isabelle: src/HOL/Import/HOL4Compat.thy@f6af6b265d20 (annotated)

14620 1be590fd2422 Minor cleanup of headers and some speedup of the HOL4 import. skalberg parents: 14516 diff changeset	1	(* Title: HOL/Import/HOL4Compat.thy
1be590fd2422 Minor cleanup of headers and some speedup of the HOL4 import. skalberg parents: 14516 diff changeset	2	ID: $Id$
1be590fd2422 Minor cleanup of headers and some speedup of the HOL4 import. skalberg parents: 14516 diff changeset	3	Author: Sebastian Skalberg (TU Muenchen)
1be590fd2422 Minor cleanup of headers and some speedup of the HOL4 import. skalberg parents: 14516 diff changeset	4	*)
1be590fd2422 Minor cleanup of headers and some speedup of the HOL4 import. skalberg parents: 14516 diff changeset	5
14516 a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	6	theory HOL4Compat = HOL4Setup + Divides + Primes + Real:
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	7
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	8	lemma EXISTS_UNIQUE_DEF: "(Ex1 P) = (Ex P & (ALL x y. P x & P y --> (x = y)))"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	9	by auto
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	10
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	11	lemma COND_DEF:"(If b t f) = (@x. ((b = True) --> (x = t)) & ((b = False) --> (x = f)))"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	12	by auto
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	13
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	14	constdefs
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	15	LET :: "['a \<Rightarrow> 'b,'a] \<Rightarrow> 'b"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	16	"LET f s == f s"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	17
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	18	lemma [hol4rew]: "LET f s = Let s f"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	19	by (simp add: LET_def Let_def)
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	20
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	21	lemmas [hol4rew] = ONE_ONE_rew
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	22
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	23	lemma bool_case_DEF: "(bool_case x y b) = (if b then x else y)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	24	by simp;
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	25
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	26	lemma INR_INL_11: "(ALL y x. (Inl x = Inl y) = (x = y)) & (ALL y x. (Inr x = Inr y) = (x = y))"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	27	by safe
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	28
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	29	consts
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	30	ISL :: "'a + 'b => bool"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	31	ISR :: "'a + 'b => bool"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	32
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	33	primrec ISL_def:
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	34	"ISL (Inl x) = True"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	35	"ISL (Inr x) = False"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	36
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	37	primrec ISR_def:
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	38	"ISR (Inl x) = False"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	39	"ISR (Inr x) = True"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	40
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	41	lemma ISL: "(ALL x. ISL (Inl x)) & (ALL y. ~ISL (Inr y))"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	42	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	43
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	44	lemma ISR: "(ALL x. ISR (Inr x)) & (ALL y. ~ISR (Inl y))"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	45	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	46
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	47	consts
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	48	OUTL :: "'a + 'b => 'a"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	49	OUTR :: "'a + 'b => 'b"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	50
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	51	primrec OUTL_def:
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	52	"OUTL (Inl x) = x"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	53
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	54	primrec OUTR_def:
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	55	"OUTR (Inr x) = x"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	56
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	57	lemma OUTL: "OUTL (Inl x) = x"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	58	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	59
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	60	lemma OUTR: "OUTR (Inr x) = x"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	61	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	62
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	63	lemma sum_case_def: "(ALL f g x. sum_case f g (Inl x) = f x) & (ALL f g y. sum_case f g (Inr y) = g y)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	64	by simp;
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	65
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	66	lemma one: "ALL v. v = ()"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	67	by simp;
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	68
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	69	lemma option_case_def: "(!u f. option_case u f None = u) & (!u f x. option_case u f (Some x) = f x)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	70	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	71
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	72	lemma OPTION_MAP_DEF: "(!f x. option_map f (Some x) = Some (f x)) & (!f. option_map f None = None)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	73	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	74
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	75	consts
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	76	IS_SOME :: "'a option => bool"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	77	IS_NONE :: "'a option => bool"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	78
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	79	primrec IS_SOME_def:
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	80	"IS_SOME (Some x) = True"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	81	"IS_SOME None = False"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	82
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	83	primrec IS_NONE_def:
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	84	"IS_NONE (Some x) = False"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	85	"IS_NONE None = True"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	86
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	87	lemma IS_NONE_DEF: "(!x. IS_NONE (Some x) = False) & (IS_NONE None = True)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	88	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	89
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	90	lemma IS_SOME_DEF: "(!x. IS_SOME (Some x) = True) & (IS_SOME None = False)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	91	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	92
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	93	consts
