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1098	by(exhaust_tac "ys" 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1099	by(Auto_tac);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1100	qed "list_all2_Cons1";
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1101
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1102	Goalw [list_all2_def]
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1103	"list_all2 P xs (y#ys) = (? z zs. xs = z#zs & P z y & list_all2 P zs ys)";
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1104	by(exhaust_tac "xs" 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1105	by(Auto_tac);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1106	qed "list_all2_Cons2";
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1107
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1108	Goalw [list_all2_def]
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1109	"list_all2 P (xs@ys) zs = \
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1110	\ (EX us vs. zs = us@vs & length us = length xs & length vs = length ys & \
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1111	\ list_all2 P xs us & list_all2 P ys vs)";
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1112	by(simp_tac (simpset() addsimps [zip_append1]) 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1113	br iffI 1;
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1114	by(res_inst_tac [("x","take (length xs) zs")] exI 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1115	by(res_inst_tac [("x","drop (length xs) zs")] exI 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1116	by(asm_full_simp_tac (simpset() addsimps [min_def,eq_sym_conv]) 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1117	by (Clarify_tac 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1118	by(asm_full_simp_tac (simpset() addsimps [ball_Un]) 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1119	qed "list_all2_append1";
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1120
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1121	Goalw [list_all2_def]
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1122	"list_all2 P xs (ys@zs) = \
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1123	\ (EX us vs. xs = us@vs & length us = length ys & length vs = length zs & \
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1124	\ list_all2 P us ys & list_all2 P vs zs)";
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1125	by(simp_tac (simpset() addsimps [zip_append2]) 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1126	br iffI 1;
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1127	by(res_inst_tac [("x","take (length ys) xs")] exI 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1128	by(res_inst_tac [("x","drop (length ys) xs")] exI 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1129	by(asm_full_simp_tac (simpset() addsimps [min_def,eq_sym_conv]) 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1130	by (Clarify_tac 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1131	by(asm_full_simp_tac (simpset() addsimps [ball_Un]) 1);
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1132	qed "list_all2_append2";
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1133
746c5cf09bde More lemmas. nipkow parents: 8115 diff changeset	1134	Goalw [list_all2_def]
8115 c802042066e8 Forgot to "call" MicroJava in makefile. nipkow parents: 8064 diff changeset	1135	"list_all2 P xs ys = \
c802042066e8 Forgot to "call" MicroJava in makefile. nipkow parents: 8064 diff changeset	1136	\ (length xs = length ys & (!i<length xs. P (xs!i) (ys!i)))";
c802042066e8 Forgot to "call" MicroJava in makefile. nipkow parents: 8064 diff changeset	1137	by(force_tac (claset(), simpset() addsimps [set_zip]) 1);
c802042066e8 Forgot to "call" MicroJava in makefile. nipkow parents: 8064 diff changeset	1138	qed "list_all2_conv_all_nth";
5272 95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	1139
95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	1140	( foldl )
95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	1141	section "foldl";
95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	1142
95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	1143	Goal "!a. foldl f a (xs @ ys) = foldl f (foldl f a xs) ys";
5318 72bf8039b53f expandshort paulson parents: 5316 diff changeset	1144	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	1145	by Auto_tac;
5272 95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	1146	qed_spec_mp "foldl_append";
95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	1147	Addsimps [foldl_append];
95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	1148
95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	1149	(* Note: `n <= foldl op+ n ns' looks simpler, but is more difficult to use
