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cart.ml
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cart.ml
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(* ========================================================================= *)
(* Definition of finite Cartesian product types. *)
(* *)
(* (c) Copyright, John Harrison 1998-2007 *)
(* (c) Copyright, Andrea Gabrielli, Marco Maggesi 2017-2018 *)
(* ========================================================================= *)
needs "iterate.ml";;
(* ------------------------------------------------------------------------- *)
(* Association of a number with an indexing type. *)
(* ------------------------------------------------------------------------- *)
let dimindex = new_definition
`dimindex(s:A->bool) = if FINITE(:A) then CARD(:A) else 1`;;
let DIMINDEX_NONZERO = prove
(`!s:A->bool. ~(dimindex(s) = 0)`,
GEN_TAC THEN REWRITE_TAC[dimindex] THEN
COND_CASES_TAC THEN ASM_SIMP_TAC[CARD_EQ_0; ARITH] THEN SET_TAC[]);;
let DIMINDEX_GE_1 = prove
(`!s:A->bool. 1 <= dimindex(s)`,
REWRITE_TAC[ARITH_RULE `1 <= x <=> ~(x = 0)`; DIMINDEX_NONZERO]);;
let DIMINDEX_UNIV = prove
(`!s. dimindex(s:A->bool) = dimindex(:A)`,
REWRITE_TAC[dimindex]);;
let DIMINDEX_UNIQUE = prove
(`(:A) HAS_SIZE n ==> dimindex(:A) = n`,
MESON_TAC[dimindex; HAS_SIZE]);;
let UNIV_HAS_SIZE_DIMINDEX = prove
(`(:N) HAS_SIZE dimindex (:N) <=> FINITE(:N)`,
MESON_TAC[HAS_SIZE; dimindex]);;
let HAS_SIZE_1 = prove
(`(:1) HAS_SIZE 1`,
SUBGOAL_THEN `(:1) = {one}` SUBST1_TAC THENL
[REWRITE_TAC[EXTENSION; IN_UNIV; IN_SING] THEN MESON_TAC[one];
SIMP_TAC[NOT_IN_EMPTY; HAS_SIZE; FINITE_RULES; CARD_CLAUSES; ARITH]]);;
let NUMSEG_LT_DIMINDEX = prove
(`{i | i < dimindex(:N)} = 0..dimindex(:N)-1`,
REWRITE_TAC[NUMSEG_LT; DIMINDEX_NONZERO]);;
let DIMINDEX_1 = MATCH_MP DIMINDEX_UNIQUE HAS_SIZE_1;;
(* ------------------------------------------------------------------------- *)
(* An indexing type with that size, parametrized by base type. *)
(* ------------------------------------------------------------------------- *)
let finite_image_tybij =
new_type_definition "finite_image" ("finite_index","dest_finite_image")
(prove
(`?x. x IN 1..dimindex(:A)`,
EXISTS_TAC `1` THEN REWRITE_TAC[IN_NUMSEG; LE_REFL; DIMINDEX_GE_1]));;
let FINITE_IMAGE_IMAGE = prove
(`UNIV:(A)finite_image->bool = IMAGE finite_index (1..dimindex(:A))`,
REWRITE_TAC[EXTENSION; IN_UNIV; IN_IMAGE] THEN
MESON_TAC[finite_image_tybij]);;
(* ------------------------------------------------------------------------- *)
(* Dimension of such a type, and indexing over it. *)
(* ------------------------------------------------------------------------- *)
let HAS_SIZE_FINITE_IMAGE = prove
(`!s. (UNIV:(A)finite_image->bool) HAS_SIZE dimindex(s:A->bool)`,
GEN_TAC THEN SIMP_TAC[FINITE_IMAGE_IMAGE] THEN
MATCH_MP_TAC HAS_SIZE_IMAGE_INJ THEN
ONCE_REWRITE_TAC[DIMINDEX_UNIV] THEN REWRITE_TAC[HAS_SIZE_NUMSEG_1] THEN
MESON_TAC[finite_image_tybij]);;
let CARD_FINITE_IMAGE = prove
(`!s. CARD(UNIV:(A)finite_image->bool) = dimindex(s:A->bool)`,
MESON_TAC[HAS_SIZE_FINITE_IMAGE; HAS_SIZE]);;
let FINITE_FINITE_IMAGE = prove
(`FINITE(UNIV:(A)finite_image->bool)`,
MESON_TAC[HAS_SIZE_FINITE_IMAGE; HAS_SIZE]);;
let DIMINDEX_FINITE_IMAGE = prove
(`!s t. dimindex(s:(A)finite_image->bool) = dimindex(t:A->bool)`,
REPEAT GEN_TAC THEN GEN_REWRITE_TAC LAND_CONV [dimindex] THEN
MP_TAC(ISPEC `t:A->bool` HAS_SIZE_FINITE_IMAGE) THEN
SIMP_TAC[FINITE_FINITE_IMAGE; HAS_SIZE]);;
let FINITE_INDEX_WORKS = prove
(`!i:(A)finite_image.
?!n. 1 <= n /\ n <= dimindex(:A) /\ (finite_index n = i)`,
REWRITE_TAC[CONJ_ASSOC; GSYM IN_NUMSEG] THEN MESON_TAC[finite_image_tybij]);;
let FINITE_INDEX_INJ = prove
(`!i j. 1 <= i /\ i <= dimindex(:A) /\
1 <= j /\ j <= dimindex(:A)
==> ((finite_index i :A finite_image = finite_index j) <=>
(i = j))`,
MESON_TAC[FINITE_INDEX_WORKS]);;
let FORALL_FINITE_INDEX = prove
(`(!k:(N)finite_image. P k) =
(!i. 1 <= i /\ i <= dimindex(:N) ==> P(finite_index i))`,
MESON_TAC[FINITE_INDEX_WORKS]);;
(* ------------------------------------------------------------------------- *)
(* Hence finite Cartesian products, with indexing and lambdas. *)
(* ------------------------------------------------------------------------- *)
let cart_tybij =
new_type_definition "cart" ("mk_cart","dest_cart")
(prove(`?f:(B)finite_image->A. T`,REWRITE_TAC[]));;
parse_as_infix("$",(25,"left"));;
let finite_index = new_definition
`(x:A^N)$i = dest_cart x (finite_index i)`;;
let CART_EQ = prove
(`!x:A^B y.