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	94	OPTION_JOIN :: "'a option option => 'a option"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	95
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	96	primrec OPTION_JOIN_def:
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	97	"OPTION_JOIN None = None"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	98	"OPTION_JOIN (Some x) = x"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	99
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	100	lemma OPTION_JOIN_DEF: "(OPTION_JOIN None = None) & (ALL x. OPTION_JOIN (Some x) = x)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	101	by simp;
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	102
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	103	lemma PAIR: "(fst x,snd x) = x"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	104	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	105
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	106	lemma PAIR_MAP: "prod_fun f g p = (f (fst p),g (snd p))"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	107	by (simp add: prod_fun_def split_def)
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	108
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	109	lemma pair_case_def: "split = split"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	110	..;
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	111
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	112	lemma LESS_OR_EQ: "m <= (n::nat) = (m < n \| m = n)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	113	by auto
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	114
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	115	constdefs
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	116	nat_gt :: "nat => nat => bool"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	117	"nat_gt == %m n. n < m"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	118	nat_ge :: "nat => nat => bool"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	119	"nat_ge == %m n. nat_gt m n \| m = n"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	120
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	121	lemma [hol4rew]: "nat_gt m n = (n < m)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	122	by (simp add: nat_gt_def)
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	123
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	124	lemma [hol4rew]: "nat_ge m n = (n <= m)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	125	by (auto simp add: nat_ge_def nat_gt_def)
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	126
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	127	lemma GREATER_DEF: "ALL m n. (n < m) = (n < m)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	128	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	129
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	130	lemma GREATER_OR_EQ: "ALL m n. n <= (m::nat) = (n < m \| m = n)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	131	by auto
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	132
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	133	lemma LESS_DEF: "m < n = (? P. (!n. P (Suc n) --> P n) & P m & ~P n)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	134	proof safe
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	135	assume "m < n"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	136	def P == "%n. n <= m"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	137	have "(!n. P (Suc n) \<longrightarrow> P n) & P m & ~P n"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	138	proof (auto simp add: P_def)
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	139	assume "n <= m"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	140	from prems
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	141	show False
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	142	by auto
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	143	qed
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	144	thus "? P. (!n. P (Suc n) \<longrightarrow> P n) & P m & ~P n"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	145	by auto
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	146	next
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	147	fix P
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	148	assume alln: "!n. P (Suc n) \<longrightarrow> P n"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	149	assume pm: "P m"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	150	assume npn: "~P n"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	151	have "!k q. q + k = m \<longrightarrow> P q"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	152	proof
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	153	fix k
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	154	show "!q. q + k = m \<longrightarrow> P q"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	155	proof (induct k,simp_all)
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	156	show "P m" .
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	157	next
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	158	fix k
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	159	assume ind: "!q. q + k = m \<longrightarrow> P q"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	160	show "!q. Suc (q + k) = m \<longrightarrow> P q"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	161	proof (rule+)
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	162	fix q
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	163	assume "Suc (q + k) = m"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	164	hence "(Suc q) + k = m"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	165	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	166	with ind
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	167	have psq: "P (Suc q)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	168	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	169	from alln
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	170	have "P (Suc q) --> P q"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	171	..
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	172	with psq
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	173	show "P q"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	174	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	175	qed
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	176	qed
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	177	qed
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	178	hence "!q. q + (m - n) = m \<longrightarrow> P q"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	179	..
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	180	hence hehe: "n + (m - n) = m \<longrightarrow> P n"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	181	..
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	182	show "m < n"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	183	proof (rule classical)
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	184	assume "~(m<n)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	185	hence "n <= m"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	186	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	187	with hehe
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	188	have "P n"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	189	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	190	with npn
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	191	show "m < n"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	192	..
