isabelle: src/HOL/Integ/NatBin.thy@fbf90acc5bf4 (annotated)

7032 d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: diff changeset	1	(* Title: HOL/NatBin.thy
d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: diff changeset	2	ID: $Id$
d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: diff changeset	3	Author: Lawrence C Paulson, Cambridge University Computer Laboratory
d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: diff changeset	4	Copyright 1999 University of Cambridge
12838 093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	5	*)
7032 d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: diff changeset	6
12838 093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	7	header {* Binary arithmetic for the natural numbers *}
7032 d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: diff changeset	8
14353 79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	9	theory NatBin = IntDiv:
7032 d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: diff changeset	10
12838 093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	11	text {*
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	12	Arithmetic for naturals is reduced to that for the non-negative integers.
12838 093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	13	*}
093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	14
093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	15	instance nat :: number ..
093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	16
093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	17	defs (overloaded)
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	18	nat_number_of_def:
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	19	"(number_of::bin => nat) v == nat ((number_of :: bin => int) v)"
12838 093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	20
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	21
14353 79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	22	subsection{Function @{term nat}: Coercion from Type @{typ int} to @{typ nat}}
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	23
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	24	declare nat_0 [simp] nat_1 [simp]
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	25
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	26	lemma nat_number_of [simp]: "nat (number_of w) = number_of w"
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	27	by (simp add: nat_number_of_def)
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	28
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	29	lemma nat_numeral_0_eq_0 [simp]: "Numeral0 = (0::nat)"
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	30	by (simp add: nat_number_of_def)
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	31
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	32	lemma nat_numeral_1_eq_1 [simp]: "Numeral1 = (1::nat)"
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	33	by (simp add: nat_1 nat_number_of_def)
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	34
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	35	lemma numeral_1_eq_Suc_0: "Numeral1 = Suc 0"
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	36	by (simp add: nat_numeral_1_eq_1)
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	37
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	38	lemma numeral_2_eq_2: "2 = Suc (Suc 0)"
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	39	apply (unfold nat_number_of_def)
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	40	apply (rule nat_2)
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	41	done
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	42
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	43
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	44	text{*Distributive laws for type @{text nat}. The others are in theory
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	45	@{text IntArith}, but these require div and mod to be defined for type
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	46	"int". They also need some of the lemmas proved above.*}
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	47
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	48	lemma nat_div_distrib: "(0::int) <= z ==> nat (z div z') = nat z div nat z'"
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	49	apply (case_tac "0 <= z'")
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	50	apply (auto simp add: div_nonneg_neg_le0 DIVISION_BY_ZERO_DIV)
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	51	apply (case_tac "z' = 0", simp add: DIVISION_BY_ZERO)
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	52	apply (auto elim!: nonneg_eq_int)
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	53	apply (rename_tac m m')
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	54	apply (subgoal_tac "0 <= int m div int m'")
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	55	prefer 2 apply (simp add: nat_numeral_0_eq_0 pos_imp_zdiv_nonneg_iff)
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	56	apply (rule inj_int [THEN injD], simp)
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	57	apply (rule_tac r = "int (m mod m') " in quorem_div)
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	58	prefer 2 apply force
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	59	apply (simp add: nat_less_iff [symmetric] quorem_def nat_numeral_0_eq_0 zadd_int
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	60	zmult_int)
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	61	done
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	62
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	63	(Fails if z'<0: the LHS collapses to (nat z) but the RHS doesn't)
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	64	lemma nat_mod_distrib:
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	65	"[\| (0::int) <= z; 0 <= z' \|] ==> nat (z mod z') = nat z mod nat z'"
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	66	apply (case_tac "z' = 0", simp add: DIVISION_BY_ZERO)
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	67	apply (auto elim!: nonneg_eq_int)
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	68	apply (rename_tac m m')
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	69	apply (subgoal_tac "0 <= int m mod int m'")
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	70	prefer 2 apply (simp add: nat_less_iff nat_numeral_0_eq_0 pos_mod_sign)
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	71	apply (rule inj_int [THEN injD], simp)
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	72	apply (rule_tac q = "int (m div m') " in quorem_mod)
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	73	prefer 2 apply force
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	74	apply (simp add: nat_less_iff [symmetric] quorem_def nat_numeral_0_eq_0 zadd_int zmult_int)
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	75	done
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	76
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	77
14353 79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	78	subsection{Function @{term int}: Coercion from Type @{typ nat} to @{typ int}}
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	79
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	80	("neg" is used in rewrite rules for binary comparisons)
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	81	lemma int_nat_number_of [simp]:
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	82	"int (number_of v :: nat) =
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14365 diff changeset	83	(if neg (number_of v :: int) then 0
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	84	else (number_of v :: int))"
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	85	by (simp del: nat_number_of
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	86	add: neg_nat nat_number_of_def not_neg_nat add_assoc)
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	87
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	88
14390 55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	89	subsubsection{Successor }
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	90
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	91	lemma Suc_nat_eq_nat_zadd1: "(0::int) <= z ==> Suc (nat z) = nat (1 + z)"
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	92	apply (rule sym)
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	93	apply (simp add: nat_eq_iff int_Suc)
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	94	done
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	95
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	96	lemma Suc_nat_number_of_add:
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	97	"Suc (number_of v + n) =
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14365 diff changeset	98	(if neg (number_of v :: int) then 1+n else number_of (bin_succ v) + n)"
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	99	by (simp del: nat_number_of
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	100	add: nat_number_of_def neg_nat
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	101	Suc_nat_eq_nat_zadd1 number_of_succ)
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	102
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	103	lemma Suc_nat_number_of [simp]:
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	104	"Suc (number_of v) =
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14365 diff changeset	105	(if neg (number_of v :: int) then 1 else number_of (bin_succ v))"
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	106	apply (cut_tac n = 0 in Suc_nat_number_of_add)
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	107	apply (simp cong del: if_weak_cong)
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	108	done
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	109
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	110
14390 55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	111	subsubsection{Addition }
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	112
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	113	("neg" is used in rewrite rules for binary comparisons)
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	114	lemma add_nat_number_of [simp]:
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	115	"(number_of v :: nat) + number_of v' =
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14365 diff changeset	116	(if neg (number_of v :: int) then number_of v'
69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14365 diff changeset	117	else if neg (number_of v' :: int) then number_of v
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	118	else number_of (bin_add v v'))"
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	119	by (force dest!: neg_nat
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	120	simp del: nat_number_of
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	121	simp add: nat_number_of_def nat_add_distrib [symmetric])
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	122
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	123
14390 55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	124	subsubsection{Subtraction }
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	125
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	126	lemma diff_nat_eq_if:
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	127	"nat z - nat z' =
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	128	(if neg z' then nat z
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	129	else let d = z-z' in
