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lists.ml
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lists.ml
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(* ========================================================================= *)
(* Theory of lists, plus characters and strings as lists of characters. *)
(* *)
(* John Harrison, University of Cambridge Computer Laboratory *)
(* *)
(* (c) Copyright, University of Cambridge 1998 *)
(* (c) Copyright, John Harrison 1998-2007 *)
(* (c) Copyright, Marco Maggesi 2014 *)
(* ========================================================================= *)
needs "ind_types.ml";;
(* ------------------------------------------------------------------------- *)
(* Standard tactic for list induction using MATCH_MP_TAC list_INDUCT *)
(* ------------------------------------------------------------------------- *)
let LIST_INDUCT_TAC =
let list_INDUCT = prove
(`!P:(A)list->bool. P [] /\ (!h t. P t ==> P (CONS h t)) ==> !l. P l`,
MATCH_ACCEPT_TAC list_INDUCT) in
MATCH_MP_TAC list_INDUCT THEN
CONJ_TAC THENL [ALL_TAC; GEN_TAC THEN GEN_TAC THEN DISCH_TAC];;
(* ------------------------------------------------------------------------- *)
(* Basic definitions. *)
(* ------------------------------------------------------------------------- *)
let HD = new_recursive_definition list_RECURSION
`HD(CONS (h:A) t) = h`;;
let TL = new_recursive_definition list_RECURSION
`TL(CONS (h:A) t) = t`;;
let APPEND = new_recursive_definition list_RECURSION
`(!l:(A)list. APPEND [] l = l) /\
(!h t l. APPEND (CONS h t) l = CONS h (APPEND t l))`;;
let REVERSE = new_recursive_definition list_RECURSION
`(REVERSE [] = []) /\
(REVERSE (CONS (x:A) l) = APPEND (REVERSE l) [x])`;;
let LENGTH = new_recursive_definition list_RECURSION
`(LENGTH [] = 0) /\
(!h:A. !t. LENGTH (CONS h t) = SUC (LENGTH t))`;;
let MAP = new_recursive_definition list_RECURSION
`(!f:A->B. MAP f NIL = NIL) /\
(!f h t. MAP f (CONS h t) = CONS (f h) (MAP f t))`;;
let LAST = new_recursive_definition list_RECURSION
`LAST (CONS (h:A) t) = if t = [] then h else LAST t`;;
let BUTLAST = new_recursive_definition list_RECURSION
`(BUTLAST [] = []) /\
(BUTLAST (CONS h t) = if t = [] then [] else CONS h (BUTLAST t))`;;
let REPLICATE = new_recursive_definition num_RECURSION
`(REPLICATE 0 x = []) /\
(REPLICATE (SUC n) x = CONS x (REPLICATE n x))`;;
let NULL = new_recursive_definition list_RECURSION
`(NULL [] = T) /\
(NULL (CONS h t) = F)`;;
let ALL = new_recursive_definition list_RECURSION
`(ALL P [] = T) /\
(ALL P (CONS h t) <=> P h /\ ALL P t)`;;
let EX = new_recursive_definition list_RECURSION
`(EX P [] = F) /\
(EX P (CONS h t) <=> P h \/ EX P t)`;;
let ITLIST = new_recursive_definition list_RECURSION
`(ITLIST f [] b = b) /\
(ITLIST f (CONS h t) b = f h (ITLIST f t b))`;;
let MEM = new_recursive_definition list_RECURSION
`(MEM x [] <=> F) /\
(MEM x (CONS h t) <=> (x = h) \/ MEM x t)`;;
let ALL2_DEF = new_recursive_definition list_RECURSION
`(ALL2 P [] l2 <=> (l2 = [])) /\
(ALL2 P (CONS h1 t1) l2 <=>
if l2 = [] then F
else P h1 (HD l2) /\ ALL2 P t1 (TL l2))`;;
let ALL2 = prove
(`(ALL2 P [] [] <=> T) /\
(ALL2 P (CONS h1 t1) [] <=> F) /\
(ALL2 P [] (CONS h2 t2) <=> F) /\
(ALL2 P (CONS h1 t1) (CONS h2 t2) <=> P h1 h2 /\ ALL2 P t1 t2)`,
