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|
open Util
open Names
open Cic
open Term
(** Substitutions, code imported from kernel/mod_subst *)
module Deltamap = struct
type t = delta_resolver
let empty = MPmap.empty, KNmap.empty
let is_empty (mm, km) = MPmap.is_empty mm && KNmap.is_empty km
let add_kn kn hint (mm,km) = (mm,KNmap.add kn hint km)
let add_mp mp mp' (mm,km) = (MPmap.add mp mp' mm, km)
let remove_mp mp (mm,km) = (MPmap.remove mp mm, km)
let find_mp mp map = MPmap.find mp (fst map)
let find_kn kn map = KNmap.find kn (snd map)
let mem_mp mp map = MPmap.mem mp (fst map)
let mem_kn kn map = KNmap.mem kn (snd map)
let fold_kn f map i = KNmap.fold f (snd map) i
let fold fmp fkn (mm,km) i =
MPmap.fold fmp mm (KNmap.fold fkn km i)
let join map1 map2 = fold add_mp add_kn map1 map2
end
let empty_delta_resolver = Deltamap.empty
module Umap = struct
type 'a t = 'a umap_t
let empty = MPmap.empty, MBImap.empty
let is_empty (m1,m2) = MPmap.is_empty m1 && MBImap.is_empty m2
let add_mbi mbi x (m1,m2) = (m1,MBImap.add mbi x m2)
let add_mp mp x (m1,m2) = (MPmap.add mp x m1, m2)
let find_mp mp map = MPmap.find mp (fst map)
let find_mbi mbi map = MBImap.find mbi (snd map)
let mem_mp mp map = MPmap.mem mp (fst map)
let mem_mbi mbi map = MBImap.mem mbi (snd map)
let iter_mbi f map = MBImap.iter f (snd map)
let fold fmp fmbi (m1,m2) i =
MPmap.fold fmp m1 (MBImap.fold fmbi m2 i)
let join map1 map2 = fold add_mp add_mbi map1 map2
end
type 'a subst_fun = substitution -> 'a -> 'a
let empty_subst = Umap.empty
let is_empty_subst = Umap.is_empty
let add_mbid mbid mp = Umap.add_mbi mbid (mp,empty_delta_resolver)
let add_mp mp1 mp2 = Umap.add_mp mp1 (mp2,empty_delta_resolver)
let map_mbid mbid mp = add_mbid mbid mp empty_subst
let map_mp mp1 mp2 = add_mp mp1 mp2 empty_subst
let mp_in_delta mp =
Deltamap.mem_mp mp
let find_prefix resolve mp =
let rec sub_mp = function
| MPdot(mp,l) as mp_sup ->
(try Deltamap.find_mp mp_sup resolve
with Not_found -> MPdot(sub_mp mp,l))
| p -> Deltamap.find_mp p resolve
in
try sub_mp mp with Not_found -> mp
(** Nota: the following function is slightly different in mod_subst
PL: Is it on purpose ? *)
let solve_delta_kn resolve kn =
try
match Deltamap.find_kn kn resolve with
| Equiv kn1 -> kn1
| Inline _ -> raise Not_found
with Not_found ->
let mp,dir,l = repr_kn kn in
let new_mp = find_prefix resolve mp in
if mp == new_mp then
kn
else
make_kn new_mp dir l
let gen_of_delta resolve x kn fix_can =
let new_kn = solve_delta_kn resolve kn in
if kn == new_kn then x else fix_can new_kn
let constant_of_delta resolve con =
let kn = user_con con in
gen_of_delta resolve con kn (constant_of_kn_equiv kn)
let constant_of_delta2 resolve con =
let kn, kn' = canonical_con con, user_con con in
gen_of_delta resolve con kn (constant_of_kn_equiv kn')