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	130	if neg d then 0 else nat d)"
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	131	apply (simp add: Let_def nat_diff_distrib [symmetric] neg_eq_less_0 not_neg_eq_ge_0)
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	132	apply (simp add: diff_is_0_eq nat_le_eq_zle)
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	133	done
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	134
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	135	lemma diff_nat_number_of [simp]:
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	136	"(number_of v :: nat) - number_of v' =
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14365 diff changeset	137	(if neg (number_of v' :: int) then number_of v
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	138	else let d = number_of (bin_add v (bin_minus v')) in
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	139	if neg d then 0 else nat d)"
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	140	by (simp del: nat_number_of add: diff_nat_eq_if nat_number_of_def)
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	141
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	142
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	143
14390 55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	144	subsubsection{Multiplication }
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	145
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	146	lemma mult_nat_number_of [simp]:
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	147	"(number_of v :: nat) * number_of v' =
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14365 diff changeset	148	(if neg (number_of v :: int) then 0 else number_of (bin_mult v v'))"
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	149	by (force dest!: neg_nat
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	150	simp del: nat_number_of
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	151	simp add: nat_number_of_def nat_mult_distrib [symmetric])
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	152
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	153
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	154
14390 55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	155	subsubsection{Quotient }
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	156
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	157	lemma div_nat_number_of [simp]:
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	158	"(number_of v :: nat) div number_of v' =
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14365 diff changeset	159	(if neg (number_of v :: int) then 0
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	160	else nat (number_of v div number_of v'))"
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	161	by (force dest!: neg_nat
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	162	simp del: nat_number_of
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	163	simp add: nat_number_of_def nat_div_distrib [symmetric])
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	164
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	165	lemma one_div_nat_number_of [simp]:
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	166	"(Suc 0) div number_of v' = (nat (1 div number_of v'))"
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	167	by (simp del: nat_numeral_1_eq_1 add: numeral_1_eq_Suc_0 [symmetric])
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	168
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	169
14390 55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	170	subsubsection{Remainder }
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	171
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	172	lemma mod_nat_number_of [simp]:
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	173	"(number_of v :: nat) mod number_of v' =
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14365 diff changeset	174	(if neg (number_of v :: int) then 0
69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14365 diff changeset	175	else if neg (number_of v' :: int) then number_of v
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	176	else nat (number_of v mod number_of v'))"
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	177	by (force dest!: neg_nat
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	178	simp del: nat_number_of
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	179	simp add: nat_number_of_def nat_mod_distrib [symmetric])
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	180
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	181	lemma one_mod_nat_number_of [simp]:
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	182	"(Suc 0) mod number_of v' =
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	183	(if neg (number_of v' :: int) then Suc 0
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	184	else nat (1 mod number_of v'))"
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	185	by (simp del: nat_numeral_1_eq_1 add: numeral_1_eq_Suc_0 [symmetric])
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	186
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	187
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	188
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	189	ML
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	190	{*
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	191	val nat_number_of_def = thm"nat_number_of_def";
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	192
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	193	val nat_number_of = thm"nat_number_of";
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	194	val nat_numeral_0_eq_0 = thm"nat_numeral_0_eq_0";
e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	195	val nat_numeral_1_eq_1 = thm"nat_numeral_1_eq_1";
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	196	val numeral_1_eq_Suc_0 = thm"numeral_1_eq_Suc_0";
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	197	val numeral_2_eq_2 = thm"numeral_2_eq_2";
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	198	val nat_div_distrib = thm"nat_div_distrib";
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	199	val nat_mod_distrib = thm"nat_mod_distrib";
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	200	val int_nat_number_of = thm"int_nat_number_of";
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	201	val Suc_nat_eq_nat_zadd1 = thm"Suc_nat_eq_nat_zadd1";
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	202	val Suc_nat_number_of_add = thm"Suc_nat_number_of_add";
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	203	val Suc_nat_number_of = thm"Suc_nat_number_of";
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	204	val add_nat_number_of = thm"add_nat_number_of";
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	205	val diff_nat_eq_if = thm"diff_nat_eq_if";
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	206	val diff_nat_number_of = thm"diff_nat_number_of";
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	207	val mult_nat_number_of = thm"mult_nat_number_of";
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	208	val div_nat_number_of = thm"div_nat_number_of";
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	209	val mod_nat_number_of = thm"mod_nat_number_of";
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	210	*}
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	211
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	212
14390 55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	213	subsection{Comparisons}
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	214
14390 55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	215	subsubsection{Equals (=) }
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	216
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	217	lemma eq_nat_nat_iff:
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	218	"[\| (0::int) <= z; 0 <= z' \|] ==> (nat z = nat z') = (z=z')"
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	219	by (auto elim!: nonneg_eq_int)
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	220
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	221	("neg" is used in rewrite rules for binary comparisons)
14390 55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	222	lemma eq_nat_number_of [simp]:
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	223	"((number_of v :: nat) = number_of v') =
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14365 diff changeset	224	(if neg (number_of v :: int) then (iszero (number_of v' :: int) \| neg (number_of v' :: int))
69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14365 diff changeset	225	else if neg (number_of v' :: int) then iszero (number_of v :: int)
69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14365 diff changeset	226	else iszero (number_of (bin_add v (bin_minus v')) :: int))"
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	227	apply (simp only: simp_thms neg_nat not_neg_eq_ge_0 nat_number_of_def
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	228	eq_nat_nat_iff eq_number_of_eq nat_0 iszero_def
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	229	split add: split_if cong add: imp_cong)
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	230	apply (simp only: nat_eq_iff nat_eq_iff2)
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	231	apply (simp add: not_neg_eq_ge_0 [symmetric])
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	232	done
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	233
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	234
14390 55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	235	subsubsection{Less-than (<) }
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	236
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	237	("neg" is used in rewrite rules for binary comparisons)
14390 55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	238	lemma less_nat_number_of [simp]:
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	239	"((number_of v :: nat) < number_of v') =
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14365 diff changeset	240	(if neg (number_of v :: int) then neg (number_of (bin_minus v') :: int)
69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14365 diff changeset	241	else neg (number_of (bin_add v (bin_minus v')) :: int))"
14390 55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	242	by (simp only: simp_thms neg_nat not_neg_eq_ge_0 nat_number_of_def
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	243	nat_less_eq_zless less_number_of_eq_neg zless_nat_eq_int_zless
14390 55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	244	cong add: imp_cong, simp)
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	245
14390 55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	246
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	247
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	248
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	249	(Maps #n to n for n = 0, 1, 2)
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	250	lemmas numerals = nat_numeral_0_eq_0 nat_numeral_1_eq_1 numeral_2_eq_2
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	251
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	252
14353 79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	253	subsection{General Theorems About Powers Involving Binary Numerals}
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	254
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	255	text{*We cannot refer to the number @{term 2} in @{text Ring_and_Field.thy}.