REWRITE_TAC[distinctness "list"; ALL2_DEF; HD; TL]);;
let MAP2_DEF = new_recursive_definition list_RECURSION
`(MAP2 f [] l = []) /\
(MAP2 f (CONS h1 t1) l = CONS (f h1 (HD l)) (MAP2 f t1 (TL l)))`;;
let MAP2 = prove
(`(MAP2 f [] [] = []) /\
(MAP2 f (CONS h1 t1) (CONS h2 t2) = CONS (f h1 h2) (MAP2 f t1 t2))`,
REWRITE_TAC[MAP2_DEF; HD; TL]);;
let EL = new_recursive_definition num_RECURSION
`(EL 0 l = HD l) /\
(EL (SUC n) l = EL n (TL l))`;;
let FILTER = new_recursive_definition list_RECURSION
`(FILTER P [] = []) /\
(FILTER P (CONS h t) = if P h then CONS h (FILTER P t) else FILTER P t)`;;
let ASSOC = new_recursive_definition list_RECURSION
`ASSOC a (CONS h t) = if FST h = a then SND h else ASSOC a t`;;
let ITLIST2_DEF = new_recursive_definition list_RECURSION
`(ITLIST2 f [] l2 b = b) /\
(ITLIST2 f (CONS h1 t1) l2 b = f h1 (HD l2) (ITLIST2 f t1 (TL l2) b))`;;
let ITLIST2 = prove
(`(ITLIST2 f [] [] b = b) /\
(ITLIST2 f (CONS h1 t1) (CONS h2 t2) b = f h1 h2 (ITLIST2 f t1 t2 b))`,
REWRITE_TAC[ITLIST2_DEF; HD; TL]);;
let ZIP_DEF = new_recursive_definition list_RECURSION
`(ZIP [] l2 = []) /\
(ZIP (CONS h1 t1) l2 = CONS (h1,HD l2) (ZIP t1 (TL l2)))`;;
let ZIP = prove
(`(ZIP [] [] = []) /\
(ZIP (CONS h1 t1) (CONS h2 t2) = CONS (h1,h2) (ZIP t1 t2))`,
REWRITE_TAC[ZIP_DEF; HD; TL]);;
let PAIRWISE = new_recursive_definition list_RECURSION
`(PAIRWISE (r:A->A->bool) [] <=> T) /\
(PAIRWISE (r:A->A->bool) (CONS h t) <=> ALL (r h) t /\ PAIRWISE r t)`;;
let list_of_seq = new_recursive_definition num_RECURSION
`list_of_seq (s:num->A) 0 = [] /\
list_of_seq s (SUC n) = APPEND (list_of_seq s n) [s n]`;;
(* ------------------------------------------------------------------------- *)
(* Various trivial theorems. *)
(* ------------------------------------------------------------------------- *)
let NOT_CONS_NIL = prove
(`!(h:A) t. ~(CONS h t = [])`,
REWRITE_TAC[distinctness "list"]);;
let LAST_CLAUSES = prove
(`(LAST [h:A] = h) /\
(LAST (CONS h (CONS k t)) = LAST (CONS k t))`,
REWRITE_TAC[LAST; NOT_CONS_NIL]);;
let APPEND_NIL = prove
(`!l:A list. APPEND l [] = l`,
LIST_INDUCT_TAC THEN ASM_REWRITE_TAC[APPEND]);;
let APPEND_ASSOC = prove
(`!(l:A list) m n. APPEND l (APPEND m n) = APPEND (APPEND l m) n`,
LIST_INDUCT_TAC THEN ASM_REWRITE_TAC[APPEND]);;
let REVERSE_APPEND = prove
(`!(l:A list) m. REVERSE (APPEND l m) = APPEND (REVERSE m) (REVERSE l)`,
LIST_INDUCT_TAC THEN
ASM_REWRITE_TAC[APPEND; REVERSE; APPEND_NIL; APPEND_ASSOC]);;
let REVERSE_REVERSE = prove
(`!l:A list. REVERSE(REVERSE l) = l`,
LIST_INDUCT_TAC THEN ASM_REWRITE_TAC[REVERSE; REVERSE_APPEND; APPEND]);;
let CONS_11 = prove
(`!(h1:A) h2 t1 t2. (CONS h1 t1 = CONS h2 t2) <=> (h1 = h2) /\ (t1 = t2)`,
REWRITE_TAC[injectivity "list"]);;
let list_CASES = prove
(`!l:(A)list. (l = []) \/ ?h t. l = CONS h t`,
LIST_INDUCT_TAC THEN REWRITE_TAC[CONS_11; NOT_CONS_NIL] THEN
MESON_TAC[]);;
let LIST_EQ = prove
(`!l1 l2:A list.
l1 = l2 <=>
LENGTH l1 = LENGTH l2 /\ !n. n < LENGTH l2 ==> EL n l1 = EL n l2`,
REPEAT LIST_INDUCT_TAC THEN
REWRITE_TAC[NOT_CONS_NIL; CONS_11; LENGTH; CONJUNCT1 LT; NOT_SUC] THEN
ASM_REWRITE_TAC[SUC_INJ] THEN
GEN_REWRITE_TAC (RAND_CONV o RAND_CONV)
[MESON[num_CASES] `(!n. P n) <=> P 0 /\ (!n. P(SUC n))`] THEN
REWRITE_TAC[EL; HD; TL; LT_0; LT_SUC; CONJ_ACI]);;
let LENGTH_APPEND = prove
