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|
(************************************************************************)
(* * The Coq Proof Assistant / The Coq Development Team *)
(* v * INRIA, CNRS and contributors - Copyright 1999-2018 *)
(* <O___,, * (see CREDITS file for the list of authors) *)
(* \VV/ **************************************************************)
(* // * This file is distributed under the terms of the *)
(* * GNU Lesser General Public License Version 2.1 *)
(* * (see LICENSE file for the text of the license) *)
(************************************************************************)
(* File initially created by Christine Paulin, 1996 *)
(* This file builds various inductive schemes *)
open Pp
open CErrors
open Util
open Names
open Libnames
open Globnames
open Nameops
open Term
open Constr
open Vars
open Namegen
open Declarations
open Declareops
open Inductive
open Inductiveops
open Environ
open Reductionops
open Nametab
open Context.Rel.Declaration
type dep_flag = bool
(* Errors related to recursors building *)
type recursion_scheme_error =
| NotAllowedCaseAnalysis of (*isrec:*) bool * Sorts.t * pinductive
| NotMutualInScheme of inductive * inductive
| NotAllowedDependentAnalysis of (*isrec:*) bool * inductive
exception RecursionSchemeError of recursion_scheme_error
let named_hd env t na = named_hd env Evd.empty (EConstr.of_constr t) na
let name_assumption env = function
| LocalAssum (na,t) -> LocalAssum (named_hd env t na, t)
| LocalDef (na,c,t) -> LocalDef (named_hd env c na, c, t)
let mkLambda_or_LetIn_name env d b = mkLambda_or_LetIn (name_assumption env d) b
let mkProd_or_LetIn_name env d b = mkProd_or_LetIn (name_assumption env d) b
let mkLambda_name env (n,a,b) = mkLambda_or_LetIn_name env (LocalAssum (n,a)) b
let mkProd_name env (n,a,b) = mkProd_or_LetIn_name env (LocalAssum (n,a)) b
let it_mkProd_or_LetIn_name env b l = List.fold_left (fun c d -> mkProd_or_LetIn_name env d c) b l
let it_mkLambda_or_LetIn_name env b l = List.fold_left (fun c d -> mkLambda_or_LetIn_name env d c) b l
let make_prod_dep dep env = if dep then mkProd_name env else mkProd
let mkLambda_string s t c = mkLambda (Name (Id.of_string s), t, c)
(*******************************************)
(* Building curryfied elimination *)
(*******************************************)
let is_private mib =
match mib.mind_private with
| Some true -> true
| _ -> false
let check_privacy_block mib =
if is_private mib then
user_err (str"case analysis on a private inductive type")
(**********************************************************************)
(* Building case analysis schemes *)
(* Christine Paulin, 1996 *)
let mis_make_case_com dep env sigma (ind, u as pind) (mib,mip as specif) kind =
let lnamespar = Vars.subst_instance_context u mib.mind_params_ctxt in
let indf = make_ind_family(pind, Context.Rel.to_extended_list mkRel 0 lnamespar) in
let constrs = get_constructors env indf in
let projs = get_projections env indf in
let () = if Option.is_empty projs then check_privacy_block mib in
let () =
if not (Sorts.List.mem kind (elim_sorts specif)) then
raise
(RecursionSchemeError
(NotAllowedCaseAnalysis (false, fst (UnivGen.fresh_sort_in_family env kind), pind)))
in
let ndepar = mip.mind_nrealdecls + 1 in
(* Pas génant car env ne sert pas à typer mais juste à renommer les Anonym *)