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	193	qed
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	194	qed;
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	195
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	196	constdefs
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	197	FUNPOW :: "('a => 'a) => nat => 'a => 'a"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	198	"FUNPOW f n == f ^ n"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	199
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	200	lemma FUNPOW: "(ALL f x. (f ^ 0) x = x) &
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	201	(ALL f n x. (f ^ Suc n) x = (f ^ n) (f x))"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	202	proof auto
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	203	fix f n x
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	204	have "ALL x. f ((f ^ n) x) = (f ^ n) (f x)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	205	by (induct n,auto)
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	206	thus "f ((f ^ n) x) = (f ^ n) (f x)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	207	..
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	208	qed
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	209
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	210	lemma [hol4rew]: "FUNPOW f n = f ^ n"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	211	by (simp add: FUNPOW_def)
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	212
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	213	lemma ADD: "(!n. (0::nat) + n = n) & (!m n. Suc m + n = Suc (m + n))"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	214	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	215
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	216	lemma MULT: "(!n. (0::nat) * n = 0) & (!m n. Suc m * n = m * n + n)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	217	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	218
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	219	lemma SUB: "(!m. (0::nat) - m = 0) & (!m n. (Suc m) - n = (if m < n then 0 else Suc (m - n)))"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	220	apply simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	221	apply arith
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	222	done
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	223
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	224	lemma MAX_DEF: "max (m::nat) n = (if m < n then n else m)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	225	by (simp add: max_def)
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	226
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	227	lemma MIN_DEF: "min (m::nat) n = (if m < n then m else n)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	228	by (simp add: min_def)
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	229
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	230	lemma DIVISION: "(0::nat) < n --> (!k. (k = k div n * n + k mod n) & k mod n < n)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	231	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	232
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	233	constdefs
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	234	ALT_ZERO :: nat
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	235	"ALT_ZERO == 0"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	236	NUMERAL_BIT1 :: "nat \<Rightarrow> nat"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	237	"NUMERAL_BIT1 n == n + (n + Suc 0)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	238	NUMERAL_BIT2 :: "nat \<Rightarrow> nat"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	239	"NUMERAL_BIT2 n == n + (n + Suc (Suc 0))"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	240	NUMERAL :: "nat \<Rightarrow> nat"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	241	"NUMERAL x == x"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	242
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	243	lemma [hol4rew]: "NUMERAL ALT_ZERO = 0"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	244	by (simp add: ALT_ZERO_def NUMERAL_def)
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	245
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	246	lemma [hol4rew]: "NUMERAL (NUMERAL_BIT1 ALT_ZERO) = 1"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	247	by (simp add: ALT_ZERO_def NUMERAL_BIT1_def NUMERAL_def)
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	248
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	249	lemma [hol4rew]: "NUMERAL (NUMERAL_BIT2 ALT_ZERO) = 2"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	250	by (simp add: ALT_ZERO_def NUMERAL_BIT2_def NUMERAL_def)
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	251
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	252	lemma EXP: "(!m. m ^ 0 = (1::nat)) & (!m n. m ^ Suc n = m * (m::nat) ^ n)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	253	by auto
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	254
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	255	lemma num_case_def: "(!b f. nat_case b f 0 = b) & (!b f n. nat_case b f (Suc n) = f n)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	256	by simp;
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	257
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	258	lemma divides_def: "(a::nat) dvd b = (? q. b = q * a)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	259	by (auto simp add: dvd_def);
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	260
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	261	lemma list_case_def: "(!v f. list_case v f [] = v) & (!v f a0 a1. list_case v f (a0#a1) = f a0 a1)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	262	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	263
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	264	consts
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	265	list_size :: "('a \<Rightarrow> nat) \<Rightarrow> 'a list \<Rightarrow> nat"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	266
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	267	primrec
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	268	"list_size f [] = 0"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	269	"list_size f (a0#a1) = 1 + (f a0 + list_size f a1)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	270
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	271	lemma list_size_def: "(!f. list_size f [] = 0) &
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	272	(!f a0 a1. list_size f (a0#a1) = 1 + (f a0 + list_size f a1))"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	273	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	274
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	275	lemma list_case_cong: "! M M' v f. M = M' & (M' = [] \<longrightarrow> v = v') &
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	276	(!a0 a1. (M' = a0#a1) \<longrightarrow> (f a0 a1 = f' a0 a1)) -->
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	277	(list_case v f M = list_case v' f' M')"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	278	proof clarify
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	279	fix M M' v f
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	280	assume "M' = [] \<longrightarrow> v = v'"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	281	and "!a0 a1. M' = a0 # a1 \<longrightarrow> f a0 a1 = f' a0 a1"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	282	show "list_case v f M' = list_case v' f' M'"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	283	proof (rule List.list.case_cong)
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	284	show "M' = M'"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	285	..