95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	1150	because it requires an additional transitivity step
95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	1151	*)
95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	1152	Goal "!n::nat. m <= n --> m <= foldl op+ n ns";
5318 72bf8039b53f expandshort paulson parents: 5316 diff changeset	1153	by (induct_tac "ns" 1);
6058 a9600c47ace3 Shortened a proof. nipkow parents: 6055 diff changeset	1154	by Auto_tac;
5272 95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	1155	qed_spec_mp "start_le_sum";
95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	1156
95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	1157	Goal "n : set ns ==> n <= foldl op+ 0 ns";
5758 27a2b36efd95 corrected auto_tac (applications of unsafe wrappers) oheimb parents: 5644 diff changeset	1158	by (force_tac (claset() addIs [start_le_sum],
27a2b36efd95 corrected auto_tac (applications of unsafe wrappers) oheimb parents: 5644 diff changeset	1159	simpset() addsimps [in_set_conv_decomp]) 1);
5272 95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	1160	qed "elem_le_sum";
95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	1161
95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	1162	Goal "!m. (foldl op+ m ns = 0) = (m=0 & (!n : set ns. n=0))";
5318 72bf8039b53f expandshort paulson parents: 5316 diff changeset	1163	by (induct_tac "ns" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	1164	by Auto_tac;
5272 95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	1165	qed_spec_mp "sum_eq_0_conv";
95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	1166	AddIffs [sum_eq_0_conv];
95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	1167
5425 157c6663dedd Added function upto to List. nipkow parents: 5355 diff changeset	1168	( upto )
157c6663dedd Added function upto to List. nipkow parents: 5355 diff changeset	1169
5427 26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	1170	(* Does not terminate! *)
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	1171	Goal "[i..j(] = (if i<j then i#[Suc i..j(] else [])";
6162 484adda70b65 expandshort paulson parents: 6141 diff changeset	1172	by (induct_tac "j" 1);
5427 26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	1173	by Auto_tac;
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	1174	qed "upt_rec";
5425 157c6663dedd Added function upto to List. nipkow parents: 5355 diff changeset	1175
5427 26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	1176	Goal "j<=i ==> [i..j(] = []";
6162 484adda70b65 expandshort paulson parents: 6141 diff changeset	1177	by (stac upt_rec 1);
484adda70b65 expandshort paulson parents: 6141 diff changeset	1178	by (Asm_simp_tac 1);
5427 26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	1179	qed "upt_conv_Nil";
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	1180	Addsimps [upt_conv_Nil];
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	1181
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	1182	Goal "i<=j ==> [i..(Suc j)(] = [i..j(]@[j]";
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	1183	by (Asm_simp_tac 1);
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	1184	qed "upt_Suc";
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	1185
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	1186	Goal "i<j ==> [i..j(] = i#[Suc i..j(]";
6162 484adda70b65 expandshort paulson parents: 6141 diff changeset	1187	by (rtac trans 1);
484adda70b65 expandshort paulson parents: 6141 diff changeset	1188	by (stac upt_rec 1);
484adda70b65 expandshort paulson parents: 6141 diff changeset	1189	by (rtac refl 2);
5427 26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	1190	by (Asm_simp_tac 1);
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	1191	qed "upt_conv_Cons";
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	1192
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	1193	Goal "length [i..j(] = j-i";
6162 484adda70b65 expandshort paulson parents: 6141 diff changeset	1194	by (induct_tac "j" 1);
5427 26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	1195	by (Simp_tac 1);
6162 484adda70b65 expandshort paulson parents: 6141 diff changeset	1196	by (asm_simp_tac (simpset() addsimps [Suc_diff_le]) 1);
5427 26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	1197	qed "length_upt";
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	1198	Addsimps [length_upt];
5425 157c6663dedd Added function upto to List. nipkow parents: 5355 diff changeset	1199
5427 26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	1200	Goal "i+k < j --> [i..j(] ! k = i+k";
6162 484adda70b65 expandshort paulson parents: 6141 diff changeset	1201	by (induct_tac "j" 1);
484adda70b65 expandshort paulson parents: 6141 diff changeset	1202	by (Simp_tac 1);