let mind_of_delta resolve mind =
let kn = user_mind mind in
gen_of_delta resolve mind kn (mind_of_kn_equiv kn)
let mind_of_delta2 resolve mind =
let kn, kn' = canonical_mind mind, user_mind mind in
gen_of_delta resolve mind kn (mind_of_kn_equiv kn')
let find_inline_of_delta kn resolve =
match Deltamap.find_kn kn resolve with
| Inline (_,o) -> o
| _ -> raise Not_found
let constant_of_delta_with_inline resolve con =
let kn1,kn2 = canonical_con con,user_con con in
try find_inline_of_delta kn2 resolve
with Not_found ->
try find_inline_of_delta kn1 resolve
with Not_found -> None
let subst_mp0 sub mp = (* 's like subst *)
let rec aux mp =
match mp with
| MPfile sid -> Umap.find_mp mp sub
| MPbound bid ->
begin
try Umap.find_mbi bid sub
with Not_found -> Umap.find_mp mp sub
end
| MPdot (mp1,l) as mp2 ->
begin
try Umap.find_mp mp2 sub
with Not_found ->
let mp1',resolve = aux mp1 in
MPdot (mp1',l),resolve
end
in
try Some (aux mp) with Not_found -> None
let subst_mp sub mp =
match subst_mp0 sub mp with
None -> mp
| Some (mp',_) -> mp'
let subst_kn_delta sub kn =
let mp,dir,l = repr_kn kn in
match subst_mp0 sub mp with
Some (mp',resolve) ->
solve_delta_kn resolve (make_kn mp' dir l)
| None -> kn
let subst_kn sub kn =
let mp,dir,l = repr_kn kn in
match subst_mp0 sub mp with
Some (mp',_) ->
make_kn mp' dir l
| None -> kn
exception No_subst
type sideconstantsubst =
| User
| Canonical
let gen_subst_mp f sub mp1 mp2 =
match subst_mp0 sub mp1, subst_mp0 sub mp2 with
| None, None -> raise No_subst
| Some (mp',resolve), None -> User, (f mp' mp2), resolve
| None, Some (mp',resolve) -> Canonical, (f mp1 mp'), resolve
| Some (mp1',_), Some (mp2',resolve2) -> Canonical, (f mp1' mp2'), resolve2
let make_mind_equiv mpu mpc dir l =
let knu = make_kn mpu dir l in
if mpu == mpc then mind_of_kn knu
else mind_of_kn_equiv knu (make_kn mpc dir l)
let subst_ind sub mind =
let kn1,kn2 = user_mind mind, canonical_mind mind in
let mp1,dir,l = repr_kn kn1 in
let mp2,_,_ = repr_kn kn2 in
let rebuild_mind mp1 mp2 = make_mind_equiv mp1 mp2 dir l in
try
let side,mind',resolve = gen_subst_mp rebuild_mind sub mp1 mp2 in
match side with
| User -> mind_of_delta resolve mind'
| Canonical -> mind_of_delta2 resolve mind'
with No_subst -> mind
let make_con_equiv mpu mpc dir l =
let knu = make_kn mpu dir l in
if mpu == mpc then constant_of_kn knu
else constant_of_kn_equiv knu (make_kn mpc dir l)
let subst_con0 sub con u =
let kn1,kn2 = user_con con,canonical_con con in
let mp1,dir,l = repr_kn kn1 in
let mp2,_,_ = repr_kn kn2 in
let rebuild_con mp1 mp2 = make_con_equiv mp1 mp2 dir l in
let dup con = con, Const (con, u) in
let side,con',resolve = gen_subst_mp rebuild_con sub mp1 mp2 in
match constant_of_delta_with_inline resolve con' with
| Some t -> con', t
| None ->
let con'' = match side with
| User -> constant_of_delta resolve con'