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	286	next
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	287	assume "M' = []"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	288	with prems
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	289	show "v = v'"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	290	by auto
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	291	next
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	292	fix a0 a1
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	293	assume "M' = a0 # a1"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	294	with prems
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	295	show "f a0 a1 = f' a0 a1"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	296	by auto
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	297	qed
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	298	qed
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	299
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	300	lemma list_Axiom: "ALL f0 f1. EX fn. (fn [] = f0) & (ALL a0 a1. fn (a0#a1) = f1 a0 a1 (fn a1))"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	301	proof safe
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	302	fix f0 f1
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	303	def fn == "list_rec f0 f1"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	304	have "fn [] = f0 & (ALL a0 a1. fn (a0 # a1) = f1 a0 a1 (fn a1))"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	305	by (simp add: fn_def)
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	306	thus "EX fn. fn [] = f0 & (ALL a0 a1. fn (a0 # a1) = f1 a0 a1 (fn a1))"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	307	by auto
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	308	qed
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	309
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	310	lemma list_Axiom_old: "EX! fn. (fn [] = x) & (ALL h t. fn (h#t) = f (fn t) h t)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	311	proof safe
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	312	def fn == "list_rec x (%h t r. f r h t)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	313	have "fn [] = x & (ALL h t. fn (h # t) = f (fn t) h t)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	314	by (simp add: fn_def)
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	315	thus "EX fn. fn [] = x & (ALL h t. fn (h # t) = f (fn t) h t)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	316	by auto
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	317	next
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	318	fix fn1 fn2
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	319	assume "ALL h t. fn1 (h # t) = f (fn1 t) h t"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	320	assume "ALL h t. fn2 (h # t) = f (fn2 t) h t"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	321	assume "fn2 [] = fn1 []"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	322	show "fn1 = fn2"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	323	proof
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	324	fix xs
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	325	show "fn1 xs = fn2 xs"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	326	by (induct xs,simp_all add: prems)
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	327	qed
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	328	qed
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	329
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	330	lemma NULL_DEF: "(null [] = True) & (!h t. null (h # t) = False)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	331	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	332
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	333	constdefs
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	334	sum :: "nat list \<Rightarrow> nat"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	335	"sum l == foldr (op +) l 0"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	336
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	337	lemma SUM: "(sum [] = 0) & (!h t. sum (h#t) = h + sum t)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	338	by (simp add: sum_def)
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	339
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	340	lemma APPEND: "(!l. [] @ l = l) & (!l1 l2 h. (h#l1) @ l2 = h# l1 @ l2)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	341	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	342
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	343	lemma FLAT: "(concat [] = []) & (!h t. concat (h#t) = h @ (concat t))"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	344	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	345
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	346	lemma LENGTH: "(length [] = 0) & (!h t. length (h#t) = Suc (length t))"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	347	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	348
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	349	lemma MAP: "(!f. map f [] = []) & (!f h t. map f (h#t) = f h#map f t)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	350	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	351
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	352	lemma MEM: "(!x. x mem [] = False) & (!x h t. x mem (h#t) = ((x = h) \| x mem t))"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	353	by auto
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	354
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	355	lemma FILTER: "(!P. filter P [] = []) & (!P h t.