484adda70b65 expandshort paulson parents: 6141 diff changeset	1203	by (asm_simp_tac (simpset() addsimps [nth_append,less_diff_conv]@add_ac) 1);
484adda70b65 expandshort paulson parents: 6141 diff changeset	1204	by (Clarify_tac 1);
484adda70b65 expandshort paulson parents: 6141 diff changeset	1205	by (subgoal_tac "n=i+k" 1);
484adda70b65 expandshort paulson parents: 6141 diff changeset	1206	by (Asm_simp_tac 2);
484adda70b65 expandshort paulson parents: 6141 diff changeset	1207	by (Asm_simp_tac 1);
5427 26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	1208	qed_spec_mp "nth_upt";
26c9a7c0b36b Arith: less_diff_conv nipkow parents: 5425 diff changeset	1209	Addsimps [nth_upt];
5425 157c6663dedd Added function upto to List. nipkow parents: 5355 diff changeset	1210
6433 228237ec56e5 Added new thms. nipkow parents: 6408 diff changeset	1211	Goal "!i. i+m <= n --> take m [i..n(] = [i..i+m(]";
6813 bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1212	by (induct_tac "m" 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1213	by (Simp_tac 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1214	by (Clarify_tac 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1215	by (stac upt_rec 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1216	by (rtac sym 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1217	by (stac upt_rec 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1218	by (asm_simp_tac (simpset() delsimps (thms"upt.simps")) 1);
6433 228237ec56e5 Added new thms. nipkow parents: 6408 diff changeset	1219	qed_spec_mp "take_upt";
228237ec56e5 Added new thms. nipkow parents: 6408 diff changeset	1220	Addsimps [take_upt];
228237ec56e5 Added new thms. nipkow parents: 6408 diff changeset	1221
228237ec56e5 Added new thms. nipkow parents: 6408 diff changeset	1222	Goal "!m i. i < n-m --> (map f [m..n(]) ! i = f(m+i)";
6813 bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1223	by (induct_tac "n" 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1224	by (Simp_tac 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1225	by (Clarify_tac 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1226	by (subgoal_tac "m < Suc n" 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1227	by (arith_tac 2);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1228	by (stac upt_rec 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1229	by (asm_simp_tac (simpset() delsplits [split_if]) 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1230	by (split_tac [split_if] 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1231	by (rtac conjI 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1232	by (simp_tac (simpset() addsimps [nth_Cons] addsplits [nat.split]) 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1233	by (simp_tac (simpset() addsimps [nth_append] addsplits [nat.split]) 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1234	by (Clarify_tac 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1235	by (rtac conjI 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1236	by (Clarify_tac 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1237	by (subgoal_tac "Suc(m+nat) < n" 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1238	by (arith_tac 2);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1239	by (Asm_simp_tac 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1240	by (Clarify_tac 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1241	by (subgoal_tac "n = Suc(m+nat)" 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1242	by (arith_tac 2);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1243	by (Asm_simp_tac 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1244	by (simp_tac (simpset() addsimps [nth_Cons] addsplits [nat.split]) 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1245	by (arith_tac 1);
6433 228237ec56e5 Added new thms. nipkow parents: 6408 diff changeset	1246	qed_spec_mp "nth_map_upt";
228237ec56e5 Added new thms. nipkow parents: 6408 diff changeset	1247
6813 bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1248	Goal "ALL xs ys. k <= length xs --> k <= length ys --> \
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1249	\ (ALL i. i < k --> xs!i = ys!i) \
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1250	\ --> take k xs = take k ys";
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1251	by (induct_tac "k" 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1252	by (ALLGOALS (asm_simp_tac (simpset() addsimps [less_Suc_eq_0_disj,
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1253	all_conj_distrib])));
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1254	by (Clarify_tac 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1255	(Both lists must be non-empty)
