isabelle: src/HOL/Nat.thy@cc2b490f9dc4 (annotated)

923 ff1574a81019 new version of HOL with curried function application clasohm parents: diff changeset	1	(* Title: HOL/Nat.thy
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2	Author: Tobias Nipkow
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	3	Author: Lawrence C Paulson
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	4	Author: Markus Wenzel
923 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
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	7	section \<open>Natural numbers\<close>
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	8
15131 c69542757a4d New theory header syntax. nipkow parents: 14740 diff changeset	9	theory Nat
64447 e44f5c123f26 added lemma nipkow parents: 63979 diff changeset	10	imports Inductive Typedef Fun Rings
15131 c69542757a4d New theory header syntax. nipkow parents: 14740 diff changeset	11	begin
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	12
61799 4cf66f21b764 isabelle update_cartouches -c -t; wenzelm parents: 61649 diff changeset	13	subsection \<open>Type \<open>ind\<close>\<close>
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	14
43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	15	typedecl ind
43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	16
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	17	axiomatization Zero_Rep :: ind and Suc_Rep :: "ind \<Rightarrow> ind"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	18	\<comment> \<open>The axiom of infinity in 2 parts:\<close>
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	19	where Suc_Rep_inject: "Suc_Rep x = Suc_Rep y \<Longrightarrow> x = y"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	20	and Suc_Rep_not_Zero_Rep: "Suc_Rep x \<noteq> Zero_Rep"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	21
19573 340c466c9605 axiomatization; wenzelm parents: 18702 diff changeset	22
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	23	subsection \<open>Type nat\<close>
d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	24
d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	25	text \<open>Type definition\<close>
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	26
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	27	inductive Nat :: "ind \<Rightarrow> bool"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	28	where
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	29	Zero_RepI: "Nat Zero_Rep"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	30	\| Suc_RepI: "Nat i \<Longrightarrow> Nat (Suc_Rep i)"
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	31
49834 b27bbb021df1 discontinued obsolete typedef (open) syntax; wenzelm parents: 49723 diff changeset	32	typedef nat = "{n. Nat n}"
45696 476ad865f125 prefer typedef without alternative name; wenzelm parents: 45231 diff changeset	33	morphisms Rep_Nat Abs_Nat
44278 1220ecb81e8f observe distinction between sets and predicates more properly haftmann parents: 43595 diff changeset	34	using Nat.Zero_RepI by auto
1220ecb81e8f observe distinction between sets and predicates more properly haftmann parents: 43595 diff changeset	35
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	36	lemma Nat_Rep_Nat: "Nat (Rep_Nat n)"
44278 1220ecb81e8f observe distinction between sets and predicates more properly haftmann parents: 43595 diff changeset	37	using Rep_Nat by simp
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	38
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	39	lemma Nat_Abs_Nat_inverse: "Nat n \<Longrightarrow> Rep_Nat (Abs_Nat n) = n"
44278 1220ecb81e8f observe distinction between sets and predicates more properly haftmann parents: 43595 diff changeset	40	using Abs_Nat_inverse by simp
1220ecb81e8f observe distinction between sets and predicates more properly haftmann parents: 43595 diff changeset	41
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	42	lemma Nat_Abs_Nat_inject: "Nat n \<Longrightarrow> Nat m \<Longrightarrow> Abs_Nat n = Abs_Nat m \<longleftrightarrow> n = m"
44278 1220ecb81e8f observe distinction between sets and predicates more properly haftmann parents: 43595 diff changeset	43	using Abs_Nat_inject by simp
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	44
25510 38c15efe603b adjustions to due to instance target haftmann parents: 25502 diff changeset	45	instantiation nat :: zero
38c15efe603b adjustions to due to instance target haftmann parents: 25502 diff changeset	46	begin
38c15efe603b adjustions to due to instance target haftmann parents: 25502 diff changeset	47
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	48	definition Zero_nat_def: "0 = Abs_Nat Zero_Rep"
25510 38c15efe603b adjustions to due to instance target haftmann parents: 25502 diff changeset	49
38c15efe603b adjustions to due to instance target haftmann parents: 25502 diff changeset	50	instance ..
38c15efe603b adjustions to due to instance target haftmann parents: 25502 diff changeset	51
38c15efe603b adjustions to due to instance target haftmann parents: 25502 diff changeset	52	end
24995 c26e0166e568 refined; moved class power to theory Power haftmann parents: 24729 diff changeset	53
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	54	definition Suc :: "nat \<Rightarrow> nat"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	55	where "Suc n = Abs_Nat (Suc_Rep (Rep_Nat n))"
44278 1220ecb81e8f observe distinction between sets and predicates more properly haftmann parents: 43595 diff changeset	56
27104 791607529f6d rep_datatype command now takes list of constructors as input arguments haftmann parents: 26748 diff changeset	57	lemma Suc_not_Zero: "Suc m \<noteq> 0"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	58	by (simp add: Zero_nat_def Suc_def Suc_RepI Zero_RepI
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	59	Nat_Abs_Nat_inject Suc_Rep_not_Zero_Rep Nat_Rep_Nat)
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	60
27104 791607529f6d rep_datatype command now takes list of constructors as input arguments haftmann parents: 26748 diff changeset	61	lemma Zero_not_Suc: "0 \<noteq> Suc m"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	62	by (rule not_sym) (rule Suc_not_Zero)
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	63
34208 a7acd6c68d9b more regular axiom of infinity, with no (indirect) reference to overloaded constants krauss parents: 33657 diff changeset	64	lemma Suc_Rep_inject': "Suc_Rep x = Suc_Rep y \<longleftrightarrow> x = y"
a7acd6c68d9b more regular axiom of infinity, with no (indirect) reference to overloaded constants krauss parents: 33657 diff changeset	65	by (rule iffI, rule Suc_Rep_inject) simp_all
a7acd6c68d9b more regular axiom of infinity, with no (indirect) reference to overloaded constants krauss parents: 33657 diff changeset	66
55417 01fbfb60c33e adapted to 'xxx_{case,rec}' renaming, to new theorem names, and to new variable names in theorems blanchet parents: 55415 diff changeset	67	lemma nat_induct0:
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	68	assumes "P 0"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	69	and "\<And>n. P n \<Longrightarrow> P (Suc n)"
55417 01fbfb60c33e adapted to 'xxx_{case,rec}' renaming, to new theorem names, and to new variable names in theorems blanchet parents: 55415 diff changeset	70	shows "P n"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	71	using assms
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	72	apply (unfold Zero_nat_def Suc_def)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	73	apply (rule Rep_Nat_inverse [THEN subst]) \<comment> \<open>types force good instantiation\<close>
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	74	apply (erule Nat_Rep_Nat [THEN Nat.induct])
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	75	apply (iprover elim: Nat_Abs_Nat_inverse [THEN subst])
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	76	done
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	77
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	78	free_constructors case_nat for "0 :: nat" \| Suc pred
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	79	where "pred (0 :: nat) = (0 :: nat)"
58189 9d714be4f028 added 'plugins' option to control which hooks are enabled blanchet parents: 57983 diff changeset	80	apply atomize_elim
9d714be4f028 added 'plugins' option to control which hooks are enabled blanchet parents: 57983 diff changeset	81	apply (rename_tac n, induct_tac n rule: nat_induct0, auto)
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	82	apply (simp add: Suc_def Nat_Abs_Nat_inject Nat_Rep_Nat Suc_RepI Suc_Rep_inject' Rep_Nat_inject)
58189 9d714be4f028 added 'plugins' option to control which hooks are enabled blanchet parents: 57983 diff changeset	83	apply (simp only: Suc_not_Zero)
9d714be4f028 added 'plugins' option to control which hooks are enabled blanchet parents: 57983 diff changeset	84	done
55417 01fbfb60c33e adapted to 'xxx_{case,rec}' renaming, to new theorem names, and to new variable names in theorems blanchet parents: 55415 diff changeset	85
61799 4cf66f21b764 isabelle update_cartouches -c -t; wenzelm parents: 61649 diff changeset	86	\<comment> \<open>Avoid name clashes by prefixing the output of \<open>old_rep_datatype\<close> with \<open>old\<close>.\<close>
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	87	setup \<open>Sign.mandatory_path "old"\<close>
55417 01fbfb60c33e adapted to 'xxx_{case,rec}' renaming, to new theorem names, and to new variable names in theorems blanchet parents: 55415 diff changeset	88
61076 bdc1e2f0a86a eliminated \<Colon>; wenzelm parents: 61070 diff changeset	89	old_rep_datatype "0 :: nat" Suc
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	90	apply (erule nat_induct0)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	91	apply assumption
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	92	apply (rule nat.inject)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	93	apply (rule nat.distinct(1))
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	94	done
55417 01fbfb60c33e adapted to 'xxx_{case,rec}' renaming, to new theorem names, and to new variable names in theorems blanchet parents: 55415 diff changeset	95
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	96	setup \<open>Sign.parent_path\<close>
d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	97
61799 4cf66f21b764 isabelle update_cartouches -c -t; wenzelm parents: 61649 diff changeset	98	\<comment> \<open>But erase the prefix for properties that are not generated by \<open>free_constructors\<close>.\<close>
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	99	setup \<open>Sign.mandatory_path "nat"\<close>
55417 01fbfb60c33e adapted to 'xxx_{case,rec}' renaming, to new theorem names, and to new variable names in theorems blanchet parents: 55415 diff changeset	100
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	101	declare old.nat.inject[iff del]
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	102	and old.nat.distinct(1)[simp del, induct_simp del]
55417 01fbfb60c33e adapted to 'xxx_{case,rec}' renaming, to new theorem names, and to new variable names in theorems blanchet parents: 55415 diff changeset	103
01fbfb60c33e adapted to 'xxx_{case,rec}' renaming, to new theorem names, and to new variable names in theorems blanchet parents: 55415 diff changeset	104	lemmas induct = old.nat.induct
01fbfb60c33e adapted to 'xxx_{case,rec}' renaming, to new theorem names, and to new variable names in theorems blanchet parents: 55415 diff changeset	105	lemmas inducts = old.nat.inducts
55642 63beb38e9258 adapted to renaming of datatype 'cases' and 'recs' to 'case' and 'rec' blanchet parents: 55575 diff changeset	106	lemmas rec = old.nat.rec
63beb38e9258 adapted to renaming of datatype 'cases' and 'recs' to 'case' and 'rec' blanchet parents: 55575 diff changeset	107	lemmas simps = nat.inject nat.distinct nat.case nat.rec
55417 01fbfb60c33e adapted to 'xxx_{case,rec}' renaming, to new theorem names, and to new variable names in theorems blanchet parents: 55415 diff changeset	108
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	109	setup \<open>Sign.parent_path\<close>
55417 01fbfb60c33e adapted to 'xxx_{case,rec}' renaming, to new theorem names, and to new variable names in theorems blanchet parents: 55415 diff changeset	110
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	111	abbreviation rec_nat :: "'a \<Rightarrow> (nat \<Rightarrow> 'a \<Rightarrow> 'a) \<Rightarrow> nat \<Rightarrow> 'a"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	112	where "rec_nat \<equiv> old.rec_nat"
55417 01fbfb60c33e adapted to 'xxx_{case,rec}' renaming, to new theorem names, and to new variable names in theorems blanchet parents: 55415 diff changeset	113
55424 9ab4129a76a3 remove hidden fact about hidden constant from code generator setup blanchet parents: 55423 diff changeset	114	declare nat.sel[code del]
9ab4129a76a3 remove hidden fact about hidden constant from code generator setup blanchet parents: 55423 diff changeset	115
61799 4cf66f21b764 isabelle update_cartouches -c -t; wenzelm parents: 61649 diff changeset	116	hide_const (open) Nat.pred \<comment> \<open>hide everything related to the selector\<close>
55417 01fbfb60c33e adapted to 'xxx_{case,rec}' renaming, to new theorem names, and to new variable names in theorems blanchet parents: 55415 diff changeset	117	hide_fact
01fbfb60c33e adapted to 'xxx_{case,rec}' renaming, to new theorem names, and to new variable names in theorems blanchet parents: 55415 diff changeset	118	nat.case_eq_if
01fbfb60c33e adapted to 'xxx_{case,rec}' renaming, to new theorem names, and to new variable names in theorems blanchet parents: 55415 diff changeset	119	nat.collapse
01fbfb60c33e adapted to 'xxx_{case,rec}' renaming, to new theorem names, and to new variable names in theorems blanchet parents: 55415 diff changeset	120	nat.expand
01fbfb60c33e adapted to 'xxx_{case,rec}' renaming, to new theorem names, and to new variable names in theorems blanchet parents: 55415 diff changeset	121	nat.sel
57983 6edc3529bb4e reordered some (co)datatype property names for more consistency blanchet parents: 57952 diff changeset	122	nat.exhaust_sel
6edc3529bb4e reordered some (co)datatype property names for more consistency blanchet parents: 57952 diff changeset	123	nat.split_sel
6edc3529bb4e reordered some (co)datatype property names for more consistency blanchet parents: 57952 diff changeset	124	nat.split_sel_asm
55417 01fbfb60c33e adapted to 'xxx_{case,rec}' renaming, to new theorem names, and to new variable names in theorems blanchet parents: 55415 diff changeset	125
01fbfb60c33e adapted to 'xxx_{case,rec}' renaming, to new theorem names, and to new variable names in theorems blanchet parents: 55415 diff changeset	126	lemma nat_exhaust [case_names 0 Suc, cases type: nat]:
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	127	"(y = 0 \<Longrightarrow> P) \<Longrightarrow> (\<And>nat. y = Suc nat \<Longrightarrow> P) \<Longrightarrow> P"
61799 4cf66f21b764 isabelle update_cartouches -c -t; wenzelm parents: 61649 diff changeset	128	\<comment> \<open>for backward compatibility -- names of variables differ\<close>
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	129	by (rule old.nat.exhaust)
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	130
27104 791607529f6d rep_datatype command now takes list of constructors as input arguments haftmann parents: 26748 diff changeset	131	lemma nat_induct [case_names 0 Suc, induct type: nat]:
791607529f6d rep_datatype command now takes list of constructors as input arguments haftmann parents: 26748 diff changeset	132	fixes n
55417 01fbfb60c33e adapted to 'xxx_{case,rec}' renaming, to new theorem names, and to new variable names in theorems blanchet parents: 55415 diff changeset	133	assumes "P 0" and "\<And>n. P n \<Longrightarrow> P (Suc n)"
27104 791607529f6d rep_datatype command now takes list of constructors as input arguments haftmann parents: 26748 diff changeset	134	shows "P n"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	135	\<comment> \<open>for backward compatibility -- names of variables differ\<close>
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	136	using assms by (rule nat.induct)
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	137
55417 01fbfb60c33e adapted to 'xxx_{case,rec}' renaming, to new theorem names, and to new variable names in theorems blanchet parents: 55415 diff changeset	138	hide_fact
01fbfb60c33e adapted to 'xxx_{case,rec}' renaming, to new theorem names, and to new variable names in theorems blanchet parents: 55415 diff changeset	139	nat_exhaust
01fbfb60c33e adapted to 'xxx_{case,rec}' renaming, to new theorem names, and to new variable names in theorems blanchet parents: 55415 diff changeset	140	nat_induct0
24995 c26e0166e568 refined; moved class power to theory Power haftmann parents: 24729 diff changeset	141
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	142	ML \<open>
58389 ee1f45ca0d73 made new 'primrec' bootstrapping-capable blanchet parents: 58377 diff changeset	143	val nat_basic_lfp_sugar =
ee1f45ca0d73 made new 'primrec' bootstrapping-capable blanchet parents: 58377 diff changeset	144	let
ee1f45ca0d73 made new 'primrec' bootstrapping-capable blanchet parents: 58377 diff changeset	145	val ctr_sugar = the (Ctr_Sugar.ctr_sugar_of_global @{theory} @{type_name nat});
ee1f45ca0d73 made new 'primrec' bootstrapping-capable blanchet parents: 58377 diff changeset	146	val recx = Logic.varify_types_global @{term rec_nat};
ee1f45ca0d73 made new 'primrec' bootstrapping-capable blanchet parents: 58377 diff changeset	147	val C = body_type (fastype_of recx);
ee1f45ca0d73 made new 'primrec' bootstrapping-capable blanchet parents: 58377 diff changeset	148	in
ee1f45ca0d73 made new 'primrec' bootstrapping-capable blanchet parents: 58377 diff changeset	149	{T = HOLogic.natT, fp_res_index = 0, C = C, fun_arg_Tsss = [[], [[HOLogic.natT, C]]],
ee1f45ca0d73 made new 'primrec' bootstrapping-capable blanchet parents: 58377 diff changeset	150	ctr_sugar = ctr_sugar, recx = recx, rec_thms = @{thms nat.rec}}
ee1f45ca0d73 made new 'primrec' bootstrapping-capable blanchet parents: 58377 diff changeset	151	end;
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	152	\<close>
d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	153
d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	154	setup \<open>
58389 ee1f45ca0d73 made new 'primrec' bootstrapping-capable blanchet parents: 58377 diff changeset	155	let
ee1f45ca0d73 made new 'primrec' bootstrapping-capable blanchet parents: 58377 diff changeset	156	fun basic_lfp_sugars_of _ [@{typ nat}] _ _ ctxt =
62326 3cf7a067599c allow predicator instead of map function in 'primrec' blanchet parents: 62217 diff changeset	157	([], [0], [nat_basic_lfp_sugar], [], [], [], TrueI (dummy), [], false, ctxt)
58389 ee1f45ca0d73 made new 'primrec' bootstrapping-capable blanchet parents: 58377 diff changeset	158	\| basic_lfp_sugars_of bs arg_Ts callers callssss ctxt =
ee1f45ca0d73 made new 'primrec' bootstrapping-capable blanchet parents: 58377 diff changeset	159	BNF_LFP_Rec_Sugar.default_basic_lfp_sugars_of bs arg_Ts callers callssss ctxt;
ee1f45ca0d73 made new 'primrec' bootstrapping-capable blanchet parents: 58377 diff changeset	160	in
ee1f45ca0d73 made new 'primrec' bootstrapping-capable blanchet parents: 58377 diff changeset	161	BNF_LFP_Rec_Sugar.register_lfp_rec_extension
66290 88714f2e40e8 strengthened tactic blanchet parents: 65965 diff changeset	162	{nested_simps = [], special_endgame_tac = K (K (K (K no_tac))), is_new_datatype = K (K true),
88714f2e40e8 strengthened tactic blanchet parents: 65965 diff changeset	163	basic_lfp_sugars_of = basic_lfp_sugars_of, rewrite_nested_rec_call = NONE}
58389 ee1f45ca0d73 made new 'primrec' bootstrapping-capable blanchet parents: 58377 diff changeset	164	end
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	165	\<close>
d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	166
d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	167	text \<open>Injectiveness and distinctness lemmas\<close>
24995 c26e0166e568 refined; moved class power to theory Power haftmann parents: 24729 diff changeset	168
64849 766db3539859 moved some lemmas to appropriate places haftmann parents: 64712 diff changeset	169	lemma (in semidom_divide) inj_times:
766db3539859 moved some lemmas to appropriate places haftmann parents: 64712 diff changeset	170	"inj (times a)" if "a \<noteq> 0"
766db3539859 moved some lemmas to appropriate places haftmann parents: 64712 diff changeset	171	proof (rule injI)
766db3539859 moved some lemmas to appropriate places haftmann parents: 64712 diff changeset	172	fix b c
766db3539859 moved some lemmas to appropriate places haftmann parents: 64712 diff changeset	173	assume "a * b = a * c"
766db3539859 moved some lemmas to appropriate places haftmann parents: 64712 diff changeset	174	then have "a * b div a = a * c div a"
766db3539859 moved some lemmas to appropriate places haftmann parents: 64712 diff changeset	175	by (simp only:)
766db3539859 moved some lemmas to appropriate places haftmann parents: 64712 diff changeset	176	with that show "b = c"
766db3539859 moved some lemmas to appropriate places haftmann parents: 64712 diff changeset	177	by simp
766db3539859 moved some lemmas to appropriate places haftmann parents: 64712 diff changeset	178	qed
766db3539859 moved some lemmas to appropriate places haftmann parents: 64712 diff changeset	179
766db3539859 moved some lemmas to appropriate places haftmann parents: 64712 diff changeset	180	lemma (in cancel_ab_semigroup_add) inj_plus:
766db3539859 moved some lemmas to appropriate places haftmann parents: 64712 diff changeset	181	"inj (plus a)"
766db3539859 moved some lemmas to appropriate places haftmann parents: 64712 diff changeset	182	proof (rule injI)
766db3539859 moved some lemmas to appropriate places haftmann parents: 64712 diff changeset	183	fix b c
766db3539859 moved some lemmas to appropriate places haftmann parents: 64712 diff changeset	184	assume "a + b = a + c"
766db3539859 moved some lemmas to appropriate places haftmann parents: 64712 diff changeset	185	then have "a + b - a = a + c - a"
766db3539859 moved some lemmas to appropriate places haftmann parents: 64712 diff changeset	186	by (simp only:)
766db3539859 moved some lemmas to appropriate places haftmann parents: 64712 diff changeset	187	then show "b = c"
766db3539859 moved some lemmas to appropriate places haftmann parents: 64712 diff changeset	188	by simp
766db3539859 moved some lemmas to appropriate places haftmann parents: 64712 diff changeset	189	qed
766db3539859 moved some lemmas to appropriate places haftmann parents: 64712 diff changeset	190
27104 791607529f6d rep_datatype command now takes list of constructors as input arguments haftmann parents: 26748 diff changeset	191	lemma inj_Suc[simp]: "inj_on Suc N"
791607529f6d rep_datatype command now takes list of constructors as input arguments haftmann parents: 26748 diff changeset	192	by (simp add: inj_on_def)
791607529f6d rep_datatype command now takes list of constructors as input arguments haftmann parents: 26748 diff changeset	193
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	194	lemma Suc_neq_Zero: "Suc m = 0 \<Longrightarrow> R"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	195	by (rule notE) (rule Suc_not_Zero)
24995 c26e0166e568 refined; moved class power to theory Power haftmann parents: 24729 diff changeset	196
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	197	lemma Zero_neq_Suc: "0 = Suc m \<Longrightarrow> R"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	198	by (rule Suc_neq_Zero) (erule sym)
24995 c26e0166e568 refined; moved class power to theory Power haftmann parents: 24729 diff changeset	199
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	200	lemma Suc_inject: "Suc x = Suc y \<Longrightarrow> x = y"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	201	by (rule inj_Suc [THEN injD])
24995 c26e0166e568 refined; moved class power to theory Power haftmann parents: 24729 diff changeset	202
14267 b963e9cee2a0 More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas paulson parents: 14266 diff changeset	203	lemma n_not_Suc_n: "n \<noteq> Suc n"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	204	by (induct n) simp_all
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	205
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	206	lemma Suc_n_not_n: "Suc n \<noteq> n"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	207	by (rule not_sym) (rule n_not_Suc_n)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	208
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	209	text \<open>A special form of induction for reasoning about @{term "m < n"} and @{term "m - n"}.\<close>
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	210	lemma diff_induct:
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	211	assumes "\<And>x. P x 0"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	212	and "\<And>y. P 0 (Suc y)"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	213	and "\<And>x y. P x y \<Longrightarrow> P (Suc x) (Suc y)"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	214	shows "P m n"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	215	proof (induct n arbitrary: m)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	216	case 0
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	217	show ?case by (rule assms(1))
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	218	next
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	219	case (Suc n)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	220	show ?case
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	221	proof (induct m)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	222	case 0
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	223	show ?case by (rule assms(2))
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	224	next
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	225	case (Suc m)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	226	from \<open>P m n\<close> show ?case by (rule assms(3))
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	227	qed
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	228	qed
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	229
24995 c26e0166e568 refined; moved class power to theory Power haftmann parents: 24729 diff changeset	230
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	231	subsection \<open>Arithmetic operators\<close>
24995 c26e0166e568 refined; moved class power to theory Power haftmann parents: 24729 diff changeset	232
49388 1ffd5a055acf typeclass formalising bounded subtraction haftmann parents: 48891 diff changeset	233	instantiation nat :: comm_monoid_diff
25571 c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25563 diff changeset	234	begin
24995 c26e0166e568 refined; moved class power to theory Power haftmann parents: 24729 diff changeset	235
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	236	primrec plus_nat
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	237	where
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	238	add_0: "0 + n = (n::nat)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	239	\| add_Suc: "Suc m + n = Suc (m + n)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	240
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	241	lemma add_0_right [simp]: "m + 0 = m"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	242	for m :: nat
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	243	by (induct m) simp_all
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	244
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	245	lemma add_Suc_right [simp]: "m + Suc n = Suc (m + n)"
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	246	by (induct m) simp_all
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	247
28514 da83a614c454 tuned of_nat code generation haftmann parents: 27823 diff changeset	248	declare add_0 [code]
da83a614c454 tuned of_nat code generation haftmann parents: 27823 diff changeset	249
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	250	lemma add_Suc_shift [code]: "Suc m + n = m + Suc n"
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	251	by simp
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	252
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	253	primrec minus_nat
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	254	where
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	255	diff_0 [code]: "m - 0 = (m::nat)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	256	\| diff_Suc: "m - Suc n = (case m - n of 0 \<Rightarrow> 0 \| Suc k \<Rightarrow> k)"
24995 c26e0166e568 refined; moved class power to theory Power haftmann parents: 24729 diff changeset	257
28514 da83a614c454 tuned of_nat code generation haftmann parents: 27823 diff changeset	258	declare diff_Suc [simp del]
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	259
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	260	lemma diff_0_eq_0 [simp, code]: "0 - n = 0"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	261	for n :: nat
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	262	by (induct n) (simp_all add: diff_Suc)
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	263
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	264	lemma diff_Suc_Suc [simp, code]: "Suc m - Suc n = m - n"
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	265	by (induct n) (simp_all add: diff_Suc)
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	266
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	267	instance
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	268	proof
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	269	fix n m q :: nat
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	270	show "(n + m) + q = n + (m + q)" by (induct n) simp_all
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	271	show "n + m = m + n" by (induct n) simp_all
59815 cce82e360c2f explicit commutative additive inverse operation; haftmann parents: 59582 diff changeset	272	show "m + n - m = n" by (induct m) simp_all
cce82e360c2f explicit commutative additive inverse operation; haftmann parents: 59582 diff changeset	273	show "n - m - q = n - (m + q)" by (induct q) (simp_all add: diff_Suc)
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	274	show "0 + n = n" by simp
49388 1ffd5a055acf typeclass formalising bounded subtraction haftmann parents: 48891 diff changeset	275	show "0 - n = 0" by simp
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	276	qed
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	277
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	278	end
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	279
36176 3fe7e97ccca8 replaced generic 'hide' command by more conventional 'hide_class', 'hide_type', 'hide_const', 'hide_fact' -- frees some popular keywords; wenzelm parents: 35828 diff changeset	280	hide_fact (open) add_0 add_0_right diff_0
35047 1b2bae06c796 hide fact Nat.add_0_right; make add_0_right from Groups priority haftmann parents: 35028 diff changeset	281
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	282	instantiation nat :: comm_semiring_1_cancel
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	283	begin
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	284
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	285	definition One_nat_def [simp]: "1 = Suc 0"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	286
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	287	primrec times_nat
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	288	where
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	289	mult_0: "0 * n = (0::nat)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	290	\| mult_Suc: "Suc m * n = n + (m * n)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	291
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	292	lemma mult_0_right [simp]: "m * 0 = 0"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	293	for m :: nat
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	294	by (induct m) simp_all
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	295
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	296	lemma mult_Suc_right [simp]: "m * Suc n = m + (m * n)"
57512 cc97b347b301 reduced name variants for assoc and commute on plus and mult haftmann parents: 57492 diff changeset	297	by (induct m) (simp_all add: add.left_commute)
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	298
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	299	lemma add_mult_distrib: "(m + n) * k = (m * k) + (n * k)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	300	for m n k :: nat
57512 cc97b347b301 reduced name variants for assoc and commute on plus and mult haftmann parents: 57492 diff changeset	301	by (induct m) (simp_all add: add.assoc)
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	302
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	303	instance
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	304	proof
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	305	fix k n m q :: nat
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	306	show "0 \<noteq> (1::nat)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	307	by simp
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	308	show "1 * n = n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	309	by simp
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	310	show "n * m = m * n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	311	by (induct n) simp_all
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	312	show "(n * m) * q = n * (m * q)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	313	by (induct n) (simp_all add: add_mult_distrib)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	314	show "(n + m) * q = n * q + m * q"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	315	by (rule add_mult_distrib)
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	316	show "k * (m - n) = (k * m) - (k * n)"