(`!(l:A list) m. LENGTH(APPEND l m) = LENGTH l + LENGTH m`,
LIST_INDUCT_TAC THEN ASM_REWRITE_TAC[APPEND; LENGTH; ADD_CLAUSES]);;
let MAP_APPEND = prove
(`!f:A->B. !l1 l2. MAP f (APPEND l1 l2) = APPEND (MAP f l1) (MAP f l2)`,
GEN_TAC THEN LIST_INDUCT_TAC THEN ASM_REWRITE_TAC[MAP; APPEND]);;
let LENGTH_MAP = prove
(`!l. !f:A->B. LENGTH (MAP f l) = LENGTH l`,
LIST_INDUCT_TAC THEN ASM_REWRITE_TAC[MAP; LENGTH]);;
let LENGTH_EQ_NIL = prove
(`!l:A list. (LENGTH l = 0) <=> (l = [])`,
LIST_INDUCT_TAC THEN REWRITE_TAC[LENGTH; NOT_CONS_NIL; NOT_SUC]);;
let LENGTH_EQ_CONS = prove
(`!l n. (LENGTH l = SUC n) <=> ?h t. (l = CONS h t) /\ (LENGTH t = n)`,
LIST_INDUCT_TAC THEN REWRITE_TAC[LENGTH; NOT_SUC; NOT_CONS_NIL] THEN
ASM_REWRITE_TAC[SUC_INJ; CONS_11] THEN MESON_TAC[]);;
let MAP_o = prove
(`!f:A->B. !g:B->C. !l. MAP (g o f) l = MAP g (MAP f l)`,
GEN_TAC THEN GEN_TAC THEN LIST_INDUCT_TAC THEN
ASM_REWRITE_TAC[MAP; o_THM]);;
let MAP_EQ = prove
(`!f g l. ALL (\x. f x = g x) l ==> (MAP f l = MAP g l)`,
GEN_TAC THEN GEN_TAC THEN LIST_INDUCT_TAC THEN
REWRITE_TAC[MAP; ALL] THEN ASM_MESON_TAC[]);;
let ALL_IMP = prove
(`!P Q l. (!x. MEM x l /\ P x ==> Q x) /\ ALL P l ==> ALL Q l`,
GEN_TAC THEN GEN_TAC THEN LIST_INDUCT_TAC THEN
REWRITE_TAC[MEM; ALL] THEN ASM_MESON_TAC[]);;
let NOT_EX = prove
(`!P l. ~(EX P l) <=> ALL (\x. ~(P x)) l`,
GEN_TAC THEN LIST_INDUCT_TAC THEN
ASM_REWRITE_TAC[EX; ALL; DE_MORGAN_THM]);;
let NOT_ALL = prove
(`!P l. ~(ALL P l) <=> EX (\x. ~(P x)) l`,
GEN_TAC THEN LIST_INDUCT_TAC THEN
ASM_REWRITE_TAC[EX; ALL; DE_MORGAN_THM]);;
let ALL_MAP = prove
(`!P f l. ALL P (MAP f l) <=> ALL (P o f) l`,
GEN_TAC THEN GEN_TAC THEN LIST_INDUCT_TAC THEN
ASM_REWRITE_TAC[ALL; MAP; o_THM]);;
let ALL_T = prove
(`!l. ALL (\x. T) l`,
LIST_INDUCT_TAC THEN ASM_REWRITE_TAC[ALL]);;
let MAP_EQ_ALL2 = prove
(`!l m. ALL2 (\x y. f x = f y) l m ==> (MAP f l = MAP f m)`,
REPEAT LIST_INDUCT_TAC THEN ASM_REWRITE_TAC[MAP; ALL2; CONS_11] THEN
ASM_MESON_TAC[]);;
let ALL2_MAP = prove
(`!P f l. ALL2 P (MAP f l) l <=> ALL (\a. P (f a) a) l`,
GEN_TAC THEN GEN_TAC THEN
LIST_INDUCT_TAC THEN ASM_REWRITE_TAC[ALL2; MAP; ALL]);;
let MAP_EQ_DEGEN = prove
(`!l f. ALL (\x. f(x) = x) l ==> (MAP f l = l)`,
LIST_INDUCT_TAC THEN REWRITE_TAC[ALL; MAP; CONS_11] THEN
REPEAT STRIP_TAC THEN ASM_REWRITE_TAC[] THEN
FIRST_ASSUM MATCH_MP_TAC THEN ASM_REWRITE_TAC[]);;
let ALL2_AND_RIGHT = prove
(`!l m P Q. ALL2 (\x y. P x /\ Q x y) l m <=> ALL P l /\ ALL2 Q l m`,
LIST_INDUCT_TAC THEN ASM_REWRITE_TAC[ALL; ALL2] THEN
LIST_INDUCT_TAC THEN ASM_REWRITE_TAC[ALL; ALL2] THEN
REWRITE_TAC[CONJ_ACI]);;
let ITLIST_APPEND = prove
(`!f a l1 l2. ITLIST f (APPEND l1 l2) a = ITLIST f l1 (ITLIST f l2 a)`,
GEN_TAC THEN GEN_TAC THEN LIST_INDUCT_TAC THEN
ASM_REWRITE_TAC[ITLIST; APPEND]);;
let ITLIST_EXTRA = prove
(`!l. ITLIST f (APPEND l [a]) b = ITLIST f l (f a b)`,
REWRITE_TAC[ITLIST_APPEND; ITLIST]);;
let ALL_MP = prove
(`!P Q l. ALL (\x. P x ==> Q x) l /\ ALL P l ==> ALL Q l`,
GEN_TAC THEN GEN_TAC THEN LIST_INDUCT_TAC THEN
REWRITE_TAC[ALL] THEN ASM_MESON_TAC[]);;
let AND_ALL = prove
(`!l. ALL P l /\ ALL Q l <=> ALL (\x. P x /\ Q x) l`,
CONV_TAC(ONCE_DEPTH_CONV SYM_CONV) THEN
LIST_INDUCT_TAC THEN ASM_REWRITE_TAC[ALL; CONJ_ACI]);;
let EX_IMP = prove
(`!P Q l. (!x. MEM x l /\ P x ==> Q x) /\ EX P l ==> EX Q l`,