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1256	by (exhaust_tac "xs" 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1257	by (exhaust_tac "ys" 2);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1258	by (ALLGOALS Clarify_tac);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1259	(prenexing's needed, not miniscoping)
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1260	by (ALLGOALS (full_simp_tac (simpset() addsimps (all_simps RL [sym])
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1261	delsimps (all_simps))));
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1262	by (Blast_tac 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1263	qed_spec_mp "nth_take_lemma";
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1264
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1265	Goal "[\| length xs = length ys; \
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1266	\ ALL i. i < length xs --> xs!i = ys!i \|] \
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1267	\ ==> xs = ys";
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1268	by (forward_tac [[le_refl, eq_imp_le] MRS nth_take_lemma] 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1269	by (ALLGOALS (asm_full_simp_tac (simpset() addsimps [take_all])));
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1270	qed_spec_mp "nth_equalityI";
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1271
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1272	(The famous take-lemma)
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1273	Goal "(ALL i. take i xs = take i ys) ==> xs = ys";
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1274	by (dres_inst_tac [("x", "max (length xs) (length ys)")] spec 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1275	by (full_simp_tac (simpset() addsimps [le_max_iff_disj, take_all]) 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1276	qed_spec_mp "take_equalityI";
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1277
5272 95cfd872fe66 New lemmas in List and Lambda in IsaMakefile nipkow parents: 5200 diff changeset	1278
4605 579e0ef2df6b Added `remdups' nipkow parents: 4502 diff changeset	1279	( nodups & remdups )
579e0ef2df6b Added `remdups' nipkow parents: 4502 diff changeset	1280	section "nodups & remdups";
579e0ef2df6b Added `remdups' nipkow parents: 4502 diff changeset	1281
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	1282	Goal "set(remdups xs) = set xs";
4605 579e0ef2df6b Added `remdups' nipkow parents: 4502 diff changeset	1283	by (induct_tac "xs" 1);
579e0ef2df6b Added `remdups' nipkow parents: 4502 diff changeset	1284	by (Simp_tac 1);
4686 74a12e86b20b Removed `addsplits [expand_if]' nipkow parents: 4681 diff changeset	1285	by (asm_full_simp_tac (simpset() addsimps [insert_absorb]) 1);
4605 579e0ef2df6b Added `remdups' nipkow parents: 4502 diff changeset	1286	qed "set_remdups";
579e0ef2df6b Added `remdups' nipkow parents: 4502 diff changeset	1287	Addsimps [set_remdups];
579e0ef2df6b Added `remdups' nipkow parents: 4502 diff changeset	1288
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	1289	Goal "nodups(remdups xs)";
4605 579e0ef2df6b Added `remdups' nipkow parents: 4502 diff changeset	1290	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	1291	by Auto_tac;
4605 579e0ef2df6b Added `remdups' nipkow parents: 4502 diff changeset	1292	qed "nodups_remdups";
579e0ef2df6b Added `remdups' nipkow parents: 4502 diff changeset	1293
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	1294	Goal "nodups xs --> nodups (filter P xs)";
4605 579e0ef2df6b Added `remdups' nipkow parents: 4502 diff changeset	1295	by (induct_tac "xs" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	1296	by Auto_tac;
4605 579e0ef2df6b Added `remdups' nipkow parents: 4502 diff changeset	1297	qed_spec_mp "nodups_filter";
579e0ef2df6b Added `remdups' nipkow parents: 4502 diff changeset	1298
3589 244daa75f890 Added function `replicate' and lemmas map_cong and set_replicate. nipkow parents: 3586 diff changeset	1299	( replicate )
244daa75f890 Added function `replicate' and lemmas map_cong and set_replicate. nipkow parents: 3586 diff changeset	1300	section "replicate";
244daa75f890 Added function `replicate' and lemmas map_cong and set_replicate. nipkow parents: 3586 diff changeset	1301
6794 ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1302	Goal "length(replicate n x) = n";
6813 bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1303	by (induct_tac "n" 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1304	by Auto_tac;
6794 ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1305	qed "length_replicate";
ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1306	Addsimps [length_replicate];
ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1307
ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1308	Goal "map f (replicate n x) = replicate n (f x)";
ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1309	by (induct_tac "n" 1);