| Canonical -> constant_of_delta2 resolve con'
in
if con'' == con then raise No_subst else dup con''
let rec map_kn f f' c =
let func = map_kn f f' in
match c with
| Const (kn, u) -> (try snd (f' kn u) with No_subst -> c)
| Proj (kn,t) ->
let kn' =
try fst (f' kn Univ.Instance.empty)
with No_subst -> kn
in
let t' = func t in
if kn' == kn && t' == t then c
else Proj (kn', t')
| Ind ((kn,i),u) ->
let kn' = f kn in
if kn'==kn then c else Ind ((kn',i),u)
| Construct (((kn,i),j),u) ->
let kn' = f kn in
if kn'==kn then c else Construct (((kn',i),j),u)
| Case (ci,p,ct,l) ->
let ci_ind =
let (kn,i) = ci.ci_ind in
let kn' = f kn in
if kn'==kn then ci.ci_ind else kn',i
in
let p' = func p in
let ct' = func ct in
let l' = Array.smartmap func l in
if (ci.ci_ind==ci_ind && p'==p
&& l'==l && ct'==ct)then c
else
Case ({ci with ci_ind = ci_ind},
p',ct', l')
| Cast (ct,k,t) ->
let ct' = func ct in
let t'= func t in
if (t'==t && ct'==ct) then c
else Cast (ct', k, t')
| Prod (na,t,ct) ->
let ct' = func ct in
let t'= func t in
if (t'==t && ct'==ct) then c
else Prod (na, t', ct')
| Lambda (na,t,ct) ->
let ct' = func ct in
let t'= func t in
if (t'==t && ct'==ct) then c
else Lambda (na, t', ct')
| LetIn (na,b,t,ct) ->
let ct' = func ct in
let t'= func t in
let b'= func b in
if (t'==t && ct'==ct && b==b') then c
else LetIn (na, b', t', ct')
| App (ct,l) ->
let ct' = func ct in
let l' = Array.smartmap func l in
if (ct'== ct && l'==l) then c
else App (ct',l')
| Evar (e,l) ->
let l' = Array.smartmap func l in
if (l'==l) then c
else Evar (e,l')
| Fix (ln,(lna,tl,bl)) ->
let tl' = Array.smartmap func tl in
let bl' = Array.smartmap func bl in
if (bl == bl'&& tl == tl') then c
else Fix (ln,(lna,tl',bl'))
| CoFix(ln,(lna,tl,bl)) ->
let tl' = Array.smartmap func tl in
let bl' = Array.smartmap func bl in
if (bl == bl'&& tl == tl') then c
else CoFix (ln,(lna,tl',bl'))
| _ -> c
let subst_mps sub c =
if is_empty_subst sub then c
else map_kn (subst_ind sub) (subst_con0 sub) c
let rec replace_mp_in_mp mpfrom mpto mp =
match mp with
| _ when ModPath.equal mp mpfrom -> mpto
| MPdot (mp1,l) ->
let mp1' = replace_mp_in_mp mpfrom mpto mp1 in
if mp1==mp1' then mp
else MPdot (mp1',l)
| _ -> mp
let rec mp_in_mp mp mp1 =
match mp1 with
| _ when ModPath.equal mp1 mp -> true
| MPdot (mp2,l) -> mp_in_mp mp mp2
| _ -> false
let subset_prefixed_by mp resolver =
let mp_prefix mkey mequ rslv =
if mp_in_mp mp mkey then Deltamap.add_mp mkey mequ rslv else rslv
in
let kn_prefix kn hint rslv =
match hint with
| Inline _ -> rslv
| Equiv _ ->
if mp_in_mp mp (modpath kn) then Deltamap.add_kn kn hint rslv else rslv
in
Deltamap.fold mp_prefix kn_prefix resolver empty_delta_resolver
let subst_dom_delta_resolver subst resolver =
let mp_apply_subst mkey mequ rslv =
Deltamap.add_mp (subst_mp subst mkey) mequ rslv
in