60562 24af00b010cf Amalgamation of the class comm_semiring_1_diff_distrib into comm_semiring_1_cancel. Moving axiom le_add_diff_inverse2 from semiring_numeral_div to linordered_semidom. paulson <lp15@cam.ac.uk> parents: 60427 diff changeset	317	by (induct m n rule: diff_induct) simp_all
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	318	qed
25571 c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25563 diff changeset	319
c9e39eafc7a0 instantiation target rather than legacy instance haftmann parents: 25563 diff changeset	320	end
24995 c26e0166e568 refined; moved class power to theory Power haftmann parents: 24729 diff changeset	321
60562 24af00b010cf Amalgamation of the class comm_semiring_1_diff_distrib into comm_semiring_1_cancel. Moving axiom le_add_diff_inverse2 from semiring_numeral_div to linordered_semidom. paulson <lp15@cam.ac.uk> parents: 60427 diff changeset	322
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	323	subsubsection \<open>Addition\<close>
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	324
61799 4cf66f21b764 isabelle update_cartouches -c -t; wenzelm parents: 61649 diff changeset	325	text \<open>Reasoning about \<open>m + 0 = 0\<close>, etc.\<close>
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	326
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	327	lemma add_is_0 [iff]: "m + n = 0 \<longleftrightarrow> m = 0 \<and> n = 0"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	328	for m n :: nat
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	329	by (cases m) simp_all
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	330
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	331	lemma add_is_1: "m + n = Suc 0 \<longleftrightarrow> m = Suc 0 \<and> n = 0 \| m = 0 \<and> n = Suc 0"
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	332	by (cases m) simp_all
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	333
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	334	lemma one_is_add: "Suc 0 = m + n \<longleftrightarrow> m = Suc 0 \<and> n = 0 \| m = 0 \<and> n = Suc 0"
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	335	by (rule trans, rule eq_commute, rule add_is_1)
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	336
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	337	lemma add_eq_self_zero: "m + n = m \<Longrightarrow> n = 0"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	338	for m n :: nat
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	339	by (induct m) simp_all
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	340
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	341	lemma inj_on_add_nat [simp]: "inj_on (\<lambda>n. n + k) N"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	342	for k :: nat
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	343	proof (induct k)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	344	case 0
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	345	then show ?case by simp
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	346	next
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	347	case (Suc k)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	348	show ?case
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	349	using comp_inj_on [OF Suc inj_Suc] by (simp add: o_def)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	350	qed
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	351
47208 9a91b163bb71 move lemmas from Nat_Numeral.thy to Nat.thy huffman parents: 47108 diff changeset	352	lemma Suc_eq_plus1: "Suc n = n + 1"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	353	by simp
47208 9a91b163bb71 move lemmas from Nat_Numeral.thy to Nat.thy huffman parents: 47108 diff changeset	354
9a91b163bb71 move lemmas from Nat_Numeral.thy to Nat.thy huffman parents: 47108 diff changeset	355	lemma Suc_eq_plus1_left: "Suc n = 1 + n"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	356	by simp
47208 9a91b163bb71 move lemmas from Nat_Numeral.thy to Nat.thy huffman parents: 47108 diff changeset	357
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	358
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	359	subsubsection \<open>Difference\<close>
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	360
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	361	lemma Suc_diff_diff [simp]: "(Suc m - n) - Suc k = m - n - k"
62365 8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	362	by (simp add: diff_diff_add)
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	363
30093 ecb557b021b2 add lemma diff_Suc_1 huffman parents: 30079 diff changeset	364	lemma diff_Suc_1 [simp]: "Suc n - 1 = n"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	365	by simp
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	366
30093 ecb557b021b2 add lemma diff_Suc_1 huffman parents: 30079 diff changeset	367
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	368	subsubsection \<open>Multiplication\<close>
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	369
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	370	lemma mult_is_0 [simp]: "m * n = 0 \<longleftrightarrow> m = 0 \<or> n = 0" for m n :: nat
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	371	by (induct m) auto
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	372
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	373	lemma mult_eq_1_iff [simp]: "m * n = Suc 0 \<longleftrightarrow> m = Suc 0 \<and> n = Suc 0"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	374	proof (induct m)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	375	case 0
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	376	then show ?case by simp
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	377	next
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	378	case (Suc m)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	379	then show ?case by (induct n) auto
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	380	qed
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	381
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	382	lemma one_eq_mult_iff [simp]: "Suc 0 = m * n \<longleftrightarrow> m = Suc 0 \<and> n = Suc 0"
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	383	apply (rule trans)
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	384	apply (rule_tac [2] mult_eq_1_iff)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	385	apply fastforce
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	386	done
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	387
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	388	lemma nat_mult_eq_1_iff [simp]: "m * n = 1 \<longleftrightarrow> m = 1 \<and> n = 1"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	389	for m n :: nat
30079 293b896b9c25 make proofs work whether or not One_nat_def is a simp rule; replace 1 with Suc 0 in the rhs of some simp rules huffman parents: 30056 diff changeset	390	unfolding One_nat_def by (rule mult_eq_1_iff)
293b896b9c25 make proofs work whether or not One_nat_def is a simp rule; replace 1 with Suc 0 in the rhs of some simp rules huffman parents: 30056 diff changeset	391
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	392	lemma nat_1_eq_mult_iff [simp]: "1 = m * n \<longleftrightarrow> m = 1 \<and> n = 1"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	393	for m n :: nat
30079 293b896b9c25 make proofs work whether or not One_nat_def is a simp rule; replace 1 with Suc 0 in the rhs of some simp rules huffman parents: 30056 diff changeset	394	unfolding One_nat_def by (rule one_eq_mult_iff)
293b896b9c25 make proofs work whether or not One_nat_def is a simp rule; replace 1 with Suc 0 in the rhs of some simp rules huffman parents: 30056 diff changeset	395
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	396	lemma mult_cancel1 [simp]: "k * m = k * n \<longleftrightarrow> m = n \<or> k = 0"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	397	for k m n :: nat
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	398	proof -
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	399	have "k \<noteq> 0 \<Longrightarrow> k * m = k * n \<Longrightarrow> m = n"
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	400	proof (induct n arbitrary: m)
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	401	case 0
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	402	then show "m = 0" by simp
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	403	next
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	404	case (Suc n)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	405	then show "m = Suc n"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	406	by (cases m) (simp_all add: eq_commute [of 0])
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	407	qed
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	408	then show ?thesis by auto
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	409	qed
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	410
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	411	lemma mult_cancel2 [simp]: "m * k = n * k \<longleftrightarrow> m = n \<or> k = 0"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	412	for k m n :: nat
57512 cc97b347b301 reduced name variants for assoc and commute on plus and mult haftmann parents: 57492 diff changeset	413	by (simp add: mult.commute)
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	414
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	415	lemma Suc_mult_cancel1: "Suc k * m = Suc k * n \<longleftrightarrow> m = n"
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	416	by (subst mult_cancel1) simp
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	417
24995 c26e0166e568 refined; moved class power to theory Power haftmann parents: 24729 diff changeset	418
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	419	subsection \<open>Orders on @{typ nat}\<close>
d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	420
d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	421	subsubsection \<open>Operation definition\<close>
24995 c26e0166e568 refined; moved class power to theory Power haftmann parents: 24729 diff changeset	422
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	423	instantiation nat :: linorder
25510 38c15efe603b adjustions to due to instance target haftmann parents: 25502 diff changeset	424	begin
38c15efe603b adjustions to due to instance target haftmann parents: 25502 diff changeset	425
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	426	primrec less_eq_nat
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	427	where
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	428	"(0::nat) \<le> n \<longleftrightarrow> True"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	429	\| "Suc m \<le> n \<longleftrightarrow> (case n of 0 \<Rightarrow> False \| Suc n \<Rightarrow> m \<le> n)"
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	430
28514 da83a614c454 tuned of_nat code generation haftmann parents: 27823 diff changeset	431	declare less_eq_nat.simps [simp del]
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	432
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	433	lemma le0 [iff]: "0 \<le> n" for
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	434	n :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	435	by (simp add: less_eq_nat.simps)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	436
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	437	lemma [code]: "0 \<le> n \<longleftrightarrow> True"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	438	for n :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	439	by simp
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	440
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	441	definition less_nat
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	442	where less_eq_Suc_le: "n < m \<longleftrightarrow> Suc n \<le> m"
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	443
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	444	lemma Suc_le_mono [iff]: "Suc n \<le> Suc m \<longleftrightarrow> n \<le> m"
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	445	by (simp add: less_eq_nat.simps(2))
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	446
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	447	lemma Suc_le_eq [code]: "Suc m \<le> n \<longleftrightarrow> m < n"
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	448	unfolding less_eq_Suc_le ..
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	449
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	450	lemma le_0_eq [iff]: "n \<le> 0 \<longleftrightarrow> n = 0"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	451	for n :: nat
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	452	by (induct n) (simp_all add: less_eq_nat.simps(2))
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	453
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	454	lemma not_less0 [iff]: "\<not> n < 0"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	455	for n :: nat
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	456	by (simp add: less_eq_Suc_le)
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	457
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	458	lemma less_nat_zero_code [code]: "n < 0 \<longleftrightarrow> False"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	459	for n :: nat
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	460	by simp
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	461
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	462	lemma Suc_less_eq [iff]: "Suc m < Suc n \<longleftrightarrow> m < n"
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	463	by (simp add: less_eq_Suc_le)
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	464
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	465	lemma less_Suc_eq_le [code]: "m < Suc n \<longleftrightarrow> m \<le> n"
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	466	by (simp add: less_eq_Suc_le)
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	467
56194 9ffbb4004c81 fix HOL-NSA; move lemmas hoelzl parents: 56020 diff changeset	468	lemma Suc_less_eq2: "Suc n < m \<longleftrightarrow> (\<exists>m'. m = Suc m' \<and> n < m')"
9ffbb4004c81 fix HOL-NSA; move lemmas hoelzl parents: 56020 diff changeset	469	by (cases m) auto
9ffbb4004c81 fix HOL-NSA; move lemmas hoelzl parents: 56020 diff changeset	470
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	471	lemma le_SucI: "m \<le> n \<Longrightarrow> m \<le> Suc n"
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	472	by (induct m arbitrary: n) (simp_all add: less_eq_nat.simps(2) split: nat.splits)
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	473
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	474	lemma Suc_leD: "Suc m \<le> n \<Longrightarrow> m \<le> n"
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	475	by (cases n) (auto intro: le_SucI)
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	476
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	477	lemma less_SucI: "m < n \<Longrightarrow> m < Suc n"
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	478	by (simp add: less_eq_Suc_le) (erule Suc_leD)
24995 c26e0166e568 refined; moved class power to theory Power haftmann parents: 24729 diff changeset	479
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	480	lemma Suc_lessD: "Suc m < n \<Longrightarrow> m < n"
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	481	by (simp add: less_eq_Suc_le) (erule Suc_leD)
25510 38c15efe603b adjustions to due to instance target haftmann parents: 25502 diff changeset	482
26315 cb3badaa192e removed redundant less_trans, less_linear, le_imp_less_or_eq, le_less_trans, less_le_trans (cf. Orderings.thy); wenzelm parents: 26300 diff changeset	483	instance
cb3badaa192e removed redundant less_trans, less_linear, le_imp_less_or_eq, le_less_trans, less_le_trans (cf. Orderings.thy); wenzelm parents: 26300 diff changeset	484	proof
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	485	fix n m q :: nat
60562 24af00b010cf Amalgamation of the class comm_semiring_1_diff_distrib into comm_semiring_1_cancel. Moving axiom le_add_diff_inverse2 from semiring_numeral_div to linordered_semidom. paulson <lp15@cam.ac.uk> parents: 60427 diff changeset	486	show "n < m \<longleftrightarrow> n \<le> m \<and> \<not> m \<le> n"
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	487	proof (induct n arbitrary: m)
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	488	case 0
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	489	then show ?case
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	490	by (cases m) (simp_all add: less_eq_Suc_le)
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	491	next
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	492	case (Suc n)
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	493	then show ?case
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	494	by (cases m) (simp_all add: less_eq_Suc_le)
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	495	qed
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	496	show "n \<le> n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	497	by (induct n) simp_all
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	498	then show "n = m" if "n \<le> m" and "m \<le> n"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	499	using that by (induct n arbitrary: m)
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	500	(simp_all add: less_eq_nat.simps(2) split: nat.splits)
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	501	show "n \<le> q" if "n \<le> m" and "m \<le> q"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	502	using that
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	503	proof (induct n arbitrary: m q)
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	504	case 0
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	505	show ?case by simp
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	506	next
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	507	case (Suc n)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	508	then show ?case
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	509	by (simp_all (no_asm_use) add: less_eq_nat.simps(2) split: nat.splits, clarify,
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	510	simp_all (no_asm_use) add: less_eq_nat.simps(2) split: nat.splits, clarify,
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	511	simp_all (no_asm_use) add: less_eq_nat.simps(2) split: nat.splits)
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	512	qed
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	513	show "n \<le> m \<or> m \<le> n"
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	514	by (induct n arbitrary: m)
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	515	(simp_all add: less_eq_nat.simps(2) split: nat.splits)
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	516	qed
25510 38c15efe603b adjustions to due to instance target haftmann parents: 25502 diff changeset	517
38c15efe603b adjustions to due to instance target haftmann parents: 25502 diff changeset	518	end
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	519
52729 412c9e0381a1 factored syntactic type classes for bot and top (by Alessandro Coglio) haftmann parents: 52435 diff changeset	520	instantiation nat :: order_bot
29652 f4c6e546b7fe nat is a bot instance haftmann parents: 29608 diff changeset	521	begin
f4c6e546b7fe nat is a bot instance haftmann parents: 29608 diff changeset	522
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	523	definition bot_nat :: nat
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	524	where "bot_nat = 0"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	525
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	526	instance
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	527	by standard (simp add: bot_nat_def)
29652 f4c6e546b7fe nat is a bot instance haftmann parents: 29608 diff changeset	528
f4c6e546b7fe nat is a bot instance haftmann parents: 29608 diff changeset	529	end
f4c6e546b7fe nat is a bot instance haftmann parents: 29608 diff changeset	530
51329 4a3c453f99a1 split dense into inner_dense_order and no_top/no_bot hoelzl parents: 51263 diff changeset	531	instance nat :: no_top
61169 4de9ff3ea29a tuned proofs -- less legacy; wenzelm parents: 61144 diff changeset	532	by standard (auto intro: less_Suc_eq_le [THEN iffD2])
52289 83ce5d2841e7 type class for confined subtraction haftmann parents: 51329 diff changeset	533
51329 4a3c453f99a1 split dense into inner_dense_order and no_top/no_bot hoelzl parents: 51263 diff changeset	534
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	535	subsubsection \<open>Introduction properties\<close>
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	536
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	537	lemma lessI [iff]: "n < Suc n"
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	538	by (simp add: less_Suc_eq_le)
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	539
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	540	lemma zero_less_Suc [iff]: "0 < Suc n"
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	541	by (simp add: less_Suc_eq_le)
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	542
43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	543
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	544	subsubsection \<open>Elimination properties\<close>
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	545
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	546	lemma less_not_refl: "\<not> n < n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	547	for n :: nat
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	548	by (rule order_less_irrefl)
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	549
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	550	lemma less_not_refl2: "n < m \<Longrightarrow> m \<noteq> n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	551	for m n :: nat
60562 24af00b010cf Amalgamation of the class comm_semiring_1_diff_distrib into comm_semiring_1_cancel. Moving axiom le_add_diff_inverse2 from semiring_numeral_div to linordered_semidom. paulson <lp15@cam.ac.uk> parents: 60427 diff changeset	552	by (rule not_sym) (rule less_imp_neq)
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	553
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	554	lemma less_not_refl3: "s < t \<Longrightarrow> s \<noteq> t"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	555	for s t :: nat
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	556	by (rule less_imp_neq)
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	557
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	558	lemma less_irrefl_nat: "n < n \<Longrightarrow> R"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	559	for n :: nat
26335 961bbcc9d85b removed redundant Nat.less_not_sym, Nat.less_asym; wenzelm parents: 26315 diff changeset	560	by (rule notE, rule less_not_refl)
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	561
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	562	lemma less_zeroE: "n < 0 \<Longrightarrow> R"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	563	for n :: nat
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	564	by (rule notE) (rule not_less0)
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	565
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	566	lemma less_Suc_eq: "m < Suc n \<longleftrightarrow> m < n \<or> m = n"
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	567	unfolding less_Suc_eq_le le_less ..
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	568
30079 293b896b9c25 make proofs work whether or not One_nat_def is a simp rule; replace 1 with Suc 0 in the rhs of some simp rules huffman parents: 30056 diff changeset	569	lemma less_Suc0 [iff]: "(n < Suc 0) = (n = 0)"
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	570	by (simp add: less_Suc_eq)
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	571
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	572	lemma less_one [iff]: "n < 1 \<longleftrightarrow> n = 0"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	573	for n :: nat
30079 293b896b9c25 make proofs work whether or not One_nat_def is a simp rule; replace 1 with Suc 0 in the rhs of some simp rules huffman parents: 30056 diff changeset	574	unfolding One_nat_def by (rule less_Suc0)
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	575
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	576	lemma Suc_mono: "m < n \<Longrightarrow> Suc m < Suc n"
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	577	by simp
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	578
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	579	text \<open>"Less than" is antisymmetric, sort of.\<close>
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	580	lemma less_antisym: "\<not> n < m \<Longrightarrow> n < Suc m \<Longrightarrow> m = n"
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	581	unfolding not_less less_Suc_eq_le by (rule antisym)
14302 6c24235e8d5d * empty log message * nipkow parents: 14267 diff changeset	582
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	583	lemma nat_neq_iff: "m \<noteq> n \<longleftrightarrow> m < n \<or> n < m"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	584	for m n :: nat
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	585	by (rule linorder_neq_iff)
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	586
43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	587
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	588	subsubsection \<open>Inductive (?) properties\<close>
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	589
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	590	lemma Suc_lessI: "m < n \<Longrightarrow> Suc m \<noteq> n \<Longrightarrow> Suc m < n"
60562 24af00b010cf Amalgamation of the class comm_semiring_1_diff_distrib into comm_semiring_1_cancel. Moving axiom le_add_diff_inverse2 from semiring_numeral_div to linordered_semidom. paulson <lp15@cam.ac.uk> parents: 60427 diff changeset	591	unfolding less_eq_Suc_le [of m] le_less by simp
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	592
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	593	lemma lessE:
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	594	assumes major: "i < k"
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	595	and 1: "k = Suc i \<Longrightarrow> P"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	596	and 2: "\<And>j. i < j \<Longrightarrow> k = Suc j \<Longrightarrow> P"
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	597	shows P
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	598	proof -
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	599	from major have "\<exists>j. i \<le> j \<and> k = Suc j"
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	600	unfolding less_eq_Suc_le by (induct k) simp_all
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	601	then have "(\<exists>j. i < j \<and> k = Suc j) \<or> k = Suc i"
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	602	by (auto simp add: less_le)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	603	with 1 2 show P by auto
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	604	qed
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	605
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	606	lemma less_SucE:
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	607	assumes major: "m < Suc n"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	608	and less: "m < n \<Longrightarrow> P"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	609	and eq: "m = n \<Longrightarrow> P"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	610	shows P
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	611	apply (rule major [THEN lessE])
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	612	apply (rule eq)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	613	apply blast
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	614	apply (rule less)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	615	apply blast
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	616	done
43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	617
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	618	lemma Suc_lessE:
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	619	assumes major: "Suc i < k"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	620	and minor: "\<And>j. i < j \<Longrightarrow> k = Suc j \<Longrightarrow> P"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	621	shows P
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	622	apply (rule major [THEN lessE])
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	623	apply (erule lessI [THEN minor])
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	624	apply (erule Suc_lessD [THEN minor])
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	625	apply assumption
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	626	done
43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	627
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	628	lemma Suc_less_SucD: "Suc m < Suc n \<Longrightarrow> m < n"
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	629	by simp
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	630
43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	631	lemma less_trans_Suc:
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	632	assumes le: "i < j"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	633	shows "j < k \<Longrightarrow> Suc i < k"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	634	proof (induct k)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	635	case 0
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	636	then show ?case by simp
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	637	next
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	638	case (Suc k)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	639	with le show ?case
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	640	by simp (auto simp add: less_Suc_eq dest: Suc_lessD)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	641	qed
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	642
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	643	text \<open>Can be used with \<open>less_Suc_eq\<close> to get @{prop "n = m \<or> n < m"}.\<close>
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	644	lemma not_less_eq: "\<not> m < n \<longleftrightarrow> n < Suc m"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	645	by (simp only: not_less less_Suc_eq_le)
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	646
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	647	lemma not_less_eq_eq: "\<not> m \<le> n \<longleftrightarrow> Suc n \<le> m"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	648	by (simp only: not_le Suc_le_eq)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	649
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	650	text \<open>Properties of "less than or equal".\<close>
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	651
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	652	lemma le_imp_less_Suc: "m \<le> n \<Longrightarrow> m < Suc n"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	653	by (simp only: less_Suc_eq_le)
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	654
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	655	lemma Suc_n_not_le_n: "\<not> Suc n \<le> n"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	656	by (simp add: not_le less_Suc_eq_le)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	657
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	658	lemma le_Suc_eq: "m \<le> Suc n \<longleftrightarrow> m \<le> n \<or> m = Suc n"
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	659	by (simp add: less_Suc_eq_le [symmetric] less_Suc_eq)
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	660
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	661	lemma le_SucE: "m \<le> Suc n \<Longrightarrow> (m \<le> n \<Longrightarrow> R) \<Longrightarrow> (m = Suc n \<Longrightarrow> R) \<Longrightarrow> R"
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	662	by (drule le_Suc_eq [THEN iffD1], iprover+)
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	663
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	664	lemma Suc_leI: "m < n \<Longrightarrow> Suc m \<le> n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	665	by (simp only: Suc_le_eq)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	666
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	667	text \<open>Stronger version of \<open>Suc_leD\<close>.\<close>
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	668	lemma Suc_le_lessD: "Suc m \<le> n \<Longrightarrow> m < n"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	669	by (simp only: Suc_le_eq)
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	670
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	671	lemma less_imp_le_nat: "m < n \<Longrightarrow> m \<le> n" for m n :: nat
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	672	unfolding less_eq_Suc_le by (rule Suc_leD)
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	673
61799 4cf66f21b764 isabelle update_cartouches -c -t; wenzelm parents: 61649 diff changeset	674	text \<open>For instance, \<open>(Suc m < Suc n) = (Suc m \<le> n) = (m < n)\<close>\<close>
26315 cb3badaa192e removed redundant less_trans, less_linear, le_imp_less_or_eq, le_less_trans, less_le_trans (cf. Orderings.thy); wenzelm parents: 26300 diff changeset	675	lemmas le_simps = less_imp_le_nat less_Suc_eq_le Suc_le_eq
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	676
43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	677
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	678	text \<open>Equivalence of \<open>m \<le> n\<close> and \<open>m < n \<or> m = n\<close>\<close>
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	679
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	680	lemma less_or_eq_imp_le: "m < n \<or> m = n \<Longrightarrow> m \<le> n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	681	for m n :: nat
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	682	unfolding le_less .