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	256	We cannot prove general results about the numeral @{term "-1"}, so we have to
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	257	use @{term "- 1"} instead.*}
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	258
15003 6145dd7538d7 replaced monomorphic abs definitions by abs_if paulson parents: 14738 diff changeset	259	lemma power2_eq_square: "(a::'a::{comm_semiring_1_cancel,recpower})\<twosuperior> = a * a"
14353 79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	260	by (simp add: numeral_2_eq_2 Power.power_Suc)
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	261
15003 6145dd7538d7 replaced monomorphic abs definitions by abs_if paulson parents: 14738 diff changeset	262	lemma [simp]: "(0::'a::{comm_semiring_1_cancel,recpower})\<twosuperior> = 0"
14353 79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	263	by (simp add: power2_eq_square)
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	264
15003 6145dd7538d7 replaced monomorphic abs definitions by abs_if paulson parents: 14738 diff changeset	265	lemma [simp]: "(1::'a::{comm_semiring_1_cancel,recpower})\<twosuperior> = 1"
14353 79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	266	by (simp add: power2_eq_square)
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	267
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	268	text{Squares of literal numerals will be evaluated.}
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	269	declare power2_eq_square [of "number_of w", standard, simp]
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	270
15003 6145dd7538d7 replaced monomorphic abs definitions by abs_if paulson parents: 14738 diff changeset	271	lemma zero_le_power2 [simp]: "0 \<le> (a\<twosuperior>::'a::{ordered_idom,recpower})"
14353 79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	272	by (simp add: power2_eq_square zero_le_square)
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	273
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	274	lemma zero_less_power2 [simp]:
15003 6145dd7538d7 replaced monomorphic abs definitions by abs_if paulson parents: 14738 diff changeset	275	"(0 < a\<twosuperior>) = (a \<noteq> (0::'a::{ordered_idom,recpower}))"
14353 79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	276	by (force simp add: power2_eq_square zero_less_mult_iff linorder_neq_iff)
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	277
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	278	lemma zero_eq_power2 [simp]:
15003 6145dd7538d7 replaced monomorphic abs definitions by abs_if paulson parents: 14738 diff changeset	279	"(a\<twosuperior> = 0) = (a = (0::'a::{ordered_idom,recpower}))"
14353 79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	280	by (force simp add: power2_eq_square mult_eq_0_iff)
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	281
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	282	lemma abs_power2 [simp]:
15003 6145dd7538d7 replaced monomorphic abs definitions by abs_if paulson parents: 14738 diff changeset	283	"abs(a\<twosuperior>) = (a\<twosuperior>::'a::{ordered_idom,recpower})"
14353 79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	284	by (simp add: power2_eq_square abs_mult abs_mult_self)
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	285
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	286	lemma power2_abs [simp]:
15003 6145dd7538d7 replaced monomorphic abs definitions by abs_if paulson parents: 14738 diff changeset	287	"(abs a)\<twosuperior> = (a\<twosuperior>::'a::{ordered_idom,recpower})"
14353 79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	288	by (simp add: power2_eq_square abs_mult_self)
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	289
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	290	lemma power2_minus [simp]:
15003 6145dd7538d7 replaced monomorphic abs definitions by abs_if paulson parents: 14738 diff changeset	291	"(- a)\<twosuperior> = (a\<twosuperior>::'a::{comm_ring_1,recpower})"
14353 79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	292	by (simp add: power2_eq_square)
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	293
15003 6145dd7538d7 replaced monomorphic abs definitions by abs_if paulson parents: 14738 diff changeset	294	lemma power_minus1_even: "(- 1) ^ (2*n) = (1::'a::{comm_ring_1,recpower})"
14353 79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	295	apply (induct_tac "n")
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	296	apply (auto simp add: power_Suc power_add)
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	297	done
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	298
15003 6145dd7538d7 replaced monomorphic abs definitions by abs_if paulson parents: 14738 diff changeset	299	lemma power_even_eq: "(a::'a::recpower) ^ (2*n) = (a^n)^2"
14443 75910c7557c5 generic theorems about exponentials; general tidying up paulson parents: 14430 diff changeset	300	by (simp add: power_mult power_mult_distrib power2_eq_square)
75910c7557c5 generic theorems about exponentials; general tidying up paulson parents: 14430 diff changeset	301
75910c7557c5 generic theorems about exponentials; general tidying up paulson parents: 14430 diff changeset	302	lemma power_odd_eq: "(a::int) ^ Suc(2n) = a (a^n)^2"
75910c7557c5 generic theorems about exponentials; general tidying up paulson parents: 14430 diff changeset	303	by (simp add: power_even_eq)
75910c7557c5 generic theorems about exponentials; general tidying up paulson parents: 14430 diff changeset	304
14353 79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	305	lemma power_minus_even [simp]:
15003 6145dd7538d7 replaced monomorphic abs definitions by abs_if paulson parents: 14738 diff changeset	306	"(-a) ^ (2n) = (a::'a::{comm_ring_1,recpower}) ^ (2n)"
14353 79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	307	by (simp add: power_minus1_even power_minus [of a])
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	308
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	309	lemma zero_le_even_power:
15003 6145dd7538d7 replaced monomorphic abs definitions by abs_if paulson parents: 14738 diff changeset	310	"0 \<le> (a::'a::{ordered_idom,recpower}) ^ (2*n)"
14353 79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	311	proof (induct "n")
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	312	case 0
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	313	show ?case by (simp add: zero_le_one)
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	314	next
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	315	case (Suc n)
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	316	have "a ^ (2 * Suc n) = (aa) a ^ (2*n)"
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	317	by (simp add: mult_ac power_add power2_eq_square)
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	318	thus ?case
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	319	by (simp add: prems zero_le_square zero_le_mult_iff)
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	320	qed
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	321
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	322	lemma odd_power_less_zero:
15003 6145dd7538d7 replaced monomorphic abs definitions by abs_if paulson parents: 14738 diff changeset	323	"(a::'a::{ordered_idom,recpower}) < 0 ==> a ^ Suc(2*n) < 0"
14353 79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	324	proof (induct "n")
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	325	case 0
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	326	show ?case by (simp add: Power.power_Suc)
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	327	next
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	328	case (Suc n)
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	329	have "a ^ Suc (2 * Suc n) = (aa) a ^ Suc(2*n)"
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	330	by (simp add: mult_ac power_add power2_eq_square Power.power_Suc)
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	331	thus ?case
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	332	by (simp add: prems mult_less_0_iff mult_neg)
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	333	qed
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	334
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	335	lemma odd_0_le_power_imp_0_le:
15003 6145dd7538d7 replaced monomorphic abs definitions by abs_if paulson parents: 14738 diff changeset	336	"0 \<le> a ^ Suc(2*n) ==> 0 \<le> (a::'a::{ordered_idom,recpower})"
14353 79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	337	apply (insert odd_power_less_zero [of a n])
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	338	apply (force simp add: linorder_not_less [symmetric])
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	339	done
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	340
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	341
14390 55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	342	subsubsection{Nat }
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	343
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	344	lemma Suc_pred': "0 < n ==> n = Suc(n - 1)"
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	345	by (simp add: numerals)
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	346
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	347	(*Expresses a natural number constant as the Suc of another one.