let kn_apply_subst kkey hint rslv =
Deltamap.add_kn (subst_kn subst kkey) hint rslv
in
Deltamap.fold mp_apply_subst kn_apply_subst resolver empty_delta_resolver
let subst_mp_delta sub mp mkey =
match subst_mp0 sub mp with
None -> empty_delta_resolver,mp
| Some (mp',resolve) ->
let mp1 = find_prefix resolve mp' in
let resolve1 = subset_prefixed_by mp1 resolve in
(subst_dom_delta_resolver
(map_mp mp1 mkey) resolve1),mp1
let gen_subst_delta_resolver dom subst resolver =
let mp_apply_subst mkey mequ rslv =
let mkey' = if dom then subst_mp subst mkey else mkey in
let rslv',mequ' = subst_mp_delta subst mequ mkey in
Deltamap.join rslv' (Deltamap.add_mp mkey' mequ' rslv)
in
let kn_apply_subst kkey hint rslv =
let kkey' = if dom then subst_kn subst kkey else kkey in
let hint' = match hint with
| Equiv kequ -> Equiv (subst_kn_delta subst kequ)
| Inline (lev,Some t) -> Inline (lev,Some (subst_mps subst t))
| Inline (_,None) -> hint
in
Deltamap.add_kn kkey' hint' rslv
in
Deltamap.fold mp_apply_subst kn_apply_subst resolver empty_delta_resolver
let subst_codom_delta_resolver = gen_subst_delta_resolver false
let subst_dom_codom_delta_resolver = gen_subst_delta_resolver true
let update_delta_resolver resolver1 resolver2 =
let mp_apply_rslv mkey mequ rslv =
if Deltamap.mem_mp mkey resolver2 then rslv
else Deltamap.add_mp mkey (find_prefix resolver2 mequ) rslv
in
let kn_apply_rslv kkey hint rslv =
if Deltamap.mem_kn kkey resolver2 then rslv
else
let hint' = match hint with
| Equiv kequ -> Equiv (solve_delta_kn resolver2 kequ)
| _ -> hint
in
Deltamap.add_kn kkey hint' rslv
in
Deltamap.fold mp_apply_rslv kn_apply_rslv resolver1 empty_delta_resolver
let add_delta_resolver resolver1 resolver2 =
if resolver1 == resolver2 then
resolver2
else if Deltamap.is_empty resolver2 then
resolver1
else
Deltamap.join (update_delta_resolver resolver1 resolver2) resolver2
let substition_prefixed_by k mp subst =
let mp_prefixmp kmp (mp_to,reso) sub =
if mp_in_mp mp kmp && not (ModPath.equal mp kmp) then
let new_key = replace_mp_in_mp mp k kmp in
Umap.add_mp new_key (mp_to,reso) sub
else sub
in
let mbi_prefixmp mbi _ sub = sub
in
Umap.fold mp_prefixmp mbi_prefixmp subst empty_subst
let join subst1 subst2 =
let apply_subst mpk add (mp,resolve) res =
let mp',resolve' =
match subst_mp0 subst2 mp with
| None -> mp, None
| Some (mp',resolve') -> mp', Some resolve' in
let resolve'' =
match resolve' with
| Some res ->
add_delta_resolver
(subst_dom_codom_delta_resolver subst2 resolve) res
| None ->
subst_codom_delta_resolver subst2 resolve
in
let prefixed_subst = substition_prefixed_by mpk mp' subst2 in
Umap.join prefixed_subst (add (mp',resolve'') res)
in
let mp_apply_subst mp = apply_subst mp (Umap.add_mp mp) in
let mbi_apply_subst mbi = apply_subst (MPbound mbi) (Umap.add_mbi mbi) in
