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|
(************************************************************************)
(* v * The Coq Proof Assistant / The Coq Development Team *)
(* <O___,, * CNRS-Ecole Polytechnique-INRIA Futurs-Universite Paris Sud *)
(* \VV/ **************************************************************)
(* // * This file is distributed under the terms of the *)
(* * GNU Lesser General Public License Version 2.1 *)
(************************************************************************)
(* $Id$ *)
open Pp
open Util
open Options
open Term
open Termops
open Declarations
open Entries
open Inductive
open Environ
open Reduction
open Redexpr
open Declare
open Nametab
open Names
open Libnames
open Nameops
open Topconstr
open Library
open Libobject
open Constrintern
open Proof_type
open Tacmach
open Safe_typing
open Nametab
open Typeops
open Indtypes
open Vernacexpr
open Decl_kinds
open Pretyping
open Notation
let mkLambdaCit = List.fold_right (fun (x,a) b -> mkLambdaC(x,a,b))
let mkProdCit = List.fold_right (fun (x,a) b -> mkProdC(x,a,b))
let rec abstract_constr_expr c = function
| [] -> c
| LocalRawDef (x,b)::bl -> mkLetInC(x,b,abstract_constr_expr c bl)
| LocalRawAssum (idl,t)::bl ->
List.fold_right (fun x b -> mkLambdaC([x],t,b)) idl
(abstract_constr_expr c bl)
let rec generalize_constr_expr c = function
| [] -> c
| LocalRawDef (x,b)::bl -> mkLetInC(x,b,generalize_constr_expr c bl)
| LocalRawAssum (idl,t)::bl ->
List.fold_right (fun x b -> mkProdC([x],t,b)) idl
(generalize_constr_expr c bl)
let rec length_of_raw_binders = function
| [] -> 0
| LocalRawDef _::bl -> 1 + length_of_raw_binders bl
| LocalRawAssum (idl,_)::bl -> List.length idl + length_of_raw_binders bl
let rec under_binders env f n c =
if n = 0 then f env Evd.empty c else
match kind_of_term c with
| Lambda (x,t,c) ->
mkLambda (x,t,under_binders (push_rel (x,None,t) env) f (n-1) c)
| LetIn (x,b,t,c) ->
mkLetIn (x,b,t,under_binders (push_rel (x,Some b,t) env) f (n-1) c)
| _ -> assert false
let rec destSubCast c = match kind_of_term c with
| Lambda (x,t,c) ->
let (b,u) = destSubCast c in mkLambda (x,t,b), mkProd (x,t,u)
| LetIn (x,b,t,c) ->
let (d,u) = destSubCast c in mkLetIn (x,b,t,d), mkLetIn (x,b,t,u)
| Cast (b,_, u) -> (b,u)
| _ -> assert false
let rec adjust_conclusion a cs = function
| CProdN (loc,bl,c) -> CProdN (loc,bl,adjust_conclusion a cs c)
| CLetIn (loc,b,t,c) -> CLetIn (loc,b,t,adjust_conclusion a cs c)
| CHole loc ->
let (nar,name,params) = a in
if nar <> 0 then
user_err_loc (loc,"",
str "Cannot infer the non constant arguments of the conclusion of "
++ pr_id cs);
let args = List.map (fun id -> CRef(Ident(loc,id))) params in
CAppExpl (loc,(None,Ident(loc,name)),List.rev args)
| c -> c
(* Commands of the interface *)
(* 1| Constant definitions *)
let definition_message id =
if_verbose message ((string_of_id id) ^ " is defined")
let constant_entry_of_com (bl,com,comtypopt,opacity,boxed) =
let sigma = Evd.empty in
let env = Global.env() in
match comtypopt with
None ->
let b = abstract_constr_expr com bl in
let j = interp_constr_judgment sigma env b in
{ const_entry_body = j.uj_val;
const_entry_type = Some (refresh_universes j.uj_type);
const_entry_opaque = opacity;
const_entry_boxed = boxed }
| Some comtyp ->
(* We use a cast to avoid troubles with evars in comtyp *)
(* that can only be resolved knowing com *)
let b = abstract_constr_expr (mkCastC (com,DEFAULTcast,comtyp)) bl in
let (body,typ) = destSubCast (interp_constr sigma env b) in
{ const_entry_body = body;
const_entry_type = Some typ;
const_entry_opaque = opacity;
const_entry_boxed = boxed }
let red_constant_entry bl ce = function
| None -> ce
| Some red ->
let body = ce.const_entry_body in
{ ce with const_entry_body =
under_binders (Global.env()) (fst (reduction_of_red_expr red))