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	348	NOT suitable for rewriting because n recurs in the condition.*)
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	349	lemmas expand_Suc = Suc_pred' [of "number_of v", standard]
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	350
14390 55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	351	subsubsection{Arith }
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	352
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	353	lemma Suc_eq_add_numeral_1: "Suc n = n + 1"
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	354	by (simp add: numerals)
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	355
14467 bbfa6b01a55f new lemma paulson parents: 14443 diff changeset	356	lemma Suc_eq_add_numeral_1_left: "Suc n = 1 + n"
bbfa6b01a55f new lemma paulson parents: 14443 diff changeset	357	by (simp add: numerals)
bbfa6b01a55f new lemma paulson parents: 14443 diff changeset	358
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	359	(* These two can be useful when m = number_of... *)
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	360
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	361	lemma add_eq_if: "(m::nat) + n = (if m=0 then n else Suc ((m - 1) + n))"
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	362	apply (case_tac "m")
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	363	apply (simp_all add: numerals)
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	364	done
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	365
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	366	lemma mult_eq_if: "(m::nat) * n = (if m=0 then 0 else n + ((m - 1) * n))"
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	367	apply (case_tac "m")
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	368	apply (simp_all add: numerals)
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	369	done
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	370
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	371	lemma power_eq_if: "(p ^ m :: nat) = (if m=0 then 1 else p * (p ^ (m - 1)))"
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	372	apply (case_tac "m")
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	373	apply (simp_all add: numerals)
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	374	done
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	375
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	376	lemma diff_less': "[\| 0<n; 0<m \|] ==> m - n < (m::nat)"
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	377	by (simp add: diff_less numerals)
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	378
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	379	declare diff_less' [of "number_of v", standard, simp]
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	380
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	381
14390 55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	382	subsection{Comparisons involving (0::nat) }
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	383
14390 55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	384	text{Simplification already does @{term "n<0"}, @{term "n\<le>0"} and @{term "0\<le>n"}.}
55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	385
55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	386	lemma eq_number_of_0 [simp]:
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	387	"(number_of v = (0::nat)) =
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14365 diff changeset	388	(if neg (number_of v :: int) then True else iszero (number_of v :: int))"
14390 55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	389	by (simp del: nat_numeral_0_eq_0 add: nat_numeral_0_eq_0 [symmetric] iszero_0)
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	390
14390 55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	391	lemma eq_0_number_of [simp]:
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	392	"((0::nat) = number_of v) =
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14365 diff changeset	393	(if neg (number_of v :: int) then True else iszero (number_of v :: int))"
14390 55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	394	by (rule trans [OF eq_sym_conv eq_number_of_0])
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	395
14390 55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	396	lemma less_0_number_of [simp]:
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14365 diff changeset	397	"((0::nat) < number_of v) = neg (number_of (bin_minus v) :: int)"
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	398	by (simp del: nat_numeral_0_eq_0 add: nat_numeral_0_eq_0 [symmetric])
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	399
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	400
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14365 diff changeset	401	lemma neg_imp_number_of_eq_0: "neg (number_of v :: int) ==> number_of v = (0::nat)"
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	402	by (simp del: nat_numeral_0_eq_0 add: nat_numeral_0_eq_0 [symmetric] iszero_0)
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	403
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	404
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	405
14390 55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	406	subsection{Comparisons involving Suc }
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	407
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	408	lemma eq_number_of_Suc [simp]:
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	409	"(number_of v = Suc n) =
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	410	(let pv = number_of (bin_pred v) in
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	411	if neg pv then False else nat pv = n)"
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	412	apply (simp only: simp_thms Let_def neg_eq_less_0 linorder_not_less
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	413	number_of_pred nat_number_of_def
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	414	split add: split_if)
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	415	apply (rule_tac x = "number_of v" in spec)
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	416	apply (auto simp add: nat_eq_iff)
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	417	done
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	418
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	419	lemma Suc_eq_number_of [simp]:
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	420	"(Suc n = number_of v) =
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	421	(let pv = number_of (bin_pred v) in
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	422	if neg pv then False else nat pv = n)"
14390 55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	423	by (rule trans [OF eq_sym_conv eq_number_of_Suc])
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	424
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	425	lemma less_number_of_Suc [simp]:
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	426	"(number_of v < Suc n) =
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	427	(let pv = number_of (bin_pred v) in
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	428	if neg pv then True else nat pv < n)"
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	429	apply (simp only: simp_thms Let_def neg_eq_less_0 linorder_not_less
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	430	number_of_pred nat_number_of_def
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	431	split add: split_if)
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	432	apply (rule_tac x = "number_of v" in spec)
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	433	apply (auto simp add: nat_less_iff)
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	434	done
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	435
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	436	lemma less_Suc_number_of [simp]:
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	437	"(Suc n < number_of v) =
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	438	(let pv = number_of (bin_pred v) in
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	439	if neg pv then False else n < nat pv)"
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	440	apply (simp only: simp_thms Let_def neg_eq_less_0 linorder_not_less
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	441	number_of_pred nat_number_of_def
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	442	split add: split_if)
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	443	apply (rule_tac x = "number_of v" in spec)
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	444	apply (auto simp add: zless_nat_eq_int_zless)
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	445	done
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	446
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	447	lemma le_number_of_Suc [simp]:
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	448	"(number_of v <= Suc n) =
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	449	(let pv = number_of (bin_pred v) in
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	450	if neg pv then True else nat pv <= n)"
14390 55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	451	by (simp add: Let_def less_Suc_number_of linorder_not_less [symmetric])
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	452
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	453	lemma le_Suc_number_of [simp]:
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	454	"(Suc n <= number_of v) =
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	455	(let pv = number_of (bin_pred v) in
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	456	if neg pv then False else n <= nat pv)"
14390 55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	457	by (simp add: Let_def less_number_of_Suc linorder_not_less [symmetric])
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	458
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	459
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	460	(* Push int(.) inwards: *)
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	461	declare zadd_int [symmetric, simp]
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	462
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	463	lemma lemma1: "(m+m = n+n) = (m = (n::int))"