let subst = Umap.fold mp_apply_subst mbi_apply_subst subst1 empty_subst in
Umap.join subst2 subst
let from_val x = { subst_value = x; subst_subst = []; }
let force fsubst r = match r.subst_subst with
| [] -> r.subst_value
| s ->
let subst = List.fold_left join empty_subst (List.rev s) in
let x = fsubst subst r.subst_value in
let () = r.subst_subst <- [] in
let () = r.subst_value <- x in
x
let subst_substituted s r = { r with subst_subst = s :: r.subst_subst; }
let force_constr = force subst_mps
let subst_constr_subst = subst_substituted
let subst_lazy_constr sub = function
| Indirect (l,dp,i) -> Indirect (sub::l,dp,i)
let indirect_opaque_access =
ref ((fun dp i -> assert false) : DirPath.t -> int -> constr)
let indirect_opaque_univ_access =
ref ((fun dp i -> assert false) : DirPath.t -> int -> Univ.constraints)
let force_lazy_constr = function
| Indirect (l,dp,i) ->
let c = !indirect_opaque_access dp i in
force_constr (List.fold_right subst_constr_subst l (from_val c))
let force_lazy_constr_univs = function
| OpaqueDef (Indirect (l,dp,i)) -> !indirect_opaque_univ_access dp i
| _ -> Univ.empty_constraint
let subst_constant_def sub = function
| Undef inl -> Undef inl
| Def c -> Def (subst_constr_subst sub c)
| OpaqueDef lc -> OpaqueDef (subst_lazy_constr sub lc)
(** Local variables and graph *)
let body_of_constant cb = match cb.const_body with
| Undef _ -> None
| Def c -> Some (force_constr c)
| OpaqueDef c -> Some (force_lazy_constr c)
let constant_has_body cb = match cb.const_body with
| Undef _ -> false
| Def _ | OpaqueDef _ -> true
let is_opaque cb = match cb.const_body with
| OpaqueDef _ -> true
| Def _ | Undef _ -> false
let subst_rel_declaration sub (id,copt,t as x) =
let copt' = Option.smartmap (subst_mps sub) copt in
let t' = subst_mps sub t in
if copt == copt' && t == t' then x else (id,copt',t')
let subst_rel_context sub = List.smartmap (subst_rel_declaration sub)
let subst_recarg sub r = match r with
| Norec -> r
| (Mrec(kn,i)|Imbr (kn,i)) -> let kn' = subst_ind sub kn in
if kn==kn' then r else Imbr (kn',i)
let mk_norec = Rtree.mk_node Norec [||]
let mk_paths r recargs =
Rtree.mk_node r
(Array.map (fun l -> Rtree.mk_node Norec (Array.of_list l)) recargs)
let dest_recarg p = fst (Rtree.dest_node p)
let dest_subterms p =
let (_,cstrs) = Rtree.dest_node p in
Array.map (fun t -> Array.to_list (snd (Rtree.dest_node t))) cstrs
let subst_wf_paths sub p = Rtree.smartmap (subst_recarg sub) p
let eq_recarg r1 r2 = match r1, r2 with
| Norec, Norec -> true
| Mrec i1, Mrec i2 -> Names.eq_ind i1 i2
| Imbr i1, Imbr i2 -> Names.eq_ind i1 i2
| _ -> false
let eq_wf_paths = Rtree.equal eq_recarg
(**********************************************************************)
(* Representation of mutual inductive types in the kernel *)
(*
Inductive I1 (params) : U1 := c11 : T11 | ... | c1p1 : T1p1
...