GEN_TAC THEN GEN_TAC THEN LIST_INDUCT_TAC THEN
REWRITE_TAC[MEM; EX] THEN ASM_MESON_TAC[]);;
let ALL_MEM = prove
(`!P l. (!x. MEM x l ==> P x) <=> ALL P l`,
GEN_TAC THEN LIST_INDUCT_TAC THEN REWRITE_TAC[ALL; MEM] THEN
ASM_MESON_TAC[]);;
let LENGTH_REPLICATE = prove
(`!n x. LENGTH(REPLICATE n x) = n`,
INDUCT_TAC THEN ASM_REWRITE_TAC[LENGTH; REPLICATE]);;
let MEM_REPLICATE = prove
(`!n x y:A. MEM x (REPLICATE n y) <=> x = y /\ ~(n = 0)`,
INDUCT_TAC THEN ASM_REWRITE_TAC[MEM; REPLICATE; NOT_SUC] THEN
MESON_TAC[]);;
let EX_MAP = prove
(`!P f l. EX P (MAP f l) <=> EX (P o f) l`,
GEN_TAC THEN GEN_TAC THEN
LIST_INDUCT_TAC THEN ASM_REWRITE_TAC[MAP; EX; o_THM]);;
let EXISTS_EX = prove
(`!P l. (?x. EX (P x) l) <=> EX (\s. ?x. P x s) l`,
GEN_TAC THEN LIST_INDUCT_TAC THEN ASM_REWRITE_TAC[EX] THEN
ASM_MESON_TAC[]);;
let FORALL_ALL = prove
(`!P l. (!x. ALL (P x) l) <=> ALL (\s. !x. P x s) l`,
GEN_TAC THEN LIST_INDUCT_TAC THEN ASM_REWRITE_TAC[ALL] THEN
ASM_MESON_TAC[]);;
let MEM_APPEND = prove
(`!x l1 l2. MEM x (APPEND l1 l2) <=> MEM x l1 \/ MEM x l2`,
GEN_TAC THEN LIST_INDUCT_TAC THEN ASM_REWRITE_TAC[MEM; APPEND; DISJ_ACI]);;
let MEM_MAP = prove
(`!f y l. MEM y (MAP f l) <=> ?x. MEM x l /\ (y = f x)`,
GEN_TAC THEN GEN_TAC THEN LIST_INDUCT_TAC THEN
ASM_REWRITE_TAC[MEM; MAP] THEN MESON_TAC[]);;
let FILTER_APPEND = prove
(`!P l1 l2. FILTER P (APPEND l1 l2) = APPEND (FILTER P l1) (FILTER P l2)`,
GEN_TAC THEN LIST_INDUCT_TAC THEN ASM_REWRITE_TAC[FILTER; APPEND] THEN
GEN_TAC THEN COND_CASES_TAC THEN ASM_REWRITE_TAC[APPEND]);;
let FILTER_MAP = prove
(`!P f l. FILTER P (MAP f l) = MAP f (FILTER (P o f) l)`,
GEN_TAC THEN GEN_TAC THEN LIST_INDUCT_TAC THEN
ASM_REWRITE_TAC[MAP; FILTER; o_THM] THEN COND_CASES_TAC THEN
REWRITE_TAC[MAP]);;
let MEM_FILTER = prove
(`!P l x. MEM x (FILTER P l) <=> P x /\ MEM x l`,
GEN_TAC THEN LIST_INDUCT_TAC THEN ASM_REWRITE_TAC[MEM; FILTER] THEN
GEN_TAC THEN COND_CASES_TAC THEN ASM_REWRITE_TAC[MEM] THEN
ASM_MESON_TAC[]);;
let EX_MEM = prove
(`!P l. (?x. P x /\ MEM x l) <=> EX P l`,
GEN_TAC THEN LIST_INDUCT_TAC THEN ASM_REWRITE_TAC[EX; MEM] THEN
ASM_MESON_TAC[]);;
let MAP_FST_ZIP = prove
(`!l1 l2. (LENGTH l1 = LENGTH l2) ==> (MAP FST (ZIP l1 l2) = l1)`,
LIST_INDUCT_TAC THEN LIST_INDUCT_TAC THEN
ASM_SIMP_TAC[LENGTH; SUC_INJ; MAP; FST; ZIP; NOT_SUC]);;
let MAP_SND_ZIP = prove
(`!l1 l2. (LENGTH l1 = LENGTH l2) ==> (MAP SND (ZIP l1 l2) = l2)`,
LIST_INDUCT_TAC THEN LIST_INDUCT_TAC THEN
ASM_SIMP_TAC[LENGTH; SUC_INJ; MAP; FST; ZIP; NOT_SUC]);;
let LENGTH_ZIP = prove
(`!l1 l2. LENGTH l1 = LENGTH l2 ==> LENGTH(ZIP l1 l2) = LENGTH l2`,
REPEAT(LIST_INDUCT_TAC ORELSE GEN_TAC) THEN
ASM_SIMP_TAC[LENGTH; NOT_SUC; ZIP; SUC_INJ]);;
let MEM_ASSOC = prove
(`!l x. MEM (x,ASSOC x l) l <=> MEM x (MAP FST l)`,
LIST_INDUCT_TAC THEN ASM_REWRITE_TAC[MEM; MAP; ASSOC] THEN
GEN_TAC THEN COND_CASES_TAC THEN ASM_REWRITE_TAC[] THEN
ASM_MESON_TAC[PAIR; FST]);;
let ALL_APPEND = prove
(`!P l1 l2. ALL P (APPEND l1 l2) <=> ALL P l1 /\ ALL P l2`,
GEN_TAC THEN LIST_INDUCT_TAC THEN
ASM_REWRITE_TAC[ALL; APPEND; GSYM CONJ_ASSOC]);;
let MEM_EL = prove
(`!l n. n < LENGTH l ==> MEM (EL n l) l`,
LIST_INDUCT_TAC THEN REWRITE_TAC[MEM; CONJUNCT1 LT; LENGTH] THEN
INDUCT_TAC THEN ASM_SIMP_TAC[EL; HD; LT_SUC; TL]);;
let MEM_EXISTS_EL = prove