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	464	by auto
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	465
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	466	lemma lemma2: "m+m ~= (1::int) + (n + n)"
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	467	apply auto
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	468	apply (drule_tac f = "%x. x mod 2" in arg_cong)
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	469	apply (simp add: zmod_zadd1_eq)
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	470	done
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	471
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	472	lemma eq_number_of_BIT_BIT:
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	473	"((number_of (v BIT x) ::int) = number_of (w BIT y)) =
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	474	(x=y & (((number_of v) ::int) = number_of w))"
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	475	by (simp only: simp_thms number_of_BIT lemma1 lemma2 eq_commute
14738 83f1a514dcb4 changes made due to new Ring_and_Field theory obua parents: 14467 diff changeset	476	OrderedGroup.add_left_cancel add_assoc OrderedGroup.add_0
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	477	split add: split_if cong: imp_cong)
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	478
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	479
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	480	lemma eq_number_of_BIT_Pls:
15013 34264f5e4691 new treatment of binary numerals paulson parents: 15003 diff changeset	481	"((number_of (v BIT x) ::int) = Numeral0) =
34264f5e4691 new treatment of binary numerals paulson parents: 15003 diff changeset	482	(x=False & (((number_of v) ::int) = Numeral0))"
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	483	apply (simp only: simp_thms add: number_of_BIT number_of_Pls eq_commute
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	484	split add: split_if cong: imp_cong)
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	485	apply (rule_tac x = "number_of v" in spec, safe)
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	486	apply (simp_all (no_asm_use))
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	487	apply (drule_tac f = "%x. x mod 2" in arg_cong)
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	488	apply (simp add: zmod_zadd1_eq)
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	489	done
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	490
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	491	lemma eq_number_of_BIT_Min:
15013 34264f5e4691 new treatment of binary numerals paulson parents: 15003 diff changeset	492	"((number_of (v BIT x) ::int) = number_of Numeral.Min) =
34264f5e4691 new treatment of binary numerals paulson parents: 15003 diff changeset	493	(x=True & (((number_of v) ::int) = number_of Numeral.Min))"
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	494	apply (simp only: simp_thms add: number_of_BIT number_of_Min eq_commute
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	495	split add: split_if cong: imp_cong)
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	496	apply (rule_tac x = "number_of v" in spec, auto)
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	497	apply (drule_tac f = "%x. x mod 2" in arg_cong, auto)
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	498	done
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	499
15013 34264f5e4691 new treatment of binary numerals paulson parents: 15003 diff changeset	500	lemma eq_number_of_Pls_Min: "(Numeral0 ::int) ~= number_of Numeral.Min"
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	501	by auto
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	502
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	503
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	504
14390 55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	505	subsection{Literal arithmetic involving powers}
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	506
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	507	lemma nat_power_eq: "(0::int) <= z ==> nat (z^n) = nat z ^ n"
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	508	apply (induct_tac "n")
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	509	apply (simp_all (no_asm_simp) add: nat_mult_distrib)
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	510	done
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	511
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	512	lemma power_nat_number_of:
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	513	"(number_of v :: nat) ^ n =
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14365 diff changeset	514	(if neg (number_of v :: int) then 0^n else nat ((number_of v :: int) ^ n))"
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	515	by (simp only: simp_thms neg_nat not_neg_eq_ge_0 nat_number_of_def nat_power_eq
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	516	split add: split_if cong: imp_cong)
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	517
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	518
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	519	declare power_nat_number_of [of _ "number_of w", standard, simp]
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	520
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	521
14390 55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	522	text{For the integers}
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	523
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	524	lemma zpower_number_of_even:
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	525	"(z::int) ^ number_of (w BIT False) =
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	526	(let w = z ^ (number_of w) in w*w)"
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	527	apply (simp del: nat_number_of add: nat_number_of_def number_of_BIT Let_def)
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	528	apply (simp only: number_of_add)
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	529	apply (rule_tac x = "number_of w" in spec, clarify)
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	530	apply (case_tac " (0::int) <= x")
14443 75910c7557c5 generic theorems about exponentials; general tidying up paulson parents: 14430 diff changeset	531	apply (auto simp add: nat_mult_distrib power_even_eq power2_eq_square)
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	532	done
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	533
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	534	lemma zpower_number_of_odd:
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	535	"(z::int) ^ number_of (w BIT True) =
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	536	(if (0::int) <= number_of w
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	537	then (let w = z ^ (number_of w) in zww)
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	538	else 1)"
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	539	apply (simp del: nat_number_of add: nat_number_of_def number_of_BIT Let_def)
14387 e96d5c42c4b0 Polymorphic treatment of binary arithmetic using axclasses paulson parents: 14378 diff changeset	540	apply (simp only: number_of_add nat_numeral_1_eq_1 not_neg_eq_ge_0 neg_eq_less_0)
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	541	apply (rule_tac x = "number_of w" in spec, clarify)
14443 75910c7557c5 generic theorems about exponentials; general tidying up paulson parents: 14430 diff changeset	542	apply (auto simp add: nat_add_distrib nat_mult_distrib power_even_eq power2_eq_square neg_nat)
14272 5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	543	done
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	544
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	545	declare zpower_number_of_even [of "number_of v", standard, simp]
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	546	declare zpower_number_of_odd [of "number_of v", standard, simp]
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	547
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	548
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	549
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	550	ML
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	551	{*
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	552	val numerals = thms"numerals";
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	553	val numeral_ss = simpset() addsimps numerals;
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	554
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	555	val nat_bin_arith_setup =
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	556	[Fast_Arith.map_data
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	557	(fn {add_mono_thms, mult_mono_thms, inj_thms, lessD, simpset} =>
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	558	{add_mono_thms = add_mono_thms, mult_mono_thms = mult_mono_thms,
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	559	inj_thms = inj_thms,
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	560	lessD = lessD,
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	561	simpset = simpset addsimps [Suc_nat_number_of, int_nat_number_of,
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	562	not_neg_number_of_Pls,
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	563	neg_number_of_Min,neg_number_of_BIT]})]
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	564	*}
5efbb548107d Tidying of the integer development; towards removing the paulson parents: 14194 diff changeset	565
12838 093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	566	setup nat_bin_arith_setup
093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	567
13189 81ed5c6de890 Now arith can deal with div/mod arbitrary nat numerals. nipkow parents: 13154 diff changeset	568	(* Enable arith to deal with div/mod k where k is a numeral: *)
81ed5c6de890 Now arith can deal with div/mod arbitrary nat numerals. nipkow parents: 13154 diff changeset	569	declare split_div[of _ _ "number_of k", standard, arith_split]
81ed5c6de890 Now arith can deal with div/mod arbitrary nat numerals. nipkow parents: 13154 diff changeset	570	declare split_mod[of _ _ "number_of k", standard, arith_split]
13154 f1097ea60ba4 Set up arith to deal with div 2 and mod 2. nipkow parents: 13043 diff changeset	571