(x = y) <=> !i. 1 <= i /\ i <= dimindex(:B) ==> (x$i = y$i)`,
REPEAT GEN_TAC THEN REWRITE_TAC[finite_index; GSYM FORALL_FINITE_INDEX] THEN
REWRITE_TAC[GSYM FUN_EQ_THM; ETA_AX] THEN MESON_TAC[cart_tybij]);;
parse_as_binder "lambda";;
let lambda = new_definition
`(lambda) g =
@f:A^B. !i. 1 <= i /\ i <= dimindex(:B) ==> (f$i = g i)`;;
let LAMBDA_BETA = prove
(`!i. 1 <= i /\ i <= dimindex(:B)
==> (((lambda) g:A^B) $i = g i)`,
REWRITE_TAC[lambda] THEN CONV_TAC SELECT_CONV THEN
EXISTS_TAC `mk_cart(\k. g(@i. 1 <= i /\ i <= dimindex(:B) /\
(finite_index i = k))):A^B` THEN
REWRITE_TAC[finite_index; REWRITE_RULE[] cart_tybij] THEN
REPEAT STRIP_TAC THEN AP_TERM_TAC THEN MATCH_MP_TAC SELECT_UNIQUE THEN
GEN_TAC THEN REWRITE_TAC[] THEN
ASM_MESON_TAC[FINITE_INDEX_INJ; DIMINDEX_FINITE_IMAGE]);;
let LAMBDA_UNIQUE = prove
(`!f:A^B g.
(!i. 1 <= i /\ i <= dimindex(:B) ==> (f$i = g i)) <=>
((lambda) g = f)`,
SIMP_TAC[CART_EQ; LAMBDA_BETA] THEN MESON_TAC[]);;
let LAMBDA_ETA = prove
(`!g. (lambda i. g$i):A^B = g`,
REWRITE_TAC[CART_EQ; LAMBDA_BETA]);;
(* ------------------------------------------------------------------------- *)
(* For some purposes we can avoid side-conditions on the index. *)
(* ------------------------------------------------------------------------- *)
let FINITE_INDEX_INRANGE = prove
(`!i. ?k. 1 <= k /\ k <= dimindex(:N) /\ !x:A^N. x$i = x$k`,
REWRITE_TAC[finite_index] THEN MESON_TAC[FINITE_INDEX_WORKS]);;
let FINITE_INDEX_INRANGE_2 = prove
(`!i. ?k. 1 <= k /\ k <= dimindex(:N) /\
(!x:A^N. x$i = x$k) /\ (!y:B^N. y$i = y$k)`,
REWRITE_TAC[finite_index] THEN MESON_TAC[FINITE_INDEX_WORKS]);;
let CART_EQ_FULL = prove
(`!x y:A^N. x = y <=> !i. x$i = y$i`,
REPEAT GEN_TAC THEN EQ_TAC THEN SIMP_TAC[] THEN SIMP_TAC[CART_EQ]);;
(* ------------------------------------------------------------------------- *)
(* We need a non-standard sum to "paste" together Cartesian products. *)
(* ------------------------------------------------------------------------- *)
let finite_sum_tybij =
let th = prove
(`?x. x IN 1..(dimindex(:A) + dimindex(:B))`,
EXISTS_TAC `1` THEN SIMP_TAC[IN_NUMSEG; LE_REFL; DIMINDEX_GE_1;
ARITH_RULE `1 <= a ==> 1 <= a + b`]) in
new_type_definition "finite_sum" ("mk_finite_sum","dest_finite_sum") th;;
let pastecart = new_definition
`(pastecart:A^M->A^N->A^(M,N)finite_sum) f g =
lambda i. if i <= dimindex(:M) then f$i
else g$(i - dimindex(:M))`;;
let fstcart = new_definition
`(fstcart:A^(M,N)finite_sum->A^M) f = lambda i. f$i`;;
let sndcart = new_definition
`(sndcart:A^(M,N)finite_sum->A^N) f =
lambda i. f$(i + dimindex(:M))`;;
let FINITE_SUM_IMAGE = prove
(`UNIV:(A,B)finite_sum->bool =
IMAGE mk_finite_sum (1..(dimindex(:A)+dimindex(:B)))`,
REWRITE_TAC[EXTENSION; IN_UNIV; IN_IMAGE] THEN
MESON_TAC[finite_sum_tybij]);;
let DIMINDEX_HAS_SIZE_FINITE_SUM = prove
(`(UNIV:(M,N)finite_sum->bool) HAS_SIZE (dimindex(:M) + dimindex(:N))`,
SIMP_TAC[FINITE_SUM_IMAGE] THEN
MATCH_MP_TAC HAS_SIZE_IMAGE_INJ THEN
ONCE_REWRITE_TAC[DIMINDEX_UNIV] THEN REWRITE_TAC[HAS_SIZE_NUMSEG_1] THEN
MESON_TAC[finite_sum_tybij]);;
let DIMINDEX_FINITE_SUM = prove
(`dimindex(:(M,N)finite_sum) = dimindex(:M) + dimindex(:N)`,
GEN_REWRITE_TAC LAND_CONV [dimindex] THEN
REWRITE_TAC[REWRITE_RULE[HAS_SIZE] DIMINDEX_HAS_SIZE_FINITE_SUM]);;
let FSTCART_PASTECART = prove
(`!x y. fstcart(pastecart (x:A^M) (y:A^N)) = x`,
SIMP_TAC[pastecart; fstcart; CART_EQ; LAMBDA_BETA; DIMINDEX_FINITE_SUM;
ARITH_RULE `a <= b ==> a <= b + c`]);;
let SNDCART_PASTECART = prove
(`!x y. sndcart(pastecart (x:A^M) (y:A^N)) = y`,
SIMP_TAC[pastecart; sndcart; CART_EQ; LAMBDA_BETA] THEN REPEAT STRIP_TAC THEN