(`!l x. MEM x l <=> ?i. i < LENGTH l /\ x = EL i l`,
LIST_INDUCT_TAC THEN ASM_REWRITE_TAC[LENGTH; EL; MEM; CONJUNCT1 LT] THEN
GEN_TAC THEN GEN_REWRITE_TAC RAND_CONV
[MESON[num_CASES] `(?i. P i) <=> P 0 \/ (?i. P(SUC i))`] THEN
REWRITE_TAC[LT_SUC; LT_0; EL; HD; TL]);;
let ALL_EL = prove
(`!P l. (!i. i < LENGTH l ==> P (EL i l)) <=> ALL P l`,
REWRITE_TAC[GSYM ALL_MEM; MEM_EXISTS_EL] THEN MESON_TAC[]);;
let ALL2_MAP2 = prove
(`!l m. ALL2 P (MAP f l) (MAP g m) = ALL2 (\x y. P (f x) (g y)) l m`,
LIST_INDUCT_TAC THEN LIST_INDUCT_TAC THEN ASM_REWRITE_TAC[ALL2; MAP]);;
let AND_ALL2 = prove
(`!P Q l m. ALL2 P l m /\ ALL2 Q l m <=> ALL2 (\x y. P x y /\ Q x y) l m`,
GEN_TAC THEN GEN_TAC THEN CONV_TAC(ONCE_DEPTH_CONV SYM_CONV) THEN
LIST_INDUCT_TAC THEN LIST_INDUCT_TAC THEN ASM_REWRITE_TAC[ALL2] THEN
REWRITE_TAC[CONJ_ACI]);;
let ALL2_ALL = prove
(`!P l. ALL2 P l l <=> ALL (\x. P x x) l`,
GEN_TAC THEN LIST_INDUCT_TAC THEN
ASM_REWRITE_TAC[ALL2; ALL]);;
let APPEND_EQ_NIL = prove
(`!l m. (APPEND l m = []) <=> (l = []) /\ (m = [])`,
REWRITE_TAC[GSYM LENGTH_EQ_NIL; LENGTH_APPEND; ADD_EQ_0]);;
let APPEND_LCANCEL = prove
(`!l1 l2 l3:A list. APPEND l1 l2 = APPEND l1 l3 <=> l2 = l3`,
LIST_INDUCT_TAC THEN ASM_REWRITE_TAC[APPEND; CONS_11]);;
let APPEND_RCANCEL = prove
(`!l1 l2 l3:A list. APPEND l1 l3 = APPEND l2 l3 <=> l1 = l2`,
ONCE_REWRITE_TAC[MESON[REVERSE_REVERSE]
`l = l' <=> REVERSE l = REVERSE l'`] THEN
REWRITE_TAC[REVERSE_APPEND; APPEND_LCANCEL]);;
let LENGTH_MAP2 = prove
(`!f l m. (LENGTH l = LENGTH m) ==> (LENGTH(MAP2 f l m) = LENGTH m)`,
GEN_TAC THEN LIST_INDUCT_TAC THEN LIST_INDUCT_TAC THEN
ASM_SIMP_TAC[LENGTH; NOT_CONS_NIL; NOT_SUC; MAP2; SUC_INJ]);;
let MAP_EQ_NIL = prove
(`!f l. MAP f l = [] <=> l = []`,
GEN_TAC THEN LIST_INDUCT_TAC THEN REWRITE_TAC[MAP; NOT_CONS_NIL]);;
let INJECTIVE_MAP = prove
(`!f:A->B. (!l m. MAP f l = MAP f m ==> l = m) <=>
(!x y. f x = f y ==> x = y)`,
GEN_TAC THEN EQ_TAC THEN DISCH_TAC THENL
[MAP_EVERY X_GEN_TAC [`x:A`; `y:A`] THEN DISCH_TAC THEN
FIRST_X_ASSUM(MP_TAC o SPECL [`[x:A]`; `[y:A]`]) THEN
ASM_REWRITE_TAC[MAP; CONS_11];
REPEAT LIST_INDUCT_TAC THEN ASM_SIMP_TAC[MAP; NOT_CONS_NIL; CONS_11] THEN
ASM_MESON_TAC[]]);;
let SURJECTIVE_MAP = prove
(`!f:A->B. (!m. ?l. MAP f l = m) <=> (!y. ?x. f x = y)`,
GEN_TAC THEN EQ_TAC THEN DISCH_TAC THENL
[X_GEN_TAC `y:B` THEN FIRST_X_ASSUM(MP_TAC o SPEC `[y:B]`) THEN
REWRITE_TAC[LEFT_IMP_EXISTS_THM] THEN
LIST_INDUCT_TAC THEN REWRITE_TAC[MAP; CONS_11; NOT_CONS_NIL; MAP_EQ_NIL];
MATCH_MP_TAC list_INDUCT] THEN
ASM_MESON_TAC[MAP]);;
let MAP_ID = prove
(`!l. MAP (\x. x) l = l`,
LIST_INDUCT_TAC THEN ASM_REWRITE_TAC[MAP]);;
let MAP_I = prove
(`MAP I = I`,
REWRITE_TAC[FUN_EQ_THM; I_DEF; MAP_ID]);;
let BUTLAST_APPEND = prove
(`!l m:A list. BUTLAST(APPEND l m) =
if m = [] then BUTLAST l else APPEND l (BUTLAST m)`,
SIMP_TAC[COND_RAND; APPEND_NIL; MESON[]
`(if p then T else q) <=> ~p ==> q`] THEN
LIST_INDUCT_TAC THEN ASM_SIMP_TAC[APPEND; BUTLAST; APPEND_EQ_NIL]);;
let APPEND_BUTLAST_LAST = prove
(`!l. ~(l = []) ==> APPEND (BUTLAST l) [LAST l] = l`,
LIST_INDUCT_TAC THEN REWRITE_TAC[LAST; BUTLAST; NOT_CONS_NIL] THEN
COND_CASES_TAC THEN ASM_SIMP_TAC[APPEND]);;
let LAST_APPEND = prove
(`!p q. LAST(APPEND p q) = if q = [] then LAST p else LAST q`,