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	683
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	684	lemma le_eq_less_or_eq: "m \<le> n \<longleftrightarrow> m < n \<or> m = n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	685	for m n :: nat
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	686	by (rule le_less)
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	687
61799 4cf66f21b764 isabelle update_cartouches -c -t; wenzelm parents: 61649 diff changeset	688	text \<open>Useful with \<open>blast\<close>.\<close>
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	689	lemma eq_imp_le: "m = n \<Longrightarrow> m \<le> n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	690	for m n :: nat
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	691	by auto
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	692
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	693	lemma le_refl: "n \<le> n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	694	for n :: nat
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	695	by simp
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	696
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	697	lemma le_trans: "i \<le> j \<Longrightarrow> j \<le> k \<Longrightarrow> i \<le> k"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	698	for i j k :: nat
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	699	by (rule order_trans)
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	700
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	701	lemma le_antisym: "m \<le> n \<Longrightarrow> n \<le> m \<Longrightarrow> m = n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	702	for m n :: nat
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	703	by (rule antisym)
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	704
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	705	lemma nat_less_le: "m < n \<longleftrightarrow> m \<le> n \<and> m \<noteq> n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	706	for m n :: nat
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	707	by (rule less_le)
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	708
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	709	lemma le_neq_implies_less: "m \<le> n \<Longrightarrow> m \<noteq> n \<Longrightarrow> m < n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	710	for m n :: nat
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	711	unfolding less_le ..
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	712
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	713	lemma nat_le_linear: "m \<le> n \| n \<le> m"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	714	for m n :: nat
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	715	by (rule linear)
14341 a09441bd4f1e Ring_and_Field now requires axiom add_left_imp_eq for semirings. paulson parents: 14331 diff changeset	716
22718 936f7580937d tuned proofs; wenzelm parents: 22483 diff changeset	717	lemmas linorder_neqE_nat = linorder_neqE [where 'a = nat]
15921 b6e345548913 Fixing a problem with lin.arith. nipkow parents: 15539 diff changeset	718
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	719	lemma le_less_Suc_eq: "m \<le> n \<Longrightarrow> n < Suc m \<longleftrightarrow> n = m"
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	720	unfolding less_Suc_eq_le by auto
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	721
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	722	lemma not_less_less_Suc_eq: "\<not> n < m \<Longrightarrow> n < Suc m \<longleftrightarrow> n = m"
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	723	unfolding not_less by (rule le_less_Suc_eq)
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	724
43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	725	lemmas not_less_simps = not_less_less_Suc_eq le_less_Suc_eq
43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	726
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	727	lemma not0_implies_Suc: "n \<noteq> 0 \<Longrightarrow> \<exists>m. n = Suc m"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	728	by (cases n) simp_all
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	729
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	730	lemma gr0_implies_Suc: "n > 0 \<Longrightarrow> \<exists>m. n = Suc m"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	731	by (cases n) simp_all
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	732
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	733	lemma gr_implies_not0: "m < n \<Longrightarrow> n \<noteq> 0"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	734	for m n :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	735	by (cases n) simp_all
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	736
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	737	lemma neq0_conv[iff]: "n \<noteq> 0 \<longleftrightarrow> 0 < n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	738	for n :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	739	by (cases n) simp_all
25140 273772abbea2 More changes from >0 to ~=0::nat nipkow parents: 25134 diff changeset	740
61799 4cf66f21b764 isabelle update_cartouches -c -t; wenzelm parents: 61649 diff changeset	741	text \<open>This theorem is useful with \<open>blast\<close>\<close>
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	742	lemma gr0I: "(n = 0 \<Longrightarrow> False) \<Longrightarrow> 0 < n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	743	for n :: nat
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	744	by (rule neq0_conv[THEN iffD1]) iprover
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	745
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	746	lemma gr0_conv_Suc: "0 < n \<longleftrightarrow> (\<exists>m. n = Suc m)"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	747	by (fast intro: not0_implies_Suc)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	748
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	749	lemma not_gr0 [iff]: "\<not> 0 < n \<longleftrightarrow> n = 0"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	750	for n :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	751	using neq0_conv by blast
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	752
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	753	lemma Suc_le_D: "Suc n \<le> m' \<Longrightarrow> \<exists>m. m' = Suc m"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	754	by (induct m') simp_all
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	755
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	756	text \<open>Useful in certain inductive arguments\<close>
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	757	lemma less_Suc_eq_0_disj: "m < Suc n \<longleftrightarrow> m = 0 \<or> (\<exists>j. m = Suc j \<and> j < n)"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	758	by (cases m) simp_all
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	759
64447 e44f5c123f26 added lemma nipkow parents: 63979 diff changeset	760	lemma All_less_Suc: "(\<forall>i < Suc n. P i) = (P n \<and> (\<forall>i < n. P i))"
e44f5c123f26 added lemma nipkow parents: 63979 diff changeset	761	by (auto simp: less_Suc_eq)
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	762
66386 962c12353c67 added lemmas nipkow parents: 66295 diff changeset	763	lemma All_less_Suc2: "(\<forall>i < Suc n. P i) = (P 0 \<and> (\<forall>i < n. P(Suc i)))"
962c12353c67 added lemmas nipkow parents: 66295 diff changeset	764	by (auto simp: less_Suc_eq_0_disj)
962c12353c67 added lemmas nipkow parents: 66295 diff changeset	765
962c12353c67 added lemmas nipkow parents: 66295 diff changeset	766	lemma Ex_less_Suc: "(\<exists>i < Suc n. P i) = (P n \<or> (\<exists>i < n. P i))"
962c12353c67 added lemmas nipkow parents: 66295 diff changeset	767	by (auto simp: less_Suc_eq)
962c12353c67 added lemmas nipkow parents: 66295 diff changeset	768
962c12353c67 added lemmas nipkow parents: 66295 diff changeset	769	lemma Ex_less_Suc2: "(\<exists>i < Suc n. P i) = (P 0 \<or> (\<exists>i < n. P(Suc i)))"
962c12353c67 added lemmas nipkow parents: 66295 diff changeset	770	by (auto simp: less_Suc_eq_0_disj)
962c12353c67 added lemmas nipkow parents: 66295 diff changeset	771
962c12353c67 added lemmas nipkow parents: 66295 diff changeset	772
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	773	subsubsection \<open>Monotonicity of Addition\<close>
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	774
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	775	lemma Suc_pred [simp]: "n > 0 \<Longrightarrow> Suc (n - Suc 0) = n"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	776	by (simp add: diff_Suc split: nat.split)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	777
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	778	lemma Suc_diff_1 [simp]: "0 < n \<Longrightarrow> Suc (n - 1) = n"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	779	unfolding One_nat_def by (rule Suc_pred)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	780
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	781	lemma nat_add_left_cancel_le [simp]: "k + m \<le> k + n \<longleftrightarrow> m \<le> n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	782	for k m n :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	783	by (induct k) simp_all
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	784
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	785	lemma nat_add_left_cancel_less [simp]: "k + m < k + n \<longleftrightarrow> m < n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	786	for k m n :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	787	by (induct k) simp_all
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	788
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	789	lemma add_gr_0 [iff]: "m + n > 0 \<longleftrightarrow> m > 0 \<or> n > 0"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	790	for m n :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	791	by (auto dest: gr0_implies_Suc)
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	792
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	793	text \<open>strict, in 1st argument\<close>
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	794	lemma add_less_mono1: "i < j \<Longrightarrow> i + k < j + k"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	795	for i j k :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	796	by (induct k) simp_all
14341 a09441bd4f1e Ring_and_Field now requires axiom add_left_imp_eq for semirings. paulson parents: 14331 diff changeset	797
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	798	text \<open>strict, in both arguments\<close>
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	799	lemma add_less_mono: "i < j \<Longrightarrow> k < l \<Longrightarrow> i + k < j + l"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	800	for i j k l :: nat
14341 a09441bd4f1e Ring_and_Field now requires axiom add_left_imp_eq for semirings. paulson parents: 14331 diff changeset	801	apply (rule add_less_mono1 [THEN less_trans], assumption+)
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	802	apply (induct j)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	803	apply simp_all
14341 a09441bd4f1e Ring_and_Field now requires axiom add_left_imp_eq for semirings. paulson parents: 14331 diff changeset	804	done
a09441bd4f1e Ring_and_Field now requires axiom add_left_imp_eq for semirings. paulson parents: 14331 diff changeset	805
61799 4cf66f21b764 isabelle update_cartouches -c -t; wenzelm parents: 61649 diff changeset	806	text \<open>Deleted \<open>less_natE\<close>; use \<open>less_imp_Suc_add RS exE\<close>\<close>
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	807	lemma less_imp_Suc_add: "m < n \<Longrightarrow> \<exists>k. n = Suc (m + k)"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	808	proof (induct n)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	809	case 0
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	810	then show ?case by simp
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	811	next
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	812	case Suc
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	813	then show ?case
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	814	by (simp add: order_le_less)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	815	(blast elim!: less_SucE intro!: Nat.add_0_right [symmetric] add_Suc_right [symmetric])
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	816	qed
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	817
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	818	lemma le_Suc_ex: "k \<le> l \<Longrightarrow> (\<exists>n. l = k + n)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	819	for k l :: nat
56194 9ffbb4004c81 fix HOL-NSA; move lemmas hoelzl parents: 56020 diff changeset	820	by (auto simp: less_Suc_eq_le[symmetric] dest: less_imp_Suc_add)
9ffbb4004c81 fix HOL-NSA; move lemmas hoelzl parents: 56020 diff changeset	821
61799 4cf66f21b764 isabelle update_cartouches -c -t; wenzelm parents: 61649 diff changeset	822	text \<open>strict, in 1st argument; proof is by induction on \<open>k > 0\<close>\<close>
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	823	lemma mult_less_mono2:
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	824	fixes i j :: nat
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	825	assumes "i < j" and "0 < k"
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	826	shows "k * i < k * j"
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	827	using \<open>0 < k\<close>
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	828	proof (induct k)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	829	case 0
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	830	then show ?case by simp
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	831	next
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	832	case (Suc k)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	833	with \<open>i < j\<close> show ?case
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	834	by (cases k) (simp_all add: add_less_mono)
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	835	qed
14341 a09441bd4f1e Ring_and_Field now requires axiom add_left_imp_eq for semirings. paulson parents: 14331 diff changeset	836
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	837	text \<open>Addition is the inverse of subtraction:
d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	838	if @{term "n \<le> m"} then @{term "n + (m - n) = m"}.\<close>
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	839	lemma add_diff_inverse_nat: "\<not> m < n \<Longrightarrow> n + (m - n) = m"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	840	for m n :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	841	by (induct m n rule: diff_induct) simp_all
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	842
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	843	lemma nat_le_iff_add: "m \<le> n \<longleftrightarrow> (\<exists>k. n = m + k)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	844	for m n :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	845	using nat_add_left_cancel_le[of m 0] by (auto dest: le_Suc_ex)
62376 85f38d5f8807 Rename ordered_comm_monoid_add to ordered_cancel_comm_monoid_add. Introduce ordreed_comm_monoid_add, canonically_ordered_comm_monoid and dioid. Setup nat, entat and ennreal as dioids. hoelzl parents: 62365 diff changeset	846
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	847	text \<open>The naturals form an ordered \<open>semidom\<close> and a \<open>dioid\<close>.\<close>
62376 85f38d5f8807 Rename ordered_comm_monoid_add to ordered_cancel_comm_monoid_add. Introduce ordreed_comm_monoid_add, canonically_ordered_comm_monoid and dioid. Setup nat, entat and ennreal as dioids. hoelzl parents: 62365 diff changeset	848
35028 108662d50512 more consistent naming of type classes involving orderings (and lattices) -- c.f. NEWS haftmann parents: 34208 diff changeset	849	instance nat :: linordered_semidom
14341 a09441bd4f1e Ring_and_Field now requires axiom add_left_imp_eq for semirings. paulson parents: 14331 diff changeset	850	proof
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	851	fix m n q :: nat
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	852	show "0 < (1::nat)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	853	by simp
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	854	show "m \<le> n \<Longrightarrow> q + m \<le> q + n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	855	by simp
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	856	show "m < n \<Longrightarrow> 0 < q \<Longrightarrow> q * m < q * n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	857	by (simp add: mult_less_mono2)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	858	show "m \<noteq> 0 \<Longrightarrow> n \<noteq> 0 \<Longrightarrow> m * n \<noteq> 0"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	859	by simp
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	860	show "n \<le> m \<Longrightarrow> (m - n) + n = m"
60562 24af00b010cf Amalgamation of the class comm_semiring_1_diff_distrib into comm_semiring_1_cancel. Moving axiom le_add_diff_inverse2 from semiring_numeral_div to linordered_semidom. paulson <lp15@cam.ac.uk> parents: 60427 diff changeset	861	by (simp add: add_diff_inverse_nat add.commute linorder_not_less)
62376 85f38d5f8807 Rename ordered_comm_monoid_add to ordered_cancel_comm_monoid_add. Introduce ordreed_comm_monoid_add, canonically_ordered_comm_monoid and dioid. Setup nat, entat and ennreal as dioids. hoelzl parents: 62365 diff changeset	862	qed
85f38d5f8807 Rename ordered_comm_monoid_add to ordered_cancel_comm_monoid_add. Introduce ordreed_comm_monoid_add, canonically_ordered_comm_monoid and dioid. Setup nat, entat and ennreal as dioids. hoelzl parents: 62365 diff changeset	863
85f38d5f8807 Rename ordered_comm_monoid_add to ordered_cancel_comm_monoid_add. Introduce ordreed_comm_monoid_add, canonically_ordered_comm_monoid and dioid. Setup nat, entat and ennreal as dioids. hoelzl parents: 62365 diff changeset	864	instance nat :: dioid
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	865	by standard (rule nat_le_iff_add)
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	866
63145 703edebd1d92 isabelle update_cartouches -c -t; wenzelm parents: 63113 diff changeset	867	declare le0[simp del] \<comment> \<open>This is now @{thm zero_le}\<close>
703edebd1d92 isabelle update_cartouches -c -t; wenzelm parents: 63113 diff changeset	868	declare le_0_eq[simp del] \<comment> \<open>This is now @{thm le_zero_eq}\<close>
703edebd1d92 isabelle update_cartouches -c -t; wenzelm parents: 63113 diff changeset	869	declare not_less0[simp del] \<comment> \<open>This is now @{thm not_less_zero}\<close>
703edebd1d92 isabelle update_cartouches -c -t; wenzelm parents: 63113 diff changeset	870	declare not_gr0[simp del] \<comment> \<open>This is now @{thm not_gr_zero}\<close>
62376 85f38d5f8807 Rename ordered_comm_monoid_add to ordered_cancel_comm_monoid_add. Introduce ordreed_comm_monoid_add, canonically_ordered_comm_monoid and dioid. Setup nat, entat and ennreal as dioids. hoelzl parents: 62365 diff changeset	871
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	872	instance nat :: ordered_cancel_comm_monoid_add ..
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	873	instance nat :: ordered_cancel_comm_monoid_diff ..
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	874
44817 b63e445c8f6d lemmas about +, , min, max on nat haftmann* parents: 44325 diff changeset	875
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	876	subsubsection \<open>@{term min} and @{term max}\<close>
44817 b63e445c8f6d lemmas about +, , min, max on nat haftmann* parents: 44325 diff changeset	877
b63e445c8f6d lemmas about +, , min, max on nat haftmann* parents: 44325 diff changeset	878	lemma mono_Suc: "mono Suc"
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	879	by (rule monoI) simp
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	880
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	881	lemma min_0L [simp]: "min 0 n = 0"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	882	for n :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	883	by (rule min_absorb1) simp
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	884
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	885	lemma min_0R [simp]: "min n 0 = 0"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	886	for n :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	887	by (rule min_absorb2) simp
44817 b63e445c8f6d lemmas about +, , min, max on nat haftmann* parents: 44325 diff changeset	888
b63e445c8f6d lemmas about +, , min, max on nat haftmann* parents: 44325 diff changeset	889	lemma min_Suc_Suc [simp]: "min (Suc m) (Suc n) = Suc (min m n)"
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	890	by (simp add: mono_Suc min_of_mono)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	891
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	892	lemma min_Suc1: "min (Suc n) m = (case m of 0 \<Rightarrow> 0 \| Suc m' \<Rightarrow> Suc(min n m'))"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	893	by (simp split: nat.split)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	894
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	895	lemma min_Suc2: "min m (Suc n) = (case m of 0 \<Rightarrow> 0 \| Suc m' \<Rightarrow> Suc(min m' n))"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	896	by (simp split: nat.split)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	897
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	898	lemma max_0L [simp]: "max 0 n = n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	899	for n :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	900	by (rule max_absorb2) simp
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	901
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	902	lemma max_0R [simp]: "max n 0 = n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	903	for n :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	904	by (rule max_absorb1) simp
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	905
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	906	lemma max_Suc_Suc [simp]: "max (Suc m) (Suc n) = Suc (max m n)"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	907	by (simp add: mono_Suc max_of_mono)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	908
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	909	lemma max_Suc1: "max (Suc n) m = (case m of 0 \<Rightarrow> Suc n \| Suc m' \<Rightarrow> Suc (max n m'))"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	910	by (simp split: nat.split)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	911
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	912	lemma max_Suc2: "max m (Suc n) = (case m of 0 \<Rightarrow> Suc n \| Suc m' \<Rightarrow> Suc (max m' n))"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	913	by (simp split: nat.split)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	914
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	915	lemma nat_mult_min_left: "min m n * q = min (m * q) (n * q)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	916	for m n q :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	917	by (simp add: min_def not_le)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	918	(auto dest: mult_right_le_imp_le mult_right_less_imp_less le_less_trans)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	919
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	920	lemma nat_mult_min_right: "m * min n q = min (m * n) (m * q)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	921	for m n q :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	922	by (simp add: min_def not_le)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	923	(auto dest: mult_left_le_imp_le mult_left_less_imp_less le_less_trans)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	924
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	925	lemma nat_add_max_left: "max m n + q = max (m + q) (n + q)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	926	for m n q :: nat
44817 b63e445c8f6d lemmas about +, , min, max on nat haftmann* parents: 44325 diff changeset	927	by (simp add: max_def)
b63e445c8f6d lemmas about +, , min, max on nat haftmann* parents: 44325 diff changeset	928
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	929	lemma nat_add_max_right: "m + max n q = max (m + n) (m + q)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	930	for m n q :: nat
44817 b63e445c8f6d lemmas about +, , min, max on nat haftmann* parents: 44325 diff changeset	931	by (simp add: max_def)
b63e445c8f6d lemmas about +, , min, max on nat haftmann* parents: 44325 diff changeset	932
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	933	lemma nat_mult_max_left: "max m n * q = max (m * q) (n * q)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	934	for m n q :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	935	by (simp add: max_def not_le)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	936	(auto dest: mult_right_le_imp_le mult_right_less_imp_less le_less_trans)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	937
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	938	lemma nat_mult_max_right: "m * max n q = max (m * n) (m * q)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	939	for m n q :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	940	by (simp add: max_def not_le)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	941	(auto dest: mult_left_le_imp_le mult_left_less_imp_less le_less_trans)
14267 b963e9cee2a0 More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas paulson parents: 14266 diff changeset	942
b963e9cee2a0 More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas paulson parents: 14266 diff changeset	943
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	944	subsubsection \<open>Additional theorems about @{term "op \<le>"}\<close>
d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	945
d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	946	text \<open>Complete induction, aka course-of-values induction\<close>
26748 4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	947
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	948	instance nat :: wellorder
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	949	proof
27823 52971512d1a2 moved class wellorder to theory Orderings haftmann parents: 27789 diff changeset	950	fix P and n :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	951	assume step: "(\<And>m. m < n \<Longrightarrow> P m) \<Longrightarrow> P n" for n :: nat
27823 52971512d1a2 moved class wellorder to theory Orderings haftmann parents: 27789 diff changeset	952	have "\<And>q. q \<le> n \<Longrightarrow> P q"
52971512d1a2 moved class wellorder to theory Orderings haftmann parents: 27789 diff changeset	953	proof (induct n)
52971512d1a2 moved class wellorder to theory Orderings haftmann parents: 27789 diff changeset	954	case (0 n)
26748 4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	955	have "P 0" by (rule step) auto
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	956	with 0 show ?case by auto
26748 4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	957	next
27823 52971512d1a2 moved class wellorder to theory Orderings haftmann parents: 27789 diff changeset	958	case (Suc m n)
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	959	then have "n \<le> m \<or> n = Suc m"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	960	by (simp add: le_Suc_eq)
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	961	then show ?case
26748 4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	962	proof
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	963	assume "n \<le> m"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	964	then show "P n" by (rule Suc(1))
26748 4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	965	next
27823 52971512d1a2 moved class wellorder to theory Orderings haftmann parents: 27789 diff changeset	966	assume n: "n = Suc m"
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	967	show "P n" by (rule step) (rule Suc(1), simp add: n le_simps)
26748 4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	968	qed
4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	969	qed
27823 52971512d1a2 moved class wellorder to theory Orderings haftmann parents: 27789 diff changeset	970	then show "P n" by auto
26748 4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	971	qed
4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	972
57015 842bb6d36263 added lemma nipkow parents: 56194 diff changeset	973
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	974	lemma Least_eq_0[simp]: "P 0 \<Longrightarrow> Least P = 0"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	975	for P :: "nat \<Rightarrow> bool"
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	976	by (rule Least_equality[OF _ le0])
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	977
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	978	lemma Least_Suc: "P n \<Longrightarrow> \<not> P 0 \<Longrightarrow> (LEAST n. P n) = Suc (LEAST m. P (Suc m))"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	979	apply (cases n)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	980	apply auto
27823 52971512d1a2 moved class wellorder to theory Orderings haftmann parents: 27789 diff changeset	981	apply (frule LeastI)
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	982	apply (drule_tac P = "\<lambda>x. P (Suc x)" in LeastI)
27823 52971512d1a2 moved class wellorder to theory Orderings haftmann parents: 27789 diff changeset	983	apply (subgoal_tac " (LEAST x. P x) \<le> Suc (LEAST x. P (Suc x))")
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	984	apply (erule_tac [2] Least_le)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	985	apply (cases "LEAST x. P x")
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	986	apply auto
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	987	apply (drule_tac P = "\<lambda>x. P (Suc x)" in Least_le)
27823 52971512d1a2 moved class wellorder to theory Orderings haftmann parents: 27789 diff changeset	988	apply (blast intro: order_antisym)
52971512d1a2 moved class wellorder to theory Orderings haftmann parents: 27789 diff changeset	989	done
52971512d1a2 moved class wellorder to theory Orderings haftmann parents: 27789 diff changeset	990
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	991	lemma Least_Suc2: "P n \<Longrightarrow> Q m \<Longrightarrow> \<not> P 0 \<Longrightarrow> \<forall>k. P (Suc k) = Q k \<Longrightarrow> Least P = Suc (Least Q)"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	992	by (erule (1) Least_Suc [THEN ssubst]) simp
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	993
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	994	lemma ex_least_nat_le: "\<not> P 0 \<Longrightarrow> P n \<Longrightarrow> \<exists>k\<le>n. (\<forall>i<k. \<not> P i) \<and> P k"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	995	for P :: "nat \<Rightarrow> bool"
27823 52971512d1a2 moved class wellorder to theory Orderings haftmann parents: 27789 diff changeset	996	apply (cases n)
52971512d1a2 moved class wellorder to theory Orderings haftmann parents: 27789 diff changeset	997	apply blast
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	998	apply (rule_tac x="LEAST k. P k" in exI)
27823 52971512d1a2 moved class wellorder to theory Orderings haftmann parents: 27789 diff changeset	999	apply (blast intro: Least_le dest: not_less_Least intro: LeastI_ex)
52971512d1a2 moved class wellorder to theory Orderings haftmann parents: 27789 diff changeset	1000	done
52971512d1a2 moved class wellorder to theory Orderings haftmann parents: 27789 diff changeset	1001
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1002	lemma ex_least_nat_less: "\<not> P 0 \<Longrightarrow> P n \<Longrightarrow> \<exists>k<n. (\<forall>i\<le>k. \<not> P i) \<and> P (k + 1)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1003	for P :: "nat \<Rightarrow> bool"
27823 52971512d1a2 moved class wellorder to theory Orderings haftmann parents: 27789 diff changeset	1004	apply (cases n)
52971512d1a2 moved class wellorder to theory Orderings haftmann parents: 27789 diff changeset	1005	apply blast
52971512d1a2 moved class wellorder to theory Orderings haftmann parents: 27789 diff changeset	1006	apply (frule (1) ex_least_nat_le)
52971512d1a2 moved class wellorder to theory Orderings haftmann parents: 27789 diff changeset	1007	apply (erule exE)
52971512d1a2 moved class wellorder to theory Orderings haftmann parents: 27789 diff changeset	1008	apply (case_tac k)
52971512d1a2 moved class wellorder to theory Orderings haftmann parents: 27789 diff changeset	1009	apply simp
52971512d1a2 moved class wellorder to theory Orderings haftmann parents: 27789 diff changeset	1010	apply (rename_tac k1)
52971512d1a2 moved class wellorder to theory Orderings haftmann parents: 27789 diff changeset	1011	apply (rule_tac x=k1 in exI)
52971512d1a2 moved class wellorder to theory Orderings haftmann parents: 27789 diff changeset	1012	apply (auto simp add: less_eq_Suc_le)
52971512d1a2 moved class wellorder to theory Orderings haftmann parents: 27789 diff changeset	1013	done
52971512d1a2 moved class wellorder to theory Orderings haftmann parents: 27789 diff changeset	1014
26748 4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	1015	lemma nat_less_induct:
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1016	fixes P :: "nat \<Rightarrow> bool"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1017	assumes "\<And>n. \<forall>m. m < n \<longrightarrow> P m \<Longrightarrow> P n"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1018	shows "P n"
26748 4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	1019	using assms less_induct by blast
4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	1020
4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	1021	lemma measure_induct_rule [case_names less]:
64876 65a247444100 generalized types in lemmas blanchet parents: 64849 diff changeset	1022	fixes f :: "'a \<Rightarrow> 'b::wellorder"
26748 4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	1023	assumes step: "\<And>x. (\<And>y. f y < f x \<Longrightarrow> P y) \<Longrightarrow> P x"
4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	1024	shows "P a"
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1025	by (induct m \<equiv> "f a" arbitrary: a rule: less_induct) (auto intro: step)
26748 4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	1026
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	1027	text \<open>old style induction rules:\<close>
26748 4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	1028	lemma measure_induct:
64876 65a247444100 generalized types in lemmas blanchet parents: 64849 diff changeset	1029	fixes f :: "'a \<Rightarrow> 'b::wellorder"
26748 4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	1030	shows "(\<And>x. \<forall>y. f y < f x \<longrightarrow> P y \<Longrightarrow> P x) \<Longrightarrow> P a"
4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	1031	by (rule measure_induct_rule [of f P a]) iprover
4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	1032
4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	1033	lemma full_nat_induct:
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1034	assumes step: "\<And>n. (\<forall>m. Suc m \<le> n \<longrightarrow> P m) \<Longrightarrow> P n"
26748 4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	1035	shows "P n"
4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	1036	by (rule less_induct) (auto intro: step simp:le_simps)
14267 b963e9cee2a0 More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas paulson parents: 14266 diff changeset	1037
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1038	text\<open>An induction rule for establishing binary relations\<close>
62683 ddd1c864408b clarified rule structure; wenzelm parents: 62608 diff changeset	1039	lemma less_Suc_induct [consumes 1]:
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1040	assumes less: "i < j"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1041	and step: "\<And>i. P i (Suc i)"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1042	and trans: "\<And>i j k. i < j \<Longrightarrow> j < k \<Longrightarrow> P i j \<Longrightarrow> P j k \<Longrightarrow> P i k"
19870 ef037d1b32d1 new results paulson parents: 19573 diff changeset	1043	shows "P i j"
ef037d1b32d1 new results paulson parents: 19573 diff changeset	1044	proof -
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1045	from less obtain k where j: "j = Suc (i + k)"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1046	by (auto dest: less_imp_Suc_add)
22718 936f7580937d tuned proofs; wenzelm parents: 22483 diff changeset	1047	have "P i (Suc (i + k))"
19870 ef037d1b32d1 new results paulson parents: 19573 diff changeset	1048	proof (induct k)
22718 936f7580937d tuned proofs; wenzelm parents: 22483 diff changeset	1049	case 0
936f7580937d tuned proofs; wenzelm parents: 22483 diff changeset	1050	show ?case by (simp add: step)
19870 ef037d1b32d1 new results paulson parents: 19573 diff changeset	1051	next
ef037d1b32d1 new results paulson parents: 19573 diff changeset	1052	case (Suc k)
31714 347e9d18f372 generalized less_Suc_induct krauss parents: 31155 diff changeset	1053	have "0 + i < Suc k + i" by (rule add_less_mono1) simp
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1054	then have "i < Suc (i + k)" by (simp add: add.commute)
31714 347e9d18f372 generalized less_Suc_induct krauss parents: 31155 diff changeset	1055	from trans[OF this lessI Suc step]
347e9d18f372 generalized less_Suc_induct krauss parents: 31155 diff changeset	1056	show ?case by simp
19870 ef037d1b32d1 new results paulson parents: 19573 diff changeset	1057	qed
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1058	then show "P i j" by (simp add: j)
19870 ef037d1b32d1 new results paulson parents: 19573 diff changeset	1059	qed
ef037d1b32d1 new results paulson parents: 19573 diff changeset	1060
63111 caa0c513bbca tuned document; wenzelm parents: 63110 diff changeset	1061	text \<open>
caa0c513bbca tuned document; wenzelm parents: 63110 diff changeset	1062	The method of infinite descent, frequently used in number theory.