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	356	filter P (h#t) = (if P h then h#filter P t else filter P t))"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	357	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	358
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	359	lemma REPLICATE: "(ALL x. replicate 0 x = []) &
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	360	(ALL n x. replicate (Suc n) x = x # replicate n x)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	361	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	362
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	363	constdefs
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	364	FOLDR :: "[['a,'b]\<Rightarrow>'b,'b,'a list] \<Rightarrow> 'b"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	365	"FOLDR f e l == foldr f l e"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	366
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	367	lemma [hol4rew]: "FOLDR f e l = foldr f l e"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	368	by (simp add: FOLDR_def)
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	369
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	370	lemma FOLDR: "(!f e. foldr f [] e = e) & (!f e x l. foldr f (x#l) e = f x (foldr f l e))"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	371	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	372
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	373	lemma FOLDL: "(!f e. foldl f e [] = e) & (!f e x l. foldl f e (x#l) = foldl f (f e x) l)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	374	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	375
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	376	lemma EVERY_DEF: "(!P. list_all P [] = True) & (!P h t. list_all P (h#t) = (P h & list_all P t))"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	377	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	378
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	379	consts
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	380	list_exists :: "['a \<Rightarrow> bool,'a list] \<Rightarrow> bool"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	381
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	382	primrec
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	383	list_exists_Nil: "list_exists P Nil = False"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	384	list_exists_Cons: "list_exists P (x#xs) = (if P x then True else list_exists P xs)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	385
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	386	lemma list_exists_DEF: "(!P. list_exists P [] = False) &
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	387	(!P h t. list_exists P (h#t) = (P h \| list_exists P t))"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	388	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	389
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	390	consts
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	391	map2 :: "[['a,'b]\<Rightarrow>'c,'a list,'b list] \<Rightarrow> 'c list"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	392
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	393	primrec
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	394	map2_Nil: "map2 f [] l2 = []"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	395	map2_Cons: "map2 f (x#xs) l2 = f x (hd l2) # map2 f xs (tl l2)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	396
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	397	lemma MAP2: "(!f. map2 f [] [] = []) & (!f h1 t1 h2 t2. map2 f (h1#t1) (h2#t2) = f h1 h2#map2 f t1 t2)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	398	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	399
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	400	lemma list_INDUCT: "\<lbrakk> P [] ; !t. P t \<longrightarrow> (!h. P (h#t)) \<rbrakk> \<Longrightarrow> !l. P l"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	401	proof
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	402	fix l
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	403	assume "P []"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	404	assume allt: "!t. P t \<longrightarrow> (!h. P (h # t))"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	405	show "P l"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	406	proof (induct l)
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	407	show "P []" .
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	408	next
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	409	fix h t
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	410	assume "P t"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	411	with allt
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	412	have "!h. P (h # t)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	413	by auto
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	414	thus "P (h # t)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	415	..
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	416	qed
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	417	qed
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	418
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	419	lemma list_CASES: "(l = []) \| (? t h. l = h#t)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	420	by (induct l,auto)
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	421
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	422	constdefs
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	423	ZIP :: "'a list * 'b list \<Rightarrow> ('a * 'b) list"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	424	"ZIP == %(a,b). zip a b"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	425
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	426	lemma ZIP: "(zip [] [] = []) &
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	427	(!x1 l1 x2 l2. zip (x1#l1) (x2#l2) = (x1,x2)#zip l1 l2)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	428	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	429
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	430	lemma [hol4rew]: "ZIP (a,b) = zip a b"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	431	by (simp add: ZIP_def)
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	432
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	433	consts
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	434	unzip :: "('a * 'b) list \<Rightarrow> 'a list * 'b list"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	435
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	436	primrec
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	437	unzip_Nil: "unzip [] = ([],[])"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	438	unzip_Cons: "unzip (xy#xys) = (let zs = unzip xys in (fst xy # fst zs,snd xy # snd zs))"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	439
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	440	lemma UNZIP: "(unzip [] = ([],[])) &
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	441	(!x l. unzip (x#l) = (fst x#fst (unzip l),snd x#snd (unzip l)))"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	442	by (simp add: Let_def)
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	443
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	444	lemma REVERSE: "(rev [] = []) & (!h t. rev (h#t) = (rev t) @ [h])"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	445	by simp;
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	446
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	447	lemma REAL_SUP_ALLPOS: "\<lbrakk> ALL x. P (x::real) \<longrightarrow> 0 < x ; EX x. P x; EX z. ALL x. P x \<longrightarrow> x < z \<rbrakk> \<Longrightarrow> EX s. ALL y. (EX x. P x & y < x) = (y < s)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	448	proof safe
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	449	fix x z
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	450	assume allx: "ALL x. P x \<longrightarrow> 0 < x"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	451	assume px: "P x"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	452	assume allx': "ALL x. P x \<longrightarrow> x < z"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	453	have "EX s. ALL y. (EX x : Collect P. y < x) = (y < s)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	454	proof (rule posreal_complete)
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	455	show "ALL x : Collect P. 0 < x"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	456	proof safe
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	457	fix x
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	458	assume "P x"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	459	from allx
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	460	have "P x \<longrightarrow> 0 < x"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	461	..