LIST_INDUCT_TAC THEN ASM_REWRITE_TAC[APPEND; LAST; APPEND_EQ_NIL] THEN
MESON_TAC[]);;
let LENGTH_TL = prove
(`!l. ~(l = []) ==> LENGTH(TL l) = LENGTH l - 1`,
LIST_INDUCT_TAC THEN REWRITE_TAC[LENGTH; TL; ARITH; SUC_SUB1]);;
let EL_APPEND = prove
(`!k l m. EL k (APPEND l m) = if k < LENGTH l then EL k l
else EL (k - LENGTH l) m`,
INDUCT_TAC THEN REWRITE_TAC[EL] THEN
LIST_INDUCT_TAC THEN
REWRITE_TAC[HD; APPEND; LENGTH; SUB_0; EL; LT_0; CONJUNCT1 LT] THEN
ASM_REWRITE_TAC[TL; LT_SUC; SUB_SUC]);;
let EL_TL = prove
(`!n. EL n (TL l) = EL (n + 1) l`,
REWRITE_TAC[GSYM ADD1; EL]);;
let EL_CONS = prove
(`!n h t. EL n (CONS h t) = if n = 0 then h else EL (n - 1) t`,
INDUCT_TAC THEN REWRITE_TAC[EL; HD; TL; NOT_SUC; SUC_SUB1]);;
let LAST_EL = prove
(`!l. ~(l = []) ==> LAST l = EL (LENGTH l - 1) l`,
LIST_INDUCT_TAC THEN REWRITE_TAC[LAST; LENGTH; SUC_SUB1] THEN
DISCH_TAC THEN COND_CASES_TAC THEN
ASM_SIMP_TAC[LENGTH; EL; HD; EL_CONS; LENGTH_EQ_NIL]);;
let HD_APPEND = prove
(`!l m:A list. HD(APPEND l m) = if l = [] then HD m else HD l`,
LIST_INDUCT_TAC THEN REWRITE_TAC[HD; APPEND; NOT_CONS_NIL]);;
let CONS_HD_TL = prove
(`!l. ~(l = []) ==> l = CONS (HD l) (TL l)`,
LIST_INDUCT_TAC THEN REWRITE_TAC[NOT_CONS_NIL;HD;TL]);;
let EL_MAP = prove
(`!f n l. n < LENGTH l ==> EL n (MAP f l) = f(EL n l)`,
GEN_TAC THEN INDUCT_TAC THEN LIST_INDUCT_TAC THEN
ASM_REWRITE_TAC[LENGTH; CONJUNCT1 LT; LT_0; EL; HD; TL; MAP; LT_SUC]);;
let MAP_REVERSE = prove
(`!f l. REVERSE(MAP f l) = MAP f (REVERSE l)`,
GEN_TAC THEN LIST_INDUCT_TAC THEN
ASM_REWRITE_TAC[MAP; REVERSE; MAP_APPEND]);;
let ALL_FILTER = prove
(`!P Q l:A list. ALL P (FILTER Q l) <=> ALL (\x. Q x ==> P x) l`,
GEN_TAC THEN GEN_TAC THEN
LIST_INDUCT_TAC THEN REWRITE_TAC[ALL; FILTER] THEN
COND_CASES_TAC THEN ASM_REWRITE_TAC[ALL]);;
let APPEND_SING = prove
(`!h t. APPEND [h] t = CONS h t`,
REWRITE_TAC[APPEND]);;
let MEM_APPEND_DECOMPOSE_LEFT = prove
(`!x:A l. MEM x l <=> ?l1 l2. ~(MEM x l1) /\ l = APPEND l1 (CONS x l2)`,
REWRITE_TAC[TAUT `(p <=> q) <=> (p ==> q) /\ (q ==> p)`] THEN
SIMP_TAC[LEFT_IMP_EXISTS_THM; MEM_APPEND; MEM] THEN X_GEN_TAC `x:A` THEN
MATCH_MP_TAC list_INDUCT THEN REWRITE_TAC[MEM] THEN
MAP_EVERY X_GEN_TAC [`y:A`; `l:A list`] THEN
ASM_CASES_TAC `x:A = y` THEN ASM_MESON_TAC[MEM; APPEND]);;
let MEM_APPEND_DECOMPOSE = prove
(`!x:A l. MEM x l <=> ?l1 l2. l = APPEND l1 (CONS x l2)`,
REWRITE_TAC[TAUT `(p <=> q) <=> (p ==> q) /\ (q ==> p)`] THEN
SIMP_TAC[LEFT_IMP_EXISTS_THM; MEM_APPEND; MEM] THEN
ONCE_REWRITE_TAC[MEM_APPEND_DECOMPOSE_LEFT] THEN MESON_TAC[]);;
let PAIRWISE_APPEND = prove
(`!R:A->A->bool l m.
PAIRWISE R (APPEND l m) <=>
PAIRWISE R l /\ PAIRWISE R m /\ (!x y. MEM x l /\ MEM y m ==> R x y)`,
GEN_TAC THEN MATCH_MP_TAC list_INDUCT THEN
REWRITE_TAC[APPEND; PAIRWISE; MEM; ALL_APPEND; GSYM ALL_MEM] THEN
MESON_TAC[]);;
let PAIRWISE_MAP = prove
(`!R f:A->B l.
PAIRWISE R (MAP f l) <=> PAIRWISE (\x y. R (f x) (f y)) l`,
GEN_TAC THEN GEN_TAC THEN
LIST_INDUCT_TAC THEN ASM_REWRITE_TAC[PAIRWISE; MAP; ALL_MAP; o_DEF]);;
let PAIRWISE_IMPLIES = prove
(`!R:A->A->bool R' l.
PAIRWISE R l /\ (!x y. MEM x l /\ MEM y l /\ R x y ==> R' x y)
==> PAIRWISE R' l`,
GEN_TAC THEN GEN_TAC THEN MATCH_MP_TAC list_INDUCT THEN
REWRITE_TAC[PAIRWISE; GSYM ALL_MEM; MEM] THEN MESON_TAC[]);;
let PAIRWISE_TRANSITIVE = prove
(`!R x y:A l.