W(fun (_,w) -> MP_TAC (PART_MATCH (lhs o rand) LAMBDA_BETA (lhand w))) THEN
ANTS_TAC THENL
[REWRITE_TAC[DIMINDEX_FINITE_SUM] THEN MATCH_MP_TAC
(ARITH_RULE `1 <= i /\ i <= b ==> 1 <= i + a /\ i + a <= a + b`) THEN
ASM_REWRITE_TAC[];
DISCH_THEN SUBST1_TAC THEN REWRITE_TAC[] THEN
ASM_SIMP_TAC[ADD_SUB; ARITH_RULE `1 <= i ==> ~(i + a <= a)`]]);;
let PASTECART_FST_SND = prove
(`!z. pastecart (fstcart z) (sndcart z):A^(M,N)finite_sum = z`,
SIMP_TAC[pastecart; fstcart; sndcart; CART_EQ; LAMBDA_BETA] THEN
REPEAT GEN_TAC THEN COND_CASES_TAC THEN ASM_REWRITE_TAC[] THEN
ASM_SIMP_TAC[DIMINDEX_FINITE_SUM; LAMBDA_BETA;
ARITH_RULE `i <= a + b ==> i - a <= b`;
ARITH_RULE `~(i <= a) ==> 1 <= i - a`;
ARITH_RULE `~(i <= a) ==> ((i - a) + a = i)`]);;
let PASTECART_EQ = prove
(`!x y:A^(M,N)finite_sum.
x = y <=> fstcart x = fstcart y /\ sndcart x = sndcart y`,
MESON_TAC[PASTECART_FST_SND]);;
let FORALL_PASTECART = prove
(`(!p:A^(M,N)finite_sum. P p) <=> !x y. P (pastecart x y)`,
MESON_TAC[PASTECART_FST_SND; FSTCART_PASTECART; SNDCART_PASTECART]);;
let EXISTS_PASTECART = prove
(`(?p:A^(M,N)finite_sum. P p) <=> ?x y. P (pastecart x y)`,
MESON_TAC[PASTECART_FST_SND; FSTCART_PASTECART; SNDCART_PASTECART]);;
let PASTECART_INJ = prove
(`!x:A^M y:A^N w z. pastecart x y = pastecart w z <=> x = w /\ y = z`,
REWRITE_TAC[PASTECART_EQ; FSTCART_PASTECART; SNDCART_PASTECART]);;
let FSTCART_COMPONENT = prove
(`!x:A^(M,N)finite_sum i. 1 <= i /\ i <= dimindex(:M)
==> fstcart x$i = x$i`,
SIMP_TAC[fstcart; LAMBDA_BETA]);;
let SNDCART_COMPONENT = prove
(`!x:A^(M,N)finite_sum i. 1 <= i /\ i <= dimindex(:N)
==> sndcart x$i = x$(i + dimindex(:M))`,
SIMP_TAC[sndcart; LAMBDA_BETA]);;
let PASTECART_COMPONENT = prove
(`(!u:A^M v:A^N i. 1 <= i /\ i <= dimindex(:M) ==> pastecart u v$i = u$i) /\
(!u:A^M v:A^N i. dimindex(:M) + 1 <= i /\ i <= dimindex(:M) + dimindex(:N)
==> pastecart u v$i = v$(i - dimindex(:M)))`,
REWRITE_TAC[pastecart] THEN CONJ_TAC THEN REPEAT GEN_TAC THEN STRIP_TAC THENL
[SUBGOAL_THEN `i <= dimindex(:(M,N)finite_sum)`
(fun th -> ASM_SIMP_TAC[LAMBDA_BETA; th]) THEN
REWRITE_TAC[DIMINDEX_FINITE_SUM] THEN ASM_ARITH_TAC;
ASM_SIMP_TAC[LAMBDA_BETA; DIMINDEX_FINITE_SUM;
ARITH_RULE `dimindex(:M) + 1 <= i ==> 1 <= i`] THEN
COND_CASES_TAC THEN REWRITE_TAC[] THEN ASM_ARITH_TAC]);;
(* ------------------------------------------------------------------------- *)
(* Likewise a "subtraction" function on type indices. *)
(* ------------------------------------------------------------------------- *)
let finite_diff_tybij =
let th = prove
(`?x. x IN 1..(if dimindex(:B) < dimindex(:A)
then dimindex(:A) - dimindex(:B) else 1)`,
EXISTS_TAC `1` THEN REWRITE_TAC[IN_NUMSEG] THEN ARITH_TAC) in
new_type_definition "finite_diff" ("mk_finite_diff","dest_finite_diff") th;;
let FINITE_DIFF_IMAGE = prove
(`UNIV:(A,B)finite_diff->bool =
IMAGE mk_finite_diff
(1..(if dimindex(:B) < dimindex(:A)
then dimindex(:A) - dimindex(:B) else 1))`,
REWRITE_TAC[EXTENSION; IN_UNIV; IN_IMAGE] THEN
MESON_TAC[finite_diff_tybij]);;
let DIMINDEX_HAS_SIZE_FINITE_DIFF = prove
(`(UNIV:(M,N)finite_diff->bool) HAS_SIZE
(if dimindex(:N) < dimindex(:M) then dimindex(:M) - dimindex(:N) else 1)`,
SIMP_TAC[FINITE_DIFF_IMAGE] THEN
MATCH_MP_TAC HAS_SIZE_IMAGE_INJ THEN
ONCE_REWRITE_TAC[DIMINDEX_UNIV] THEN REWRITE_TAC[HAS_SIZE_NUMSEG_1] THEN
MESON_TAC[finite_diff_tybij]);;
let DIMINDEX_FINITE_DIFF = prove
(`dimindex(:(M,N)finite_diff) =
if dimindex(:N) < dimindex(:M) then dimindex(:M) - dimindex(:N) else 1`,
GEN_REWRITE_TAC LAND_CONV [dimindex] THEN
REWRITE_TAC[REWRITE_RULE[HAS_SIZE] DIMINDEX_HAS_SIZE_FINITE_DIFF]);;
(* ------------------------------------------------------------------------- *)