caa0c513bbca tuned document; wenzelm parents: 63110 diff changeset	1063	Provided by Roelof Oosterhuis.
caa0c513bbca tuned document; wenzelm parents: 63110 diff changeset	1064	\<open>P n\<close> is true for all natural numbers if
caa0c513bbca tuned document; wenzelm parents: 63110 diff changeset	1065	\<^item> case ``0'': given \<open>n = 0\<close> prove \<open>P n\<close>
caa0c513bbca tuned document; wenzelm parents: 63110 diff changeset	1066	\<^item> case ``smaller'': given \<open>n > 0\<close> and \<open>\<not> P n\<close> prove there exists
caa0c513bbca tuned document; wenzelm parents: 63110 diff changeset	1067	a smaller natural number \<open>m\<close> such that \<open>\<not> P m\<close>.
caa0c513bbca tuned document; wenzelm parents: 63110 diff changeset	1068	\<close>
caa0c513bbca tuned document; wenzelm parents: 63110 diff changeset	1069
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1070	lemma infinite_descent: "(\<And>n. \<not> P n \<Longrightarrow> \<exists>m<n. \<not> P m) \<Longrightarrow> P n" for P :: "nat \<Rightarrow> bool"
63111 caa0c513bbca tuned document; wenzelm parents: 63110 diff changeset	1071	\<comment> \<open>compact version without explicit base case\<close>
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1072	by (induct n rule: less_induct) auto
26748 4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	1073
63111 caa0c513bbca tuned document; wenzelm parents: 63110 diff changeset	1074	lemma infinite_descent0 [case_names 0 smaller]:
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1075	fixes P :: "nat \<Rightarrow> bool"
63111 caa0c513bbca tuned document; wenzelm parents: 63110 diff changeset	1076	assumes "P 0"
caa0c513bbca tuned document; wenzelm parents: 63110 diff changeset	1077	and "\<And>n. n > 0 \<Longrightarrow> \<not> P n \<Longrightarrow> \<exists>m. m < n \<and> \<not> P m"
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1078	shows "P n"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1079	apply (rule infinite_descent)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1080	using assms
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1081	apply (case_tac "n > 0")
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1082	apply auto
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1083	done
26748 4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	1084
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	1085	text \<open>
63111 caa0c513bbca tuned document; wenzelm parents: 63110 diff changeset	1086	Infinite descent using a mapping to \<open>nat\<close>:
caa0c513bbca tuned document; wenzelm parents: 63110 diff changeset	1087	\<open>P x\<close> is true for all \<open>x \<in> D\<close> if there exists a \<open>V \<in> D \<Rightarrow> nat\<close> and
caa0c513bbca tuned document; wenzelm parents: 63110 diff changeset	1088	\<^item> case ``0'': given \<open>V x = 0\<close> prove \<open>P x\<close>
caa0c513bbca tuned document; wenzelm parents: 63110 diff changeset	1089	\<^item> ``smaller'': given \<open>V x > 0\<close> and \<open>\<not> P x\<close> prove
caa0c513bbca tuned document; wenzelm parents: 63110 diff changeset	1090	there exists a \<open>y \<in> D\<close> such that \<open>V y < V x\<close> and \<open>\<not> P y\<close>.
caa0c513bbca tuned document; wenzelm parents: 63110 diff changeset	1091	\<close>
26748 4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	1092	corollary infinite_descent0_measure [case_names 0 smaller]:
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1093	fixes V :: "'a \<Rightarrow> nat"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1094	assumes 1: "\<And>x. V x = 0 \<Longrightarrow> P x"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1095	and 2: "\<And>x. V x > 0 \<Longrightarrow> \<not> P x \<Longrightarrow> \<exists>y. V y < V x \<and> \<not> P y"
26748 4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	1096	shows "P x"
4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	1097	proof -
4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	1098	obtain n where "n = V x" by auto
4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	1099	moreover have "\<And>x. V x = n \<Longrightarrow> P x"
4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	1100	proof (induct n rule: infinite_descent0)
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1101	case 0
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1102	with 1 show "P x" by auto
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1103	next
26748 4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	1104	case (smaller n)
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1105	then obtain x where *: "V x = n " and "V x > 0 \<and> \<not> P x" by auto
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1106	with 2 obtain y where "V y < V x \<and> \<not> P y" by auto
63111 caa0c513bbca tuned document; wenzelm parents: 63110 diff changeset	1107	with * obtain m where "m = V y \<and> m < n \<and> \<not> P y" by auto
26748 4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	1108	then show ?case by auto
4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	1109	qed
4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	1110	ultimately show "P x" by auto
4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	1111	qed
4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	1112
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1113	text \<open>Again, without explicit base case:\<close>
26748 4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	1114	lemma infinite_descent_measure:
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1115	fixes V :: "'a \<Rightarrow> nat"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1116	assumes "\<And>x. \<not> P x \<Longrightarrow> \<exists>y. V y < V x \<and> \<not> P y"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1117	shows "P x"
26748 4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	1118	proof -
4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	1119	from assms obtain n where "n = V x" by auto
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1120	moreover have "\<And>x. V x = n \<Longrightarrow> P x"
26748 4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	1121	proof (induct n rule: infinite_descent, auto)
63111 caa0c513bbca tuned document; wenzelm parents: 63110 diff changeset	1122	show "\<exists>m < V x. \<exists>y. V y = m \<and> \<not> P y" if "\<not> P x" for x
caa0c513bbca tuned document; wenzelm parents: 63110 diff changeset	1123	using assms and that by auto
26748 4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	1124	qed
4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	1125	ultimately show "P x" by auto
4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	1126	qed
4d51ddd6aa5c Merged theories about wellfoundedness into one: Wellfounded.thy krauss parents: 26335 diff changeset	1127
63111 caa0c513bbca tuned document; wenzelm parents: 63110 diff changeset	1128	text \<open>A (clumsy) way of lifting \<open><\<close> monotonicity to \<open>\<le>\<close> monotonicity\<close>
14267 b963e9cee2a0 More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas paulson parents: 14266 diff changeset	1129	lemma less_mono_imp_le_mono:
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1130	fixes f :: "nat \<Rightarrow> nat"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1131	and i j :: nat
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1132	assumes "\<And>i j::nat. i < j \<Longrightarrow> f i < f j"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1133	and "i \<le> j"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1134	shows "f i \<le> f j"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1135	using assms by (auto simp add: order_le_less)
24438 2d8058804a76 Added infinite_descent nipkow parents: 24286 diff changeset	1136
14267 b963e9cee2a0 More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas paulson parents: 14266 diff changeset	1137
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	1138	text \<open>non-strict, in 1st argument\<close>
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1139	lemma add_le_mono1: "i \<le> j \<Longrightarrow> i + k \<le> j + k"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1140	for i j k :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1141	by (rule add_right_mono)
14267 b963e9cee2a0 More refinements to Ring_and_Field and numerics. Conversion of Divides_lemmas paulson parents: 14266 diff changeset	1142
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	1143	text \<open>non-strict, in both arguments\<close>
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1144	lemma add_le_mono: "i \<le> j \<Longrightarrow> k \<le> l \<Longrightarrow> i + k \<le> j + l"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1145	for i j k l :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1146	by (rule add_mono)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1147
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1148	lemma le_add2: "n \<le> m + n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1149	for m n :: nat
62608 19f87fa0cfcb more theorems on orderings haftmann parents: 62502 diff changeset	1150	by simp
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	1151
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1152	lemma le_add1: "n \<le> n + m"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1153	for m n :: nat
62608 19f87fa0cfcb more theorems on orderings haftmann parents: 62502 diff changeset	1154	by simp
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	1155
43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	1156	lemma less_add_Suc1: "i < Suc (i + m)"
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1157	by (rule le_less_trans, rule le_add1, rule lessI)
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	1158
43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	1159	lemma less_add_Suc2: "i < Suc (m + i)"
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1160	by (rule le_less_trans, rule le_add2, rule lessI)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1161
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1162	lemma less_iff_Suc_add: "m < n \<longleftrightarrow> (\<exists>k. n = Suc (m + k))"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1163	by (iprover intro!: less_add_Suc1 less_imp_Suc_add)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1164
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1165	lemma trans_le_add1: "i \<le> j \<Longrightarrow> i \<le> j + m"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1166	for i j m :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1167	by (rule le_trans, assumption, rule le_add1)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1168
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1169	lemma trans_le_add2: "i \<le> j \<Longrightarrow> i \<le> m + j"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1170	for i j m :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1171	by (rule le_trans, assumption, rule le_add2)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1172
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1173	lemma trans_less_add1: "i < j \<Longrightarrow> i < j + m"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1174	for i j m :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1175	by (rule less_le_trans, assumption, rule le_add1)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1176
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1177	lemma trans_less_add2: "i < j \<Longrightarrow> i < m + j"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1178	for i j m :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1179	by (rule less_le_trans, assumption, rule le_add2)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1180
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1181	lemma add_lessD1: "i + j < k \<Longrightarrow> i < k"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1182	for i j k :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1183	by (rule le_less_trans [of _ "i+j"]) (simp_all add: le_add1)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1184
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1185	lemma not_add_less1 [iff]: "\<not> i + j < i"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1186	for i j :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1187	apply (rule notI)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1188	apply (drule add_lessD1)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1189	apply (erule less_irrefl [THEN notE])
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1190	done
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1191
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1192	lemma not_add_less2 [iff]: "\<not> j + i < i"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1193	for i j :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1194	by (simp add: add.commute)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1195
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1196	lemma add_leD1: "m + k \<le> n \<Longrightarrow> m \<le> n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1197	for k m n :: nat
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1198	by (rule order_trans [of _ "m + k"]) (simp_all add: le_add1)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1199
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1200	lemma add_leD2: "m + k \<le> n \<Longrightarrow> k \<le> n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1201	for k m n :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1202	apply (simp add: add.commute)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1203	apply (erule add_leD1)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1204	done
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1205
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1206	lemma add_leE: "m + k \<le> n \<Longrightarrow> (m \<le> n \<Longrightarrow> k \<le> n \<Longrightarrow> R) \<Longrightarrow> R"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1207	for k m n :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1208	by (blast dest: add_leD1 add_leD2)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1209
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1210	text \<open>needs \<open>\<And>k\<close> for \<open>ac_simps\<close> to work\<close>
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1211	lemma less_add_eq_less: "\<And>k. k < l \<Longrightarrow> m + l = k + n \<Longrightarrow> m < n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1212	for l m n :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1213	by (force simp del: add_Suc_right simp add: less_iff_Suc_add add_Suc_right [symmetric] ac_simps)
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	1214
43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	1215
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	1216	subsubsection \<open>More results about difference\<close>
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	1217
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1218	lemma Suc_diff_le: "n \<le> m \<Longrightarrow> Suc m - n = Suc (m - n)"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1219	by (induct m n rule: diff_induct) simp_all
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	1220
43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	1221	lemma diff_less_Suc: "m - n < Suc m"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1222	apply (induct m n rule: diff_induct)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1223	apply (erule_tac [3] less_SucE)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1224	apply (simp_all add: less_Suc_eq)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1225	done
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1226
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1227	lemma diff_le_self [simp]: "m - n \<le> m"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1228	for m n :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1229	by (induct m n rule: diff_induct) (simp_all add: le_SucI)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1230
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1231	lemma less_imp_diff_less: "j < k \<Longrightarrow> j - n < k"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1232	for j k n :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1233	by (rule le_less_trans, rule diff_le_self)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1234
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1235	lemma diff_Suc_less [simp]: "0 < n \<Longrightarrow> n - Suc i < n"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1236	by (cases n) (auto simp add: le_simps)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1237
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1238	lemma diff_add_assoc: "k \<le> j \<Longrightarrow> (i + j) - k = i + (j - k)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1239	for i j k :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1240	by (induct j k rule: diff_induct) simp_all
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1241
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1242	lemma add_diff_assoc [simp]: "k \<le> j \<Longrightarrow> i + (j - k) = i + j - k"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1243	for i j k :: nat
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1244	by (fact diff_add_assoc [symmetric])
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1245
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1246	lemma diff_add_assoc2: "k \<le> j \<Longrightarrow> (j + i) - k = (j - k) + i"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1247	for i j k :: nat
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1248	by (simp add: ac_simps)
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1249
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1250	lemma add_diff_assoc2 [simp]: "k \<le> j \<Longrightarrow> j - k + i = j + i - k"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1251	for i j k :: nat
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1252	by (fact diff_add_assoc2 [symmetric])
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	1253
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1254	lemma le_imp_diff_is_add: "i \<le> j \<Longrightarrow> (j - i = k) = (j = k + i)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1255	for i j k :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1256	by auto
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1257
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1258	lemma diff_is_0_eq [simp]: "m - n = 0 \<longleftrightarrow> m \<le> n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1259	for m n :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1260	by (induct m n rule: diff_induct) simp_all
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1261
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1262	lemma diff_is_0_eq' [simp]: "m \<le> n \<Longrightarrow> m - n = 0"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1263	for m n :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1264	by (rule iffD2, rule diff_is_0_eq)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1265
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1266	lemma zero_less_diff [simp]: "0 < n - m \<longleftrightarrow> m < n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1267	for m n :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1268	by (induct m n rule: diff_induct) simp_all
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	1269
22718 936f7580937d tuned proofs; wenzelm parents: 22483 diff changeset	1270	lemma less_imp_add_positive:
936f7580937d tuned proofs; wenzelm parents: 22483 diff changeset	1271	assumes "i < j"
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1272	shows "\<exists>k::nat. 0 < k \<and> i + k = j"
22718 936f7580937d tuned proofs; wenzelm parents: 22483 diff changeset	1273	proof
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1274	from assms show "0 < j - i \<and> i + (j - i) = j"
23476 839db6346cc8 fix looping simp rule huffman parents: 23438 diff changeset	1275	by (simp add: order_less_imp_le)
22718 936f7580937d tuned proofs; wenzelm parents: 22483 diff changeset	1276	qed
9436 62bb04ab4b01 rearranged setup of arithmetic procedures, avoiding global reference values; wenzelm parents: 7702 diff changeset	1277
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	1278	text \<open>a nice rewrite for bounded subtraction\<close>
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1279	lemma nat_minus_add_max: "n - m + m = max n m"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1280	for m n :: nat
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1281	by (simp add: max_def not_le order_less_imp_le)
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	1282
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1283	lemma nat_diff_split: "P (a - b) \<longleftrightarrow> (a < b \<longrightarrow> P 0) \<and> (\<forall>d. a = b + d \<longrightarrow> P d)"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1284	for a b :: nat
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1285	\<comment> \<open>elimination of \<open>-\<close> on \<open>nat\<close>\<close>
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1286	by (cases "a < b") (auto simp add: not_less le_less dest!: add_eq_self_zero [OF sym])
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	1287
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1288	lemma nat_diff_split_asm: "P (a - b) \<longleftrightarrow> \<not> (a < b \<and> \<not> P 0 \<or> (\<exists>d. a = b + d \<and> \<not> P d))"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1289	for a b :: nat
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1290	\<comment> \<open>elimination of \<open>-\<close> on \<open>nat\<close> in assumptions\<close>
62365 8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	1291	by (auto split: nat_diff_split)
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	1292
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1293	lemma Suc_pred': "0 < n \<Longrightarrow> n = Suc(n - 1)"
47255 30a1692557b0 removed Nat_Numeral.thy, moving all theorems elsewhere huffman parents: 47208 diff changeset	1294	by simp
30a1692557b0 removed Nat_Numeral.thy, moving all theorems elsewhere huffman parents: 47208 diff changeset	1295
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1296	lemma add_eq_if: "m + n = (if m = 0 then n else Suc ((m - 1) + n))"
47255 30a1692557b0 removed Nat_Numeral.thy, moving all theorems elsewhere huffman parents: 47208 diff changeset	1297	unfolding One_nat_def by (cases m) simp_all
30a1692557b0 removed Nat_Numeral.thy, moving all theorems elsewhere huffman parents: 47208 diff changeset	1298
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1299	lemma mult_eq_if: "m * n = (if m = 0 then 0 else n + ((m - 1) * n))"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1300	for m n :: nat
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1301	by (cases m) simp_all
47255 30a1692557b0 removed Nat_Numeral.thy, moving all theorems elsewhere huffman parents: 47208 diff changeset	1302
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1303	lemma Suc_diff_eq_diff_pred: "0 < n \<Longrightarrow> Suc m - n = m - (n - 1)"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1304	by (cases n) simp_all
47255 30a1692557b0 removed Nat_Numeral.thy, moving all theorems elsewhere huffman parents: 47208 diff changeset	1305
30a1692557b0 removed Nat_Numeral.thy, moving all theorems elsewhere huffman parents: 47208 diff changeset	1306	lemma diff_Suc_eq_diff_pred: "m - Suc n = (m - 1) - n"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1307	by (cases m) simp_all
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1308
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1309	lemma Let_Suc [simp]: "Let (Suc n) f \<equiv> f (Suc n)"
47255 30a1692557b0 removed Nat_Numeral.thy, moving all theorems elsewhere huffman parents: 47208 diff changeset	1310	by (fact Let_def)
30a1692557b0 removed Nat_Numeral.thy, moving all theorems elsewhere huffman parents: 47208 diff changeset	1311
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	1312
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	1313	subsubsection \<open>Monotonicity of multiplication\<close>
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	1314
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1315	lemma mult_le_mono1: "i \<le> j \<Longrightarrow> i * k \<le> j * k"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1316	for i j k :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1317	by (simp add: mult_right_mono)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1318
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1319	lemma mult_le_mono2: "i \<le> j \<Longrightarrow> k * i \<le> k * j"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1320	for i j k :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1321	by (simp add: mult_left_mono)
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	1322
61799 4cf66f21b764 isabelle update_cartouches -c -t; wenzelm parents: 61649 diff changeset	1323	text \<open>\<open>\<le>\<close> monotonicity, BOTH arguments\<close>
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1324	lemma mult_le_mono: "i \<le> j \<Longrightarrow> k \<le> l \<Longrightarrow> i * k \<le> j * l"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1325	for i j k l :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1326	by (simp add: mult_mono)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1327
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1328	lemma mult_less_mono1: "i < j \<Longrightarrow> 0 < k \<Longrightarrow> i * k < j * k"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1329	for i j k :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1330	by (simp add: mult_strict_right_mono)
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	1331
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1332	text \<open>Differs from the standard \<open>zero_less_mult_iff\<close> in that there are no negative numbers.\<close>
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1333	lemma nat_0_less_mult_iff [simp]: "0 < m * n \<longleftrightarrow> 0 < m \<and> 0 < n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1334	for m n :: nat
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1335	proof (induct m)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1336	case 0
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1337	then show ?case by simp
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1338	next
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1339	case (Suc m)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1340	then show ?case by (cases n) simp_all
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1341	qed
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	1342
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1343	lemma one_le_mult_iff [simp]: "Suc 0 \<le> m * n \<longleftrightarrow> Suc 0 \<le> m \<and> Suc 0 \<le> n"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1344	proof (induct m)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1345	case 0
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1346	then show ?case by simp
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1347	next
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1348	case (Suc m)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1349	then show ?case by (cases n) simp_all
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1350	qed
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1351
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1352	lemma mult_less_cancel2 [simp]: "m * k < n * k \<longleftrightarrow> 0 < k \<and> m < n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1353	for k m n :: nat
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	1354	apply (safe intro!: mult_less_mono1)
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1355	apply (cases k)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1356	apply auto
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1357	apply (simp add: linorder_not_le [symmetric])
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	1358	apply (blast intro: mult_le_mono1)
43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	1359	done
43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	1360
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1361	lemma mult_less_cancel1 [simp]: "k * m < k * n \<longleftrightarrow> 0 < k \<and> m < n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1362	for k m n :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1363	by (simp add: mult.commute [of k])
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1364
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1365	lemma mult_le_cancel1 [simp]: "k * m \<le> k * n \<longleftrightarrow> (0 < k \<longrightarrow> m \<le> n)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1366	for k m n :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1367	by (simp add: linorder_not_less [symmetric], auto)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1368
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1369	lemma mult_le_cancel2 [simp]: "m * k \<le> n * k \<longleftrightarrow> (0 < k \<longrightarrow> m \<le> n)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1370	for k m n :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1371	by (simp add: linorder_not_less [symmetric], auto)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1372
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1373	lemma Suc_mult_less_cancel1: "Suc k * m < Suc k * n \<longleftrightarrow> m < n"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1374	by (subst mult_less_cancel1) simp
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1375
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1376	lemma Suc_mult_le_cancel1: "Suc k * m \<le> Suc k * n \<longleftrightarrow> m \<le> n"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1377	by (subst mult_le_cancel1) simp
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1378
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1379	lemma le_square: "m \<le> m * m"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1380	for m :: nat
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	1381	by (cases m) (auto intro: le_add1)
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	1382
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1383	lemma le_cube: "m \<le> m * (m * m)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1384	for m :: nat
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	1385	by (cases m) (auto intro: le_add1)
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	1386
61799 4cf66f21b764 isabelle update_cartouches -c -t; wenzelm parents: 61649 diff changeset	1387	text \<open>Lemma for \<open>gcd\<close>\<close>
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1388	lemma mult_eq_self_implies_10: "m = m * n \<Longrightarrow> n = 1 \<or> m = 0"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1389	for m n :: nat
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	1390	apply (drule sym)
43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	1391	apply (rule disjCI)
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1392	apply (rule linorder_cases)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1393	defer
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1394	apply assumption
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1395	apply (drule mult_less_mono2)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1396	apply auto
13449 43c9ec498291 - Converted to new theory format berghofe parents: 12338 diff changeset	1397	done
9436 62bb04ab4b01 rearranged setup of arithmetic procedures, avoiding global reference values; wenzelm parents: 7702 diff changeset	1398
51263 31e786e0e6a7 turned example into library for comparing growth of functions haftmann parents: 51173 diff changeset	1399	lemma mono_times_nat:
31e786e0e6a7 turned example into library for comparing growth of functions haftmann parents: 51173 diff changeset	1400	fixes n :: nat
31e786e0e6a7 turned example into library for comparing growth of functions haftmann parents: 51173 diff changeset	1401	assumes "n > 0"
31e786e0e6a7 turned example into library for comparing growth of functions haftmann parents: 51173 diff changeset	1402	shows "mono (times n)"
31e786e0e6a7 turned example into library for comparing growth of functions haftmann parents: 51173 diff changeset	1403	proof
31e786e0e6a7 turned example into library for comparing growth of functions haftmann parents: 51173 diff changeset	1404	fix m q :: nat
31e786e0e6a7 turned example into library for comparing growth of functions haftmann parents: 51173 diff changeset	1405	assume "m \<le> q"
31e786e0e6a7 turned example into library for comparing growth of functions haftmann parents: 51173 diff changeset	1406	with assms show "n * m \<le> n * q" by simp
31e786e0e6a7 turned example into library for comparing growth of functions haftmann parents: 51173 diff changeset	1407	qed
31e786e0e6a7 turned example into library for comparing growth of functions haftmann parents: 51173 diff changeset	1408
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1409	text \<open>The lattice order on @{typ nat}.\<close>
24995 c26e0166e568 refined; moved class power to theory Power haftmann parents: 24729 diff changeset	1410
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	1411	instantiation nat :: distrib_lattice
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	1412	begin
24995 c26e0166e568 refined; moved class power to theory Power haftmann parents: 24729 diff changeset	1413
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1414	definition "(inf :: nat \<Rightarrow> nat \<Rightarrow> nat) = min"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1415
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1416	definition "(sup :: nat \<Rightarrow> nat \<Rightarrow> nat) = max"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1417
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1418	instance
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1419	by intro_classes
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1420	(auto simp add: inf_nat_def sup_nat_def max_def not_le min_def
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1421	intro: order_less_imp_le antisym elim!: order_trans order_less_trans)
24995 c26e0166e568 refined; moved class power to theory Power haftmann parents: 24729 diff changeset	1422
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	1423	end
24995 c26e0166e568 refined; moved class power to theory Power haftmann parents: 24729 diff changeset	1424
c26e0166e568 refined; moved class power to theory Power haftmann parents: 24729 diff changeset	1425
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	1426	subsection \<open>Natural operation of natural numbers on functions\<close>
d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	1427
d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	1428	text \<open>
30971 7fbebf75b3ef funpow and relpow with shared "^^" syntax haftmann parents: 30966 diff changeset	1429	We use the same logical constant for the power operations on
7fbebf75b3ef funpow and relpow with shared "^^" syntax haftmann parents: 30966 diff changeset	1430	functions and relations, in order to share the same syntax.