(length_of_raw_binders bl)
body }
let declare_global_definition ident ce local =
let kn = declare_constant ident (DefinitionEntry ce,IsDefinition Definition) in
if local = Local && Options.is_verbose() then
msg_warning (pr_id ident ++ str" is declared as a global definition");
definition_message ident;
ConstRef kn
let declare_definition ident (local,boxed,dok) bl red_option c typopt hook =
let ce = constant_entry_of_com (bl,c,typopt,false,boxed) in
let ce' = red_constant_entry bl ce red_option in
let r = match local with
| Local when Lib.sections_are_opened () ->
let c =
SectionLocalDef(ce'.const_entry_body,ce'.const_entry_type,false) in
let _ = declare_variable ident (Lib.cwd(),c,IsDefinition Definition) in
definition_message ident;
if Pfedit.refining () then
msgerrnl (str"Warning: Local definition " ++ pr_id ident ++
str" is not visible from current goals");
VarRef ident
| (Global|Local) ->
declare_global_definition ident ce' local in
hook local r
let syntax_definition ident c local onlyparse =
let c = snd (interp_aconstr [] [] c) in
Syntax_def.declare_syntactic_definition local ident onlyparse c
(* 2| Variable/Hypothesis/Parameter/Axiom declarations *)
let assumption_message id =
if_verbose message ((string_of_id id) ^ " is assumed")
let declare_one_assumption is_coe (local,kind) c (_,ident) =
let r = match local with
| Local when Lib.sections_are_opened () ->
let _ =
declare_variable ident
(Lib.cwd(), SectionLocalAssum c, IsAssumption kind) in
assumption_message ident;
if is_verbose () & Pfedit.refining () then
msgerrnl (str"Warning: Variable " ++ pr_id ident ++
str" is not visible from current goals");
VarRef ident
| (Global|Local) ->
let kn =
declare_constant ident (ParameterEntry c, IsAssumption kind) in
assumption_message ident;
if local=Local & Options.is_verbose () then
msg_warning (pr_id ident ++ str" is declared as a parameter" ++
str" because it is at a global level");
ConstRef kn in
if is_coe then Class.try_add_new_coercion r local
let declare_assumption idl is_coe k bl c =
let c = generalize_constr_expr c bl in
let c = interp_type Evd.empty (Global.env()) c in
List.iter (declare_one_assumption is_coe k c) idl
(* 3a| Elimination schemes for mutual inductive definitions *)
open Indrec
let non_type_eliminations =
[ (InProp,elimination_suffix InProp);
(InSet,elimination_suffix InSet) ]
let declare_one_elimination ind =
let (mib,mip) = Global.lookup_inductive ind in
let mindstr = string_of_id mip.mind_typename in
let declare s c t =
let id = id_of_string s in
let kn = Declare.declare_internal_constant id
(DefinitionEntry
{ const_entry_body = c;
const_entry_type = t;
const_entry_opaque = false;
const_entry_boxed = Options.boxed_definitions() },
Decl_kinds.IsDefinition Definition) in
definition_message id;
kn
in
let env = Global.env () in
let sigma = Evd.empty in
let elim_scheme = Indrec.build_indrec env sigma ind in
let npars = mib.mind_nparams_rec in
let make_elim s = Indrec.instantiate_indrec_scheme s npars elim_scheme in
let kelim = mip.mind_kelim in
(* in case the inductive has a type elimination, generates only one
induction scheme, the other ones share the same code with the
apropriate type *)
if List.mem InType kelim then
let elim = make_elim (new_sort_in_family InType) in
let cte = declare (mindstr^(Indrec.elimination_suffix InType)) elim None in
let c = mkConst cte and t = constant_type (Global.env()) cte in
List.iter (fun (sort,suff) ->
let (t',c') =
Indrec.instantiate_type_indrec_scheme (new_sort_in_family sort)
npars c t in
let _ = declare (mindstr^suff) c' (Some t') in ())
non_type_eliminations
else (* Impredicative or logical inductive definition *)
List.iter
(fun (sort,suff) ->
if List.mem sort kelim then
let elim = make_elim (new_sort_in_family sort) in