(* And a finite-forcing "multiplication" on type indices. *)
(* ------------------------------------------------------------------------- *)
let finite_prod_tybij =
let th = prove
(`?x. x IN 1..(dimindex(:A) * dimindex(:B))`,
EXISTS_TAC `1` THEN REWRITE_TAC[IN_NUMSEG; LE_REFL] THEN
MESON_TAC[LE_1; DIMINDEX_GE_1; MULT_EQ_0]) in
new_type_definition "finite_prod" ("mk_finite_prod","dest_finite_prod") th;;
let FINITE_PROD_IMAGE = prove
(`UNIV:(A,B)finite_prod->bool =
IMAGE mk_finite_prod (1..(dimindex(:A)*dimindex(:B)))`,
REWRITE_TAC[EXTENSION; IN_UNIV; IN_IMAGE] THEN
MESON_TAC[finite_prod_tybij]);;
let DIMINDEX_HAS_SIZE_FINITE_PROD = prove
(`(UNIV:(M,N)finite_prod->bool) HAS_SIZE (dimindex(:M) * dimindex(:N))`,
SIMP_TAC[FINITE_PROD_IMAGE] THEN
MATCH_MP_TAC HAS_SIZE_IMAGE_INJ THEN
ONCE_REWRITE_TAC[DIMINDEX_UNIV] THEN REWRITE_TAC[HAS_SIZE_NUMSEG_1] THEN
MESON_TAC[finite_prod_tybij]);;
let DIMINDEX_FINITE_PROD = prove
(`dimindex(:(M,N)finite_prod) = dimindex(:M) * dimindex(:N)`,
GEN_REWRITE_TAC LAND_CONV [dimindex] THEN
REWRITE_TAC[REWRITE_RULE[HAS_SIZE] DIMINDEX_HAS_SIZE_FINITE_PROD]);;
(* ------------------------------------------------------------------------- *)
(* Type constructors for setting up finite types indexed by binary numbers. *)
(* ------------------------------------------------------------------------- *)
let tybit0_INDUCT,tybit0_RECURSION = define_type
"tybit0 = mktybit0((A,A)finite_sum)";;
let tybit1_INDUCT,tybit1_RECURSION = define_type
"tybit1 = mktybit1(((A,A)finite_sum,1)finite_sum)";;
let HAS_SIZE_TYBIT0 = prove
(`(:(A)tybit0) HAS_SIZE 2 * dimindex(:A)`,
SUBGOAL_THEN
`(:(A)tybit0) = IMAGE mktybit0 (:(A,A)finite_sum)`
SUBST1_TAC THENL
[CONV_TAC SYM_CONV THEN MATCH_MP_TAC SURJECTIVE_IMAGE_EQ THEN
REWRITE_TAC[IN_UNIV] THEN MESON_TAC[cases "tybit0"];
MATCH_MP_TAC HAS_SIZE_IMAGE_INJ THEN
REWRITE_TAC[IN_UNIV; injectivity "tybit0"] THEN
W(MP_TAC o PART_MATCH lhand
DIMINDEX_HAS_SIZE_FINITE_SUM o lhand o snd) THEN
REWRITE_TAC[DIMINDEX_FINITE_SUM; GSYM MULT_2]]);;
let HAS_SIZE_TYBIT1 = prove
(`(:(A)tybit1) HAS_SIZE 2 * dimindex(:A) + 1`,
SUBGOAL_THEN
`(:(A)tybit1) = IMAGE mktybit1 (:((A,A)finite_sum,1)finite_sum)`
SUBST1_TAC THENL
[CONV_TAC SYM_CONV THEN MATCH_MP_TAC SURJECTIVE_IMAGE_EQ THEN
REWRITE_TAC[IN_UNIV] THEN MESON_TAC[cases "tybit1"];
MATCH_MP_TAC HAS_SIZE_IMAGE_INJ THEN
REWRITE_TAC[IN_UNIV; injectivity "tybit1"] THEN
W(MP_TAC o PART_MATCH lhand
DIMINDEX_HAS_SIZE_FINITE_SUM o lhand o snd) THEN
REWRITE_TAC[DIMINDEX_FINITE_SUM; DIMINDEX_1; GSYM MULT_2]]);;
let DIMINDEX_TYBIT0 = prove
(`dimindex(:(A)tybit0) = 2 * dimindex(:A)`,
MATCH_MP_TAC DIMINDEX_UNIQUE THEN MATCH_ACCEPT_TAC HAS_SIZE_TYBIT0);;
let DIMINDEX_TYBIT1 = prove
(`dimindex(:(A)tybit1) = 2 * dimindex(:A) + 1`,
MATCH_MP_TAC DIMINDEX_UNIQUE THEN MATCH_ACCEPT_TAC HAS_SIZE_TYBIT1);;
let DIMINDEX_CLAUSES = prove
(`dimindex(:1) = 1 /\
dimindex(:(A)tybit0) = 2 * dimindex(:A) /\
dimindex(:(A)tybit1) = 2 * dimindex(:A) + 1`,
REWRITE_TAC[DIMINDEX_1] THEN CONJ_TAC THEN
MATCH_MP_TAC DIMINDEX_UNIQUE THEN
REWRITE_TAC[ HAS_SIZE_TYBIT0; HAS_SIZE_TYBIT1]);;
let FINITE_1 = prove
(`FINITE (:1)`,
MESON_TAC[HAS_SIZE_1; HAS_SIZE]);;
let FINITE_TYBIT0 = prove
(`FINITE (:A tybit0)`,
MESON_TAC[HAS_SIZE_TYBIT0; HAS_SIZE]);;
let FINITE_TYBIT1 = prove
(`FINITE (:A tybit1)`,
MESON_TAC[HAS_SIZE_TYBIT1; HAS_SIZE]);;
let FINITE_CLAUSES = prove
(`FINITE(:1) /\ FINITE(:A tybit0) /\ FINITE(:A tybit1)`,
REWRITE_TAC[FINITE_1; FINITE_TYBIT0; FINITE_TYBIT1]);;
(* ------------------------------------------------------------------------- *)
(* Computing dimindex of fintypes. *)
(* ------------------------------------------------------------------------- *)