6813 bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1310	by Auto_tac;
6794 ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1311	qed "map_replicate";
ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1312	Addsimps [map_replicate];
ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1313
ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1314	Goal "(replicate n x) @ (x#xs) = x # replicate n x @ xs";
ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1315	by (induct_tac "n" 1);
6813 bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1316	by Auto_tac;
6794 ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1317	qed "replicate_app_Cons_same";
ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1318
ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1319	Goal "rev(replicate n x) = replicate n x";
ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1320	by (induct_tac "n" 1);
6813 bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1321	by (Simp_tac 1);
6794 ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1322	by (asm_simp_tac (simpset() addsimps [replicate_app_Cons_same]) 1);
ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1323	qed "rev_replicate";
ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1324	Addsimps [rev_replicate];
ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1325
8009 29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1326	Goal "replicate (n+m) x = replicate n x @ replicate m x";
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1327	by (induct_tac "n" 1);
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1328	by Auto_tac;
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1329	qed "replicate_add";
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1330
6794 ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1331	Goal"n ~= 0 --> hd(replicate n x) = x";
ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1332	by (induct_tac "n" 1);
6813 bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1333	by Auto_tac;
6794 ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1334	qed_spec_mp "hd_replicate";
ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1335	Addsimps [hd_replicate];
ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1336
ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1337	Goal "n ~= 0 --> tl(replicate n x) = replicate (n-1) x";
ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1338	by (induct_tac "n" 1);
6813 bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1339	by Auto_tac;
6794 ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1340	qed_spec_mp "tl_replicate";
ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1341	Addsimps [tl_replicate];
ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1342
ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1343	Goal "n ~= 0 --> last(replicate n x) = x";
ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1344	by (induct_tac "n" 1);
6813 bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1345	by Auto_tac;
6794 ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1346	qed_spec_mp "last_replicate";
ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1347	Addsimps [last_replicate];
ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1348
ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1349	Goal "!i. i<n --> (replicate n x)!i = x";
6813 bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1350	by (induct_tac "n" 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1351	by (Simp_tac 1);
bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1352	by (asm_simp_tac (simpset() addsimps [nth_Cons] addsplits [nat.split]) 1);
6794 ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1353	qed_spec_mp "nth_replicate";
ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1354	Addsimps [nth_replicate];
ac367328b875 Added lots of 'replicate' lemmas. nipkow parents: 6451 diff changeset	1355
4935 1694e2daef8f Cleaned up and simplified etc. nipkow parents: 4911 diff changeset	1356	Goal "set(replicate (Suc n) x) = {x}";
4423 a129b817b58a expandshort; wenzelm parents: 4132 diff changeset	1357	by (induct_tac "n" 1);
5316 7a8975451a89 even more tidying of Goal commands paulson parents: 5296 diff changeset	1358	by Auto_tac;
3589 244daa75f890 Added function `replicate' and lemmas map_cong and set_replicate. nipkow parents: 3586 diff changeset	1359	val lemma = result();
244daa75f890 Added function `replicate' and lemmas map_cong and set_replicate. nipkow parents: 3586 diff changeset	1360
5043 3fdc881e8ff9 goal -> Goal nipkow parents: 4935 diff changeset	1361	Goal "n ~= 0 ==> set(replicate n x) = {x}";
4423 a129b817b58a expandshort; wenzelm parents: 4132 diff changeset	1362	by (fast_tac (claset() addSDs [not0_implies_Suc] addSIs [lemma]) 1);