(* mais pas très joli ... (mais manque get_sort_of à ce niveau) *)
let env' = push_rel_context lnamespar env in
let rec add_branch env k =
if Int.equal k (Array.length mip.mind_consnames) then
let nbprod = k+1 in
let indf' = lift_inductive_family nbprod indf in
let arsign,_ = get_arity env indf' in
let depind = build_dependent_inductive env indf' in
let deparsign = LocalAssum (Anonymous,depind)::arsign in
let ci = make_case_info env (fst pind) RegularStyle in
let pbody =
appvect
(mkRel (ndepar + nbprod),
if dep then Context.Rel.to_extended_vect mkRel 0 deparsign
else Context.Rel.to_extended_vect mkRel 1 arsign) in
let p =
it_mkLambda_or_LetIn_name env'
((if dep then mkLambda_name env' else mkLambda)
(Anonymous,depind,pbody))
arsign
in
let obj =
match projs with
| None -> mkCase (ci, lift ndepar p, mkRel 1,
Termops.rel_vect ndepar k)
| Some ps ->
let term =
mkApp (mkRel 2,
Array.map
(fun p -> mkProj (Projection.make p true, mkRel 1)) ps) in
if dep then
let ty = mkApp (mkRel 3, [| mkRel 1 |]) in
mkCast (term, DEFAULTcast, ty)
else term
in
it_mkLambda_or_LetIn_name env' obj deparsign
else
let cs = lift_constructor (k+1) constrs.(k) in
let t = build_branch_type env sigma dep (mkRel (k+1)) cs in
mkLambda_string "f" t
(add_branch (push_rel (LocalAssum (Anonymous, t)) env) (k+1))
in
let (sigma, s) = Evd.fresh_sort_in_family ~rigid:Evd.univ_flexible_alg env sigma kind in
let typP = make_arity env' sigma dep indf s in
let typP = EConstr.Unsafe.to_constr typP in
let c =
it_mkLambda_or_LetIn_name env
(mkLambda_string "P" typP
(add_branch (push_rel (LocalAssum (Anonymous,typP)) env') 0)) lnamespar
in
(sigma, c)
(* check if the type depends recursively on one of the inductive scheme *)
(**********************************************************************)
(* Building the recursive elimination *)
(* Christine Paulin, 1996 *)
(*
* t is the type of the constructor co and recargs is the information on
* the recursive calls. (It is assumed to be in form given by the user).
* build the type of the corresponding branch of the recurrence principle
* assuming f has this type, branch_rec gives also the term
* [x1]..[xk](f xi (F xi) ...) to be put in the corresponding branch of
* the case operation
* FPvect gives for each inductive definition if we want an elimination
* on it with which predicate and which recursive function.
*)
let type_rec_branch is_rec dep env sigma (vargs,depPvect,decP) tyi cs recargs =
let make_prod = make_prod_dep dep in
let nparams = List.length vargs in
let process_pos env depK pk =
let rec prec env i sign p =
let p',largs = whd_allnolet_stack env sigma (EConstr.of_constr p) in
let p' = EConstr.Unsafe.to_constr p' in
let largs = List.map EConstr.Unsafe.to_constr largs in
match kind p' with
| Prod (n,t,c) ->
let d = LocalAssum (n,t) in
make_prod env (n,t,prec (push_rel d env) (i+1) (d::sign) c)
| LetIn (n,b,t,c) when List.is_empty largs ->
let d = LocalDef (n,b,t) in
mkLetIn (n,b,t,prec (push_rel d env) (i+1) (d::sign) c)
| Ind (_,_) ->
let realargs = List.skipn nparams largs in
let base = applist (lift i pk,realargs) in
if depK then
Reduction.beta_appvect
base [|applist (mkRel (i+1), Context.Rel.to_extended_list mkRel 0 sign)|]
else
base
| _ ->
let t' = whd_all env sigma (EConstr.of_constr p) in
let t' = EConstr.Unsafe.to_constr t' in