(!x y z. R x y /\ R y z ==> R x z)
==> (PAIRWISE R (CONS x (CONS y l)) <=> R x y /\ PAIRWISE R (CONS y l))`,
REPEAT STRIP_TAC THEN
REWRITE_TAC[PAIRWISE; ALL; GSYM CONJ_ASSOC;
TAUT `(p /\ q /\ r /\ s <=> p /\ r /\ s) <=>
p /\ s ==> r ==> q`] THEN
STRIP_TAC THEN MATCH_MP_TAC(REWRITE_RULE[IMP_CONJ] ALL_IMP) THEN
ASM_MESON_TAC[]);;
let LENGTH_LIST_OF_SEQ = prove
(`!s:num->A n. LENGTH(list_of_seq s n) = n`,
GEN_TAC THEN INDUCT_TAC THEN
ASM_REWRITE_TAC[list_of_seq; LENGTH; LENGTH_APPEND; ADD_CLAUSES]);;
let EL_LIST_OF_SEQ = prove
(`!s:num->A m n. m < n ==> EL m (list_of_seq s n) = s m`,
GEN_TAC THEN ONCE_REWRITE_TAC[SWAP_FORALL_THM] THEN
INDUCT_TAC THEN
REWRITE_TAC[list_of_seq; LT; EL_APPEND; LENGTH_LIST_OF_SEQ] THEN
REPEAT STRIP_TAC THEN ASM_SIMP_TAC[SUB_REFL; EL; HD; LT_REFL]);;
let LIST_OF_SEQ_EQ_NIL = prove
(`!s:num->A n. list_of_seq s n = [] <=> n = 0`,
REWRITE_TAC[GSYM LENGTH_EQ_NIL; LENGTH_LIST_OF_SEQ; LENGTH]);;
(* ------------------------------------------------------------------------- *)
(* Syntax. *)
(* ------------------------------------------------------------------------- *)
let mk_cons h t =
try let cons = mk_const("CONS",[type_of h,aty]) in
mk_comb(mk_comb(cons,h),t)
with Failure _ -> failwith "mk_cons";;
let mk_list (tms,ty) =
try let nil = mk_const("NIL",[ty,aty]) in
if tms = [] then nil else
let cons = mk_const("CONS",[ty,aty]) in
itlist (mk_binop cons) tms nil
with Failure _ -> failwith "mk_list";;
let mk_flist tms =
try mk_list(tms,type_of(hd tms))
with Failure _ -> failwith "mk_flist";;
(* ------------------------------------------------------------------------- *)
(* Extra monotonicity theorems for inductive definitions. *)
(* ------------------------------------------------------------------------- *)
let MONO_ALL = prove
(`(!x:A. P x ==> Q x) ==> ALL P l ==> ALL Q l`,
DISCH_TAC THEN SPEC_TAC(`l:A list`,`l:A list`) THEN
LIST_INDUCT_TAC THEN ASM_REWRITE_TAC[ALL] THEN ASM_MESON_TAC[]);;
let MONO_ALL2 = prove
(`(!x y. (P:A->B->bool) x y ==> Q x y) ==> ALL2 P l l' ==> ALL2 Q l l'`,
DISCH_TAC THEN
SPEC_TAC(`l':B list`,`l':B list`) THEN SPEC_TAC(`l:A list`,`l:A list`) THEN
LIST_INDUCT_TAC THEN REWRITE_TAC[ALL2_DEF] THEN
GEN_TAC THEN COND_CASES_TAC THEN REWRITE_TAC[] THEN ASM_MESON_TAC[]);;
monotonicity_theorems := [MONO_ALL; MONO_ALL2] @ !monotonicity_theorems;;
(* ------------------------------------------------------------------------- *)
(* Apply a conversion down a list. *)
(* ------------------------------------------------------------------------- *)
let rec LIST_CONV conv tm =
if is_cons tm then
COMB2_CONV (RAND_CONV conv) (LIST_CONV conv) tm
else if fst(dest_const tm) = "NIL" then REFL tm
else failwith "LIST_CONV";;
(* ------------------------------------------------------------------------- *)
(* Type of characters, like the HOL88 "ascii" type, with syntax *)
(* constructors and equality conversions for chars and strings. *)
(* ------------------------------------------------------------------------- *)
let char_INDUCT,char_RECURSION = define_type
"char = ASCII bool bool bool bool bool bool bool bool";;
new_type_abbrev("string",`:char list`);;
let dest_char,mk_char,dest_string,mk_string,CHAR_EQ_CONV,STRING_EQ_CONV =
let bool_of_term t =
match t with
Const("T",_) -> true
| Const("F",_) -> false
| _ -> failwith "bool_of_term" in
let code_of_term t =
let f,tms = strip_comb t in
if not(is_const f && fst(dest_const f) = "ASCII")
|| not(length tms = 8) then failwith "code_of_term"
else
itlist (fun b f -> if b then 1 + 2 * f else 2 * f)
(map bool_of_term (rev tms)) 0 in
let char_of_term = Char.chr o code_of_term in
let dest_string tm =
try let tms = dest_list tm in
if fst(dest_type(hd(snd(dest_type(type_of tm))))) <> "char"