let _ = declare (mindstr^suff) elim None in ())
non_type_eliminations
let declare_eliminations sp =
let mib = Global.lookup_mind sp in
if mib.mind_finite then
for i = 0 to Array.length mib.mind_packets - 1 do
declare_one_elimination (sp,i)
done
(* 3b| Mutual Inductive definitions *)
let minductive_message = function
| [] -> error "no inductive definition"
| [x] -> (pr_id x ++ str " is defined")
| l -> hov 0 (prlist_with_sep pr_coma pr_id l ++
spc () ++ str "are defined")
let recursive_message v =
match Array.length v with
| 0 -> error "no recursive definition"
| 1 -> (Printer.pr_global v.(0) ++ str " is recursively defined")
| _ -> hov 0 (prvect_with_sep pr_coma Printer.pr_global v ++
spc () ++ str "are recursively defined")
let corecursive_message v =
match Array.length v with
| 0 -> error "no corecursive definition"
| 1 -> (Printer.pr_global v.(0) ++ str " is corecursively defined")
| _ -> hov 0 (prvect_with_sep pr_coma Printer.pr_global v ++
spc () ++ str "are corecursively defined")
let interp_mutual lparams lnamearconstrs finite =
let allnames =
List.fold_left (fun acc (id,_,_,l) -> id::(List.map fst l)@acc)
[] lnamearconstrs in
if not (list_distinct allnames) then
error "Two inductive objects have the same name";
let sigma = Evd.empty and env0 = Global.env() in
let env_params, params = interp_context sigma env0 lparams in
(* Builds the params of the inductive entry *)
let params' =
List.map (fun (na,b,t) ->
let id = match na with
| Name id -> id
| Anonymous -> anomaly "Unnamed inductive variable" in
match b with
| None -> (id, LocalAssum t)
| Some b -> (id, LocalDef b)) params
in
let paramassums =
List.fold_right (fun d l -> match d with
(id,LocalAssum _) -> id::l | (_,LocalDef _) -> l) params' [] in
let nparamassums = List.length paramassums in
let (ind_env,ind_impls,arityl) =
List.fold_left
(fun (env, ind_impls, arl) (recname, _, arityc, _) ->
let arity = interp_type sigma env_params arityc in
let fullarity = it_mkProd_or_LetIn arity params in
let env' = Termops.push_rel_assum (Name recname,fullarity) env in
let argsc = compute_arguments_scope fullarity in
let ind_impls' =
if Impargs.is_implicit_args() then
let impl = Impargs.compute_implicits env_params fullarity in
let paramimpl,_ = list_chop nparamassums impl in
let l = List.fold_right
(fun imp l -> if Impargs.is_status_implicit imp then
Impargs.name_of_implicit imp::l else l) paramimpl [] in
(recname,(l,impl,argsc))::ind_impls
else
(recname,([],[],argsc))::ind_impls in
(env', ind_impls', (arity::arl)))
(env0, [], []) lnamearconstrs
in
(* Names of parameters as arguments of the inductive type (defs removed) *)
let lparargs =
List.flatten
(List.map (function (id,LocalAssum _) -> [id] | _ -> []) params') in
let notations =
List.fold_right (fun (_,ntnopt,_,_) l -> option_cons ntnopt l)
lnamearconstrs [] in
let fs = States.freeze() in
(* Declare the notations for the inductive types pushed in local context*)
try
List.iter (fun (df,c,scope) -> (* No scope for tmp notation *)
Metasyntax.add_notation_interpretation df ind_impls c None) notations;
let ind_env_params = push_rel_context params ind_env in
let mispecvec =
List.map2
(fun ar (name,_,_,lname_constr) ->
let constrnames, bodies = List.split lname_constr in
(* Compute the conclusions of constructor types *)
(* for inductive given in ML syntax *)
let nar =
List.length (fst (Reductionops.splay_arity env_params Evd.empty ar))
in
let bodies =
List.map2 (adjust_conclusion (nar,name,lparargs))
constrnames bodies
in
(* Interpret the constructor types *)
let constrs =
List.map
(interp_type sigma ind_env_params ~impls:(paramassums,ind_impls))
bodies
in
(* Build the inductive entry *)
{ mind_entry_typename = name;
mind_entry_arity = ar;
mind_entry_consnames = constrnames;
mind_entry_lc = constrs })
(List.rev arityl) lnamearconstrs
in
States.unfreeze fs;