3589 244daa75f890 Added function `replicate' and lemmas map_cong and set_replicate. nipkow parents: 3586 diff changeset	1363	qed "set_replicate";
244daa75f890 Added function `replicate' and lemmas map_cong and set_replicate. nipkow parents: 3586 diff changeset	1364	Addsimps [set_replicate];
5162 53e505c6019c Added simproc list_eq. nipkow parents: 5132 diff changeset	1365
8009 29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1366	Goal "set(replicate n x) = (if n=0 then {} else {x})";
8064 357652a08ee0 expandshort paulson parents: 8009 diff changeset	1367	by (Auto_tac);
8009 29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1368	qed "set_replicate_conv_if";
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1369
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1370	Goal "x : set(replicate n y) --> x=y";
8064 357652a08ee0 expandshort paulson parents: 8009 diff changeset	1371	by (asm_simp_tac (simpset() addsimps [set_replicate_conv_if]) 1);
8009 29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1372	qed_spec_mp "in_set_replicateD";
29a7a79ee7f4 Imported Conny's lemmas from MicroJava nipkow parents: 7570 diff changeset	1373
5162 53e505c6019c Added simproc list_eq. nipkow parents: 5132 diff changeset	1374
5281 f4d16517b360 List now contains some lexicographic orderings. nipkow parents: 5278 diff changeset	1375	(* Lexcicographic orderings on lists *)
f4d16517b360 List now contains some lexicographic orderings. nipkow parents: 5278 diff changeset	1376	section"Lexcicographic orderings on lists";
f4d16517b360 List now contains some lexicographic orderings. nipkow parents: 5278 diff changeset	1377
f4d16517b360 List now contains some lexicographic orderings. nipkow parents: 5278 diff changeset	1378	Goal "wf r ==> wf(lexn r n)";
5318 72bf8039b53f expandshort paulson parents: 5316 diff changeset	1379	by (induct_tac "n" 1);
72bf8039b53f expandshort paulson parents: 5316 diff changeset	1380	by (Simp_tac 1);
72bf8039b53f expandshort paulson parents: 5316 diff changeset	1381	by (Simp_tac 1);
72bf8039b53f expandshort paulson parents: 5316 diff changeset	1382	by (rtac wf_subset 1);
72bf8039b53f expandshort paulson parents: 5316 diff changeset	1383	by (rtac Int_lower1 2);
72bf8039b53f expandshort paulson parents: 5316 diff changeset	1384	by (rtac wf_prod_fun_image 1);
72bf8039b53f expandshort paulson parents: 5316 diff changeset	1385	by (rtac injI 2);
6813 bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1386	by Auto_tac;
5281 f4d16517b360 List now contains some lexicographic orderings. nipkow parents: 5278 diff changeset	1387	qed "wf_lexn";
f4d16517b360 List now contains some lexicographic orderings. nipkow parents: 5278 diff changeset	1388
f4d16517b360 List now contains some lexicographic orderings. nipkow parents: 5278 diff changeset	1389	Goal "!xs ys. (xs,ys) : lexn r n --> length xs = n & length ys = n";
5318 72bf8039b53f expandshort paulson parents: 5316 diff changeset	1390	by (induct_tac "n" 1);
6813 bf90f86502b2 many new lemmas about take & drop, incl the famous take-lemma paulson parents: 6794 diff changeset	1391	by Auto_tac;
5281 f4d16517b360 List now contains some lexicographic orderings. nipkow parents: 5278 diff changeset	1392	qed_spec_mp "lexn_length";
f4d16517b360 List now contains some lexicographic orderings. nipkow parents: 5278 diff changeset	1393
f4d16517b360 List now contains some lexicographic orderings. nipkow parents: 5278 diff changeset	1394	Goalw [lex_def] "wf r ==> wf(lex r)";
5318 72bf8039b53f expandshort paulson parents: 5316 diff changeset	1395	by (rtac wf_UN 1);
72bf8039b53f expandshort paulson parents: 5316 diff changeset	1396	by (blast_tac (claset() addIs [wf_lexn]) 1);
72bf8039b53f expandshort paulson parents: 5316 diff changeset	1397	by (Clarify_tac 1);
72bf8039b53f expandshort paulson parents: 5316 diff changeset	1398	by (rename_tac "m n" 1);
72bf8039b53f expandshort paulson parents: 5316 diff changeset	1399	by (subgoal_tac "m ~= n" 1);
72bf8039b53f expandshort paulson parents: 5316 diff changeset	1400	by (Blast_tac 2);
72bf8039b53f expandshort paulson parents: 5316 diff changeset	1401	by (blast_tac (claset() addDs [lexn_length,not_sym]) 1);
5281 f4d16517b360 List now contains some lexicographic orderings. nipkow parents: 5278 diff changeset	1402	qed "wf_lex";
f4d16517b360 List now contains some lexicographic orderings. nipkow parents: 5278 diff changeset	1403	AddSIs [wf_lex];
f4d16517b360 List now contains some lexicographic orderings. nipkow parents: 5278 diff changeset	1404
f4d16517b360 List now contains some lexicographic orderings. nipkow parents: 5278 diff changeset	1405	Goal
f4d16517b360 List now contains some lexicographic orderings. nipkow parents: 5278 diff changeset	1406	"lexn r n = \
f4d16517b360 List now contains some lexicographic orderings. nipkow parents: 5278 diff changeset	1407	\ {(xs,ys). length xs = n & length ys = n & \