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	1431	\<close>
30971 7fbebf75b3ef funpow and relpow with shared "^^" syntax haftmann parents: 30966 diff changeset	1432
45965 2af982715e5c generalized type signature to permit overloading on `set` haftmann parents: 45933 diff changeset	1433	consts compow :: "nat \<Rightarrow> 'a \<Rightarrow> 'a"
30971 7fbebf75b3ef funpow and relpow with shared "^^" syntax haftmann parents: 30966 diff changeset	1434
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1435	abbreviation compower :: "'a \<Rightarrow> nat \<Rightarrow> 'a" (infixr "^^" 80)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1436	where "f ^^ n \<equiv> compow n f"
30971 7fbebf75b3ef funpow and relpow with shared "^^" syntax haftmann parents: 30966 diff changeset	1437
7fbebf75b3ef funpow and relpow with shared "^^" syntax haftmann parents: 30966 diff changeset	1438	notation (latex output)
7fbebf75b3ef funpow and relpow with shared "^^" syntax haftmann parents: 30966 diff changeset	1439	compower ("(_\<^bsup>_\<^esup>)" [1000] 1000)
7fbebf75b3ef funpow and relpow with shared "^^" syntax haftmann parents: 30966 diff changeset	1440
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1441	text \<open>\<open>f ^^ n = f \<circ> \<dots> \<circ> f\<close>, the \<open>n\<close>-fold composition of \<open>f\<close>\<close>
30971 7fbebf75b3ef funpow and relpow with shared "^^" syntax haftmann parents: 30966 diff changeset	1442
7fbebf75b3ef funpow and relpow with shared "^^" syntax haftmann parents: 30966 diff changeset	1443	overloading
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1444	funpow \<equiv> "compow :: nat \<Rightarrow> ('a \<Rightarrow> 'a) \<Rightarrow> ('a \<Rightarrow> 'a)"
30971 7fbebf75b3ef funpow and relpow with shared "^^" syntax haftmann parents: 30966 diff changeset	1445	begin
30954 cf50e67bc1d1 power operation on functions in theory Nat; power operation on relations in theory Transitive_Closure haftmann parents: 30686 diff changeset	1446
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1447	primrec funpow :: "nat \<Rightarrow> ('a \<Rightarrow> 'a) \<Rightarrow> 'a \<Rightarrow> 'a"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1448	where
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1449	"funpow 0 f = id"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1450	\| "funpow (Suc n) f = f \<circ> funpow n f"
30954 cf50e67bc1d1 power operation on functions in theory Nat; power operation on relations in theory Transitive_Closure haftmann parents: 30686 diff changeset	1451
30971 7fbebf75b3ef funpow and relpow with shared "^^" syntax haftmann parents: 30966 diff changeset	1452	end
7fbebf75b3ef funpow and relpow with shared "^^" syntax haftmann parents: 30966 diff changeset	1453
62217 527488dc8b90 Reorganised a huge proof paulson <lp15@cam.ac.uk> parents: 61799 diff changeset	1454	lemma funpow_0 [simp]: "(f ^^ 0) x = x"
527488dc8b90 Reorganised a huge proof paulson <lp15@cam.ac.uk> parents: 61799 diff changeset	1455	by simp
527488dc8b90 Reorganised a huge proof paulson <lp15@cam.ac.uk> parents: 61799 diff changeset	1456
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1457	lemma funpow_Suc_right: "f ^^ Suc n = f ^^ n \<circ> f"
49723 bbc2942ba09f alternative simplification of ^^ to the righthand side; haftmann parents: 49388 diff changeset	1458	proof (induct n)
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1459	case 0
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1460	then show ?case by simp
49723 bbc2942ba09f alternative simplification of ^^ to the righthand side; haftmann parents: 49388 diff changeset	1461	next
bbc2942ba09f alternative simplification of ^^ to the righthand side; haftmann parents: 49388 diff changeset	1462	fix n
bbc2942ba09f alternative simplification of ^^ to the righthand side; haftmann parents: 49388 diff changeset	1463	assume "f ^^ Suc n = f ^^ n \<circ> f"
bbc2942ba09f alternative simplification of ^^ to the righthand side; haftmann parents: 49388 diff changeset	1464	then show "f ^^ Suc (Suc n) = f ^^ Suc n \<circ> f"
bbc2942ba09f alternative simplification of ^^ to the righthand side; haftmann parents: 49388 diff changeset	1465	by (simp add: o_assoc)
bbc2942ba09f alternative simplification of ^^ to the righthand side; haftmann parents: 49388 diff changeset	1466	qed
bbc2942ba09f alternative simplification of ^^ to the righthand side; haftmann parents: 49388 diff changeset	1467
bbc2942ba09f alternative simplification of ^^ to the righthand side; haftmann parents: 49388 diff changeset	1468	lemmas funpow_simps_right = funpow.simps(1) funpow_Suc_right
bbc2942ba09f alternative simplification of ^^ to the righthand side; haftmann parents: 49388 diff changeset	1469
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1470	text \<open>For code generation.\<close>
30971 7fbebf75b3ef funpow and relpow with shared "^^" syntax haftmann parents: 30966 diff changeset	1471
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1472	definition funpow :: "nat \<Rightarrow> ('a \<Rightarrow> 'a) \<Rightarrow> 'a \<Rightarrow> 'a"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1473	where funpow_code_def [code_abbrev]: "funpow = compow"
30954 cf50e67bc1d1 power operation on functions in theory Nat; power operation on relations in theory Transitive_Closure haftmann parents: 30686 diff changeset	1474
30971 7fbebf75b3ef funpow and relpow with shared "^^" syntax haftmann parents: 30966 diff changeset	1475	lemma [code]:
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1476	"funpow (Suc n) f = f \<circ> funpow n f"
30971 7fbebf75b3ef funpow and relpow with shared "^^" syntax haftmann parents: 30966 diff changeset	1477	"funpow 0 f = id"
37430 a77740fc3957 added lemma funpow_mult haftmann parents: 37387 diff changeset	1478	by (simp_all add: funpow_code_def)
30971 7fbebf75b3ef funpow and relpow with shared "^^" syntax haftmann parents: 30966 diff changeset	1479
36176 3fe7e97ccca8 replaced generic 'hide' command by more conventional 'hide_class', 'hide_type', 'hide_const', 'hide_fact' -- frees some popular keywords; wenzelm parents: 35828 diff changeset	1480	hide_const (open) funpow
30954 cf50e67bc1d1 power operation on functions in theory Nat; power operation on relations in theory Transitive_Closure haftmann parents: 30686 diff changeset	1481
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1482	lemma funpow_add: "f ^^ (m + n) = f ^^ m \<circ> f ^^ n"
30954 cf50e67bc1d1 power operation on functions in theory Nat; power operation on relations in theory Transitive_Closure haftmann parents: 30686 diff changeset	1483	by (induct m) simp_all
cf50e67bc1d1 power operation on functions in theory Nat; power operation on relations in theory Transitive_Closure haftmann parents: 30686 diff changeset	1484
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1485	lemma funpow_mult: "(f ^^ m) ^^ n = f ^^ (m * n)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1486	for f :: "'a \<Rightarrow> 'a"
37430 a77740fc3957 added lemma funpow_mult haftmann parents: 37387 diff changeset	1487	by (induct n) (simp_all add: funpow_add)
a77740fc3957 added lemma funpow_mult haftmann parents: 37387 diff changeset	1488
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1489	lemma funpow_swap1: "f ((f ^^ n) x) = (f ^^ n) (f x)"
30954 cf50e67bc1d1 power operation on functions in theory Nat; power operation on relations in theory Transitive_Closure haftmann parents: 30686 diff changeset	1490	proof -
30971 7fbebf75b3ef funpow and relpow with shared "^^" syntax haftmann parents: 30966 diff changeset	1491	have "f ((f ^^ n) x) = (f ^^ (n + 1)) x" by simp
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1492	also have "\<dots> = (f ^^ n \<circ> f ^^ 1) x" by (simp only: funpow_add)
30971 7fbebf75b3ef funpow and relpow with shared "^^" syntax haftmann parents: 30966 diff changeset	1493	also have "\<dots> = (f ^^ n) (f x)" by simp
30954 cf50e67bc1d1 power operation on functions in theory Nat; power operation on relations in theory Transitive_Closure haftmann parents: 30686 diff changeset	1494	finally show ?thesis .
cf50e67bc1d1 power operation on functions in theory Nat; power operation on relations in theory Transitive_Closure haftmann parents: 30686 diff changeset	1495	qed
cf50e67bc1d1 power operation on functions in theory Nat; power operation on relations in theory Transitive_Closure haftmann parents: 30686 diff changeset	1496
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1497	lemma comp_funpow: "comp f ^^ n = comp (f ^^ n)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1498	for f :: "'a \<Rightarrow> 'a"
38621 d6cb7e625d75 more concise characterization of of_nat operation and class semiring_char_0 haftmann parents: 37767 diff changeset	1499	by (induct n) simp_all
30954 cf50e67bc1d1 power operation on functions in theory Nat; power operation on relations in theory Transitive_Closure haftmann parents: 30686 diff changeset	1500
54496 178922b63b58 add lemmas Suc_funpow and id_funpow to simpset; add lemma map_add_upt hoelzl parents: 54411 diff changeset	1501	lemma Suc_funpow[simp]: "Suc ^^ n = (op + n)"
178922b63b58 add lemmas Suc_funpow and id_funpow to simpset; add lemma map_add_upt hoelzl parents: 54411 diff changeset	1502	by (induct n) simp_all
178922b63b58 add lemmas Suc_funpow and id_funpow to simpset; add lemma map_add_upt hoelzl parents: 54411 diff changeset	1503
178922b63b58 add lemmas Suc_funpow and id_funpow to simpset; add lemma map_add_upt hoelzl parents: 54411 diff changeset	1504	lemma id_funpow[simp]: "id ^^ n = id"
178922b63b58 add lemmas Suc_funpow and id_funpow to simpset; add lemma map_add_upt hoelzl parents: 54411 diff changeset	1505	by (induct n) simp_all
38621 d6cb7e625d75 more concise characterization of of_nat operation and class semiring_char_0 haftmann parents: 37767 diff changeset	1506
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1507	lemma funpow_mono: "mono f \<Longrightarrow> A \<le> B \<Longrightarrow> (f ^^ n) A \<le> (f ^^ n) B"
63561 fba08009ff3e add lemmas contributed by Peter Gammie Andreas Lochbihler parents: 63197 diff changeset	1508	for f :: "'a \<Rightarrow> ('a::order)"
59000 6eb0725503fc import general theorems from AFP/Markov_Models hoelzl parents: 58952 diff changeset	1509	by (induct n arbitrary: A B)
6eb0725503fc import general theorems from AFP/Markov_Models hoelzl parents: 58952 diff changeset	1510	(auto simp del: funpow.simps(2) simp add: funpow_Suc_right mono_def)
6eb0725503fc import general theorems from AFP/Markov_Models hoelzl parents: 58952 diff changeset	1511
63561 fba08009ff3e add lemmas contributed by Peter Gammie Andreas Lochbihler parents: 63197 diff changeset	1512	lemma funpow_mono2:
fba08009ff3e add lemmas contributed by Peter Gammie Andreas Lochbihler parents: 63197 diff changeset	1513	assumes "mono f"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1514	and "i \<le> j"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1515	and "x \<le> y"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1516	and "x \<le> f x"
63561 fba08009ff3e add lemmas contributed by Peter Gammie Andreas Lochbihler parents: 63197 diff changeset	1517	shows "(f ^^ i) x \<le> (f ^^ j) y"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1518	using assms(2,3)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1519	proof (induct j arbitrary: y)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1520	case 0
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1521	then show ?case by simp
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1522	next
63561 fba08009ff3e add lemmas contributed by Peter Gammie Andreas Lochbihler parents: 63197 diff changeset	1523	case (Suc j)
fba08009ff3e add lemmas contributed by Peter Gammie Andreas Lochbihler parents: 63197 diff changeset	1524	show ?case
fba08009ff3e add lemmas contributed by Peter Gammie Andreas Lochbihler parents: 63197 diff changeset	1525	proof(cases "i = Suc j")
fba08009ff3e add lemmas contributed by Peter Gammie Andreas Lochbihler parents: 63197 diff changeset	1526	case True
fba08009ff3e add lemmas contributed by Peter Gammie Andreas Lochbihler parents: 63197 diff changeset	1527	with assms(1) Suc show ?thesis
fba08009ff3e add lemmas contributed by Peter Gammie Andreas Lochbihler parents: 63197 diff changeset	1528	by (simp del: funpow.simps add: funpow_simps_right monoD funpow_mono)
fba08009ff3e add lemmas contributed by Peter Gammie Andreas Lochbihler parents: 63197 diff changeset	1529	next
fba08009ff3e add lemmas contributed by Peter Gammie Andreas Lochbihler parents: 63197 diff changeset	1530	case False
fba08009ff3e add lemmas contributed by Peter Gammie Andreas Lochbihler parents: 63197 diff changeset	1531	with assms(1,4) Suc show ?thesis
fba08009ff3e add lemmas contributed by Peter Gammie Andreas Lochbihler parents: 63197 diff changeset	1532	by (simp del: funpow.simps add: funpow_simps_right le_eq_less_or_eq less_Suc_eq_le)
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1533	(simp add: Suc.hyps monoD order_subst1)
63561 fba08009ff3e add lemmas contributed by Peter Gammie Andreas Lochbihler parents: 63197 diff changeset	1534	qed
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1535	qed
63561 fba08009ff3e add lemmas contributed by Peter Gammie Andreas Lochbihler parents: 63197 diff changeset	1536
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1537
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	1538	subsection \<open>Kleene iteration\<close>
45833 033cb3a668b9 lemmas about Kleene iteration nipkow parents: 45696 diff changeset	1539
52729 412c9e0381a1 factored syntactic type classes for bot and top (by Alessandro Coglio) haftmann parents: 52435 diff changeset	1540	lemma Kleene_iter_lpfp:
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1541	fixes f :: "'a::order_bot \<Rightarrow> 'a"
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1542	assumes "mono f"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1543	and "f p \<le> p"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1544	shows "(f ^^ k) bot \<le> p"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1545	proof (induct k)
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1546	case 0
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1547	show ?case by simp
45833 033cb3a668b9 lemmas about Kleene iteration nipkow parents: 45696 diff changeset	1548	next
033cb3a668b9 lemmas about Kleene iteration nipkow parents: 45696 diff changeset	1549	case Suc
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1550	show ?case
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1551	using monoD[OF assms(1) Suc] assms(2) by simp
45833 033cb3a668b9 lemmas about Kleene iteration nipkow parents: 45696 diff changeset	1552	qed
033cb3a668b9 lemmas about Kleene iteration nipkow parents: 45696 diff changeset	1553
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1554	lemma lfp_Kleene_iter:
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1555	assumes "mono f"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1556	and "(f ^^ Suc k) bot = (f ^^ k) bot"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1557	shows "lfp f = (f ^^ k) bot"
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1558	proof (rule antisym)
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1559	show "lfp f \<le> (f ^^ k) bot"
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1560	proof (rule lfp_lowerbound)
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1561	show "f ((f ^^ k) bot) \<le> (f ^^ k) bot"
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1562	using assms(2) by simp
45833 033cb3a668b9 lemmas about Kleene iteration nipkow parents: 45696 diff changeset	1563	qed
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1564	show "(f ^^ k) bot \<le> lfp f"
45833 033cb3a668b9 lemmas about Kleene iteration nipkow parents: 45696 diff changeset	1565	using Kleene_iter_lpfp[OF assms(1)] lfp_unfold[OF assms(1)] by simp
033cb3a668b9 lemmas about Kleene iteration nipkow parents: 45696 diff changeset	1566	qed
033cb3a668b9 lemmas about Kleene iteration nipkow parents: 45696 diff changeset	1567
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1568	lemma mono_pow: "mono f \<Longrightarrow> mono (f ^^ n)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1569	for f :: "'a \<Rightarrow> 'a::complete_lattice"
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1570	by (induct n) (auto simp: mono_def)
60636 ee18efe9b246 add named theorems order_continuous_intros; lfp/gfp_funpow; bounded variant for lfp/gfp transfer hoelzl parents: 60562 diff changeset	1571
ee18efe9b246 add named theorems order_continuous_intros; lfp/gfp_funpow; bounded variant for lfp/gfp transfer hoelzl parents: 60562 diff changeset	1572	lemma lfp_funpow:
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1573	assumes f: "mono f"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1574	shows "lfp (f ^^ Suc n) = lfp f"
60636 ee18efe9b246 add named theorems order_continuous_intros; lfp/gfp_funpow; bounded variant for lfp/gfp transfer hoelzl parents: 60562 diff changeset	1575	proof (rule antisym)
ee18efe9b246 add named theorems order_continuous_intros; lfp/gfp_funpow; bounded variant for lfp/gfp transfer hoelzl parents: 60562 diff changeset	1576	show "lfp f \<le> lfp (f ^^ Suc n)"
ee18efe9b246 add named theorems order_continuous_intros; lfp/gfp_funpow; bounded variant for lfp/gfp transfer hoelzl parents: 60562 diff changeset	1577	proof (rule lfp_lowerbound)
ee18efe9b246 add named theorems order_continuous_intros; lfp/gfp_funpow; bounded variant for lfp/gfp transfer hoelzl parents: 60562 diff changeset	1578	have "f (lfp (f ^^ Suc n)) = lfp (\<lambda>x. f ((f ^^ n) x))"
ee18efe9b246 add named theorems order_continuous_intros; lfp/gfp_funpow; bounded variant for lfp/gfp transfer hoelzl parents: 60562 diff changeset	1579	unfolding funpow_Suc_right by (simp add: lfp_rolling f mono_pow comp_def)
ee18efe9b246 add named theorems order_continuous_intros; lfp/gfp_funpow; bounded variant for lfp/gfp transfer hoelzl parents: 60562 diff changeset	1580	then show "f (lfp (f ^^ Suc n)) \<le> lfp (f ^^ Suc n)"
ee18efe9b246 add named theorems order_continuous_intros; lfp/gfp_funpow; bounded variant for lfp/gfp transfer hoelzl parents: 60562 diff changeset	1581	by (simp add: comp_def)
ee18efe9b246 add named theorems order_continuous_intros; lfp/gfp_funpow; bounded variant for lfp/gfp transfer hoelzl parents: 60562 diff changeset	1582	qed
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1583	have "(f ^^ n) (lfp f) = lfp f" for n
63979 95c3ae4baba8 clarified lfp/gfp statements and proofs; wenzelm parents: 63648 diff changeset	1584	by (induct n) (auto intro: f lfp_fixpoint)
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1585	then show "lfp (f ^^ Suc n) \<le> lfp f"
60636 ee18efe9b246 add named theorems order_continuous_intros; lfp/gfp_funpow; bounded variant for lfp/gfp transfer hoelzl parents: 60562 diff changeset	1586	by (intro lfp_lowerbound) (simp del: funpow.simps)
ee18efe9b246 add named theorems order_continuous_intros; lfp/gfp_funpow; bounded variant for lfp/gfp transfer hoelzl parents: 60562 diff changeset	1587	qed
ee18efe9b246 add named theorems order_continuous_intros; lfp/gfp_funpow; bounded variant for lfp/gfp transfer hoelzl parents: 60562 diff changeset	1588
ee18efe9b246 add named theorems order_continuous_intros; lfp/gfp_funpow; bounded variant for lfp/gfp transfer hoelzl parents: 60562 diff changeset	1589	lemma gfp_funpow:
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1590	assumes f: "mono f"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1591	shows "gfp (f ^^ Suc n) = gfp f"
60636 ee18efe9b246 add named theorems order_continuous_intros; lfp/gfp_funpow; bounded variant for lfp/gfp transfer hoelzl parents: 60562 diff changeset	1592	proof (rule antisym)
ee18efe9b246 add named theorems order_continuous_intros; lfp/gfp_funpow; bounded variant for lfp/gfp transfer hoelzl parents: 60562 diff changeset	1593	show "gfp f \<ge> gfp (f ^^ Suc n)"
ee18efe9b246 add named theorems order_continuous_intros; lfp/gfp_funpow; bounded variant for lfp/gfp transfer hoelzl parents: 60562 diff changeset	1594	proof (rule gfp_upperbound)
ee18efe9b246 add named theorems order_continuous_intros; lfp/gfp_funpow; bounded variant for lfp/gfp transfer hoelzl parents: 60562 diff changeset	1595	have "f (gfp (f ^^ Suc n)) = gfp (\<lambda>x. f ((f ^^ n) x))"
ee18efe9b246 add named theorems order_continuous_intros; lfp/gfp_funpow; bounded variant for lfp/gfp transfer hoelzl parents: 60562 diff changeset	1596	unfolding funpow_Suc_right by (simp add: gfp_rolling f mono_pow comp_def)
ee18efe9b246 add named theorems order_continuous_intros; lfp/gfp_funpow; bounded variant for lfp/gfp transfer hoelzl parents: 60562 diff changeset	1597	then show "f (gfp (f ^^ Suc n)) \<ge> gfp (f ^^ Suc n)"
ee18efe9b246 add named theorems order_continuous_intros; lfp/gfp_funpow; bounded variant for lfp/gfp transfer hoelzl parents: 60562 diff changeset	1598	by (simp add: comp_def)
ee18efe9b246 add named theorems order_continuous_intros; lfp/gfp_funpow; bounded variant for lfp/gfp transfer hoelzl parents: 60562 diff changeset	1599	qed
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1600	have "(f ^^ n) (gfp f) = gfp f" for n
63979 95c3ae4baba8 clarified lfp/gfp statements and proofs; wenzelm parents: 63648 diff changeset	1601	by (induct n) (auto intro: f gfp_fixpoint)
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1602	then show "gfp (f ^^ Suc n) \<ge> gfp f"
60636 ee18efe9b246 add named theorems order_continuous_intros; lfp/gfp_funpow; bounded variant for lfp/gfp transfer hoelzl parents: 60562 diff changeset	1603	by (intro gfp_upperbound) (simp del: funpow.simps)
ee18efe9b246 add named theorems order_continuous_intros; lfp/gfp_funpow; bounded variant for lfp/gfp transfer hoelzl parents: 60562 diff changeset	1604	qed
45833 033cb3a668b9 lemmas about Kleene iteration nipkow parents: 45696 diff changeset	1605
63561 fba08009ff3e add lemmas contributed by Peter Gammie Andreas Lochbihler parents: 63197 diff changeset	1606	lemma Kleene_iter_gpfp:
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1607	fixes f :: "'a::order_top \<Rightarrow> 'a"
63561 fba08009ff3e add lemmas contributed by Peter Gammie Andreas Lochbihler parents: 63197 diff changeset	1608	assumes "mono f"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1609	and "p \<le> f p"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1610	shows "p \<le> (f ^^ k) top"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1611	proof (induct k)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1612	case 0
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1613	show ?case by simp
63561 fba08009ff3e add lemmas contributed by Peter Gammie Andreas Lochbihler parents: 63197 diff changeset	1614	next