notations, { mind_entry_params = params';
mind_entry_record = false;
mind_entry_finite = finite;
mind_entry_inds = mispecvec }
with e -> States.unfreeze fs; raise e
let declare_mutual_with_eliminations isrecord mie =
let lrecnames =
List.map (fun e -> e.mind_entry_typename) mie.mind_entry_inds in
let (_,kn) = declare_mind isrecord mie in
if_verbose ppnl (minductive_message lrecnames);
declare_eliminations kn;
kn
(* Very syntactical equality *)
let eq_la d1 d2 = match d1,d2 with
| LocalRawAssum (nal,ast), LocalRawAssum (nal',ast') ->
(List.length nal = List.length nal') &&
List.for_all2 (fun (_,na) (_,na') -> na = na') nal nal'
& (try let _ = Constrextern.check_same_type ast ast' in true with _ -> false)
| LocalRawDef ((_,id),ast), LocalRawDef ((_,id'),ast') ->
id=id' & (try let _ = Constrextern.check_same_type ast ast' in true with _ -> false)
| _ -> false
let extract_coe lc =
List.fold_right
(fun (addcoe,((_,(id:identifier)),t)) (l1,l2) ->
((if addcoe then id::l1 else l1), (id,t)::l2)) lc ([],[])
let extract_coe_la_lc = function
| [] -> anomaly "Vernacentries: empty list of inductive types"
| ((_,id),ntn,la,ar,lc)::rest ->
let rec check = function
| [] -> [],[]
| ((_,id),ntn,la',ar,lc)::rest ->
if (List.length la = List.length la') &&
(List.for_all2 eq_la la la')
then
let mcoes, mspec = check rest in
let coes, lc' = extract_coe lc in
(coes::mcoes,(id,ntn,ar,lc')::mspec)
else
error ("Parameters should be syntactically the same "^
"for each inductive type")
in
let mcoes, mspec = check rest in
let coes, lc' = extract_coe lc in
(coes,la,(id,ntn,ar,lc'):: mspec)
let build_mutual lind finite =
let ((coes:identifier list),lparams,lnamearconstructs) = extract_coe_la_lc lind in
let notations,mie = interp_mutual lparams lnamearconstructs finite in
let _ = declare_mutual_with_eliminations false mie in
(* Declare the notations now bound to the inductive types *)
List.iter (fun (df,c,scope) ->
Metasyntax.add_notation_interpretation df [] c scope) notations;
List.iter
(fun id ->
Class.try_add_new_coercion (locate (make_short_qualid id)) Global) coes
(* try to find non recursive definitions *)
let list_chop_hd i l = match list_chop i l with
| (l1,x::l2) -> (l1,x,l2)
| _ -> assert false
let collect_non_rec env =
let rec searchrec lnonrec lnamerec ldefrec larrec nrec =
try
let i =
list_try_find_i
(fun i f ->
if List.for_all (fun def -> not (occur_var env f def)) ldefrec
then i else failwith "try_find_i")
0 lnamerec
in
let (lf1,f,lf2) = list_chop_hd i lnamerec in
let (ldef1,def,ldef2) = list_chop_hd i ldefrec in
let (lar1,ar,lar2) = list_chop_hd i larrec in
let newlnv =
try
match list_chop i nrec with
| (lnv1,_::lnv2) -> (lnv1@lnv2)
| _ -> [] (* nrec=[] for cofixpoints *)
with Failure "list_chop" -> []
in
searchrec ((f,def,ar)::lnonrec)
(lf1@lf2) (ldef1@ldef2) (lar1@lar2) newlnv
with Failure "try_find_i" ->
(List.rev lnonrec,
(Array.of_list lnamerec, Array.of_list ldefrec,
Array.of_list larrec, Array.of_list nrec))
in
searchrec []
let build_recursive (lnameargsardef:(fixpoint_expr *decl_notation) list)
boxed =
let lrecnames = List.map (fun ((f,_,_,_,_),_) -> f) lnameargsardef
and sigma = Evd.empty
and env0 = Global.env()
and nv = Array.of_list (List.map (fun ((_,n,_,_,_),_) -> n) lnameargsardef) in
(* Build the recursive context and notations for the recursive types *)
let (rec_sign,rec_impls,arityl) =
List.fold_left
(fun (env,impls,arl) ((recname,_,bl,arityc,_),_) ->
let arityc = generalize_constr_expr arityc bl in
let arity = interp_type sigma env0 arityc in
let impl =
if Impargs.is_implicit_args()
then Impargs.compute_implicits env0 arity
else [] in
let impls' =(recname,([],impl,compute_arguments_scope arity))::impls in
(Environ.push_named (recname,None,arity) env, impls', arity::arl))
(env0,[],[]) lnameargsardef in