f4d16517b360 List now contains some lexicographic orderings. nipkow parents: 5278 diff changeset	1408	\ (? xys x y xs' ys'. xs= xys @ x#xs' & ys= xys @ y#ys' & (x,y):r)}";
5318 72bf8039b53f expandshort paulson parents: 5316 diff changeset	1409	by (induct_tac "n" 1);
72bf8039b53f expandshort paulson parents: 5316 diff changeset	1410	by (Simp_tac 1);
72bf8039b53f expandshort paulson parents: 5316 diff changeset	1411	by (Blast_tac 1);
5641 5266f09db46c length_Suc_conv is no longer given to AddIffs paulson parents: 5537 diff changeset	1412	by (asm_full_simp_tac (simpset()
5296 bdef7d349d27 added length_Suc_conv, finite_set oheimb parents: 5283 diff changeset	1413	addsimps [lex_prod_def]) 1);
5641 5266f09db46c length_Suc_conv is no longer given to AddIffs paulson parents: 5537 diff changeset	1414	by (auto_tac (claset(), simpset()));
5318 72bf8039b53f expandshort paulson parents: 5316 diff changeset	1415	by (Blast_tac 1);
72bf8039b53f expandshort paulson parents: 5316 diff changeset	1416	by (rename_tac "a xys x xs' y ys'" 1);
72bf8039b53f expandshort paulson parents: 5316 diff changeset	1417	by (res_inst_tac [("x","a#xys")] exI 1);
72bf8039b53f expandshort paulson parents: 5316 diff changeset	1418	by (Simp_tac 1);
72bf8039b53f expandshort paulson parents: 5316 diff changeset	1419	by (exhaust_tac "xys" 1);
5641 5266f09db46c length_Suc_conv is no longer given to AddIffs paulson parents: 5537 diff changeset	1420	by (ALLGOALS (asm_full_simp_tac (simpset())));
5318 72bf8039b53f expandshort paulson parents: 5316 diff changeset	1421	by (Blast_tac 1);
5281 f4d16517b360 List now contains some lexicographic orderings. nipkow parents: 5278 diff changeset	1422	qed "lexn_conv";
f4d16517b360 List now contains some lexicographic orderings. nipkow parents: 5278 diff changeset	1423
f4d16517b360 List now contains some lexicographic orderings. nipkow parents: 5278 diff changeset	1424	Goalw [lex_def]
f4d16517b360 List now contains some lexicographic orderings. nipkow parents: 5278 diff changeset	1425	"lex r = \
f4d16517b360 List now contains some lexicographic orderings. nipkow parents: 5278 diff changeset	1426	\ {(xs,ys). length xs = length ys & \
f4d16517b360 List now contains some lexicographic orderings. nipkow parents: 5278 diff changeset	1427	\ (? xys x y xs' ys'. xs= xys @ x#xs' & ys= xys @ y#ys' & (x,y):r)}";
5641 5266f09db46c length_Suc_conv is no longer given to AddIffs paulson parents: 5537 diff changeset	1428	by (force_tac (claset(), simpset() addsimps [lexn_conv]) 1);
5281 f4d16517b360 List now contains some lexicographic orderings. nipkow parents: 5278 diff changeset	1429	qed "lex_conv";
f4d16517b360 List now contains some lexicographic orderings. nipkow parents: 5278 diff changeset	1430
f4d16517b360 List now contains some lexicographic orderings. nipkow parents: 5278 diff changeset	1431	Goalw [lexico_def] "wf r ==> wf(lexico r)";
5318 72bf8039b53f expandshort paulson parents: 5316 diff changeset	1432	by (Blast_tac 1);
5281 f4d16517b360 List now contains some lexicographic orderings. nipkow parents: 5278 diff changeset	1433	qed "wf_lexico";
f4d16517b360 List now contains some lexicographic orderings. nipkow parents: 5278 diff changeset	1434	AddSIs [wf_lexico];
f4d16517b360 List now contains some lexicographic orderings. nipkow parents: 5278 diff changeset	1435
f4d16517b360 List now contains some lexicographic orderings. nipkow parents: 5278 diff changeset	1436	Goalw
f4d16517b360 List now contains some lexicographic orderings. nipkow parents: 5278 diff changeset	1437	[lexico_def,diag_def,lex_prod_def,measure_def,inv_image_def]
f4d16517b360 List now contains some lexicographic orderings. nipkow parents: 5278 diff changeset	1438	"lexico r = {(xs,ys). length xs < length ys \| \
f4d16517b360 List now contains some lexicographic orderings. nipkow parents: 5278 diff changeset	1439	\ length xs = length ys & (xs,ys) : lex r}";
5318 72bf8039b53f expandshort paulson parents: 5316 diff changeset	1440	by (Simp_tac 1);
5281 f4d16517b360 List now contains some lexicographic orderings. nipkow parents: 5278 diff changeset	1441	qed "lexico_conv";
f4d16517b360 List now contains some lexicographic orderings. nipkow parents: 5278 diff changeset	1442
5283 0027ddfbc831 More lemmas about lex. nipkow parents: 5281 diff changeset	1443	Goal "([],ys) ~: lex r";
5318 72bf8039b53f expandshort paulson parents: 5316 diff changeset	1444	by (simp_tac (simpset() addsimps [lex_conv]) 1);
5283 0027ddfbc831 More lemmas about lex. nipkow parents: 5281 diff changeset	1445	qed "Nil_notin_lex";
0027ddfbc831 More lemmas about lex. nipkow parents: 5281 diff changeset	1446
0027ddfbc831 More lemmas about lex. nipkow parents: 5281 diff changeset	1447	Goal "(xs,[]) ~: lex r";
5318 72bf8039b53f expandshort paulson parents: 5316 diff changeset	1448	by (simp_tac (simpset() addsimps [lex_conv]) 1);