let DIMINDEX_CONV : conv =
let [pth_num;pth0;pth1;pth_one] = (CONJUNCTS o prove)
(`(dimindex(:A) = n <=> dimindex(s:A->bool) = NUMERAL n) /\
(dimindex(:A) = n <=> dimindex(:A tybit0) = BIT0 n) /\
(dimindex(:A) = n <=> dimindex(:A tybit1) = BIT1 n) /\
dimindex(:1) = BIT1 _0`,
CONJ_TAC THENL [REWRITE_TAC[NUMERAL; dimindex]; ALL_TAC] THEN
REWRITE_TAC[DIMINDEX_CLAUSES] THEN CONV_TAC BITS_ELIM_CONV THEN
ARITH_TAC) in
let nvar = `n:num` in
let rec calc_dimindex ty =
match ty with
Tyapp("1",_) -> pth_one
| Tyapp("tybit0",ty'::_) ->
let th = calc_dimindex ty' in
let n = rand(concl th) in
EQ_MP (INST [n,nvar] (INST_TYPE [ty',aty] pth0)) th
| Tyapp("tybit1",ty'::_) ->
let th = calc_dimindex ty' in
let n = rand(concl th) in
EQ_MP (INST [n,nvar] (INST_TYPE [ty',aty] pth1)) th
| _ -> fail() in
function
Comb(Const("dimindex",_),tm) ->
let uty = type_of tm in
let _,(sty::_) = dest_type uty in
let th = calc_dimindex sty in
let svar = mk_var("s",uty)
and ntm = rand(concl th) in
let pth = INST [tm,svar;ntm,nvar] (INST_TYPE [sty,aty] pth_num) in
EQ_MP pth th
| _ -> failwith "DIMINDEX_CONV";;
let HAS_SIZE_DIMINDEX_RULE =
let pth = prove
(`(:A) HAS_SIZE n <=> FINITE(:A) /\ dimindex(:A) = n`,
MESON_TAC[UNIV_HAS_SIZE_DIMINDEX; HAS_SIZE]) in
let htm = `(HAS_SIZE) (:A)`
and conv = GEN_REWRITE_CONV I [pth]
and rule = EQT_ELIM o GEN_REWRITE_CONV I [FINITE_CLAUSES] in
fun nty ->
let tm = mk_comb(inst[nty,aty] htm,mk_numeral (dest_finty nty)) in
let th1 = conv tm in
EQ_MP (SYM th1)
(CONJ (rule (lhand(rand(concl th1))))
(DIMINDEX_CONV (lhand(rand(rand(concl th1))))));;
let DIMINDEX_TAC : tactic =
CONV_TAC (ONCE_DEPTH_CONV DIMINDEX_CONV);;
(* ------------------------------------------------------------------------- *)
(* Remember cases 2, 3 and 4, which are especially useful for real^N. *)
(* ------------------------------------------------------------------------- *)
let DIMINDEX_2 = prove
(`dimindex (:2) = 2`,
DIMINDEX_TAC THEN REFL_TAC);;
let DIMINDEX_3 = prove
(`dimindex (:3) = 3`,
DIMINDEX_TAC THEN REFL_TAC);;
let DIMINDEX_4 = prove
(`dimindex (:4) = 4`,
DIMINDEX_TAC THEN REFL_TAC);;
let HAS_SIZE_2 = HAS_SIZE_DIMINDEX_RULE `:2`;;
let HAS_SIZE_3 = HAS_SIZE_DIMINDEX_RULE `:3`;;
let HAS_SIZE_4 = HAS_SIZE_DIMINDEX_RULE `:4`;;
(* ------------------------------------------------------------------------- *)
(* Finiteness lemma. *)
(* ------------------------------------------------------------------------- *)
let FINITE_CART = prove
(`!P. (!i. 1 <= i /\ i <= dimindex(:N) ==> FINITE {x | P i x})
==> FINITE {v:A^N | !i. 1 <= i /\ i <= dimindex(:N) ==> P i (v$i)}`,
GEN_TAC THEN DISCH_TAC THEN
SUBGOAL_THEN
`!n. n <= dimindex(:N)
==> FINITE {v:A^N | (!i. 1 <= i /\ i <= dimindex(:N) /\ i <= n
==> P i (v$i)) /\
(!i. 1 <= i /\ i <= dimindex(:N) /\ n < i
==> v$i = @x. F)}`
(MP_TAC o SPEC `dimindex(:N)`) THEN REWRITE_TAC[LE_REFL; LET_ANTISYM] THEN
INDUCT_TAC THENL
[REWRITE_TAC[ARITH_RULE `1 <= i /\ i <= n /\ i <= 0 <=> F`] THEN
SIMP_TAC[ARITH_RULE `1 <= i /\ i <= n /\ 0 < i <=> 1 <= i /\ i <= n`] THEN
SUBGOAL_THEN
`{v | !i. 1 <= i /\ i <= dimindex (:N) ==> v$i = (@x. F)} =
{(lambda i. @x. F):A^N}`
(fun th -> SIMP_TAC[FINITE_RULES;th]) THEN
SIMP_TAC[EXTENSION; IN_SING; IN_ELIM_THM; CART_EQ; LAMBDA_BETA];
ALL_TAC] THEN
DISCH_TAC THEN
MATCH_MP_TAC FINITE_SUBSET THEN EXISTS_TAC
`IMAGE (\(x:A,v:A^N). (lambda i. if i = SUC n then x else v$i):A^N)
{x,v | x IN {x:A | P (SUC n) x} /\
v IN {v:A^N | (!i. 1 <= i /\ i <= dimindex(:N) /\ i <= n
==> P i (v$i)) /\
(!i. 1 <= i /\ i <= dimindex (:N) /\ n < i
==> v$i = (@x. F))}}` THEN
CONJ_TAC THENL
[MATCH_MP_TAC FINITE_IMAGE THEN
ASM_SIMP_TAC[FINITE_PRODUCT; ARITH_RULE `1 <= SUC n`;