fba08009ff3e add lemmas contributed by Peter Gammie Andreas Lochbihler parents: 63197 diff changeset	1615	case Suc
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1616	show ?case
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1617	using monoD[OF assms(1) Suc] assms(2) by simp
63561 fba08009ff3e add lemmas contributed by Peter Gammie Andreas Lochbihler parents: 63197 diff changeset	1618	qed
fba08009ff3e add lemmas contributed by Peter Gammie Andreas Lochbihler parents: 63197 diff changeset	1619
fba08009ff3e add lemmas contributed by Peter Gammie Andreas Lochbihler parents: 63197 diff changeset	1620	lemma gfp_Kleene_iter:
fba08009ff3e add lemmas contributed by Peter Gammie Andreas Lochbihler parents: 63197 diff changeset	1621	assumes "mono f"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1622	and "(f ^^ Suc k) top = (f ^^ k) top"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1623	shows "gfp f = (f ^^ k) top"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1624	(is "?lhs = ?rhs")
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1625	proof (rule antisym)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1626	have "?rhs \<le> f ?rhs"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1627	using assms(2) by simp
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1628	then show "?rhs \<le> ?lhs"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1629	by (rule gfp_upperbound)
63561 fba08009ff3e add lemmas contributed by Peter Gammie Andreas Lochbihler parents: 63197 diff changeset	1630	show "?lhs \<le> ?rhs"
fba08009ff3e add lemmas contributed by Peter Gammie Andreas Lochbihler parents: 63197 diff changeset	1631	using Kleene_iter_gpfp[OF assms(1)] gfp_unfold[OF assms(1)] by simp
fba08009ff3e add lemmas contributed by Peter Gammie Andreas Lochbihler parents: 63197 diff changeset	1632	qed
fba08009ff3e add lemmas contributed by Peter Gammie Andreas Lochbihler parents: 63197 diff changeset	1633
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1634
61799 4cf66f21b764 isabelle update_cartouches -c -t; wenzelm parents: 61649 diff changeset	1635	subsection \<open>Embedding of the naturals into any \<open>semiring_1\<close>: @{term of_nat}\<close>
24196 f1dbfd7e3223 localized of_nat haftmann parents: 24162 diff changeset	1636
f1dbfd7e3223 localized of_nat haftmann parents: 24162 diff changeset	1637	context semiring_1
f1dbfd7e3223 localized of_nat haftmann parents: 24162 diff changeset	1638	begin
f1dbfd7e3223 localized of_nat haftmann parents: 24162 diff changeset	1639
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1640	definition of_nat :: "nat \<Rightarrow> 'a"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1641	where "of_nat n = (plus 1 ^^ n) 0"
38621 d6cb7e625d75 more concise characterization of of_nat operation and class semiring_char_0 haftmann parents: 37767 diff changeset	1642
d6cb7e625d75 more concise characterization of of_nat operation and class semiring_char_0 haftmann parents: 37767 diff changeset	1643	lemma of_nat_simps [simp]:
d6cb7e625d75 more concise characterization of of_nat operation and class semiring_char_0 haftmann parents: 37767 diff changeset	1644	shows of_nat_0: "of_nat 0 = 0"
d6cb7e625d75 more concise characterization of of_nat operation and class semiring_char_0 haftmann parents: 37767 diff changeset	1645	and of_nat_Suc: "of_nat (Suc m) = 1 + of_nat m"
d6cb7e625d75 more concise characterization of of_nat operation and class semiring_char_0 haftmann parents: 37767 diff changeset	1646	by (simp_all add: of_nat_def)
25193 e2e1a4b00de3 various localizations haftmann parents: 25162 diff changeset	1647
e2e1a4b00de3 various localizations haftmann parents: 25162 diff changeset	1648	lemma of_nat_1 [simp]: "of_nat 1 = 1"
38621 d6cb7e625d75 more concise characterization of of_nat operation and class semiring_char_0 haftmann parents: 37767 diff changeset	1649	by (simp add: of_nat_def)
25193 e2e1a4b00de3 various localizations haftmann parents: 25162 diff changeset	1650
e2e1a4b00de3 various localizations haftmann parents: 25162 diff changeset	1651	lemma of_nat_add [simp]: "of_nat (m + n) = of_nat m + of_nat n"
57514 bdc2c6b40bf2 prefer ac_simps collections over separate name bindings for add and mult haftmann parents: 57512 diff changeset	1652	by (induct m) (simp_all add: ac_simps)
25193 e2e1a4b00de3 various localizations haftmann parents: 25162 diff changeset	1653
61649 268d88ec9087 Tweaks for "real": Removal of [iff] status for some lemmas, adding [simp] for others. Plus fixes. paulson <lp15@cam.ac.uk> parents: 61531 diff changeset	1654	lemma of_nat_mult [simp]: "of_nat (m * n) = of_nat m * of_nat n"
57514 bdc2c6b40bf2 prefer ac_simps collections over separate name bindings for add and mult haftmann parents: 57512 diff changeset	1655	by (induct m) (simp_all add: ac_simps distrib_right)
25193 e2e1a4b00de3 various localizations haftmann parents: 25162 diff changeset	1656
61531 ab2e862263e7 Rounding function, uniform limits, cotangent, binomial identities eberlm parents: 61378 diff changeset	1657	lemma mult_of_nat_commute: "of_nat x * y = y * of_nat x"
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1658	by (induct x) (simp_all add: algebra_simps)
61531 ab2e862263e7 Rounding function, uniform limits, cotangent, binomial identities eberlm parents: 61378 diff changeset	1659
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1660	primrec of_nat_aux :: "('a \<Rightarrow> 'a) \<Rightarrow> nat \<Rightarrow> 'a \<Rightarrow> 'a"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1661	where
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1662	"of_nat_aux inc 0 i = i"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1663	\| "of_nat_aux inc (Suc n) i = of_nat_aux inc n (inc i)" \<comment> \<open>tail recursive\<close>
25928 042e877d9841 tuned code setup haftmann parents: 25690 diff changeset	1664
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1665	lemma of_nat_code: "of_nat n = of_nat_aux (\<lambda>i. i + 1) n 0"
28514 da83a614c454 tuned of_nat code generation haftmann parents: 27823 diff changeset	1666	proof (induct n)
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1667	case 0
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1668	then show ?case by simp
28514 da83a614c454 tuned of_nat code generation haftmann parents: 27823 diff changeset	1669	next
da83a614c454 tuned of_nat code generation haftmann parents: 27823 diff changeset	1670	case (Suc n)
da83a614c454 tuned of_nat code generation haftmann parents: 27823 diff changeset	1671	have "\<And>i. of_nat_aux (\<lambda>i. i + 1) n (i + 1) = of_nat_aux (\<lambda>i. i + 1) n i + 1"
da83a614c454 tuned of_nat code generation haftmann parents: 27823 diff changeset	1672	by (induct n) simp_all
da83a614c454 tuned of_nat code generation haftmann parents: 27823 diff changeset	1673	from this [of 0] have "of_nat_aux (\<lambda>i. i + 1) n 1 = of_nat_aux (\<lambda>i. i + 1) n 0 + 1"
da83a614c454 tuned of_nat code generation haftmann parents: 27823 diff changeset	1674	by simp
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1675	with Suc show ?case
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1676	by (simp add: add.commute)
28514 da83a614c454 tuned of_nat code generation haftmann parents: 27823 diff changeset	1677	qed
30966 55104c664185 avoid local [code] haftmann parents: 30954 diff changeset	1678
24196 f1dbfd7e3223 localized of_nat haftmann parents: 24162 diff changeset	1679	end
f1dbfd7e3223 localized of_nat haftmann parents: 24162 diff changeset	1680
45231 d85a2fdc586c replacing code_inline by code_unfold, removing obsolete code_unfold, code_inline del now that the ancient code generator is removed bulwahn parents: 44890 diff changeset	1681	declare of_nat_code [code]
30966 55104c664185 avoid local [code] haftmann parents: 30954 diff changeset	1682
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1683	context ring_1
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1684	begin
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1685
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1686	lemma of_nat_diff: "n \<le> m \<Longrightarrow> of_nat (m - n) = of_nat m - of_nat n"
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1687	by (simp add: algebra_simps of_nat_add [symmetric])
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1688
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1689	end
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1690
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1691	text \<open>Class for unital semirings with characteristic zero.
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	1692	Includes non-ordered rings like the complex numbers.\<close>
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	1693
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	1694	class semiring_char_0 = semiring_1 +
38621 d6cb7e625d75 more concise characterization of of_nat operation and class semiring_char_0 haftmann parents: 37767 diff changeset	1695	assumes inj_of_nat: "inj of_nat"
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	1696	begin
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	1697
38621 d6cb7e625d75 more concise characterization of of_nat operation and class semiring_char_0 haftmann parents: 37767 diff changeset	1698	lemma of_nat_eq_iff [simp]: "of_nat m = of_nat n \<longleftrightarrow> m = n"
d6cb7e625d75 more concise characterization of of_nat operation and class semiring_char_0 haftmann parents: 37767 diff changeset	1699	by (auto intro: inj_of_nat injD)
d6cb7e625d75 more concise characterization of of_nat operation and class semiring_char_0 haftmann parents: 37767 diff changeset	1700
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1701	text \<open>Special cases where either operand is zero\<close>
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	1702
54147 97a8ff4e4ac9 killed most "no_atp", to make Sledgehammer more complete blanchet parents: 53986 diff changeset	1703	lemma of_nat_0_eq_iff [simp]: "0 = of_nat n \<longleftrightarrow> 0 = n"
38621 d6cb7e625d75 more concise characterization of of_nat operation and class semiring_char_0 haftmann parents: 37767 diff changeset	1704	by (fact of_nat_eq_iff [of 0 n, unfolded of_nat_0])
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	1705
54147 97a8ff4e4ac9 killed most "no_atp", to make Sledgehammer more complete blanchet parents: 53986 diff changeset	1706	lemma of_nat_eq_0_iff [simp]: "of_nat m = 0 \<longleftrightarrow> m = 0"
38621 d6cb7e625d75 more concise characterization of of_nat operation and class semiring_char_0 haftmann parents: 37767 diff changeset	1707	by (fact of_nat_eq_iff [of m 0, unfolded of_nat_0])
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	1708
65583 8d53b3bebab4 Further new material. The simprule status of some exp and ln identities was reverted. paulson <lp15@cam.ac.uk> parents: 64876 diff changeset	1709	lemma of_nat_1_eq_iff [simp]: "1 = of_nat n \<longleftrightarrow> n=1"
8d53b3bebab4 Further new material. The simprule status of some exp and ln identities was reverted. paulson <lp15@cam.ac.uk> parents: 64876 diff changeset	1710	using of_nat_eq_iff by fastforce
8d53b3bebab4 Further new material. The simprule status of some exp and ln identities was reverted. paulson <lp15@cam.ac.uk> parents: 64876 diff changeset	1711
8d53b3bebab4 Further new material. The simprule status of some exp and ln identities was reverted. paulson <lp15@cam.ac.uk> parents: 64876 diff changeset	1712	lemma of_nat_eq_1_iff [simp]: "of_nat n = 1 \<longleftrightarrow> n=1"
8d53b3bebab4 Further new material. The simprule status of some exp and ln identities was reverted. paulson <lp15@cam.ac.uk> parents: 64876 diff changeset	1713	using of_nat_eq_iff by fastforce
8d53b3bebab4 Further new material. The simprule status of some exp and ln identities was reverted. paulson <lp15@cam.ac.uk> parents: 64876 diff changeset	1714
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1715	lemma of_nat_neq_0 [simp]: "of_nat (Suc n) \<noteq> 0"
60353 838025c6e278 implicit partial divison operation in integral domains haftmann parents: 60175 diff changeset	1716	unfolding of_nat_eq_0_iff by simp
838025c6e278 implicit partial divison operation in integral domains haftmann parents: 60175 diff changeset	1717
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1718	lemma of_nat_0_neq [simp]: "0 \<noteq> of_nat (Suc n)"
60562 24af00b010cf Amalgamation of the class comm_semiring_1_diff_distrib into comm_semiring_1_cancel. Moving axiom le_add_diff_inverse2 from semiring_numeral_div to linordered_semidom. paulson <lp15@cam.ac.uk> parents: 60427 diff changeset	1719	unfolding of_nat_0_eq_iff by simp
24af00b010cf Amalgamation of the class comm_semiring_1_diff_distrib into comm_semiring_1_cancel. Moving axiom le_add_diff_inverse2 from semiring_numeral_div to linordered_semidom. paulson <lp15@cam.ac.uk> parents: 60427 diff changeset	1720
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	1721	end
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	1722
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1723	class ring_char_0 = ring_1 + semiring_char_0
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1724
35028 108662d50512 more consistent naming of type classes involving orderings (and lattices) -- c.f. NEWS haftmann parents: 34208 diff changeset	1725	context linordered_semidom
25193 e2e1a4b00de3 various localizations haftmann parents: 25162 diff changeset	1726	begin
e2e1a4b00de3 various localizations haftmann parents: 25162 diff changeset	1727
47489 04e7d09ade7a tuned some proofs; huffman parents: 47255 diff changeset	1728	lemma of_nat_0_le_iff [simp]: "0 \<le> of_nat n"
04e7d09ade7a tuned some proofs; huffman parents: 47255 diff changeset	1729	by (induct n) simp_all
25193 e2e1a4b00de3 various localizations haftmann parents: 25162 diff changeset	1730
47489 04e7d09ade7a tuned some proofs; huffman parents: 47255 diff changeset	1731	lemma of_nat_less_0_iff [simp]: "\<not> of_nat m < 0"
04e7d09ade7a tuned some proofs; huffman parents: 47255 diff changeset	1732	by (simp add: not_less)
25193 e2e1a4b00de3 various localizations haftmann parents: 25162 diff changeset	1733
e2e1a4b00de3 various localizations haftmann parents: 25162 diff changeset	1734	lemma of_nat_less_iff [simp]: "of_nat m < of_nat n \<longleftrightarrow> m < n"
62376 85f38d5f8807 Rename ordered_comm_monoid_add to ordered_cancel_comm_monoid_add. Introduce ordreed_comm_monoid_add, canonically_ordered_comm_monoid and dioid. Setup nat, entat and ennreal as dioids. hoelzl parents: 62365 diff changeset	1735	by (induct m n rule: diff_induct) (simp_all add: add_pos_nonneg)
25193 e2e1a4b00de3 various localizations haftmann parents: 25162 diff changeset	1736
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	1737	lemma of_nat_le_iff [simp]: "of_nat m \<le> of_nat n \<longleftrightarrow> m \<le> n"
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	1738	by (simp add: not_less [symmetric] linorder_not_less [symmetric])
25193 e2e1a4b00de3 various localizations haftmann parents: 25162 diff changeset	1739
47489 04e7d09ade7a tuned some proofs; huffman parents: 47255 diff changeset	1740	lemma less_imp_of_nat_less: "m < n \<Longrightarrow> of_nat m < of_nat n"
04e7d09ade7a tuned some proofs; huffman parents: 47255 diff changeset	1741	by simp
04e7d09ade7a tuned some proofs; huffman parents: 47255 diff changeset	1742
04e7d09ade7a tuned some proofs; huffman parents: 47255 diff changeset	1743	lemma of_nat_less_imp_less: "of_nat m < of_nat n \<Longrightarrow> m < n"
04e7d09ade7a tuned some proofs; huffman parents: 47255 diff changeset	1744	by simp
04e7d09ade7a tuned some proofs; huffman parents: 47255 diff changeset	1745
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1746	text \<open>Every \<open>linordered_semidom\<close> has characteristic zero.\<close>
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1747
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1748	subclass semiring_char_0
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1749	by standard (auto intro!: injI simp add: eq_iff)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1750
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1751	text \<open>Special cases where either operand is zero\<close>
25193 e2e1a4b00de3 various localizations haftmann parents: 25162 diff changeset	1752
54147 97a8ff4e4ac9 killed most "no_atp", to make Sledgehammer more complete blanchet parents: 53986 diff changeset	1753	lemma of_nat_le_0_iff [simp]: "of_nat m \<le> 0 \<longleftrightarrow> m = 0"
25193 e2e1a4b00de3 various localizations haftmann parents: 25162 diff changeset	1754	by (rule of_nat_le_iff [of _ 0, simplified])
e2e1a4b00de3 various localizations haftmann parents: 25162 diff changeset	1755
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	1756	lemma of_nat_0_less_iff [simp]: "0 < of_nat n \<longleftrightarrow> 0 < n"
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	1757	by (rule of_nat_less_iff [of 0, simplified])
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	1758
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	1759	end
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	1760
35028 108662d50512 more consistent naming of type classes involving orderings (and lattices) -- c.f. NEWS haftmann parents: 34208 diff changeset	1761	context linordered_idom
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	1762	begin
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	1763
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	1764	lemma abs_of_nat [simp]: "\<bar>of_nat n\<bar> = of_nat n"
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	1765	unfolding abs_if by auto
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	1766
25193 e2e1a4b00de3 various localizations haftmann parents: 25162 diff changeset	1767	end
e2e1a4b00de3 various localizations haftmann parents: 25162 diff changeset	1768
e2e1a4b00de3 various localizations haftmann parents: 25162 diff changeset	1769	lemma of_nat_id [simp]: "of_nat n = n"
35216 7641e8d831d2 get rid of many duplicate simp rule warnings huffman parents: 35121 diff changeset	1770	by (induct n) simp_all
25193 e2e1a4b00de3 various localizations haftmann parents: 25162 diff changeset	1771
e2e1a4b00de3 various localizations haftmann parents: 25162 diff changeset	1772	lemma of_nat_eq_id [simp]: "of_nat = id"
39302 d7728f65b353 renamed lemmas: ext_iff -> fun_eq_iff, set_ext_iff -> set_eq_iff, set_ext -> set_eqI nipkow parents: 39198 diff changeset	1773	by (auto simp add: fun_eq_iff)
25193 e2e1a4b00de3 various localizations haftmann parents: 25162 diff changeset	1774
e2e1a4b00de3 various localizations haftmann parents: 25162 diff changeset	1775
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	1776	subsection \<open>The set of natural numbers\<close>
25193 e2e1a4b00de3 various localizations haftmann parents: 25162 diff changeset	1777
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	1778	context semiring_1
25193 e2e1a4b00de3 various localizations haftmann parents: 25162 diff changeset	1779	begin
e2e1a4b00de3 various localizations haftmann parents: 25162 diff changeset	1780
61070 b72a990adfe2 prefer symbols; wenzelm parents: 60758 diff changeset	1781	definition Nats :: "'a set" ("\<nat>")
b72a990adfe2 prefer symbols; wenzelm parents: 60758 diff changeset	1782	where "\<nat> = range of_nat"
25193 e2e1a4b00de3 various localizations haftmann parents: 25162 diff changeset	1783
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	1784	lemma of_nat_in_Nats [simp]: "of_nat n \<in> \<nat>"
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	1785	by (simp add: Nats_def)
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	1786
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	1787	lemma Nats_0 [simp]: "0 \<in> \<nat>"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1788	apply (simp add: Nats_def)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1789	apply (rule range_eqI)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1790	apply (rule of_nat_0 [symmetric])
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1791	done
25193 e2e1a4b00de3 various localizations haftmann parents: 25162 diff changeset	1792
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	1793	lemma Nats_1 [simp]: "1 \<in> \<nat>"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1794	apply (simp add: Nats_def)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1795	apply (rule range_eqI)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1796	apply (rule of_nat_1 [symmetric])
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1797	done
25193 e2e1a4b00de3 various localizations haftmann parents: 25162 diff changeset	1798
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	1799	lemma Nats_add [simp]: "a \<in> \<nat> \<Longrightarrow> b \<in> \<nat> \<Longrightarrow> a + b \<in> \<nat>"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1800	apply (auto simp add: Nats_def)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1801	apply (rule range_eqI)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1802	apply (rule of_nat_add [symmetric])
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1803	done
26072 f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	1804
f65a7fa2da6c <= and < on nat no longer depend on wellfounded relations haftmann parents: 25928 diff changeset	1805	lemma Nats_mult [simp]: "a \<in> \<nat> \<Longrightarrow> b \<in> \<nat> \<Longrightarrow> a * b \<in> \<nat>"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1806	apply (auto simp add: Nats_def)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1807	apply (rule range_eqI)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1808	apply (rule of_nat_mult [symmetric])
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1809	done
25193 e2e1a4b00de3 various localizations haftmann parents: 25162 diff changeset	1810
35633 5da59c1ddece add lemmas Nats_cases and Nats_induct huffman parents: 35416 diff changeset	1811	lemma Nats_cases [cases set: Nats]:
5da59c1ddece add lemmas Nats_cases and Nats_induct huffman parents: 35416 diff changeset	1812	assumes "x \<in> \<nat>"
5da59c1ddece add lemmas Nats_cases and Nats_induct huffman parents: 35416 diff changeset	1813	obtains (of_nat) n where "x = of_nat n"
5da59c1ddece add lemmas Nats_cases and Nats_induct huffman parents: 35416 diff changeset	1814	unfolding Nats_def
5da59c1ddece add lemmas Nats_cases and Nats_induct huffman parents: 35416 diff changeset	1815	proof -
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	1816	from \<open>x \<in> \<nat>\<close> have "x \<in> range of_nat" unfolding Nats_def .
35633 5da59c1ddece add lemmas Nats_cases and Nats_induct huffman parents: 35416 diff changeset	1817	then obtain n where "x = of_nat n" ..
5da59c1ddece add lemmas Nats_cases and Nats_induct huffman parents: 35416 diff changeset	1818	then show thesis ..