15013 34264f5e4691 new treatment of binary numerals paulson parents: 15003 diff changeset	572	lemma nat_number_of_Pls: "Numeral0 = (0::nat)"
12838 093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	573	by (simp add: number_of_Pls nat_number_of_def)
093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	574
15013 34264f5e4691 new treatment of binary numerals paulson parents: 15003 diff changeset	575	lemma nat_number_of_Min: "number_of Numeral.Min = (0::nat)"
12838 093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	576	apply (simp only: number_of_Min nat_number_of_def nat_zminus_int)
093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	577	apply (simp add: neg_nat)
093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	578	done
7032 d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: diff changeset	579
12838 093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	580	lemma nat_number_of_BIT_True:
093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	581	"number_of (w BIT True) =
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14365 diff changeset	582	(if neg (number_of w :: int) then 0
12838 093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	583	else let n = number_of w in Suc (n + n))"
093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	584	apply (simp only: nat_number_of_def Let_def split: split_if)
093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	585	apply (intro conjI impI)
093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	586	apply (simp add: neg_nat neg_number_of_BIT)
093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	587	apply (rule int_int_eq [THEN iffD1])
093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	588	apply (simp only: not_neg_nat neg_number_of_BIT int_Suc zadd_int [symmetric] simp_thms)
093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	589	apply (simp only: number_of_BIT if_True zadd_assoc)
093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	590	done
7032 d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: diff changeset	591
12838 093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	592	lemma nat_number_of_BIT_False:
093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	593	"number_of (w BIT False) = (let n::nat = number_of w in n + n)"
093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	594	apply (simp only: nat_number_of_def Let_def)
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14365 diff changeset	595	apply (cases "neg (number_of w :: int)")
12838 093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	596	apply (simp add: neg_nat neg_number_of_BIT)
093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	597	apply (rule int_int_eq [THEN iffD1])
093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	598	apply (simp only: not_neg_nat neg_number_of_BIT int_Suc zadd_int [symmetric] simp_thms)
093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	599	apply (simp only: number_of_BIT if_False zadd_0 zadd_assoc)
093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	600	done
093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	601
13043 ad1828b479b7 renamed nat_number_of to nat_number (avoid clash with separate theorem); wenzelm parents: 12933 diff changeset	602	lemmas nat_number =
12838 093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	603	nat_number_of_Pls nat_number_of_Min
093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	604	nat_number_of_BIT_True nat_number_of_BIT_False
093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	605
093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	606	lemma Let_Suc [simp]: "Let (Suc n) f == f (Suc n)"
093d9b8979f2 tuned; wenzelm parents: 12440 diff changeset	607	by (simp add: Let_def)
10574 8f98f0301d67 Linear arithmetic now copes with mixed nat/int formulae. nipkow parents: 9509 diff changeset	608
15003 6145dd7538d7 replaced monomorphic abs definitions by abs_if paulson parents: 14738 diff changeset	609	lemma power_m1_even: "(-1) ^ (2*n) = (1::'a::{number_ring,recpower})"
14443 75910c7557c5 generic theorems about exponentials; general tidying up paulson parents: 14430 diff changeset	610	by (simp add: power_mult);
75910c7557c5 generic theorems about exponentials; general tidying up paulson parents: 14430 diff changeset	611
15003 6145dd7538d7 replaced monomorphic abs definitions by abs_if paulson parents: 14738 diff changeset	612	lemma power_m1_odd: "(-1) ^ Suc(2*n) = (-1::'a::{number_ring,recpower})"
14443 75910c7557c5 generic theorems about exponentials; general tidying up paulson parents: 14430 diff changeset	613	by (simp add: power_mult power_Suc);
75910c7557c5 generic theorems about exponentials; general tidying up paulson parents: 14430 diff changeset	614
12440 fb5851b71a82 Added code generator setup. berghofe parents: 11468 diff changeset	615
14390 55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	616	subsection{Literal arithmetic and @{term of_nat}}
55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	617
55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	618	lemma of_nat_double:
55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	619	"0 \<le> x ==> of_nat (nat (2 * x)) = of_nat (nat x) + of_nat (nat x)"
55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	620	by (simp only: mult_2 nat_add_distrib of_nat_add)
55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	621
55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	622	lemma nat_numeral_m1_eq_0: "-1 = (0::nat)"
55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	623	by (simp only: nat_number_of_def, simp)
55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	624
55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	625	lemma of_nat_number_of_lemma:
55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	626	"of_nat (number_of v :: nat) =
55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	627	(if 0 \<le> (number_of v :: int)
55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	628	then (number_of v :: 'a :: number_ring)
55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	629	else 0)"
15013 34264f5e4691 new treatment of binary numerals paulson parents: 15003 diff changeset	630	by (simp add: int_number_of_def nat_number_of_def number_of_eq of_nat_nat);
14390 55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	631
55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	632	lemma of_nat_number_of_eq [simp]:
55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	633	"of_nat (number_of v :: nat) =
55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	634	(if neg (number_of v :: int) then 0
55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	635	else (number_of v :: 'a :: number_ring))"
55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	636	by (simp only: of_nat_number_of_lemma neg_def, simp)
55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	637
55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	638
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	639	subsection {Lemmas for the Combination and Cancellation Simprocs}
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	640
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	641	lemma nat_number_of_add_left:
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	642	"number_of v + (number_of v' + (k::nat)) =
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14365 diff changeset	643	(if neg (number_of v :: int) then number_of v' + k
69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14365 diff changeset	644	else if neg (number_of v' :: int) then number_of v + k
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	645	else number_of (bin_add v v') + k)"
14390 55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	646	by simp
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	647
14430 5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14417 diff changeset	648	lemma nat_number_of_mult_left:
5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14417 diff changeset	649	"number_of v * (number_of v' * (k::nat)) =
5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14417 diff changeset	650	(if neg (number_of v :: int) then 0
5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14417 diff changeset	651	else number_of (bin_mult v v') * k)"
5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14417 diff changeset	652	by simp
5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14417 diff changeset	653
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	654
14390 55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	655	subsubsection{For @{text combine_numerals}}
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	656
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	657	lemma left_add_mult_distrib: "iu + (ju + k) = (i+j)*u + (k::nat)"
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	658	by (simp add: add_mult_distrib)
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	659
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	660
14390 55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	661	subsubsection{For @{text cancel_numerals}}
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	662
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	663	lemma nat_diff_add_eq1:
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	664	"j <= (i::nat) ==> ((iu + m) - (ju + n)) = (((i-j)*u + m) - n)"
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	665	by (simp split add: nat_diff_split add: add_mult_distrib)
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	666
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	667	lemma nat_diff_add_eq2:
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	668	"i <= (j::nat) ==> ((iu + m) - (ju + n)) = (m - ((j-i)*u + n))"
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	669	by (simp split add: nat_diff_split add: add_mult_distrib)
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	670
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	671	lemma nat_eq_add_iff1:
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	672	"j <= (i::nat) ==> (iu + m = ju + n) = ((i-j)*u + m = n)"
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	673	by (auto split add: nat_diff_split simp add: add_mult_distrib)
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	674
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	675	lemma nat_eq_add_iff2:
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	676	"i <= (j::nat) ==> (iu + m = ju + n) = (m = (j-i)*u + n)"
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	677	by (auto split add: nat_diff_split simp add: add_mult_distrib)
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	678
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	679	lemma nat_less_add_iff1:
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	680	"j <= (i::nat) ==> (iu + m < ju + n) = ((i-j)*u + m < n)"
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	681	by (auto split add: nat_diff_split simp add: add_mult_distrib)
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	682
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	683	lemma nat_less_add_iff2:
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	684	"i <= (j::nat) ==> (iu + m < ju + n) = (m < (j-i)*u + n)"
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	685	by (auto split add: nat_diff_split simp add: add_mult_distrib)
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	686
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	687	lemma nat_le_add_iff1:
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	688	"j <= (i::nat) ==> (iu + m <= ju + n) = ((i-j)*u + m <= n)"
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	689	by (auto split add: nat_diff_split simp add: add_mult_distrib)
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	690
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	691	lemma nat_le_add_iff2:
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	692	"i <= (j::nat) ==> (iu + m <= ju + n) = (m <= (j-i)*u + n)"
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	693	by (auto split add: nat_diff_split simp add: add_mult_distrib)
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	694
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	695
14390 55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	696	subsubsection{For @{text cancel_numeral_factors} }
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	697
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	698	lemma nat_mult_le_cancel1: "(0::nat) < k ==> (km <= kn) = (m<=n)"
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	699	by auto
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	700
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	701	lemma nat_mult_less_cancel1: "(0::nat) < k ==> (km < kn) = (m<n)"
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	702	by auto
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	703
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	704	lemma nat_mult_eq_cancel1: "(0::nat) < k ==> (km = kn) = (m=n)"
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	705	by auto
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	706
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	707	lemma nat_mult_div_cancel1: "(0::nat) < k ==> (km) div (kn) = (m div n)"
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	708	by auto
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	709
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	710
14390 55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	711	subsubsection{For @{text cancel_factor} }
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	712
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	713	lemma nat_mult_le_cancel_disj: "(km <= kn) = ((0::nat) < k --> m<=n)"
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	714	by auto
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	715
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	716	lemma nat_mult_less_cancel_disj: "(km < kn) = ((0::nat) < k & m<n)"
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	717	by auto
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	718
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	719	lemma nat_mult_eq_cancel_disj: "(km = kn) = (k = (0::nat) \| m=n)"
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	720	by auto
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	721
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	722	lemma nat_mult_div_cancel_disj:
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	723	"(km) div (kn) = (if k = (0::nat) then 0 else m div n)"
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	724	by (simp add: nat_mult_div_cancel1)
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	725
14353 79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	726
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	727	ML
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	728	{*
14353 79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	729	val eq_nat_nat_iff = thm"eq_nat_nat_iff";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	730	val eq_nat_number_of = thm"eq_nat_number_of";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	731	val less_nat_number_of = thm"less_nat_number_of";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	732	val power2_eq_square = thm "power2_eq_square";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	733	val zero_le_power2 = thm "zero_le_power2";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	734	val zero_less_power2 = thm "zero_less_power2";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	735	val zero_eq_power2 = thm "zero_eq_power2";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	736	val abs_power2 = thm "abs_power2";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	737	val power2_abs = thm "power2_abs";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	738	val power2_minus = thm "power2_minus";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	739	val power_minus1_even = thm "power_minus1_even";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	740	val power_minus_even = thm "power_minus_even";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	741	val zero_le_even_power = thm "zero_le_even_power";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	742	val odd_power_less_zero = thm "odd_power_less_zero";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	743	val odd_0_le_power_imp_0_le = thm "odd_0_le_power_imp_0_le";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	744
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	745	val Suc_pred' = thm"Suc_pred'";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	746	val expand_Suc = thm"expand_Suc";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	747	val Suc_eq_add_numeral_1 = thm"Suc_eq_add_numeral_1";
14467 bbfa6b01a55f new lemma paulson parents: 14443 diff changeset	748	val Suc_eq_add_numeral_1_left = thm"Suc_eq_add_numeral_1_left";
14353 79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	749	val add_eq_if = thm"add_eq_if";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	750	val mult_eq_if = thm"mult_eq_if";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	751	val power_eq_if = thm"power_eq_if";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	752	val diff_less' = thm"diff_less'";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	753	val eq_number_of_0 = thm"eq_number_of_0";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	754	val eq_0_number_of = thm"eq_0_number_of";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	755	val less_0_number_of = thm"less_0_number_of";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	756	val neg_imp_number_of_eq_0 = thm"neg_imp_number_of_eq_0";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	757	val eq_number_of_Suc = thm"eq_number_of_Suc";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	758	val Suc_eq_number_of = thm"Suc_eq_number_of";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	759	val less_number_of_Suc = thm"less_number_of_Suc";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	760	val less_Suc_number_of = thm"less_Suc_number_of";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	761	val le_number_of_Suc = thm"le_number_of_Suc";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	762	val le_Suc_number_of = thm"le_Suc_number_of";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	763	val eq_number_of_BIT_BIT = thm"eq_number_of_BIT_BIT";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	764	val eq_number_of_BIT_Pls = thm"eq_number_of_BIT_Pls";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	765	val eq_number_of_BIT_Min = thm"eq_number_of_BIT_Min";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	766	val eq_number_of_Pls_Min = thm"eq_number_of_Pls_Min";
14390 55fe71faadda further tweaks to the numeric theories paulson parents: 14387 diff changeset	767	val of_nat_number_of_eq = thm"of_nat_number_of_eq";
14353 79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	768	val nat_power_eq = thm"nat_power_eq";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	769	val power_nat_number_of = thm"power_nat_number_of";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	770	val zpower_number_of_even = thm"zpower_number_of_even";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	771	val zpower_number_of_odd = thm"zpower_number_of_odd";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	772	val nat_number_of_Pls = thm"nat_number_of_Pls";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	773	val nat_number_of_Min = thm"nat_number_of_Min";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	774	val nat_number_of_BIT_True = thm"nat_number_of_BIT_True";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	775	val nat_number_of_BIT_False = thm"nat_number_of_BIT_False";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	776	val Let_Suc = thm"Let_Suc";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	777
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	778	val nat_number = thms"nat_number";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	779
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	780	val nat_number_of_add_left = thm"nat_number_of_add_left";
14430 5cb24165a2e1 new material from Avigad, and simplified treatment of division by 0 paulson parents: 14417 diff changeset	781	val nat_number_of_mult_left = thm"nat_number_of_mult_left";
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	782	val left_add_mult_distrib = thm"left_add_mult_distrib";
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	783	val nat_diff_add_eq1 = thm"nat_diff_add_eq1";
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	784	val nat_diff_add_eq2 = thm"nat_diff_add_eq2";