ARITH_RULE `SUC n <= m ==> n <= m`];
ALL_TAC] THEN
REWRITE_TAC[SUBSET; IN_IMAGE; IN_ELIM_PAIR_THM; EXISTS_PAIR_THM] THEN
X_GEN_TAC `v:A^N` THEN REWRITE_TAC[IN_ELIM_THM] THEN
STRIP_TAC THEN EXISTS_TAC `(v:A^N)$(SUC n)` THEN
EXISTS_TAC `(lambda i. if i = SUC n then @x. F else (v:A^N)$i):A^N` THEN
SIMP_TAC[CART_EQ; LAMBDA_BETA; ARITH_RULE `i <= n ==> ~(i = SUC n)`] THEN
ASM_MESON_TAC[LE; ARITH_RULE `1 <= SUC n`;
ARITH_RULE `n < i /\ ~(i = SUC n) ==> SUC n < i`]);;
(* ------------------------------------------------------------------------- *)
(* More cardinality results for whole universe. *)
(* ------------------------------------------------------------------------- *)
let HAS_SIZE_CART_UNIV = prove
(`!m. (:A) HAS_SIZE m ==> (:A^N) HAS_SIZE m EXP (dimindex(:N))`,
REPEAT STRIP_TAC THEN
SUBGOAL_THEN
`(:(N)finite_image->A) HAS_SIZE m EXP (dimindex(:N))`
MP_TAC THENL
[ASM_SIMP_TAC[HAS_SIZE_FUNSPACE_UNIV; HAS_SIZE_FINITE_IMAGE];
DISCH_THEN(MP_TAC o ISPEC `mk_cart:((N)finite_image->A)->A^N` o
MATCH_MP (REWRITE_RULE[IMP_CONJ_ALT] HAS_SIZE_IMAGE_INJ)) THEN
REWRITE_TAC[IN_UNIV] THEN
ANTS_TAC THENL [MESON_TAC[cart_tybij]; MATCH_MP_TAC EQ_IMP] THEN
AP_THM_TAC THEN AP_TERM_TAC THEN MATCH_MP_TAC SURJECTIVE_IMAGE_EQ THEN
REWRITE_TAC[IN_UNIV] THEN MESON_TAC[cart_tybij]]);;
let CARD_CART_UNIV = prove
(`FINITE(:A) ==> CARD(:A^N) = CARD(:A) EXP dimindex(:N)`,
MESON_TAC[HAS_SIZE_CART_UNIV; HAS_SIZE]);;
let FINITE_CART_UNIV = prove
(`FINITE(:A) ==> FINITE(:A^N)`,
MESON_TAC[HAS_SIZE_CART_UNIV; HAS_SIZE]);;
(* ------------------------------------------------------------------------- *)
(* Explicit construction of a vector from a list of components. *)
(* ------------------------------------------------------------------------- *)
let vector = new_definition
`(vector l):A^N = lambda i. EL (i - 1) l`;;
(* ------------------------------------------------------------------------- *)
(* Convenient set membership elimination theorem. *)
(* ------------------------------------------------------------------------- *)
let IN_ELIM_PASTECART_THM = prove
(`!P (a:A^M) (b:A^N). pastecart a b IN {pastecart x y | P x y} <=> P a b`,
REWRITE_TAC[IN_ELIM_THM; PASTECART_EQ;
FSTCART_PASTECART; SNDCART_PASTECART] THEN
MESON_TAC[]);;
(* ------------------------------------------------------------------------- *)
(* Variant of product types using pasting of vectors. *)
(* ------------------------------------------------------------------------- *)
parse_as_infix("PCROSS",(22,"right"));;
let PCROSS = new_definition
`s PCROSS t = {pastecart (x:A^M) (y:A^N) | x IN s /\ y IN t}`;;
let FORALL_IN_PCROSS = prove
(`(!z:A^(M,N)finite_sum. z IN s PCROSS t ==> P z) <=>
(!x y. x IN s /\ y IN t ==> P(pastecart x y))`,
REWRITE_TAC[PCROSS; FORALL_IN_GSPEC]);;
let EXISTS_IN_PCROSS = prove
(`(?z:A^(M,N)finite_sum. z IN s PCROSS t /\ P z) <=>
(?x y. x IN s /\ y IN t /\ P(pastecart x y))`,
REWRITE_TAC[PCROSS; EXISTS_IN_GSPEC; CONJ_ASSOC]);;
let PASTECART_IN_PCROSS = prove
(`!s t (x:A^M) (y:A^N). (pastecart x y) IN (s PCROSS t) <=> x IN s /\ y IN t`,
REWRITE_TAC[PCROSS; IN_ELIM_PASTECART_THM]);;
let PCROSS_EQ_EMPTY = prove
(`!(s:A^M->bool) (t:A^N->bool). s PCROSS t = {} <=> s = {} \/ t = {}`,
REWRITE_TAC[PCROSS] THEN SET_TAC[]);;
let PCROSS_EMPTY = prove
(`(!s. (s PCROSS {}) :A^(M,N)finite_sum->bool = {}) /\
(!t. ({} PCROSS t) :A^(M,N)finite_sum->bool = {})`,
REWRITE_TAC[PCROSS_EQ_EMPTY]);;
let PCROSS_SING = prove
(`!(x:A^M) (y:A^N). {x} PCROSS {y} = {pastecart x y}`,
REWRITE_TAC[EXTENSION; FORALL_PASTECART; IN_SING; PASTECART_IN_PCROSS;
PASTECART_INJ]);;
let SUBSET_PCROSS = prove
(`!(s:A^M->bool) (t:A^N->bool) s' t'.