5da59c1ddece add lemmas Nats_cases and Nats_induct huffman parents: 35416 diff changeset	1819	qed
5da59c1ddece add lemmas Nats_cases and Nats_induct huffman parents: 35416 diff changeset	1820
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1821	lemma Nats_induct [case_names of_nat, induct set: Nats]: "x \<in> \<nat> \<Longrightarrow> (\<And>n. P (of_nat n)) \<Longrightarrow> P x"
35633 5da59c1ddece add lemmas Nats_cases and Nats_induct huffman parents: 35416 diff changeset	1822	by (rule Nats_cases) auto
5da59c1ddece add lemmas Nats_cases and Nats_induct huffman parents: 35416 diff changeset	1823
25193 e2e1a4b00de3 various localizations haftmann parents: 25162 diff changeset	1824	end
e2e1a4b00de3 various localizations haftmann parents: 25162 diff changeset	1825
e2e1a4b00de3 various localizations haftmann parents: 25162 diff changeset	1826
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	1827	subsection \<open>Further arithmetic facts concerning the natural numbers\<close>
21243 afffe1f72143 removed theory NatArith (now part of Nat); wenzelm parents: 21191 diff changeset	1828
22845 5f9138bcb3d7 changed code generator invocation syntax haftmann parents: 22744 diff changeset	1829	lemma subst_equals:
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1830	assumes "t = s" and "u = t"
22845 5f9138bcb3d7 changed code generator invocation syntax haftmann parents: 22744 diff changeset	1831	shows "u = s"
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1832	using assms(2,1) by (rule trans)
22845 5f9138bcb3d7 changed code generator invocation syntax haftmann parents: 22744 diff changeset	1833
48891 c0eafbd55de3 prefer ML_file over old uses; wenzelm parents: 48560 diff changeset	1834	ML_file "Tools/nat_arith.ML"
48559 686cc7c47589 give Nat_Arith simprocs proper name bindings by using simproc_setup huffman parents: 47988 diff changeset	1835
686cc7c47589 give Nat_Arith simprocs proper name bindings by using simproc_setup huffman parents: 47988 diff changeset	1836	simproc_setup nateq_cancel_sums
686cc7c47589 give Nat_Arith simprocs proper name bindings by using simproc_setup huffman parents: 47988 diff changeset	1837	("(l::nat) + m = n" \| "(l::nat) = m + n" \| "Suc m = n" \| "m = Suc n") =
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	1838	\<open>fn phi => try o Nat_Arith.cancel_eq_conv\<close>
48559 686cc7c47589 give Nat_Arith simprocs proper name bindings by using simproc_setup huffman parents: 47988 diff changeset	1839
686cc7c47589 give Nat_Arith simprocs proper name bindings by using simproc_setup huffman parents: 47988 diff changeset	1840	simproc_setup natless_cancel_sums
686cc7c47589 give Nat_Arith simprocs proper name bindings by using simproc_setup huffman parents: 47988 diff changeset	1841	("(l::nat) + m < n" \| "(l::nat) < m + n" \| "Suc m < n" \| "m < Suc n") =
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	1842	\<open>fn phi => try o Nat_Arith.cancel_less_conv\<close>
48559 686cc7c47589 give Nat_Arith simprocs proper name bindings by using simproc_setup huffman parents: 47988 diff changeset	1843
686cc7c47589 give Nat_Arith simprocs proper name bindings by using simproc_setup huffman parents: 47988 diff changeset	1844	simproc_setup natle_cancel_sums
686cc7c47589 give Nat_Arith simprocs proper name bindings by using simproc_setup huffman parents: 47988 diff changeset	1845	("(l::nat) + m \<le> n" \| "(l::nat) \<le> m + n" \| "Suc m \<le> n" \| "m \<le> Suc n") =
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	1846	\<open>fn phi => try o Nat_Arith.cancel_le_conv\<close>
48559 686cc7c47589 give Nat_Arith simprocs proper name bindings by using simproc_setup huffman parents: 47988 diff changeset	1847
686cc7c47589 give Nat_Arith simprocs proper name bindings by using simproc_setup huffman parents: 47988 diff changeset	1848	simproc_setup natdiff_cancel_sums
686cc7c47589 give Nat_Arith simprocs proper name bindings by using simproc_setup huffman parents: 47988 diff changeset	1849	("(l::nat) + m - n" \| "(l::nat) - (m + n)" \| "Suc m - n" \| "m - Suc n") =
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	1850	\<open>fn phi => try o Nat_Arith.cancel_diff_conv\<close>
24091 109f19a13872 added Tools/lin_arith.ML; wenzelm parents: 24075 diff changeset	1851
27625 3a45b555001a added lemmas nipkow parents: 27213 diff changeset	1852	context order
3a45b555001a added lemmas nipkow parents: 27213 diff changeset	1853	begin
3a45b555001a added lemmas nipkow parents: 27213 diff changeset	1854
3a45b555001a added lemmas nipkow parents: 27213 diff changeset	1855	lemma lift_Suc_mono_le:
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1856	assumes mono: "\<And>n. f n \<le> f (Suc n)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1857	and "n \<le> n'"
27627 93016de79b02 simplified proofs krauss parents: 27625 diff changeset	1858	shows "f n \<le> f n'"
93016de79b02 simplified proofs krauss parents: 27625 diff changeset	1859	proof (cases "n < n'")
93016de79b02 simplified proofs krauss parents: 27625 diff changeset	1860	case True
53986 a269577d97c0 tuned proofs haftmann parents: 53374 diff changeset	1861	then show ?thesis
62683 ddd1c864408b clarified rule structure; wenzelm parents: 62608 diff changeset	1862	by (induct n n' rule: less_Suc_induct) (auto intro: mono)
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1863	next
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1864	case False
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1865	with \<open>n \<le> n'\<close> show ?thesis by auto
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1866	qed
27625 3a45b555001a added lemmas nipkow parents: 27213 diff changeset	1867
56020 f92479477c52 introduced antimono; incseq, decseq are now abbreviations for mono and antimono; renamed Library/Continuity to Library/Order_Continuity; removed up_cont; renamed down_cont to down_continuity and generalized to complete_lattices hoelzl parents: 55642 diff changeset	1868	lemma lift_Suc_antimono_le:
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1869	assumes mono: "\<And>n. f n \<ge> f (Suc n)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1870	and "n \<le> n'"
56020 f92479477c52 introduced antimono; incseq, decseq are now abbreviations for mono and antimono; renamed Library/Continuity to Library/Order_Continuity; removed up_cont; renamed down_cont to down_continuity and generalized to complete_lattices hoelzl parents: 55642 diff changeset	1871	shows "f n \<ge> f n'"
f92479477c52 introduced antimono; incseq, decseq are now abbreviations for mono and antimono; renamed Library/Continuity to Library/Order_Continuity; removed up_cont; renamed down_cont to down_continuity and generalized to complete_lattices hoelzl parents: 55642 diff changeset	1872	proof (cases "n < n'")
f92479477c52 introduced antimono; incseq, decseq are now abbreviations for mono and antimono; renamed Library/Continuity to Library/Order_Continuity; removed up_cont; renamed down_cont to down_continuity and generalized to complete_lattices hoelzl parents: 55642 diff changeset	1873	case True
f92479477c52 introduced antimono; incseq, decseq are now abbreviations for mono and antimono; renamed Library/Continuity to Library/Order_Continuity; removed up_cont; renamed down_cont to down_continuity and generalized to complete_lattices hoelzl parents: 55642 diff changeset	1874	then show ?thesis
62683 ddd1c864408b clarified rule structure; wenzelm parents: 62608 diff changeset	1875	by (induct n n' rule: less_Suc_induct) (auto intro: mono)
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1876	next
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1877	case False
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1878	with \<open>n \<le> n'\<close> show ?thesis by auto
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1879	qed
56020 f92479477c52 introduced antimono; incseq, decseq are now abbreviations for mono and antimono; renamed Library/Continuity to Library/Order_Continuity; removed up_cont; renamed down_cont to down_continuity and generalized to complete_lattices hoelzl parents: 55642 diff changeset	1880
27625 3a45b555001a added lemmas nipkow parents: 27213 diff changeset	1881	lemma lift_Suc_mono_less:
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1882	assumes mono: "\<And>n. f n < f (Suc n)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1883	and "n < n'"
27627 93016de79b02 simplified proofs krauss parents: 27625 diff changeset	1884	shows "f n < f n'"
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1885	using \<open>n < n'\<close> by (induct n n' rule: less_Suc_induct) (auto intro: mono)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1886
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1887	lemma lift_Suc_mono_less_iff: "(\<And>n. f n < f (Suc n)) \<Longrightarrow> f n < f m \<longleftrightarrow> n < m"
53986 a269577d97c0 tuned proofs haftmann parents: 53374 diff changeset	1888	by (blast intro: less_asym' lift_Suc_mono_less [of f]
a269577d97c0 tuned proofs haftmann parents: 53374 diff changeset	1889	dest: linorder_not_less[THEN iffD1] le_eq_less_or_eq [THEN iffD1])
27789 1bf827e3258d added lemmas nipkow parents: 27679 diff changeset	1890
27625 3a45b555001a added lemmas nipkow parents: 27213 diff changeset	1891	end
3a45b555001a added lemmas nipkow parents: 27213 diff changeset	1892
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1893	lemma mono_iff_le_Suc: "mono f \<longleftrightarrow> (\<forall>n. f n \<le> f (Suc n))"
37387 3581483cca6c qualified types "+" and nat; qualified constants Ball, Bex, Suc, curry; modernized some specifications haftmann parents: 36977 diff changeset	1894	unfolding mono_def by (auto intro: lift_Suc_mono_le [of f])
27625 3a45b555001a added lemmas nipkow parents: 27213 diff changeset	1895
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1896	lemma antimono_iff_le_Suc: "antimono f \<longleftrightarrow> (\<forall>n. f (Suc n) \<le> f n)"
56020 f92479477c52 introduced antimono; incseq, decseq are now abbreviations for mono and antimono; renamed Library/Continuity to Library/Order_Continuity; removed up_cont; renamed down_cont to down_continuity and generalized to complete_lattices hoelzl parents: 55642 diff changeset	1897	unfolding antimono_def by (auto intro: lift_Suc_antimono_le [of f])
f92479477c52 introduced antimono; incseq, decseq are now abbreviations for mono and antimono; renamed Library/Continuity to Library/Order_Continuity; removed up_cont; renamed down_cont to down_continuity and generalized to complete_lattices hoelzl parents: 55642 diff changeset	1898
27789 1bf827e3258d added lemmas nipkow parents: 27679 diff changeset	1899	lemma mono_nat_linear_lb:
53986 a269577d97c0 tuned proofs haftmann parents: 53374 diff changeset	1900	fixes f :: "nat \<Rightarrow> nat"
a269577d97c0 tuned proofs haftmann parents: 53374 diff changeset	1901	assumes "\<And>m n. m < n \<Longrightarrow> f m < f n"
a269577d97c0 tuned proofs haftmann parents: 53374 diff changeset	1902	shows "f m + k \<le> f (m + k)"
a269577d97c0 tuned proofs haftmann parents: 53374 diff changeset	1903	proof (induct k)
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1904	case 0
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1905	then show ?case by simp
53986 a269577d97c0 tuned proofs haftmann parents: 53374 diff changeset	1906	next
a269577d97c0 tuned proofs haftmann parents: 53374 diff changeset	1907	case (Suc k)
a269577d97c0 tuned proofs haftmann parents: 53374 diff changeset	1908	then have "Suc (f m + k) \<le> Suc (f (m + k))" by simp
a269577d97c0 tuned proofs haftmann parents: 53374 diff changeset	1909	also from assms [of "m + k" "Suc (m + k)"] have "Suc (f (m + k)) \<le> f (Suc (m + k))"
a269577d97c0 tuned proofs haftmann parents: 53374 diff changeset	1910	by (simp add: Suc_le_eq)
a269577d97c0 tuned proofs haftmann parents: 53374 diff changeset	1911	finally show ?case by simp
a269577d97c0 tuned proofs haftmann parents: 53374 diff changeset	1912	qed
27789 1bf827e3258d added lemmas nipkow parents: 27679 diff changeset	1913
1bf827e3258d added lemmas nipkow parents: 27679 diff changeset	1914
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1915	text \<open>Subtraction laws, mostly by Clemens Ballarin\<close>
21243 afffe1f72143 removed theory NatArith (now part of Nat); wenzelm parents: 21191 diff changeset	1916
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1917	lemma diff_less_mono:
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1918	fixes a b c :: nat
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1919	assumes "a < b" and "c \<le> a"
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1920	shows "a - c < b - c"
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1921	proof -
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1922	from assms obtain d e where "b = c + (d + e)" and "a = c + e" and "d > 0"
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1923	by (auto dest!: le_Suc_ex less_imp_Suc_add simp add: ac_simps)
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1924	then show ?thesis by simp
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1925	qed
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1926
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1927	lemma less_diff_conv: "i < j - k \<longleftrightarrow> i + k < j"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1928	for i j k :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1929	by (cases "k \<le> j") (auto simp add: not_le dest: less_imp_Suc_add le_Suc_ex)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1930
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1931	lemma less_diff_conv2: "k \<le> j \<Longrightarrow> j - k < i \<longleftrightarrow> j < i + k"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1932	for j k i :: nat
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1933	by (auto dest: le_Suc_ex)
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1934
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1935	lemma le_diff_conv: "j - k \<le> i \<longleftrightarrow> j \<le> i + k"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1936	for j k i :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1937	by (cases "k \<le> j") (auto simp add: not_le dest!: less_imp_Suc_add le_Suc_ex)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1938
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1939	lemma diff_diff_cancel [simp]: "i \<le> n \<Longrightarrow> n - (n - i) = i"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1940	for i n :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1941	by (auto dest: le_Suc_ex)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1942
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1943	lemma diff_less [simp]: "0 < n \<Longrightarrow> 0 < m \<Longrightarrow> m - n < m"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1944	for i n :: nat
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1945	by (auto dest: less_imp_Suc_add)
21243 afffe1f72143 removed theory NatArith (now part of Nat); wenzelm parents: 21191 diff changeset	1946
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	1947	text \<open>Simplification of relational expressions involving subtraction\<close>
21243 afffe1f72143 removed theory NatArith (now part of Nat); wenzelm parents: 21191 diff changeset	1948
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1949	lemma diff_diff_eq: "k \<le> m \<Longrightarrow> k \<le> n \<Longrightarrow> m - k - (n - k) = m - n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1950	for m n k :: nat
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1951	by (auto dest!: le_Suc_ex)
21243 afffe1f72143 removed theory NatArith (now part of Nat); wenzelm parents: 21191 diff changeset	1952
36176 3fe7e97ccca8 replaced generic 'hide' command by more conventional 'hide_class', 'hide_type', 'hide_const', 'hide_fact' -- frees some popular keywords; wenzelm parents: 35828 diff changeset	1953	hide_fact (open) diff_diff_eq
35064 1bdef0c013d3 hide fact names clashing with fact names from Group.thy haftmann parents: 35047 diff changeset	1954
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1955	lemma eq_diff_iff: "k \<le> m \<Longrightarrow> k \<le> n \<Longrightarrow> m - k = n - k \<longleftrightarrow> m = n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1956	for m n k :: nat
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1957	by (auto dest: le_Suc_ex)
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1958
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1959	lemma less_diff_iff: "k \<le> m \<Longrightarrow> k \<le> n \<Longrightarrow> m - k < n - k \<longleftrightarrow> m < n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1960	for m n k :: nat
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1961	by (auto dest!: le_Suc_ex)
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1962
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1963	lemma le_diff_iff: "k \<le> m \<Longrightarrow> k \<le> n \<Longrightarrow> m - k \<le> n - k \<longleftrightarrow> m \<le> n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1964	for m n k :: nat
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1965	by (auto dest!: le_Suc_ex)
21243 afffe1f72143 removed theory NatArith (now part of Nat); wenzelm parents: 21191 diff changeset	1966
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1967	lemma le_diff_iff': "a \<le> c \<Longrightarrow> b \<le> c \<Longrightarrow> c - a \<le> c - b \<longleftrightarrow> b \<le> a"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1968	for a b c :: nat
63099 af0e964aad7b Moved material from AFP/Randomised_Social_Choice to distribution eberlm parents: 63040 diff changeset	1969	by (force dest: le_Suc_ex)
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1970
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1971
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1972	text \<open>(Anti)Monotonicity of subtraction -- by Stephan Merz\<close>
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1973
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1974	lemma diff_le_mono: "m \<le> n \<Longrightarrow> m - l \<le> n - l"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1975	for m n l :: nat
63648 f9f3006a5579 "split add" -> "split" nipkow parents: 63588 diff changeset	1976	by (auto dest: less_imp_le less_imp_Suc_add split: nat_diff_split)
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1977
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1978	lemma diff_le_mono2: "m \<le> n \<Longrightarrow> l - n \<le> l - m"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1979	for m n l :: nat
63648 f9f3006a5579 "split add" -> "split" nipkow parents: 63588 diff changeset	1980	by (auto dest: less_imp_le le_Suc_ex less_imp_Suc_add less_le_trans split: nat_diff_split)
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1981
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1982	lemma diff_less_mono2: "m < n \<Longrightarrow> m < l \<Longrightarrow> l - n < l - m"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1983	for m n l :: nat
63648 f9f3006a5579 "split add" -> "split" nipkow parents: 63588 diff changeset	1984	by (auto dest: less_imp_Suc_add split: nat_diff_split)
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1985
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1986	lemma diffs0_imp_equal: "m - n = 0 \<Longrightarrow> n - m = 0 \<Longrightarrow> m = n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1987	for m n :: nat
63648 f9f3006a5579 "split add" -> "split" nipkow parents: 63588 diff changeset	1988	by (simp split: nat_diff_split)
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1989
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1990	lemma min_diff: "min (m - i) (n - i) = min m n - i"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	1991	for m n i :: nat
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1992	by (cases m n rule: le_cases)
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	1993	(auto simp add: not_le min.absorb1 min.absorb2 min.absorb_iff1 [symmetric] diff_le_mono)
26143 314c0bcb7df7 Added useful general lemmas from the work with the HeapMonad bulwahn parents: 26101 diff changeset	1994
60562 24af00b010cf Amalgamation of the class comm_semiring_1_diff_distrib into comm_semiring_1_cancel. Moving axiom le_add_diff_inverse2 from semiring_numeral_div to linordered_semidom. paulson <lp15@cam.ac.uk> parents: 60427 diff changeset	1995	lemma inj_on_diff_nat:
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1996	fixes k :: nat
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	1997	assumes "\<forall>n \<in> N. k \<le> n"
26143 314c0bcb7df7 Added useful general lemmas from the work with the HeapMonad bulwahn parents: 26101 diff changeset	1998	shows "inj_on (\<lambda>n. n - k) N"
314c0bcb7df7 Added useful general lemmas from the work with the HeapMonad bulwahn parents: 26101 diff changeset	1999	proof (rule inj_onI)
314c0bcb7df7 Added useful general lemmas from the work with the HeapMonad bulwahn parents: 26101 diff changeset	2000	fix x y
314c0bcb7df7 Added useful general lemmas from the work with the HeapMonad bulwahn parents: 26101 diff changeset	2001	assume a: "x \<in> N" "y \<in> N" "x - k = y - k"
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2002	with assms have "x - k + k = y - k + k" by auto
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2003	with a assms show "x = y" by (auto simp add: eq_diff_iff)
26143 314c0bcb7df7 Added useful general lemmas from the work with the HeapMonad bulwahn parents: 26101 diff changeset	2004	qed
314c0bcb7df7 Added useful general lemmas from the work with the HeapMonad bulwahn parents: 26101 diff changeset	2005
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2006	text \<open>Rewriting to pull differences out\<close>
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2007
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2008	lemma diff_diff_right [simp]: "k \<le> j \<Longrightarrow> i - (j - k) = i + k - j"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2009	for i j k :: nat
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2010	by (fact diff_diff_right)
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2011
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2012	lemma diff_Suc_diff_eq1 [simp]:
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2013	assumes "k \<le> j"
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2014	shows "i - Suc (j - k) = i + k - Suc j"
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2015	proof -
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2016	from assms have *: "Suc (j - k) = Suc j - k"
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2017	by (simp add: Suc_diff_le)
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2018	from assms have "k \<le> Suc j"
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2019	by (rule order_trans) simp
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2020	with diff_diff_right [of k "Suc j" i] * show ?thesis
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2021	by simp
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2022	qed
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2023
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2024	lemma diff_Suc_diff_eq2 [simp]:
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2025	assumes "k \<le> j"
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2026	shows "Suc (j - k) - i = Suc j - (k + i)"
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2027	proof -
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2028	from assms obtain n where "j = k + n"
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2029	by (auto dest: le_Suc_ex)
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2030	moreover have "Suc n - i = (k + Suc n) - (k + i)"
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2031	using add_diff_cancel_left [of k "Suc n" i] by simp
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2032	ultimately show ?thesis by simp
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2033	qed
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2034
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2035	lemma Suc_diff_Suc:
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2036	assumes "n < m"
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2037	shows "Suc (m - Suc n) = m - n"
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2038	proof -
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2039	from assms obtain q where "m = n + Suc q"
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2040	by (auto dest: less_imp_Suc_add)
63040 eb4ddd18d635 eliminated old 'def'; wenzelm parents: 62683 diff changeset	2041	moreover define r where "r = Suc q"
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2042	ultimately have "Suc (m - Suc n) = r" and "m = n + r"
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2043	by simp_all
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2044	then show ?thesis by simp
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2045	qed
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2046
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2047	lemma one_less_mult: "Suc 0 < n \<Longrightarrow> Suc 0 < m \<Longrightarrow> Suc 0 < m * n"
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2048	using less_1_mult [of n m] by (simp add: ac_simps)
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2049
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2050	lemma n_less_m_mult_n: "0 < n \<Longrightarrow> Suc 0 < m \<Longrightarrow> n < m * n"
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2051	using mult_strict_right_mono [of 1 m n] by simp
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2052
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2053	lemma n_less_n_mult_m: "0 < n \<Longrightarrow> Suc 0 < m \<Longrightarrow> n < n * m"
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2054	using mult_strict_left_mono [of 1 m n] by simp
21243 afffe1f72143 removed theory NatArith (now part of Nat); wenzelm parents: 21191 diff changeset	2055
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2056
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	2057	text \<open>Specialized induction principles that work "backwards":\<close>
23001 3608f0362a91 added induction principles for induction "backwards": P (Suc n) ==> P n krauss parents: 22920 diff changeset	2058
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2059	lemma inc_induct [consumes 1, case_names base step]:
54411 f72e58a5a75f stronger inc_induct and dec_induct hoelzl parents: 54223 diff changeset	2060	assumes less: "i \<le> j"
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2061	and base: "P j"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2062	and step: "\<And>n. i \<le> n \<Longrightarrow> n < j \<Longrightarrow> P (Suc n) \<Longrightarrow> P n"
23001 3608f0362a91 added induction principles for induction "backwards": P (Suc n) ==> P n krauss parents: 22920 diff changeset	2063	shows "P i"
54411 f72e58a5a75f stronger inc_induct and dec_induct hoelzl parents: 54223 diff changeset	2064	using less step
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2065	proof (induct "j - i" arbitrary: i)
23001 3608f0362a91 added induction principles for induction "backwards": P (Suc n) ==> P n krauss parents: 22920 diff changeset	2066	case (0 i)
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2067	then have "i = j" by simp
23001 3608f0362a91 added induction principles for induction "backwards": P (Suc n) ==> P n krauss parents: 22920 diff changeset	2068	with base show ?case by simp
3608f0362a91 added induction principles for induction "backwards": P (Suc n) ==> P n krauss parents: 22920 diff changeset	2069	next
54411 f72e58a5a75f stronger inc_induct and dec_induct hoelzl parents: 54223 diff changeset	2070	case (Suc d n)
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2071	from Suc.hyps have "n \<noteq> j" by auto
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2072	with Suc have "n < j" by (simp add: less_le)
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2073	from \<open>Suc d = j - n\<close> have "d + 1 = j - n" by simp
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2074	then have "d + 1 - 1 = j - n - 1" by simp
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2075	then have "d = j - n - 1" by simp
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2076	then have "d = j - (n + 1)" by (simp add: diff_diff_eq)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2077	then have "d = j - Suc n" by simp
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2078	moreover from \<open>n < j\<close> have "Suc n \<le> j" by (simp add: Suc_le_eq)
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2079	ultimately have "P (Suc n)"
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2080	proof (rule Suc.hyps)
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2081	fix q
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2082	assume "Suc n \<le> q"
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2083	then have "n \<le> q" by (simp add: Suc_le_eq less_imp_le)
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2084	moreover assume "q < j"
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2085	moreover assume "P (Suc q)"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2086	ultimately show "P q" by (rule Suc.prems)
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2087	qed
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2088	with order_refl \<open>n < j\<close> show "P n" by (rule Suc.prems)
23001 3608f0362a91 added induction principles for induction "backwards": P (Suc n) ==> P n krauss parents: 22920 diff changeset	2089	qed
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2090
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2091	lemma strict_inc_induct [consumes 1, case_names base step]:
23001 3608f0362a91 added induction principles for induction "backwards": P (Suc n) ==> P n krauss parents: 22920 diff changeset	2092	assumes less: "i < j"
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2093	and base: "\<And>i. j = Suc i \<Longrightarrow> P i"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2094	and step: "\<And>i. i < j \<Longrightarrow> P (Suc i) \<Longrightarrow> P i"
23001 3608f0362a91 added induction principles for induction "backwards": P (Suc n) ==> P n krauss parents: 22920 diff changeset	2095	shows "P i"
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2096	using less proof (induct "j - i - 1" arbitrary: i)
23001 3608f0362a91 added induction principles for induction "backwards": P (Suc n) ==> P n krauss parents: 22920 diff changeset	2097	case (0 i)
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2098	from \<open>i < j\<close> obtain n where "j = i + n" and "n > 0"
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2099	by (auto dest!: less_imp_Suc_add)
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2100	with 0 have "j = Suc i"
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2101	by (auto intro: order_antisym simp add: Suc_le_eq)
23001 3608f0362a91 added induction principles for induction "backwards": P (Suc n) ==> P n krauss parents: 22920 diff changeset	2102	with base show ?case by simp
3608f0362a91 added induction principles for induction "backwards": P (Suc n) ==> P n krauss parents: 22920 diff changeset	2103	next
3608f0362a91 added induction principles for induction "backwards": P (Suc n) ==> P n krauss parents: 22920 diff changeset	2104	case (Suc d i)
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2105	from \<open>Suc d = j - i - 1\<close> have *: "Suc d = j - Suc i"
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2106	by (simp add: diff_diff_add)
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2107	then have "Suc d - 1 = j - Suc i - 1" by simp
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2108	then have "d = j - Suc i - 1" by simp
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2109	moreover from * have "j - Suc i \<noteq> 0" by auto
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2110	then have "Suc i < j" by (simp add: not_le)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2111	ultimately have "P (Suc i)" by (rule Suc.hyps)
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2112	with \<open>i < j\<close> show "P i" by (rule step)
23001 3608f0362a91 added induction principles for induction "backwards": P (Suc n) ==> P n krauss parents: 22920 diff changeset	2113	qed
3608f0362a91 added induction principles for induction "backwards": P (Suc n) ==> P n krauss parents: 22920 diff changeset	2114
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2115	lemma zero_induct_lemma: "P k \<Longrightarrow> (\<And>n. P (Suc n) \<Longrightarrow> P n) \<Longrightarrow> P (k - i)"
23001 3608f0362a91 added induction principles for induction "backwards": P (Suc n) ==> P n krauss parents: 22920 diff changeset	2116	using inc_induct[of "k - i" k P, simplified] by blast
3608f0362a91 added induction principles for induction "backwards": P (Suc n) ==> P n krauss parents: 22920 diff changeset	2117
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2118	lemma zero_induct: "P k \<Longrightarrow> (\<And>n. P (Suc n) \<Longrightarrow> P n) \<Longrightarrow> P 0"
23001 3608f0362a91 added induction principles for induction "backwards": P (Suc n) ==> P n krauss parents: 22920 diff changeset	2119	using inc_induct[of 0 k P] by blast
21243 afffe1f72143 removed theory NatArith (now part of Nat); wenzelm parents: 21191 diff changeset	2120
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2121	text \<open>Further induction rule similar to @{thm inc_induct}.\<close>
27625 3a45b555001a added lemmas nipkow parents: 27213 diff changeset	2122
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2123	lemma dec_induct [consumes 1, case_names base step]:
54411 f72e58a5a75f stronger inc_induct and dec_induct hoelzl parents: 54223 diff changeset	2124	"i \<le> j \<Longrightarrow> P i \<Longrightarrow> (\<And>n. i \<le> n \<Longrightarrow> n < j \<Longrightarrow> P n \<Longrightarrow> P (Suc n)) \<Longrightarrow> P j"
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2125	proof (induct j arbitrary: i)
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2126	case 0
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2127	then show ?case by simp
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2128	next
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2129	case (Suc j)
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2130	from Suc.prems consider "i \<le> j" \| "i = Suc j"
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2131	by (auto simp add: le_Suc_eq)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2132	then show ?case
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2133	proof cases
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2134	case 1
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2135	moreover have "j < Suc j" by simp
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2136	moreover have "P j" using \<open>i \<le> j\<close> \<open>P i\<close>
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2137	proof (rule Suc.hyps)
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2138	fix q
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2139	assume "i \<le> q"
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2140	moreover assume "q < j" then have "q < Suc j"
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2141	by (simp add: less_Suc_eq)
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2142	moreover assume "P q"
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2143	ultimately show "P (Suc q)" by (rule Suc.prems)
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2144	qed
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2145	ultimately show "P (Suc j)" by (rule Suc.prems)
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2146	next
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2147	case 2
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2148	with \<open>P i\<close> show "P (Suc j)" by simp
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2149	qed
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2150	qed
b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2151
66295 1ec601d9c829 moved transitive_stepwise_le into Nat, where it belongs paulson <lp15@cam.ac.uk> parents: 66290 diff changeset	2152	lemma transitive_stepwise_le:
1ec601d9c829 moved transitive_stepwise_le into Nat, where it belongs paulson <lp15@cam.ac.uk> parents: 66290 diff changeset	2153	assumes "m \<le> n" "\<And>x. R x x" "\<And>x y z. R x y \<Longrightarrow> R y z \<Longrightarrow> R x z" and "\<And>n. R n (Suc n)"
1ec601d9c829 moved transitive_stepwise_le into Nat, where it belongs paulson <lp15@cam.ac.uk> parents: 66290 diff changeset	2154	shows "R m n"
1ec601d9c829 moved transitive_stepwise_le into Nat, where it belongs paulson <lp15@cam.ac.uk> parents: 66290 diff changeset	2155	using \<open>m \<le> n\<close>
1ec601d9c829 moved transitive_stepwise_le into Nat, where it belongs paulson <lp15@cam.ac.uk> parents: 66290 diff changeset	2156	by (induction rule: dec_induct) (use assms in blast)+
1ec601d9c829 moved transitive_stepwise_le into Nat, where it belongs paulson <lp15@cam.ac.uk> parents: 66290 diff changeset	2157
59000 6eb0725503fc import general theorems from AFP/Markov_Models hoelzl parents: 58952 diff changeset	2158
65963 ca1e636fa716 redefined Greatest nipkow parents: 65583 diff changeset	2159	subsubsection \<open>Greatest operator\<close>
ca1e636fa716 redefined Greatest nipkow parents: 65583 diff changeset	2160
ca1e636fa716 redefined Greatest nipkow parents: 65583 diff changeset	2161	lemma ex_has_greatest_nat:
ca1e636fa716 redefined Greatest nipkow parents: 65583 diff changeset	2162	"P (k::nat) \<Longrightarrow> \<forall>y. P y \<longrightarrow> y \<le> b \<Longrightarrow> \<exists>x. P x \<and> (\<forall>y. P y \<longrightarrow> y \<le> x)"
ca1e636fa716 redefined Greatest nipkow parents: 65583 diff changeset	2163	proof (induction "b-k" arbitrary: b k rule: less_induct)
ca1e636fa716 redefined Greatest nipkow parents: 65583 diff changeset	2164	case less
ca1e636fa716 redefined Greatest nipkow parents: 65583 diff changeset	2165	show ?case
ca1e636fa716 redefined Greatest nipkow parents: 65583 diff changeset	2166	proof cases
ca1e636fa716 redefined Greatest nipkow parents: 65583 diff changeset	2167	assume "\<exists>n>k. P n"
ca1e636fa716 redefined Greatest nipkow parents: 65583 diff changeset	2168	then obtain n where "n>k" "P n" by blast
ca1e636fa716 redefined Greatest nipkow parents: 65583 diff changeset	2169	have "n \<le> b" using \<open>P n\<close> less.prems(2) by auto
ca1e636fa716 redefined Greatest nipkow parents: 65583 diff changeset	2170	hence "b-n < b-k"
ca1e636fa716 redefined Greatest nipkow parents: 65583 diff changeset	2171	by(rule diff_less_mono2[OF \<open>k<n\<close> less_le_trans[OF \<open>k<n\<close>]])
ca1e636fa716 redefined Greatest nipkow parents: 65583 diff changeset	2172	from less.hyps[OF this \<open>P n\<close> less.prems(2)]
ca1e636fa716 redefined Greatest nipkow parents: 65583 diff changeset	2173	show ?thesis .