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	462	thus "0 < x"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	463	by (simp add: prems)
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	464	qed
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	465	next
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	466	from px
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	467	show "EX x. x : Collect P"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	468	by auto
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	469	next
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	470	from allx'
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	471	show "EX y. ALL x : Collect P. x < y"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	472	apply simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	473	..
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	474	qed
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	475	thus "EX s. ALL y. (EX x. P x & y < x) = (y < s)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	476	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	477	qed
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	478
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	479	lemma REAL_10: "~((1::real) = 0)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	480	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	481
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	482	lemma REAL_ADD_ASSOC: "(x::real) + (y + z) = x + y + z"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	483	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	484
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	485	lemma REAL_MUL_ASSOC: "(x::real) * (y * z) = x * y * z"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	486	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	487
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	488	lemma REAL_ADD_LINV: "-x + x = (0::real)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	489	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	490
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	491	lemma REAL_MUL_LINV: "x ~= (0::real) ==> inverse x * x = 1"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	492	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	493
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	494	lemma REAL_LT_TOTAL: "((x::real) = y) \| x < y \| y < x"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	495	by auto;
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	496
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	497	lemma [hol4rew]: "real (0::nat) = 0"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	498	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	499
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	500	lemma [hol4rew]: "real (1::nat) = 1"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	501	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	502
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	503	lemma [hol4rew]: "real (2::nat) = 2"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	504	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	505
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	506	lemma real_lte: "((x::real) <= y) = (~(y < x))"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	507	by auto
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	508
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	509	lemma real_of_num: "((0::real) = 0) & (!n. real (Suc n) = real n + 1)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	510	by (simp add: real_of_nat_Suc)
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	511
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	512	lemma abs: "abs (x::real) = (if 0 <= x then x else -x)"
15003 6145dd7538d7 replaced monomorphic abs definitions by abs_if paulson parents: 14620 diff changeset	513	by (simp add: abs_if)
14516 a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	514
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	515	lemma pow: "(!x::real. x ^ 0 = 1) & (!x::real. ALL n. x ^ (Suc n) = x * x ^ n)"
15003 6145dd7538d7 replaced monomorphic abs definitions by abs_if paulson parents: 14620 diff changeset	516	by simp
14516 a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	517
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	518	constdefs
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	519	real_gt :: "real => real => bool"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	520	"real_gt == %x y. y < x"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	521
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	522	lemma [hol4rew]: "real_gt x y = (y < x)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	523	by (simp add: real_gt_def)
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	524
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	525	lemma real_gt: "ALL x (y::real). (y < x) = (y < x)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	526	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	527
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	528	constdefs
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	529	real_ge :: "real => real => bool"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	530	"real_ge x y == y <= x"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	531
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	532	lemma [hol4rew]: "real_ge x y = (y <= x)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	533	by (simp add: real_ge_def)
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	534
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	535	lemma real_ge: "ALL x y. (y <= x) = (y <= x)"
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	536	by simp
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	537
a183dec876ab Added HOL proof importer. skalberg parents: diff changeset	538	end

author	kleing
	Fri, 27 May 2005 01:09:44 +0200
changeset 16095	f6af6b265d20
parent 15003	6145dd7538d7
child 16417	9bc16273c2d4
permissions	-rw-r--r--