s PCROSS t SUBSET s' PCROSS t' <=>
s = {} \/ t = {} \/ s SUBSET s' /\ t SUBSET t'`,
SIMP_TAC[PCROSS; EXTENSION; IN_ELIM_PASTECART_THM; SUBSET;
FORALL_PASTECART; PASTECART_IN_PCROSS; NOT_IN_EMPTY] THEN MESON_TAC[]);;
let PCROSS_MONO = prove
(`!(s:A^M->bool) (t:A^N->bool) s' t'.
s SUBSET s' /\ t SUBSET t' ==> s PCROSS t SUBSET s' PCROSS t'`,
SIMP_TAC[SUBSET_PCROSS]);;
let PCROSS_EQ = prove
(`!s s':real^M->bool t t':real^N->bool.
s PCROSS t = s' PCROSS t' <=>
(s = {} \/ t = {}) /\ (s' = {} \/ t' = {}) \/ s = s' /\ t = t'`,
REWRITE_TAC[GSYM SUBSET_ANTISYM_EQ; SUBSET_PCROSS] THEN SET_TAC[]);;
let UNIV_PCROSS_UNIV = prove
(`(:A^M) PCROSS (:A^N) = (:A^(M,N)finite_sum)`,
REWRITE_TAC[EXTENSION; FORALL_PASTECART; PASTECART_IN_PCROSS; IN_UNIV]);;
let HAS_SIZE_PCROSS = prove
(`!(s:A^M->bool) (t:A^N->bool) m n.
s HAS_SIZE m /\ t HAS_SIZE n ==> (s PCROSS t) HAS_SIZE (m * n)`,
REPEAT GEN_TAC THEN DISCH_TAC THEN
FIRST_ASSUM(MP_TAC o MATCH_MP HAS_SIZE_PRODUCT) THEN
MATCH_MP_TAC EQ_IMP THEN SPEC_TAC(`m * n:num`,`k:num`) THEN
MATCH_MP_TAC BIJECTIONS_HAS_SIZE_EQ THEN
EXISTS_TAC `\(x:A^M,y:A^N). pastecart x y` THEN
EXISTS_TAC `\z:A^(M,N)finite_sum. fstcart z,sndcart z` THEN
REWRITE_TAC[FORALL_IN_GSPEC; PASTECART_IN_PCROSS] THEN
REWRITE_TAC[IN_ELIM_PAIR_THM; PASTECART_FST_SND] THEN
REWRITE_TAC[FORALL_IN_PCROSS; FSTCART_PASTECART; SNDCART_PASTECART]);;
let FINITE_PCROSS = prove
(`!(s:A^M->bool) (t:A^N->bool).
FINITE s /\ FINITE t ==> FINITE(s PCROSS t)`,
MESON_TAC[REWRITE_RULE[HAS_SIZE] HAS_SIZE_PCROSS]);;
let FINITE_PCROSS_EQ = prove
(`!(s:A^M->bool) (t:A^N->bool).
FINITE(s PCROSS t) <=> s = {} \/ t = {} \/ FINITE s /\ FINITE t`,
REPEAT GEN_TAC THEN
MAP_EVERY ASM_CASES_TAC [`s:A^M->bool = {}`; `t:A^N->bool = {}`] THEN
ASM_REWRITE_TAC[PCROSS_EMPTY; FINITE_EMPTY] THEN
EQ_TAC THEN SIMP_TAC[FINITE_PCROSS] THEN REPEAT STRIP_TAC THEN
MATCH_MP_TAC FINITE_SUBSET THENL
[EXISTS_TAC `IMAGE fstcart ((s PCROSS t):A^(M,N)finite_sum->bool)`;
EXISTS_TAC `IMAGE sndcart ((s PCROSS t):A^(M,N)finite_sum->bool)`] THEN
ASM_SIMP_TAC[FINITE_IMAGE; SUBSET; IN_IMAGE; EXISTS_PASTECART] THEN
REWRITE_TAC[PASTECART_IN_PCROSS; FSTCART_PASTECART; SNDCART_PASTECART] THEN
ASM SET_TAC[]);;
let IMAGE_FSTCART_PCROSS = prove
(`!s:real^M->bool t:real^N->bool.