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	785	val nat_eq_add_iff1 = thm"nat_eq_add_iff1";
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	786	val nat_eq_add_iff2 = thm"nat_eq_add_iff2";
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	787	val nat_less_add_iff1 = thm"nat_less_add_iff1";
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	788	val nat_less_add_iff2 = thm"nat_less_add_iff2";
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	789	val nat_le_add_iff1 = thm"nat_le_add_iff1";
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	790	val nat_le_add_iff2 = thm"nat_le_add_iff2";
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	791	val nat_mult_le_cancel1 = thm"nat_mult_le_cancel1";
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	792	val nat_mult_less_cancel1 = thm"nat_mult_less_cancel1";
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	793	val nat_mult_eq_cancel1 = thm"nat_mult_eq_cancel1";
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	794	val nat_mult_div_cancel1 = thm"nat_mult_div_cancel1";
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	795	val nat_mult_le_cancel_disj = thm"nat_mult_le_cancel_disj";
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	796	val nat_mult_less_cancel_disj = thm"nat_mult_less_cancel_disj";
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	797	val nat_mult_eq_cancel_disj = thm"nat_mult_eq_cancel_disj";
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	798	val nat_mult_div_cancel_disj = thm"nat_mult_div_cancel_disj";
14353 79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	799
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	800	val power_minus_even = thm"power_minus_even";
79f9fbef9106 Added lemmas to Ring_and_Field with slightly modified simplification rules paulson parents: 14288 diff changeset	801	val zero_le_even_power = thm"zero_le_even_power";
14273 e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	802	*}
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	803
e33ffff0123c further simplifications of the integer development; converting more .ML files paulson parents: 14272 diff changeset	804
12440 fb5851b71a82 Added code generator setup. berghofe parents: 11468 diff changeset	805	subsection {* Configuration of the code generator *}
fb5851b71a82 Added code generator setup. berghofe parents: 11468 diff changeset	806
12933 b85c62c4e826 Introduced variants of operators + * ~ constrained to type int berghofe parents: 12838 diff changeset	807	ML {*
b85c62c4e826 Introduced variants of operators + * ~ constrained to type int berghofe parents: 12838 diff changeset	808	infix 7 `*;
b85c62c4e826 Introduced variants of operators + * ~ constrained to type int berghofe parents: 12838 diff changeset	809	infix 6 `+;
b85c62c4e826 Introduced variants of operators + * ~ constrained to type int berghofe parents: 12838 diff changeset	810
b85c62c4e826 Introduced variants of operators + * ~ constrained to type int berghofe parents: 12838 diff changeset	811	val op `* = op * : int * int -> int;
b85c62c4e826 Introduced variants of operators + * ~ constrained to type int berghofe parents: 12838 diff changeset	812	val op `+ = op + : int * int -> int;
b85c62c4e826 Introduced variants of operators + * ~ constrained to type int berghofe parents: 12838 diff changeset	813	val `~ = ~ : int -> int;
b85c62c4e826 Introduced variants of operators + * ~ constrained to type int berghofe parents: 12838 diff changeset	814	*}
b85c62c4e826 Introduced variants of operators + * ~ constrained to type int berghofe parents: 12838 diff changeset	815
12440 fb5851b71a82 Added code generator setup. berghofe parents: 11468 diff changeset	816	types_code
fb5851b71a82 Added code generator setup. berghofe parents: 11468 diff changeset	817	"int" ("int")
fb5851b71a82 Added code generator setup. berghofe parents: 11468 diff changeset	818
14194 8953b566dfed Improved efficiency of code generated for functions int and nat. berghofe parents: 13491 diff changeset	819	constdefs
8953b566dfed Improved efficiency of code generated for functions int and nat. berghofe parents: 13491 diff changeset	820	int_aux :: "int \<Rightarrow> nat \<Rightarrow> int"
8953b566dfed Improved efficiency of code generated for functions int and nat. berghofe parents: 13491 diff changeset	821	"int_aux i n == (i + int n)"
8953b566dfed Improved efficiency of code generated for functions int and nat. berghofe parents: 13491 diff changeset	822	nat_aux :: "nat \<Rightarrow> int \<Rightarrow> nat"
8953b566dfed Improved efficiency of code generated for functions int and nat. berghofe parents: 13491 diff changeset	823	"nat_aux n i == (n + nat i)"
12440 fb5851b71a82 Added code generator setup. berghofe parents: 11468 diff changeset	824
14194 8953b566dfed Improved efficiency of code generated for functions int and nat. berghofe parents: 13491 diff changeset	825	lemma [code]:
8953b566dfed Improved efficiency of code generated for functions int and nat. berghofe parents: 13491 diff changeset	826	"int_aux i 0 = i"
8953b566dfed Improved efficiency of code generated for functions int and nat. berghofe parents: 13491 diff changeset	827	"int_aux i (Suc n) = int_aux (i + 1) n" -- {* tail recursive *}
8953b566dfed Improved efficiency of code generated for functions int and nat. berghofe parents: 13491 diff changeset	828	"int n = int_aux 0 n"
8953b566dfed Improved efficiency of code generated for functions int and nat. berghofe parents: 13491 diff changeset	829	by (simp add: int_aux_def)+
8953b566dfed Improved efficiency of code generated for functions int and nat. berghofe parents: 13491 diff changeset	830
8953b566dfed Improved efficiency of code generated for functions int and nat. berghofe parents: 13491 diff changeset	831	lemma [code]: "nat_aux n i = (if i <= 0 then n else nat_aux (Suc n) (i - 1))"
8953b566dfed Improved efficiency of code generated for functions int and nat. berghofe parents: 13491 diff changeset	832	by (simp add: nat_aux_def Suc_nat_eq_nat_zadd1) -- {* tail recursive *}
8953b566dfed Improved efficiency of code generated for functions int and nat. berghofe parents: 13491 diff changeset	833	lemma [code]: "nat i = nat_aux 0 i"
8953b566dfed Improved efficiency of code generated for functions int and nat. berghofe parents: 13491 diff changeset	834	by (simp add: nat_aux_def)
12440 fb5851b71a82 Added code generator setup. berghofe parents: 11468 diff changeset	835
fb5851b71a82 Added code generator setup. berghofe parents: 11468 diff changeset	836	consts_code
fb5851b71a82 Added code generator setup. berghofe parents: 11468 diff changeset	837	"0" :: "int" ("0")
fb5851b71a82 Added code generator setup. berghofe parents: 11468 diff changeset	838	"1" :: "int" ("1")
12933 b85c62c4e826 Introduced variants of operators + * ~ constrained to type int berghofe parents: 12838 diff changeset	839	"uminus" :: "int => int" ("`~")
b85c62c4e826 Introduced variants of operators + * ~ constrained to type int berghofe parents: 12838 diff changeset	840	"op +" :: "int => int => int" ("(_ `+/ _)")
b85c62c4e826 Introduced variants of operators + * ~ constrained to type int berghofe parents: 12838 diff changeset	841	"op " :: "int => int => int" ("(_ `/ _)")
15129 fbf90acc5bf4 Replaced `div and `mod in consts_code section by div and mod. berghofe parents: 15013 diff changeset	842	"op div" :: "int => int => int" ("(_ div/ _)")
fbf90acc5bf4 Replaced `div and `mod in consts_code section by div and mod. berghofe parents: 15013 diff changeset	843	"op mod" :: "int => int => int" ("(_ mod/ _)")
14378 69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14365 diff changeset	844	"op <" :: "int => int => bool" ("(_ </ _)")
69c4d5997669 generic of_nat and of_int functions, and generalization of iszero paulson parents: 14365 diff changeset	845	"op <=" :: "int => int => bool" ("(_ <=/ _)")
12440 fb5851b71a82 Added code generator setup. berghofe parents: 11468 diff changeset	846	"neg" ("(_ < 0)")
fb5851b71a82 Added code generator setup. berghofe parents: 11468 diff changeset	847
14417 34ffa53db76c Added specific code generator for number_of. berghofe parents: 14390 diff changeset	848	ML {*
34ffa53db76c Added specific code generator for number_of. berghofe parents: 14390 diff changeset	849	fun number_of_codegen thy gr s b (Const ("Numeral.number_of",
34ffa53db76c Added specific code generator for number_of. berghofe parents: 14390 diff changeset	850	Type ("fun", [_, Type ("IntDef.int", [])])) $ bin) =
34ffa53db76c Added specific code generator for number_of. berghofe parents: 14390 diff changeset	851	(Some (gr, Pretty.str (string_of_int (HOLogic.dest_binum bin)))
34ffa53db76c Added specific code generator for number_of. berghofe parents: 14390 diff changeset	852	handle TERM _ => None)
34ffa53db76c Added specific code generator for number_of. berghofe parents: 14390 diff changeset	853	\| number_of_codegen thy gr s b (Const ("Numeral.number_of",
34ffa53db76c Added specific code generator for number_of. berghofe parents: 14390 diff changeset	854	Type ("fun", [_, Type ("nat", [])])) $ bin) =
34ffa53db76c Added specific code generator for number_of. berghofe parents: 14390 diff changeset	855	Some (Codegen.invoke_codegen thy s b (gr,
34ffa53db76c Added specific code generator for number_of. berghofe parents: 14390 diff changeset	856	Const ("IntDef.nat", HOLogic.intT --> HOLogic.natT) $
34ffa53db76c Added specific code generator for number_of. berghofe parents: 14390 diff changeset	857	(Const ("Numeral.number_of", HOLogic.binT --> HOLogic.intT) $ bin)))
34ffa53db76c Added specific code generator for number_of. berghofe parents: 14390 diff changeset	858	\| number_of_codegen _ _ _ _ _ = None;
34ffa53db76c Added specific code generator for number_of. berghofe parents: 14390 diff changeset	859	*}
34ffa53db76c Added specific code generator for number_of. berghofe parents: 14390 diff changeset	860
34ffa53db76c Added specific code generator for number_of. berghofe parents: 14390 diff changeset	861	setup {* [Codegen.add_codegen "number_of_codegen" number_of_codegen] *}
34ffa53db76c Added specific code generator for number_of. berghofe parents: 14390 diff changeset	862
7032 d6efb3b8e669 NatBin: binary arithmetic for the naturals paulson parents: diff changeset	863	end

author	berghofe
	Mon, 16 Aug 2004 12:29:09 +0200
changeset 15129	fbf90acc5bf4
parent 15013	34264f5e4691
child 15131	c69542757a4d
permissions	-rw-r--r--