if Constr.equal p' t' then assert false
else prec env i sign t'
in
prec env 0 []
in
let rec process_constr env i c recargs nhyps li =
if nhyps > 0 then match kind c with
| Prod (n,t,c_0) ->
let (optionpos,rest) =
match recargs with
| [] -> None,[]
| ra::rest ->
(match dest_recarg ra with
| Mrec (_,j) when is_rec -> (depPvect.(j),rest)
| Imbr _ -> (None,rest)
| _ -> (None, rest))
in
(match optionpos with
| None ->
make_prod env
(n,t,
process_constr (push_rel (LocalAssum (n,t)) env) (i+1) c_0 rest
(nhyps-1) (i::li))
| Some(dep',p) ->
let nP = lift (i+1+decP) p in
let env' = push_rel (LocalAssum (n,t)) env in
let t_0 = process_pos env' dep' nP (lift 1 t) in
make_prod_dep (dep || dep') env
(n,t,
mkArrow t_0
(process_constr
(push_rel (LocalAssum (Anonymous,t_0)) env')
(i+2) (lift 1 c_0) rest (nhyps-1) (i::li))))
| LetIn (n,b,t,c_0) ->
mkLetIn (n,b,t,
process_constr
(push_rel (LocalDef (n,b,t)) env)
(i+1) c_0 recargs (nhyps-1) li)
| _ -> assert false
else
if dep then
let realargs = List.rev_map (fun k -> mkRel (i-k)) li in
let params = List.map (lift i) vargs in
let co = applist (mkConstructU cs.cs_cstr,params@realargs) in
Reduction.beta_appvect c [|co|]
else c
in
let nhyps = List.length cs.cs_args in
let nP = match depPvect.(tyi) with
| Some(_,p) -> lift (nhyps+decP) p
| _ -> assert false in
let base = appvect (nP,cs.cs_concl_realargs) in
let c = it_mkProd_or_LetIn base cs.cs_args in
process_constr env 0 c recargs nhyps []
let make_rec_branch_arg env sigma (nparrec,fvect,decF) f cstr recargs =
let process_pos env fk =
let rec prec env i hyps p =
let p',largs = whd_allnolet_stack env sigma (EConstr.of_constr p) in
let p' = EConstr.Unsafe.to_constr p' in
let largs = List.map EConstr.Unsafe.to_constr largs in
match kind p' with
| Prod (n,t,c) ->
let d = LocalAssum (n,t) in
mkLambda_name env (n,t,prec (push_rel d env) (i+1) (d::hyps) c)
| LetIn (n,b,t,c) when List.is_empty largs ->
let d = LocalDef (n,b,t) in
mkLetIn (n,b,t,prec (push_rel d env) (i+1) (d::hyps) c)
| Ind _ ->
let realargs = List.skipn nparrec largs
and arg = appvect (mkRel (i+1), Context.Rel.to_extended_vect mkRel 0 hyps) in
applist(lift i fk,realargs@[arg])
| _ ->
let t' = whd_all env sigma (EConstr.of_constr p) in
let t' = EConstr.Unsafe.to_constr t' in
if Constr.equal t' p' then assert false
else prec env i hyps t'
in
prec env 0 []
in
(* ici, cstrprods est la liste des produits du constructeur instantié *)
let rec process_constr env i f = function
| (LocalAssum (n,t) as d)::cprest, recarg::rest ->
let optionpos =
match dest_recarg recarg with
| Norec -> None
| Imbr _ -> None
| Mrec (_,i) -> fvect.(i)
in
(match optionpos with
| None ->
mkLambda_name env
(n,t,process_constr (push_rel d env) (i+1)
(EConstr.Unsafe.to_constr (whd_beta Evd.empty (EConstr.of_constr (applist (lift 1 f, [(mkRel 1)])))))
(cprest,rest))
| Some(_,f_0) ->
let nF = lift (i+1+decF) f_0 in
let env' = push_rel d env in
let arg = process_pos env' nF (lift 1 t) in
mkLambda_name env
(n,t,process_constr env' (i+1)
(EConstr.Unsafe.to_constr (whd_beta Evd.empty (EConstr.of_constr (applist (lift 1 f, [(mkRel 1); arg])))))
(cprest,rest)))
| (LocalDef (n,c,t) as d)::cprest, rest ->
mkLetIn
(n,c,t,
process_constr (push_rel d env) (i+1) (lift 1 f)
(cprest,rest))
| [],[] -> f
| _,[] | [],_ -> anomaly (Pp.str "process_constr.")