ca1e636fa716 redefined Greatest nipkow parents: 65583 diff changeset	2174	next
ca1e636fa716 redefined Greatest nipkow parents: 65583 diff changeset	2175	assume "\<not> (\<exists>n>k. P n)"
ca1e636fa716 redefined Greatest nipkow parents: 65583 diff changeset	2176	hence "\<forall>y. P y \<longrightarrow> y \<le> k" by (auto simp: not_less)
ca1e636fa716 redefined Greatest nipkow parents: 65583 diff changeset	2177	thus ?thesis using less.prems(1) by auto
ca1e636fa716 redefined Greatest nipkow parents: 65583 diff changeset	2178	qed
ca1e636fa716 redefined Greatest nipkow parents: 65583 diff changeset	2179	qed
ca1e636fa716 redefined Greatest nipkow parents: 65583 diff changeset	2180
65965 088c79b40156 tuned names nipkow parents: 65963 diff changeset	2181	lemma GreatestI_nat:
088c79b40156 tuned names nipkow parents: 65963 diff changeset	2182	"\<lbrakk> P(k::nat); \<forall>y. P y \<longrightarrow> y \<le> b \<rbrakk> \<Longrightarrow> P (Greatest P)"
65963 ca1e636fa716 redefined Greatest nipkow parents: 65583 diff changeset	2183	apply(drule (1) ex_has_greatest_nat)
ca1e636fa716 redefined Greatest nipkow parents: 65583 diff changeset	2184	using GreatestI2_order by auto
ca1e636fa716 redefined Greatest nipkow parents: 65583 diff changeset	2185
65965 088c79b40156 tuned names nipkow parents: 65963 diff changeset	2186	lemma Greatest_le_nat:
088c79b40156 tuned names nipkow parents: 65963 diff changeset	2187	"\<lbrakk> P(k::nat); \<forall>y. P y \<longrightarrow> y \<le> b \<rbrakk> \<Longrightarrow> k \<le> (Greatest P)"
65963 ca1e636fa716 redefined Greatest nipkow parents: 65583 diff changeset	2188	apply(frule (1) ex_has_greatest_nat)
ca1e636fa716 redefined Greatest nipkow parents: 65583 diff changeset	2189	using GreatestI2_order[where P=P and Q=\<open>\<lambda>x. k \<le> x\<close>] by auto
ca1e636fa716 redefined Greatest nipkow parents: 65583 diff changeset	2190
65965 088c79b40156 tuned names nipkow parents: 65963 diff changeset	2191	lemma GreatestI_ex_nat:
088c79b40156 tuned names nipkow parents: 65963 diff changeset	2192	"\<lbrakk> \<exists>k::nat. P k; \<forall>y. P y \<longrightarrow> y \<le> b \<rbrakk> \<Longrightarrow> P (Greatest P)"
65963 ca1e636fa716 redefined Greatest nipkow parents: 65583 diff changeset	2193	apply (erule exE)
65965 088c79b40156 tuned names nipkow parents: 65963 diff changeset	2194	apply (erule (1) GreatestI_nat)
65963 ca1e636fa716 redefined Greatest nipkow parents: 65583 diff changeset	2195	done
ca1e636fa716 redefined Greatest nipkow parents: 65583 diff changeset	2196
ca1e636fa716 redefined Greatest nipkow parents: 65583 diff changeset	2197
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2198	subsection \<open>Monotonicity of \<open>funpow\<close>\<close>
59000 6eb0725503fc import general theorems from AFP/Markov_Models hoelzl parents: 58952 diff changeset	2199
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2200	lemma funpow_increasing: "m \<le> n \<Longrightarrow> mono f \<Longrightarrow> (f ^^ n) \<top> \<le> (f ^^ m) \<top>"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2201	for f :: "'a::{lattice,order_top} \<Rightarrow> 'a"
59000 6eb0725503fc import general theorems from AFP/Markov_Models hoelzl parents: 58952 diff changeset	2202	by (induct rule: inc_induct)
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2203	(auto simp del: funpow.simps(2) simp add: funpow_Suc_right
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2204	intro: order_trans[OF _ funpow_mono])
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2205
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2206	lemma funpow_decreasing: "m \<le> n \<Longrightarrow> mono f \<Longrightarrow> (f ^^ m) \<bottom> \<le> (f ^^ n) \<bottom>"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2207	for f :: "'a::{lattice,order_bot} \<Rightarrow> 'a"
59000 6eb0725503fc import general theorems from AFP/Markov_Models hoelzl parents: 58952 diff changeset	2208	by (induct rule: dec_induct)
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2209	(auto simp del: funpow.simps(2) simp add: funpow_Suc_right
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2210	intro: order_trans[OF _ funpow_mono])
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2211
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2212	lemma mono_funpow: "mono Q \<Longrightarrow> mono (\<lambda>i. (Q ^^ i) \<bottom>)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2213	for Q :: "'a::{lattice,order_bot} \<Rightarrow> 'a"
59000 6eb0725503fc import general theorems from AFP/Markov_Models hoelzl parents: 58952 diff changeset	2214	by (auto intro!: funpow_decreasing simp: mono_def)
58377 c6f93b8d2d8e moved old 'size' generator together with 'old_datatype' blanchet parents: 58306 diff changeset	2215
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2216	lemma antimono_funpow: "mono Q \<Longrightarrow> antimono (\<lambda>i. (Q ^^ i) \<top>)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2217	for Q :: "'a::{lattice,order_top} \<Rightarrow> 'a"
60175 831ddb69db9b add lfp/gfp rule for nn_integral hoelzl parents: 59833 diff changeset	2218	by (auto intro!: funpow_increasing simp: antimono_def)
831ddb69db9b add lfp/gfp rule for nn_integral hoelzl parents: 59833 diff changeset	2219
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2220
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	2221	subsection \<open>The divides relation on @{typ nat}\<close>
33274 b6ff7db522b5 moved lemmas for dvd on nat to theories Nat and Power haftmann parents: 32772 diff changeset	2222
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2223	lemma dvd_1_left [iff]: "Suc 0 dvd k"
62365 8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2224	by (simp add: dvd_def)
8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2225
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2226	lemma dvd_1_iff_1 [simp]: "m dvd Suc 0 \<longleftrightarrow> m = Suc 0"
62365 8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2227	by (simp add: dvd_def)
8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2228
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2229	lemma nat_dvd_1_iff_1 [simp]: "m dvd 1 \<longleftrightarrow> m = 1"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2230	for m :: nat
62365 8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2231	by (simp add: dvd_def)
8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2232
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2233	lemma dvd_antisym: "m dvd n \<Longrightarrow> n dvd m \<Longrightarrow> m = n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2234	for m n :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2235	unfolding dvd_def by (force dest: mult_eq_self_implies_10 simp add: mult.assoc)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2236
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2237	lemma dvd_diff_nat [simp]: "k dvd m \<Longrightarrow> k dvd n \<Longrightarrow> k dvd (m - n)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2238	for k m n :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2239	unfolding dvd_def by (blast intro: right_diff_distrib' [symmetric])
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2240
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2241	lemma dvd_diffD: "k dvd m - n \<Longrightarrow> k dvd n \<Longrightarrow> n \<le> m \<Longrightarrow> k dvd m"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2242	for k m n :: nat
33274 b6ff7db522b5 moved lemmas for dvd on nat to theories Nat and Power haftmann parents: 32772 diff changeset	2243	apply (erule linorder_not_less [THEN iffD2, THEN add_diff_inverse, THEN subst])
b6ff7db522b5 moved lemmas for dvd on nat to theories Nat and Power haftmann parents: 32772 diff changeset	2244	apply (blast intro: dvd_add)
b6ff7db522b5 moved lemmas for dvd on nat to theories Nat and Power haftmann parents: 32772 diff changeset	2245	done
b6ff7db522b5 moved lemmas for dvd on nat to theories Nat and Power haftmann parents: 32772 diff changeset	2246
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2247	lemma dvd_diffD1: "k dvd m - n \<Longrightarrow> k dvd m \<Longrightarrow> n \<le> m \<Longrightarrow> k dvd n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2248	for k m n :: nat
62365 8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2249	by (drule_tac m = m in dvd_diff_nat) auto
8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2250
8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2251	lemma dvd_mult_cancel:
8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2252	fixes m n k :: nat
8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2253	assumes "k * m dvd k * n" and "0 < k"
8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2254	shows "m dvd n"
8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2255	proof -
8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2256	from assms(1) obtain q where "k * n = (k * m) * q" ..
8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2257	then have "k * n = k * (m * q)" by (simp add: ac_simps)
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2258	with \<open>0 < k\<close> have "n = m * q" by (auto simp add: mult_left_cancel)
62365 8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2259	then show ?thesis ..
8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2260	qed
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2261
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2262	lemma dvd_mult_cancel1: "0 < m \<Longrightarrow> m * n dvd m \<longleftrightarrow> n = 1"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2263	for m n :: nat
33274 b6ff7db522b5 moved lemmas for dvd on nat to theories Nat and Power haftmann parents: 32772 diff changeset	2264	apply auto
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2265	apply (subgoal_tac "m * n dvd m * 1")
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2266	apply (drule dvd_mult_cancel)
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2267	apply auto
33274 b6ff7db522b5 moved lemmas for dvd on nat to theories Nat and Power haftmann parents: 32772 diff changeset	2268	done
b6ff7db522b5 moved lemmas for dvd on nat to theories Nat and Power haftmann parents: 32772 diff changeset	2269
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2270	lemma dvd_mult_cancel2: "0 < m \<Longrightarrow> n * m dvd m \<longleftrightarrow> n = 1"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2271	for m n :: nat
62365 8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2272	using dvd_mult_cancel1 [of m n] by (simp add: ac_simps)
8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2273
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2274	lemma dvd_imp_le: "k dvd n \<Longrightarrow> 0 < n \<Longrightarrow> k \<le> n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2275	for k n :: nat
62365 8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2276	by (auto elim!: dvdE) (auto simp add: gr0_conv_Suc)
33274 b6ff7db522b5 moved lemmas for dvd on nat to theories Nat and Power haftmann parents: 32772 diff changeset	2277
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2278	lemma nat_dvd_not_less: "0 < m \<Longrightarrow> m < n \<Longrightarrow> \<not> n dvd m"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2279	for m n :: nat
62365 8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2280	by (auto elim!: dvdE) (auto simp add: gr0_conv_Suc)
33274 b6ff7db522b5 moved lemmas for dvd on nat to theories Nat and Power haftmann parents: 32772 diff changeset	2281
54222 24874b4024d1 generalised lemma haftmann parents: 54147 diff changeset	2282	lemma less_eq_dvd_minus:
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: 49962 diff changeset	2283	fixes m n :: nat
54222 24874b4024d1 generalised lemma haftmann parents: 54147 diff changeset	2284	assumes "m \<le> n"
24874b4024d1 generalised lemma haftmann parents: 54147 diff changeset	2285	shows "m dvd n \<longleftrightarrow> m dvd n - m"
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: 49962 diff changeset	2286	proof -
54222 24874b4024d1 generalised lemma haftmann parents: 54147 diff changeset	2287	from assms have "n = m + (n - m)" by simp
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: 49962 diff changeset	2288	then obtain q where "n = m + q" ..
58647 fce800afeec7 more facts about abstract divisibility haftmann parents: 58389 diff changeset	2289	then show ?thesis by (simp add: add.commute [of m])
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: 49962 diff changeset	2290	qed
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: 49962 diff changeset	2291
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2292	lemma dvd_minus_self: "m dvd n - m \<longleftrightarrow> n < m \<or> m dvd n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2293	for m n :: nat
62481 b5d8e57826df tuned bootstrap order to provide type classes in a more sensible order haftmann parents: 62378 diff changeset	2294	by (cases "n < m") (auto elim!: dvdE simp add: not_less le_imp_diff_is_add dest: less_imp_le)
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: 49962 diff changeset	2295
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: 49962 diff changeset	2296	lemma dvd_minus_add:
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: 49962 diff changeset	2297	fixes m n q r :: nat
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: 49962 diff changeset	2298	assumes "q \<le> n" "q \<le> r * m"
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: 49962 diff changeset	2299	shows "m dvd n - q \<longleftrightarrow> m dvd n + (r * m - q)"
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: 49962 diff changeset	2300	proof -
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: 49962 diff changeset	2301	have "m dvd n - q \<longleftrightarrow> m dvd r * m + (n - q)"
58649 a62065b5e1e2 generalized and consolidated some theorems concerning divisibility haftmann parents: 58647 diff changeset	2302	using dvd_add_times_triv_left_iff [of m r] by simp
53374 a14d2a854c02 tuned proofs -- clarified flow of facts wrt. calculation; wenzelm parents: 52729 diff changeset	2303	also from assms have "\<dots> \<longleftrightarrow> m dvd r * m + n - q" by simp
a14d2a854c02 tuned proofs -- clarified flow of facts wrt. calculation; wenzelm parents: 52729 diff changeset	2304	also from assms have "\<dots> \<longleftrightarrow> m dvd (r * m - q) + n" by simp
57512 cc97b347b301 reduced name variants for assoc and commute on plus and mult haftmann parents: 57492 diff changeset	2305	also have "\<dots> \<longleftrightarrow> m dvd n + (r * m - q)" by (simp add: add.commute)
51173 3cbb4e95a565 Sieve of Eratosthenes haftmann parents: 49962 diff changeset	2306	finally show ?thesis .
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: 49962 diff changeset	2307	qed
3cbb4e95a565 Sieve of Eratosthenes haftmann parents: 49962 diff changeset	2308
33274 b6ff7db522b5 moved lemmas for dvd on nat to theories Nat and Power haftmann parents: 32772 diff changeset	2309
62365 8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2310	subsection \<open>Aliasses\<close>
44817 b63e445c8f6d lemmas about +, , min, max on nat haftmann* parents: 44325 diff changeset	2311
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2312	lemma nat_mult_1: "1 * n = n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2313	for n :: nat
58647 fce800afeec7 more facts about abstract divisibility haftmann parents: 58389 diff changeset	2314	by (fact mult_1_left)
60562 24af00b010cf Amalgamation of the class comm_semiring_1_diff_distrib into comm_semiring_1_cancel. Moving axiom le_add_diff_inverse2 from semiring_numeral_div to linordered_semidom. paulson <lp15@cam.ac.uk> parents: 60427 diff changeset	2315
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2316	lemma nat_mult_1_right: "n * 1 = n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2317	for n :: nat
58647 fce800afeec7 more facts about abstract divisibility haftmann parents: 58389 diff changeset	2318	by (fact mult_1_right)
fce800afeec7 more facts about abstract divisibility haftmann parents: 58389 diff changeset	2319
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2320	lemma nat_add_left_cancel: "k + m = k + n \<longleftrightarrow> m = n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2321	for k m n :: nat
62365 8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2322	by (fact add_left_cancel)
8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2323
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2324	lemma nat_add_right_cancel: "m + k = n + k \<longleftrightarrow> m = n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2325	for k m n :: nat
62365 8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2326	by (fact add_right_cancel)
8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2327
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2328	lemma diff_mult_distrib: "(m - n) * k = (m * k) - (n * k)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2329	for k m n :: nat
62365 8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2330	by (fact left_diff_distrib')
8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2331
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2332	lemma diff_mult_distrib2: "k * (m - n) = (k * m) - (k * n)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2333	for k m n :: nat
62365 8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2334	by (fact right_diff_distrib')
8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2335
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2336	lemma le_add_diff: "k \<le> n \<Longrightarrow> m \<le> n + m - k"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2337	for k m n :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2338	by (fact le_add_diff) (* FIXME delete *)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2339
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2340	lemma le_diff_conv2: "k \<le> j \<Longrightarrow> (i \<le> j - k) = (i + k \<le> j)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2341	for i j k :: nat
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2342	by (fact le_diff_conv2) (* FIXME delete *)
ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2343
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2344	lemma diff_self_eq_0 [simp]: "m - m = 0"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2345	for m :: nat
62365 8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2346	by (fact diff_cancel)
8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2347
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2348	lemma diff_diff_left [simp]: "i - j - k = i - (j + k)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2349	for i j k :: nat
62365 8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2350	by (fact diff_diff_add)
8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2351
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2352	lemma diff_commute: "i - j - k = i - k - j"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2353	for i j k :: nat
62365 8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2354	by (fact diff_right_commute)
8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2355
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2356	lemma diff_add_inverse: "(n + m) - n = m"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2357	for m n :: nat
62365 8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2358	by (fact add_diff_cancel_left')
8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2359
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2360	lemma diff_add_inverse2: "(m + n) - n = m"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2361	for m n :: nat
62365 8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2362	by (fact add_diff_cancel_right')
8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2363
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2364	lemma diff_cancel: "(k + m) - (k + n) = m - n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2365	for k m n :: nat
62365 8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2366	by (fact add_diff_cancel_left)
8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2367
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2368	lemma diff_cancel2: "(m + k) - (n + k) = m - n"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2369	for k m n :: nat
62365 8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2370	by (fact add_diff_cancel_right)
8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2371
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2372	lemma diff_add_0: "n - (n + m) = 0"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2373	for m n :: nat
62365 8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2374	by (fact diff_add_zero)
8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2375
63588 d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2376	lemma add_mult_distrib2: "k * (m + n) = (k * m) + (k * n)"
d0e2bad67bd4 misc tuning and modernization; wenzelm parents: 63561 diff changeset	2377	for k m n :: nat
62365 8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2378	by (fact distrib_left)
8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2379
8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2380	lemmas nat_distrib =
8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2381	add_mult_distrib distrib_left diff_mult_distrib diff_mult_distrib2
8a105c235b1f sorted out some duplicate fact bindings haftmann parents: 62344 diff changeset	2382
44817 b63e445c8f6d lemmas about +, , min, max on nat haftmann* parents: 44325 diff changeset	2383
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	2384	subsection \<open>Size of a datatype value\<close>
25193 e2e1a4b00de3 various localizations haftmann parents: 25162 diff changeset	2385
29608 564ea783ace8 no base sort in class import haftmann parents: 28952 diff changeset	2386	class size =
61799 4cf66f21b764 isabelle update_cartouches -c -t; wenzelm parents: 61649 diff changeset	2387	fixes size :: "'a \<Rightarrow> nat" \<comment> \<open>see further theory \<open>Wellfounded\<close>\<close>
23852 3736cdf9398b moved set Nats to Nat.thy haftmann parents: 23740 diff changeset	2388
58377 c6f93b8d2d8e moved old 'size' generator together with 'old_datatype' blanchet parents: 58306 diff changeset	2389	instantiation nat :: size
c6f93b8d2d8e moved old 'size' generator together with 'old_datatype' blanchet parents: 58306 diff changeset	2390	begin
c6f93b8d2d8e moved old 'size' generator together with 'old_datatype' blanchet parents: 58306 diff changeset	2391
63110 ccbdce905fca misc tuning and modernization; wenzelm parents: 63099 diff changeset	2392	definition size_nat where [simp, code]: "size (n::nat) = n"
58377 c6f93b8d2d8e moved old 'size' generator together with 'old_datatype' blanchet parents: 58306 diff changeset	2393
c6f93b8d2d8e moved old 'size' generator together with 'old_datatype' blanchet parents: 58306 diff changeset	2394	instance ..
c6f93b8d2d8e moved old 'size' generator together with 'old_datatype' blanchet parents: 58306 diff changeset	2395
c6f93b8d2d8e moved old 'size' generator together with 'old_datatype' blanchet parents: 58306 diff changeset	2396	end
c6f93b8d2d8e moved old 'size' generator together with 'old_datatype' blanchet parents: 58306 diff changeset	2397
c6f93b8d2d8e moved old 'size' generator together with 'old_datatype' blanchet parents: 58306 diff changeset	2398
60758 d8d85a8172b5 isabelle update_cartouches; wenzelm parents: 60636 diff changeset	2399	subsection \<open>Code module namespace\<close>
33364 2bd12592c5e8 tuned code setup haftmann parents: 33274 diff changeset	2400
52435 6646bb548c6b migration from code_(const\|type\|class\|instance) to code_printing and from code_module to code_identifier haftmann parents: 52289 diff changeset	2401	code_identifier
6646bb548c6b migration from code_(const\|type\|class\|instance) to code_printing and from code_module to code_identifier haftmann parents: 52289 diff changeset	2402	code_module Nat \<rightharpoonup> (SML) Arith and (OCaml) Arith and (Haskell) Arith
33364 2bd12592c5e8 tuned code setup haftmann parents: 33274 diff changeset	2403
47108 2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46351 diff changeset	2404	hide_const (open) of_nat_aux
2a1953f0d20d merged fork with new numeral representation (see NEWS) huffman parents: 46351 diff changeset	2405
25193 e2e1a4b00de3 various localizations haftmann parents: 25162 diff changeset	2406	end

author	haftmann
	Sun, 08 Oct 2017 22:28:21 +0200
changeset 66810	cc2b490f9dc4
parent 66386	962c12353c67
child 66816	212a3334e7da
permissions	-rw-r--r--