with In (params) : Un := cn1 : Tn1 | ... | cnpn : Tnpn
*)
let subst_decl_arity f g sub ar =
match ar with
| RegularArity x ->
let x' = f sub x in
if x' == x then ar
else RegularArity x'
| TemplateArity x ->
let x' = g sub x in
if x' == x then ar
else TemplateArity x'
let map_decl_arity f g = function
| RegularArity a -> RegularArity (f a)
| TemplateArity a -> TemplateArity (g a)
let subst_rel_declaration sub (id,copt,t as x) =
let copt' = Option.smartmap (subst_mps sub) copt in
let t' = subst_mps sub t in
if copt == copt' && t == t' then x else (id,copt',t')
let subst_rel_context sub = List.smartmap (subst_rel_declaration sub)
let subst_template_cst_arity sub (ctx,s as arity) =
let ctx' = subst_rel_context sub ctx in
if ctx==ctx' then arity else (ctx',s)
let subst_arity sub s = subst_decl_arity subst_mps subst_template_cst_arity sub s
(* TODO: should be changed to non-coping after Term.subst_mps *)
(* NB: we leave bytecode and native code fields untouched *)
let subst_const_body sub cb =
{ cb with
const_body = subst_constant_def sub cb.const_body;
const_type = subst_arity sub cb.const_type }
let subst_regular_ind_arity sub s =
let uar' = subst_mps sub s.mind_user_arity in
if uar' == s.mind_user_arity then s
else { mind_user_arity = uar'; mind_sort = s.mind_sort }
let subst_template_ind_arity sub s = s
(* FIXME records *)
let subst_ind_arity =
subst_decl_arity subst_regular_ind_arity subst_template_ind_arity
let subst_mind_packet sub mbp =
{ mind_consnames = mbp.mind_consnames;
mind_consnrealdecls = mbp.mind_consnrealdecls;
mind_consnrealargs = mbp.mind_consnrealargs;
mind_typename = mbp.mind_typename;
mind_nf_lc = Array.smartmap (subst_mps sub) mbp.mind_nf_lc;
mind_arity_ctxt = subst_rel_context sub mbp.mind_arity_ctxt;
mind_arity = subst_ind_arity sub mbp.mind_arity;
mind_user_lc = Array.smartmap (subst_mps sub) mbp.mind_user_lc;
mind_nrealargs = mbp.mind_nrealargs;
mind_nrealdecls = mbp.mind_nrealdecls;
mind_kelim = mbp.mind_kelim;
mind_recargs = subst_wf_paths sub mbp.mind_recargs (*wf_paths*);
mind_nb_constant = mbp.mind_nb_constant;
mind_nb_args = mbp.mind_nb_args;
mind_reloc_tbl = mbp.mind_reloc_tbl }
let subst_mind sub mib =
{ mib with
mind_params_ctxt = map_rel_context (subst_mps sub) mib.mind_params_ctxt;
mind_packets = Array.smartmap (subst_mind_packet sub) mib.mind_packets }
(* Modules *)
let rec functor_map fty f0 = function
| NoFunctor a -> NoFunctor (f0 a)
| MoreFunctor (mbid,ty,e) -> MoreFunctor(mbid,fty ty,functor_map fty f0 e)
let implem_map fs fa = function
| Struct s -> Struct (fs s)
| Algebraic a -> Algebraic (fa a)
| impl -> impl
let subst_with_body sub = function
| WithMod(id,mp) -> WithMod(id,subst_mp sub mp)
| WithDef(id,c) -> WithDef(id,subst_mps sub c)
let rec subst_expr sub = function
| MEident mp -> MEident (subst_mp sub mp)
| MEapply (me1,mp2)-> MEapply (subst_expr sub me1, subst_mp sub mp2)
| MEwith (me,wd)-> MEwith (subst_expr sub me, subst_with_body sub wd)
let rec subst_expression sub me =
functor_map (subst_modtype sub) (subst_expr sub) me
and subst_signature sub sign =
functor_map (subst_modtype sub) (subst_structure sub) sign
and subst_modtype sub mtb=
{ mtb with
typ_mp = subst_mp sub mtb.typ_mp;
typ_expr = subst_signature sub mtb.typ_expr;
typ_expr_alg = Option.smartmap (subst_expression sub) mtb.typ_expr_alg }
and subst_structure sub struc =
let subst_body = function
| SFBconst cb -> SFBconst (subst_const_body sub cb)
| SFBmind mib -> SFBmind (subst_mind sub mib)
| SFBmodule mb -> SFBmodule (subst_module sub mb)
| SFBmodtype mtb -> SFBmodtype (subst_modtype sub mtb)
in
List.map (fun (l,b) -> (l,subst_body b)) struc
and subst_module sub mb =
{ mb with
mod_mp = subst_mp sub mb.mod_mp;
mod_expr =
implem_map (subst_signature sub) (subst_expression sub) mb.mod_expr;
mod_type = subst_signature sub mb.mod_type;
mod_type_alg = Option.map (subst_expression sub) mb.mod_type_alg }
|