in
process_constr env 0 f (List.rev cstr.cs_args, recargs)
(* Main function *)
let mis_make_indrec env sigma listdepkind mib u =
let nparams = mib.mind_nparams in
let nparrec = mib.mind_nparams_rec in
let evdref = ref sigma in
let lnonparrec,lnamesparrec =
Termops.context_chop (nparams-nparrec) (Vars.subst_instance_context u mib.mind_params_ctxt) in
let nrec = List.length listdepkind in
let depPvec =
Array.make mib.mind_ntypes (None : (bool * constr) option) in
let _ =
let rec
assign k = function
| [] -> ()
| ((indi,u),mibi,mipi,dep,_)::rest ->
(Array.set depPvec (snd indi) (Some(dep,mkRel k));
assign (k-1) rest)
in
assign nrec listdepkind in
let recargsvec =
Array.map (fun mip -> mip.mind_recargs) mib.mind_packets in
(* recarg information for non recursive parameters *)
let rec recargparn l n =
if Int.equal n 0 then l else recargparn (mk_norec::l) (n-1) in
let recargpar = recargparn [] (nparams-nparrec) in
let make_one_rec p =
let makefix nbconstruct =
let rec mrec i ln ltyp ldef = function
| ((indi,u),mibi,mipi,dep,_)::rest ->
let tyi = snd indi in
let nctyi =
Array.length mipi.mind_consnames in (* nb constructeurs du type*)
(* arity in the context of the fixpoint, i.e.
P1..P_nrec f1..f_nbconstruct *)
let args = Context.Rel.to_extended_list mkRel (nrec+nbconstruct) lnamesparrec in
let indf = make_ind_family((indi,u),args) in
let arsign,_ = get_arity env indf in
let depind = build_dependent_inductive env indf in
let deparsign = LocalAssum (Anonymous,depind)::arsign in
let nonrecpar = Context.Rel.length lnonparrec in
let larsign = Context.Rel.length deparsign in
let ndepar = larsign - nonrecpar in
let dect = larsign+nrec+nbconstruct in
(* constructors in context of the Cases expr, i.e.
P1..P_nrec f1..f_nbconstruct F_1..F_nrec a_1..a_nar x:I *)
let args' = Context.Rel.to_extended_list mkRel (dect+nrec) lnamesparrec in
let args'' = Context.Rel.to_extended_list mkRel ndepar lnonparrec in
let indf' = make_ind_family((indi,u),args'@args'') in
let branches =
let constrs = get_constructors env indf' in
let fi = Termops.rel_vect (dect-i-nctyi) nctyi in
let vecfi = Array.map
(fun f -> appvect (f, Context.Rel.to_extended_vect mkRel ndepar lnonparrec))
fi
in
Array.map3
(make_rec_branch_arg env !evdref
(nparrec,depPvec,larsign))
vecfi constrs (dest_subterms recargsvec.(tyi))
in
let j = (match depPvec.(tyi) with
| Some (_,c) when isRel c -> destRel c
| _ -> assert false)
in
(* Predicate in the context of the case *)
let depind' = build_dependent_inductive env indf' in
let arsign',_ = get_arity env indf' in
let deparsign' = LocalAssum (Anonymous,depind')::arsign' in
let pargs =
let nrpar = Context.Rel.to_extended_list mkRel (2*ndepar) lnonparrec
and nrar = if dep then Context.Rel.to_extended_list mkRel 0 deparsign'
else Context.Rel.to_extended_list mkRel 1 arsign'
in nrpar@nrar
in
(* body of i-th component of the mutual fixpoint *)
let deftyi =
let ci = make_case_info env indi RegularStyle in
let concl = applist (mkRel (dect+j+ndepar),pargs) in
let pred =
it_mkLambda_or_LetIn_name env
((if dep then mkLambda_name env else mkLambda)
(Anonymous,depind',concl))
arsign'
in
let obj =
Inductiveops.make_case_or_project env !evdref indf ci (EConstr.of_constr pred)
(EConstr.mkRel 1) (Array.map EConstr.of_constr branches)
in
let obj = EConstr.to_constr !evdref obj in
it_mkLambda_or_LetIn_name env obj
(Termops.lift_rel_context nrec deparsign)
in
(* type of i-th component of the mutual fixpoint *)
let typtyi =
let concl =
let pargs = if dep then Context.Rel.to_extended_vect mkRel 0 deparsign
else Context.Rel.to_extended_vect mkRel 1 arsign
in appvect (mkRel (nbconstruct+ndepar+nonrecpar+j),pargs)
in it_mkProd_or_LetIn_name env
concl
deparsign
in
mrec (i+nctyi) (Context.Rel.nhyps arsign ::ln) (typtyi::ltyp)
(deftyi::ldef) rest
| [] ->
let fixn = Array.of_list (List.rev ln) in