IMAGE fstcart (s PCROSS t) = if t = {} then {} else s`,
REPEAT GEN_TAC THEN COND_CASES_TAC THEN
ASM_REWRITE_TAC[PCROSS_EMPTY; IMAGE_CLAUSES] THEN
REWRITE_TAC[EXTENSION; IN_IMAGE] THEN ONCE_REWRITE_TAC[CONJ_SYM] THEN
REWRITE_TAC[EXISTS_IN_PCROSS; FSTCART_PASTECART] THEN ASM SET_TAC[]);;
let IMAGE_SNDCART_PCROSS = prove
(`!s:real^M->bool t:real^N->bool.
IMAGE sndcart (s PCROSS t) = if s = {} then {} else t`,
REPEAT GEN_TAC THEN COND_CASES_TAC THEN
ASM_REWRITE_TAC[PCROSS_EMPTY; IMAGE_CLAUSES] THEN
REWRITE_TAC[EXTENSION; IN_IMAGE] THEN ONCE_REWRITE_TAC[CONJ_SYM] THEN
REWRITE_TAC[EXISTS_IN_PCROSS; SNDCART_PASTECART] THEN ASM SET_TAC[]);;
let PCROSS_INTER = prove
(`(!(s:A^M->bool) (t:A^N->bool) u.
s PCROSS (t INTER u) = (s PCROSS t) INTER (s PCROSS u)) /\
(!(s:A^M->bool) t (u:A^N->bool).
(s INTER t) PCROSS u = (s PCROSS u) INTER (t PCROSS u))`,
REWRITE_TAC[EXTENSION; FORALL_PASTECART; IN_INTER; PASTECART_IN_PCROSS] THEN
REPEAT STRIP_TAC THEN CONV_TAC TAUT);;
let PCROSS_UNION = prove
(`(!(s:A^M->bool) (t:A^N->bool) u.
s PCROSS (t UNION u) = (s PCROSS t) UNION (s PCROSS u)) /\
(!(s:A^M->bool) t (u:A^N->bool).
(s UNION t) PCROSS u = (s PCROSS u) UNION (t PCROSS u))`,
REWRITE_TAC[EXTENSION; FORALL_PASTECART; IN_UNION; PASTECART_IN_PCROSS] THEN
REPEAT STRIP_TAC THEN CONV_TAC TAUT);;
let PCROSS_DIFF = prove
(`(!(s:A^M->bool) (t:A^N->bool) u.
s PCROSS (t DIFF u) = (s PCROSS t) DIFF (s PCROSS u)) /\
(!(s:A^M->bool) t (u:A^N->bool).
(s DIFF t) PCROSS u = (s PCROSS u) DIFF (t PCROSS u))`,
REWRITE_TAC[EXTENSION; FORALL_PASTECART; IN_DIFF; PASTECART_IN_PCROSS] THEN
REPEAT STRIP_TAC THEN CONV_TAC TAUT);;
let INTER_PCROSS = prove
(`!(s:A^M->bool) s' (t:A^N->bool) t'.
(s PCROSS t) INTER (s' PCROSS t') = (s INTER s') PCROSS (t INTER t')`,
REWRITE_TAC[EXTENSION; IN_INTER; FORALL_PASTECART; PASTECART_IN_PCROSS] THEN
CONV_TAC TAUT);;
let PCROSS_UNIONS_UNIONS,PCROSS_UNIONS = (CONJ_PAIR o prove)
(`(!f g. ((UNIONS f) PCROSS (UNIONS g)) :A^(M,N)finite_sum->bool =
UNIONS {s PCROSS t | s IN f /\ t IN g}) /\
(!s f. (s PCROSS (UNIONS f)) :A^(M,N)finite_sum->bool =
UNIONS {s PCROSS t | t IN f}) /\
(!f t. ((UNIONS f) PCROSS t) :A^(M,N)finite_sum->bool =
UNIONS {s PCROSS t | s IN f})`,
REWRITE_TAC[UNIONS_GSPEC; EXTENSION; FORALL_PASTECART; IN_ELIM_THM;
PASTECART_IN_PCROSS] THEN
SET_TAC[]);;
let PCROSS_INTERS_INTERS,PCROSS_INTERS = (CONJ_PAIR o prove)
(`(!f g. ((INTERS f) PCROSS (INTERS g)) :A^(M,N)finite_sum->bool =
if f = {} then INTERS {UNIV PCROSS t | t IN g}
else if g = {} then INTERS {s PCROSS UNIV | s IN f}
else INTERS {s PCROSS t | s IN f /\ t IN g}) /\
(!s f. (s PCROSS (INTERS f)) :A^(M,N)finite_sum->bool =
if f = {} then s PCROSS UNIV else INTERS {s PCROSS t | t IN f}) /\
(!f t. ((INTERS f) PCROSS t) :A^(M,N)finite_sum->bool =
if f = {} then UNIV PCROSS t else INTERS {s PCROSS t | s IN f})`,
REPEAT STRIP_TAC THEN REPEAT (COND_CASES_TAC THEN REWRITE_TAC[]) THEN
ASM_REWRITE_TAC[INTERS_GSPEC; EXTENSION; FORALL_PASTECART; IN_ELIM_THM;
PASTECART_IN_PCROSS; NOT_IN_EMPTY] THEN
ASM SET_TAC[]);;
let DISJOINT_PCROSS = prove
(`!s:A^M->bool t:A^N->bool s' t'.
DISJOINT (s PCROSS t) (s' PCROSS t') <=>
DISJOINT s s' \/ DISJOINT t t'`,
REWRITE_TAC[DISJOINT; INTER_PCROSS; PCROSS_EQ_EMPTY]);;