5283 0027ddfbc831 More lemmas about lex. nipkow parents: 5281 diff changeset	1449	qed "Nil2_notin_lex";
0027ddfbc831 More lemmas about lex. nipkow parents: 5281 diff changeset	1450
0027ddfbc831 More lemmas about lex. nipkow parents: 5281 diff changeset	1451	AddIffs [Nil_notin_lex,Nil2_notin_lex];
0027ddfbc831 More lemmas about lex. nipkow parents: 5281 diff changeset	1452
0027ddfbc831 More lemmas about lex. nipkow parents: 5281 diff changeset	1453	Goal "((x#xs,y#ys) : lex r) = \
0027ddfbc831 More lemmas about lex. nipkow parents: 5281 diff changeset	1454	\ ((x,y) : r & length xs = length ys \| x=y & (xs,ys) : lex r)";
5318 72bf8039b53f expandshort paulson parents: 5316 diff changeset	1455	by (simp_tac (simpset() addsimps [lex_conv]) 1);
72bf8039b53f expandshort paulson parents: 5316 diff changeset	1456	by (rtac iffI 1);
72bf8039b53f expandshort paulson parents: 5316 diff changeset	1457	by (blast_tac (claset() addIs [Cons_eq_appendI]) 2);
72bf8039b53f expandshort paulson parents: 5316 diff changeset	1458	by (REPEAT(eresolve_tac [conjE, exE] 1));
72bf8039b53f expandshort paulson parents: 5316 diff changeset	1459	by (exhaust_tac "xys" 1);
72bf8039b53f expandshort paulson parents: 5316 diff changeset	1460	by (Asm_full_simp_tac 1);
72bf8039b53f expandshort paulson parents: 5316 diff changeset	1461	by (Asm_full_simp_tac 1);
72bf8039b53f expandshort paulson parents: 5316 diff changeset	1462	by (Blast_tac 1);
5283 0027ddfbc831 More lemmas about lex. nipkow parents: 5281 diff changeset	1463	qed "Cons_in_lex";
0027ddfbc831 More lemmas about lex. nipkow parents: 5281 diff changeset	1464	AddIffs [Cons_in_lex];
7032 d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: 7028 diff changeset	1465
d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: 7028 diff changeset	1466
d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: 7028 diff changeset	1467	(* Versions of some theorems above using binary numerals *)
d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: 7028 diff changeset	1468
d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: 7028 diff changeset	1469	AddIffs (map (rename_numerals thy)
d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: 7028 diff changeset	1470	[length_0_conv, zero_length_conv, length_greater_0_conv,
d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: 7028 diff changeset	1471	sum_eq_0_conv]);
d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: 7028 diff changeset	1472
d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: 7028 diff changeset	1473	Goal "take n (x#xs) = (if n = #0 then [] else x # take (n-#1) xs)";
d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: 7028 diff changeset	1474	by (exhaust_tac "n" 1);
d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: 7028 diff changeset	1475	by (ALLGOALS
d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: 7028 diff changeset	1476	(asm_simp_tac (simpset() addsimps [numeral_0_eq_0, numeral_1_eq_1])));
d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: 7028 diff changeset	1477	qed "take_Cons'";
d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: 7028 diff changeset	1478
d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: 7028 diff changeset	1479	Goal "drop n (x#xs) = (if n = #0 then x#xs else drop (n-#1) xs)";
d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: 7028 diff changeset	1480	by (exhaust_tac "n" 1);
d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: 7028 diff changeset	1481	by (ALLGOALS
d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: 7028 diff changeset	1482	(asm_simp_tac (simpset() addsimps [numeral_0_eq_0, numeral_1_eq_1])));
d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: 7028 diff changeset	1483	qed "drop_Cons'";
d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: 7028 diff changeset	1484
d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: 7028 diff changeset	1485	Goal "(x#xs)!n = (if n = #0 then x else xs!(n-#1))";
d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: 7028 diff changeset	1486	by (exhaust_tac "n" 1);
d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: 7028 diff changeset	1487	by (ALLGOALS
d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: 7028 diff changeset	1488	(asm_simp_tac (simpset() addsimps [numeral_0_eq_0, numeral_1_eq_1])));
d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: 7028 diff changeset	1489	qed "nth_Cons'";
d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: 7028 diff changeset	1490
d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: 7028 diff changeset	1491	Addsimps (map (inst "n" "number_of ?v") [take_Cons', drop_Cons', nth_Cons']);
d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: 7028 diff changeset	1492

author	nipkow
	Wed, 26 Jan 2000 11:04:38 +0100
changeset 8144	c4b5cbfb90dd
parent 8118	746c5cf09bde
child 8254	84a5fe44520f
permissions	-rw-r--r--