let fixtyi = Array.of_list (List.rev ltyp) in
let fixdef = Array.of_list (List.rev ldef) in
let names = Array.make nrec (Name(Id.of_string "F")) in
mkFix ((fixn,p),(names,fixtyi,fixdef))
in
mrec 0 [] [] []
in
let rec make_branch env i = function
| ((indi,u),mibi,mipi,dep,_)::rest ->
let tyi = snd indi in
let nconstr = Array.length mipi.mind_consnames in
let rec onerec env j =
if Int.equal j nconstr then
make_branch env (i+j) rest
else
let recarg = (dest_subterms recargsvec.(tyi)).(j) in
let recarg = recargpar@recarg in
let vargs = Context.Rel.to_extended_list mkRel (nrec+i+j) lnamesparrec in
let cs = get_constructor ((indi,u),mibi,mipi,vargs) (j+1) in
let p_0 =
type_rec_branch
true dep env !evdref (vargs,depPvec,i+j) tyi cs recarg
in
mkLambda_string "f" p_0
(onerec (push_rel (LocalAssum (Anonymous,p_0)) env) (j+1))
in onerec env 0
| [] ->
makefix i listdepkind
in
let rec put_arity env i = function
| ((indi,u),_,_,dep,kinds)::rest ->
let indf = make_ind_family ((indi,u), Context.Rel.to_extended_list mkRel i lnamesparrec) in
let s =
Evarutil.evd_comb1 (Evd.fresh_sort_in_family ~rigid:Evd.univ_flexible_alg env)
evdref kinds
in
let typP = make_arity env !evdref dep indf s in
let typP = EConstr.Unsafe.to_constr typP in
mkLambda_string "P" typP
(put_arity (push_rel (LocalAssum (Anonymous,typP)) env) (i+1) rest)
| [] ->
make_branch env 0 listdepkind
in
(* Body on make_one_rec *)
let ((indi,u),mibi,mipi,dep,kind) = List.nth listdepkind p in
if (mis_is_recursive_subset
(List.map (fun ((indi,u),_,_,_,_) -> snd indi) listdepkind)
mipi.mind_recargs)
then
let env' = push_rel_context lnamesparrec env in
it_mkLambda_or_LetIn_name env (put_arity env' 0 listdepkind)
lnamesparrec
else
let evd = !evdref in
let (evd, c) = mis_make_case_com dep env evd (indi,u) (mibi,mipi) kind in
evdref := evd; c
in
(* Body of mis_make_indrec *)
!evdref, List.init nrec make_one_rec
(**********************************************************************)
(* This builds elimination predicate for Case tactic *)
let build_case_analysis_scheme env sigma pity dep kind =
let (mib,mip) = lookup_mind_specif env (fst pity) in
if dep && not (Inductiveops.has_dependent_elim mib) then
raise (RecursionSchemeError (NotAllowedDependentAnalysis (false, fst pity)));
mis_make_case_com dep env sigma pity (mib,mip) kind
let is_in_prop mip =
match inductive_sort_family mip with
| InProp -> true
| _ -> false
let build_case_analysis_scheme_default env sigma pity kind =
let (mib,mip) = lookup_mind_specif env (fst pity) in
let dep = not (is_in_prop mip || not (Inductiveops.has_dependent_elim mib)) in
mis_make_case_com dep env sigma pity (mib,mip) kind
(**********************************************************************)
(* [modify_sort_scheme s rec] replaces the sort of the scheme
[rec] by [s] *)
let change_sort_arity sort =
let rec drec a = match kind a with
| Cast (c,_,_) -> drec c
| Prod (n,t,c) -> let s, c' = drec c in s, mkProd (n, t, c')
| LetIn (n,b,t,c) -> let s, c' = drec c in s, mkLetIn (n,b,t,c')
| Sort s -> s, mkSort sort
| _ -> assert false
in
drec
(* Change the sort in the type of an inductive definition, builds the
corresponding eta-expanded term *)
let weaken_sort_scheme env evd set sort npars term ty =
let evdref = ref evd in
let rec drec np elim =
match kind elim with
| Prod (n,t,c) ->
if Int.equal np 0 then
let osort, t' = change_sort_arity sort t in
evdref := (if set then Evd.set_eq_sort else Evd.set_leq_sort) env !evdref sort osort;
mkProd (n, t', c),
mkLambda (n, t', mkApp(term,Termops.rel_vect 0 (npars+1)))
else
let c',term' = drec (np-1) c in
mkProd (n, t, c'), mkLambda (n, t, term')
| LetIn (n,b,t,c) -> let c',term' = drec np c in
mkLetIn (n,b,t,c'), mkLetIn (n,b,t,term')
| _ -> anomaly ~label:"weaken_sort_scheme" (Pp.str "wrong elimination type.")