let arityl = List.rev arityl in
let notations =
List.fold_right (fun (_,ntnopt) l -> option_cons ntnopt l)
lnameargsardef [] in
let recdef =
(* Declare local notations *)
let fs = States.freeze() in
let def =
try
List.iter (fun (df,c,scope) -> (* No scope for tmp notation *)
Metasyntax.add_notation_interpretation df rec_impls c None) notations;
List.map2
(fun ((_,_,bl,_,def),_) arity ->
let def = abstract_constr_expr def bl in
interp_casted_constr sigma rec_sign ~impls:([],rec_impls)
def arity)
lnameargsardef arityl
with e ->
States.unfreeze fs; raise e in
States.unfreeze fs; def
in
let (lnonrec,(namerec,defrec,arrec,nvrec)) =
collect_non_rec env0 lrecnames recdef arityl (Array.to_list nv) in
let recvec =
Array.map (subst_vars (List.rev (Array.to_list namerec))) defrec in
let recdecls = (Array.map (fun id -> Name id) namerec, arrec, recvec) in
let rec declare i fi =
let ce =
{ const_entry_body = mkFix ((nvrec,i),recdecls);
const_entry_type = Some arrec.(i);
const_entry_opaque = false;
const_entry_boxed = boxed} in
let kn = declare_constant fi (DefinitionEntry ce,IsDefinition Fixpoint)
in (ConstRef kn)
in
(* declare the recursive definitions *)
let lrefrec = Array.mapi declare namerec in
if_verbose ppnl (recursive_message lrefrec);
(* The others are declared as normal definitions *)
let var_subst id = (id, global_reference id) in
let _ =
List.fold_left
(fun subst (f,def,t) ->
let ce = { const_entry_body = replace_vars subst def;
const_entry_type = Some t;
const_entry_opaque = false;
const_entry_boxed = boxed } in
let _ =
declare_constant f (DefinitionEntry ce,IsDefinition Definition)
in
warning ((string_of_id f)^" is non-recursively defined");
(var_subst f) :: subst)
(List.map var_subst (Array.to_list namerec))
lnonrec
in
List.iter (fun (df,c,scope) ->
Metasyntax.add_notation_interpretation df [] c scope) notations
let build_corecursive lnameardef boxed =
let lrecnames = List.map (fun (f,_,_,_) -> f) lnameardef
and sigma = Evd.empty
and env0 = Global.env() in
let fs = States.freeze() in
let (rec_sign,arityl) =
try
List.fold_left
(fun (env,arl) (recname,bl,arityc,_) ->
let arityc = generalize_constr_expr arityc bl in
let arity = interp_type Evd.empty env0 arityc in
let _ = declare_variable recname
(Lib.cwd(),SectionLocalAssum arity,IsAssumption Definitional) in
(Environ.push_named (recname,None,arity) env, (arity::arl)))
(env0,[]) lnameardef
with e ->
States.unfreeze fs; raise e in
let arityl = List.rev arityl in
let recdef =
try
List.map (fun (_,bl,arityc,def) ->
let arityc = generalize_constr_expr arityc bl in
let def = abstract_constr_expr def bl in
let arity = interp_constr sigma rec_sign arityc in
interp_casted_constr sigma rec_sign def arity)
lnameardef
with e ->
States.unfreeze fs; raise e
in
States.unfreeze fs;
let (lnonrec,(namerec,defrec,arrec,_)) =
collect_non_rec env0 lrecnames recdef arityl [] in
let recvec =
Array.map (subst_vars (List.rev (Array.to_list namerec))) defrec in
let recdecls = (Array.map (fun id -> Name id) namerec, arrec, recvec) in
let rec declare i fi =
let ce =
{ const_entry_body = mkCoFix (i, recdecls);
const_entry_type = Some (arrec.(i));
const_entry_opaque = false;
const_entry_boxed = boxed }
in
let kn = declare_constant fi (DefinitionEntry ce,IsDefinition CoFixpoint)
in (ConstRef kn)
in
let lrefrec = Array.mapi declare namerec in
if_verbose ppnl (corecursive_message lrefrec);
let var_subst id = (id, global_reference id) in
let _ =
List.fold_left
(fun subst (f,def,t) ->
let ce = { const_entry_body = replace_vars subst def;
const_entry_type = Some t;
const_entry_opaque = false;
const_entry_boxed = boxed } in
let _ =
declare_constant f (DefinitionEntry ce,IsDefinition Definition) in
warning ((string_of_id f)^" is non-recursively defined");
(var_subst f) :: subst)
(List.map var_subst (Array.to_list namerec))