then fail() else
let ccs = map (String.make 1 o char_of_term) tms in
String.escaped (implode ccs)
with Failure _ -> failwith "dest_string" in
let mk_bool b =
let true_tm,false_tm = `T`,`F` in
if b then true_tm else false_tm in
let mk_code =
let ascii_tm = `ASCII` in
let mk_code c =
let lis = map (fun i -> mk_bool((c / (1 lsl i)) mod 2 = 1)) (0--7) in
itlist (fun x y -> mk_comb(y,x)) lis ascii_tm in
let codes = Array.map mk_code (Array.of_list (0--255)) in
fun c -> Array.get codes c in
let mk_char = mk_code o Char.code in
let mk_string s =
let ns = map (fun i -> Char.code(String.get s i))
(0--(String.length s - 1)) in
mk_list(map mk_code ns,`:char`) in
let CHAR_DISTINCTNESS =
let avars,bvars,cvars =
[`a0:bool`;`a1:bool`;`a2:bool`;`a3:bool`;`a4:bool`;`a5:bool`;`a6:bool`],
[`b1:bool`;`b2:bool`;`b3:bool`;`b4:bool`;`b5:bool`;`b6:bool`;`b7:bool`],
[`c1:bool`;`c2:bool`;`c3:bool`;`c4:bool`;`c5:bool`;`c6:bool`;`c7:bool`] in
let ASCII_NEQS_FT = (map EQF_INTRO o CONJUNCTS o prove)
(`~(ASCII F b1 b2 b3 b4 b5 b6 b7 = ASCII T c1 c2 c3 c4 c5 c6 c7) /\
~(ASCII a0 F b2 b3 b4 b5 b6 b7 = ASCII a0 T c2 c3 c4 c5 c6 c7) /\
~(ASCII a0 a1 F b3 b4 b5 b6 b7 = ASCII a0 a1 T c3 c4 c5 c6 c7) /\
~(ASCII a0 a1 a2 F b4 b5 b6 b7 = ASCII a0 a1 a2 T c4 c5 c6 c7) /\
~(ASCII a0 a1 a2 a3 F b5 b6 b7 = ASCII a0 a1 a2 a3 T c5 c6 c7) /\
~(ASCII a0 a1 a2 a3 a4 F b6 b7 = ASCII a0 a1 a2 a3 a4 T c6 c7) /\
~(ASCII a0 a1 a2 a3 a4 a5 F b7 = ASCII a0 a1 a2 a3 a4 a5 T c7) /\
~(ASCII a0 a1 a2 a3 a4 a5 a6 F = ASCII a0 a1 a2 a3 a4 a5 a6 T)`,
REWRITE_TAC[injectivity "char"]) in
let ASCII_NEQS_TF =
let ilist = zip bvars cvars @ zip cvars bvars in
let f = EQF_INTRO o INST ilist o GSYM o EQF_ELIM in
map f ASCII_NEQS_FT in
let rec prefix n l =
if n = 0 then [] else
match l with
h::t -> h :: prefix (n-1) t
| _ -> l in
let rec findneq n prefix a b =
match a,b with
b1::a, b2::b -> if b1 <> b2 then n,rev prefix,bool_of_term b2,a,b else
findneq (n+1) (b1 :: prefix) a b
| _, _ -> fail() in
fun c1 c2 ->
let _,a = strip_comb c1
and _,b = strip_comb c2 in
let n,p,b,s1,s2 = findneq 0 [] a b in
let ss1 = funpow n tl bvars
and ss2 = funpow n tl cvars in
let pp = prefix n avars in
let pth = if b then ASCII_NEQS_FT else ASCII_NEQS_TF in
INST (zip p pp @ zip s1 ss1 @ zip s2 ss2) (el n pth) in
let STRING_DISTINCTNESS =
let xtm,xstm = `x:char`,`xs:string`
and ytm,ystm = `y:char`,`ys:string`
and niltm = `[]:string` in
let NIL_EQ_THM = EQT_INTRO (REFL niltm)
and CONS_EQ_THM,CONS_NEQ_THM = (CONJ_PAIR o prove)
(`(CONS x xs:string = CONS x ys <=> xs = ys) /\
((x = y <=> F) ==> (CONS x xs:string = CONS y ys <=> F))`,
REWRITE_TAC[CONS_11] THEN MESON_TAC[])
and NIL_NEQ_CONS,CONS_NEQ_NIL = (CONJ_PAIR o prove)
(`(NIL:string = CONS x xs <=> F) /\
(CONS x xs:string = NIL <=> F)`,
REWRITE_TAC[NOT_CONS_NIL]) in
let rec STRING_DISTINCTNESS s1 s2 =
if s1 = niltm
then if s2 = niltm then NIL_EQ_THM
else let c2,s2 = rand (rator s2),rand s2 in
INST [c2,xtm;s2,xstm] NIL_NEQ_CONS
else let c1,s1 = rand (rator s1),rand s1 in
if s2 = niltm then INST [c1,xtm;s1,xstm] CONS_NEQ_NIL
else let c2,s2 = rand (rator s2),rand s2 in
if c1 = c2
then let th1 = INST [c1,xtm; s1,xstm; s2,ystm] CONS_EQ_THM
and th2 = STRING_DISTINCTNESS s1 s2 in
TRANS th1 th2
else let ilist = [c1,xtm; c2,ytm; s1,xstm; s2,ystm] in
let itm = INST ilist CONS_NEQ_THM in
MP itm (CHAR_DISTINCTNESS c1 c2) in
STRING_DISTINCTNESS in
let CHAR_EQ_CONV : conv =
fun tm ->
let c1,c2 = dest_eq tm in
if compare c1 c2 = 0 then EQT_INTRO (REFL c1) else
CHAR_DISTINCTNESS c1 c2
and STRING_EQ_CONV tm =
let ltm,rtm = dest_eq tm in
if compare ltm rtm = 0 then EQT_INTRO (REFL ltm) else
STRING_DISTINCTNESS ltm rtm in
char_of_term,mk_char,dest_string,mk_string,CHAR_EQ_CONV,STRING_EQ_CONV;;