in
let ty, term = drec npars ty in
!evdref, ty, term
(**********************************************************************)
(* Interface to build complex Scheme *)
(* Check inductive types only occurs once
(otherwise we obtain a meaning less scheme) *)
let check_arities env listdepkind =
let _ = List.fold_left
(fun ln (((_,ni as mind),u),mibi,mipi,dep,kind) ->
let kelim = elim_sorts (mibi,mipi) in
if not (Sorts.List.mem kind kelim) then raise
(RecursionSchemeError
(NotAllowedCaseAnalysis (true, fst (UnivGen.fresh_sort_in_family env
kind),(mind,u))))
else if Int.List.mem ni ln then raise
(RecursionSchemeError (NotMutualInScheme (mind,mind)))
else ni::ln)
[] listdepkind
in true
let build_mutual_induction_scheme env sigma = function
| ((mind,u),dep,s)::lrecspec ->
let (mib,mip) = lookup_mind_specif env mind in
if dep && not (Inductiveops.has_dependent_elim mib) then
raise (RecursionSchemeError (NotAllowedDependentAnalysis (true, mind)));
let (sp,tyi) = mind in
let listdepkind =
((mind,u),mib,mip,dep,s)::
(List.map
(function ((mind',u'),dep',s') ->
let (sp',_) = mind' in
if MutInd.equal sp sp' then
let (mibi',mipi') = lookup_mind_specif env mind' in
((mind',u'),mibi',mipi',dep',s')
else
raise (RecursionSchemeError (NotMutualInScheme (mind,mind'))))
lrecspec)
in
let _ = check_arities env listdepkind in
mis_make_indrec env sigma listdepkind mib u
| _ -> anomaly (Pp.str "build_induction_scheme expects a non empty list of inductive types.")
let build_induction_scheme env sigma pind dep kind =
let (mib,mip) = lookup_mind_specif env (fst pind) in
if dep && not (Inductiveops.has_dependent_elim mib) then
raise (RecursionSchemeError (NotAllowedDependentAnalysis (true, fst pind)));
let sigma, l = mis_make_indrec env sigma [(pind,mib,mip,dep,kind)] mib (snd pind) in
sigma, List.hd l
(*s Eliminations. *)
let elimination_suffix = function
| InProp -> "_ind"
| InSet -> "_rec"
| InType -> "_rect"
let case_suffix = "_case"
let make_elimination_ident id s = add_suffix id (elimination_suffix s)
(* Look up function for the default elimination constant *)
let lookup_eliminator ind_sp s =
let kn,i = ind_sp in
let mp,dp,l = KerName.repr (MutInd.canonical kn) in
let ind_id = (Global.lookup_mind kn).mind_packets.(i).mind_typename in
let id = add_suffix ind_id (elimination_suffix s) in
(* Try first to get an eliminator defined in the same section as the *)
(* inductive type *)
try
let cst =Global.constant_of_delta_kn (KerName.make mp dp (Label.of_id id)) in
let _ = Global.lookup_constant cst in
ConstRef cst
with Not_found ->
(* Then try to get a user-defined eliminator in some other places *)
(* using short name (e.g. for "eq_rec") *)
try Nametab.locate (qualid_of_ident id)
with Not_found ->
user_err ~hdr:"default_elim"
(strbrk "Cannot find the elimination combinator " ++
Id.print id ++ strbrk ", the elimination of the inductive definition " ++
pr_global_env Id.Set.empty (IndRef ind_sp) ++
strbrk " on sort " ++ Termops.pr_sort_family s ++
strbrk " is probably not allowed.")
|