lnonrec
in ()
let build_scheme lnamedepindsort =
let lrecnames = List.map (fun ((_,f),_,_,_) -> f) lnamedepindsort
and sigma = Evd.empty
and env0 = Global.env() in
let lrecspec =
List.map
(fun (_,dep,indid,sort) ->
let ind = Nametab.global_inductive indid in
let (mib,mip) = Global.lookup_inductive ind in
(ind,mib,mip,dep,interp_elimination_sort sort))
lnamedepindsort
in
let listdecl = Indrec.build_mutual_indrec env0 sigma lrecspec in
let rec declare decl fi lrecref =
let decltype = Retyping.get_type_of env0 Evd.empty decl in
let decltype = refresh_universes decltype in
let ce = { const_entry_body = decl;
const_entry_type = Some decltype;
const_entry_opaque = false;
const_entry_boxed = Options.boxed_definitions() } in
let kn = declare_constant fi (DefinitionEntry ce, IsDefinition Scheme) in
ConstRef kn :: lrecref
in
let lrecref = List.fold_right2 declare listdecl lrecnames [] in
if_verbose ppnl (recursive_message (Array.of_list lrecref))
let start_proof id kind c hook =
let sign = Global.named_context () in
let sign = clear_proofs sign in
Pfedit.start_proof id kind sign c hook
let start_proof_com sopt kind (bl,t) hook =
let id = match sopt with
| Some id ->
(* We check existence here: it's a bit late at Qed time *)
if Nametab.exists_cci (Lib.make_path id) or is_section_variable id then
errorlabstrm "start_proof" (pr_id id ++ str " already exists");
id
| None ->
next_global_ident_away false (id_of_string "Unnamed_thm")
(Pfedit.get_all_proof_names ())
in
let env = Global.env () in
let c = interp_type Evd.empty env (generalize_constr_expr t bl) in
let _ = Typeops.infer_type env c in
start_proof id kind c hook
let save id const (locality,kind) hook =
let {const_entry_body = pft;
const_entry_type = tpo;
const_entry_opaque = opacity } = const in
let l,r = match locality with
| Local when Lib.sections_are_opened () ->
let k = logical_kind_of_goal_kind kind in
let c = SectionLocalDef (pft, tpo, opacity) in
let _ = declare_variable id (Lib.cwd(), c, k) in
(Local, VarRef id)
| Local ->
let k = logical_kind_of_goal_kind kind in
let kn = declare_constant id (DefinitionEntry const, k) in
(Global, ConstRef kn)
| Global ->
let k = logical_kind_of_goal_kind kind in
let kn = declare_constant id (DefinitionEntry const, k) in
(Global, ConstRef kn) in
hook l r;
Pfedit.delete_current_proof ();
definition_message id
let save_named opacity =
let id,(const,persistence,hook) = Pfedit.cook_proof () in
let const = { const with const_entry_opaque = opacity } in
save id const persistence hook
let check_anonymity id save_ident =
if atompart_of_id id <> "Unnamed_thm" then
error "This command can only be used for unnamed theorem"
(*
message("Overriding name "^(string_of_id id)^" and using "^save_ident)
*)
let save_anonymous opacity save_ident =
let id,(const,persistence,hook) = Pfedit.cook_proof () in
let const = { const with const_entry_opaque = opacity } in
check_anonymity id save_ident;
save save_ident const persistence hook
let save_anonymous_with_strength kind opacity save_ident =
let id,(const,_,hook) = Pfedit.cook_proof () in
let const = { const with const_entry_opaque = opacity } in
check_anonymity id save_ident;
(* we consider that non opaque behaves as local for discharge *)
save save_ident const (Global, Proof kind) hook
let admit () =
let (id,k,typ,hook) = Pfedit.current_proof_statement () in
(* Contraire aux besoins d'interactivité...
if k <> IsGlobal (Proof Conjecture) then
error "Only statements declared as conjecture can be admitted";
*)
let kn =
declare_constant id (ParameterEntry typ, IsAssumption Conjectural) in
hook Global (ConstRef kn);
Pfedit.delete_current_proof ();
assumption_message id
let get_current_context () =
try Pfedit.get_current_goal_context ()
with e when Logic.catchable_exception e ->
(Evd.empty, Global.env())
|