(************************************************************************) (* v * The Coq Proof Assistant / The Coq Development Team *) (* if Evd.is_defined sigma evk then whd_ise sigma (existential_value sigma ev) else raise (Uninstantiated_evar evk) | _ -> c (* Expand evars, possibly in the head of an application *) let whd_castappevar_stack sigma c = let rec whrec (c, l as s) = match kind_of_term c with | Evar (evk,args as ev) when Evd.mem sigma evk & Evd.is_defined sigma evk -> whrec (existential_value sigma ev, l) | Cast (c,_,_) -> whrec (c, l) | App (f,args) -> whrec (f, Array.fold_right (fun a l -> a::l) args l) | _ -> s in whrec (c, []) let whd_castappevar sigma c = applist (whd_castappevar_stack sigma c) let nf_evar = Pretype_errors.nf_evar let j_nf_evar = Pretype_errors.j_nf_evar let jl_nf_evar = Pretype_errors.jl_nf_evar let jv_nf_evar = Pretype_errors.jv_nf_evar let tj_nf_evar = Pretype_errors.tj_nf_evar let nf_named_context_evar sigma ctx = Sign.map_named_context (Reductionops.nf_evar sigma) ctx let nf_rel_context_evar sigma ctx = Sign.map_rel_context (Reductionops.nf_evar sigma) ctx let nf_env_evar sigma env = let nc' = nf_named_context_evar sigma (Environ.named_context env) in let rel' = nf_rel_context_evar sigma (Environ.rel_context env) in push_rel_context rel' (reset_with_named_context (val_of_named_context nc') env) let nf_evar_info evc info = { info with evar_concl = Reductionops.nf_evar evc info.evar_concl; evar_hyps = map_named_val (Reductionops.nf_evar evc) info.evar_hyps} let nf_evars evm = Evd.fold (fun ev evi evm' -> Evd.add evm' ev (nf_evar_info evm evi)) evm Evd.empty let nf_evar_defs evd = Evd.evars_reset_evd (nf_evars (Evd.evars_of evd)) evd let nf_isevar evd = nf_evar (Evd.evars_of evd) let j_nf_isevar evd = j_nf_evar (Evd.evars_of evd) let jl_nf_isevar evd = jl_nf_evar (Evd.evars_of evd) let jv_nf_isevar evd = jv_nf_evar (Evd.evars_of evd) let tj_nf_isevar evd = tj_nf_evar (Evd.evars_of evd) (**********************) (* Creating new metas *) (**********************) (* Generator of metavariables *) let new_meta = let meta_ctr = ref 0 in fun () -> incr meta_ctr; !meta_ctr let mk_new_meta () = mkMeta(new_meta()) let collect_evars emap c = let rec collrec acc c = match kind_of_term c with | Evar (evk,_) -> if Evd.mem emap evk & not (Evd.is_defined emap evk) then evk::acc else (* No recursion on the evar instantiation *) acc | _ -> fold_constr collrec acc c in list_uniquize (collrec [] c) let push_dependent_evars sigma emap = Evd.fold (fun ev {evar_concl = ccl} (sigma',emap') -> List.fold_left (fun (sigma',emap') ev -> (Evd.add sigma' ev (Evd.find emap' ev),Evd.remove emap' ev)) (sigma',emap') (collect_evars emap' ccl)) emap (sigma,emap) (* replaces a mapping of existentials into a mapping of metas. Problem if an evar appears in the type of another one (pops anomaly) *) let evars_to_metas sigma (emap, c) = let emap = nf_evars emap in let sigma',emap' = push_dependent_evars sigma emap in let change_exist evar = let ty = nf_betaiota (nf_evar emap (existential_type emap evar)) in let n = new_meta() in mkCast (mkMeta n, DEFAULTcast, ty) in let rec replace c = match kind_of_term c with | Evar (evk,_ as ev) when Evd.mem emap' evk -> change_exist ev | _ -> map_constr replace c in (sigma', replace c) (* The list of non-instantiated existential declarations *) let non_instantiated sigma = let listev = to_list sigma in List.fold_left (fun l (ev,evi) -> if evi.evar_body = Evar_empty then ((ev,nf_evar_info sigma evi)::l) else l) [] listev (**********************) (* Creating new evars *) (**********************) (* Generator of existential names *) let new_untyped_evar = let evar_ctr = ref 0 in fun () -> incr evar_ctr; existential_of_int !evar_ctr (*------------------------------------* * functional operations on evar sets * *------------------------------------*) let new_evar_instance sign evd typ ?(src=(dummy_loc,InternalHole)) ?filter instance = let instance = match filter with | None -> instance | Some filter -> snd (list_filter2 (fun b c -> b) (filter,instance)) in assert (let ctxt = named_context_of_val sign in list_distinct (ids_of_named_context ctxt)); let newevk = new_untyped_evar() in let evd = evar_declare sign newevk typ ~src:src ?filter evd in (evd,mkEvar (newevk,Array.of_list instance)) (* Knowing that [Gamma |- ev : T] and that [ev] is applied to [args], * [make_projectable_subst ev args] builds the substitution [Gamma:=args]. * If a variable and an alias of it are bound to the same instance, we skip * the alias (we just use eq_constr -- instead of conv --, since anyway, * only instances that are variables -- or evars -- are later considered; * morever, we can bet that similar instances came at some time from * the very same substitution. The removal of aliased duplicates is * useful to ensure the uniqueness of a projection. *) let make_projectable_subst sigma evi args = let sign = evar_filtered_context evi in let rec alias_of_var id = match pi2 (Sign.lookup_named id sign) with | Some t when isVar t -> alias_of_var (destVar t) | _ -> id in snd (List.fold_right (fun (id,b,c) (args,l) -> match b,args with | Some c, a::rest when isVar c & (try eq_constr a (snd (List.assoc (destVar c) l)) with Not_found -> false) -> (rest,l) | _, a::rest -> (rest, (id, (alias_of_var id,whd_evar sigma a))::l) | _ -> anomaly "Instance does not match its signature") sign (List.rev (Array.to_list args),[])) let make_pure_subst evi args = snd (List.fold_right (fun (id,b,c) (args,l) -> match args with | a::rest -> (rest, (id,a)::l) | _ -> anomaly "Instance does not match its signature") (evar_filtered_context evi) (List.rev (Array.to_list args),[])) (* [push_rel_context_to_named_context] builds the defining context and the * initial instance of an evar. If the evar is to be used in context * * Gamma = a1 ... an xp ... x1 * \- named part -/ \- de Bruijn part -/ * * then the x1...xp are turned into variables so that the evar is declared in * context * * a1 ... an xp ... x1 * \----------- named part ------------/ * * but used applied to the initial instance "a1 ... an Rel(p) ... Rel(1)" * so that ev[a1:=a1 ... an:=an xp:=Rel(p) ... x1:=Rel(1)] is correctly typed * in context Gamma. * * Remark 1: The instance is reverted in practice (i.e. Rel(1) comes first) * Remark 2: If some of the ai or xj are definitions, we keep them in the * instance. This is necessary so that no unfolding of local definitions * happens when inferring implicit arguments (consider e.g. the problem * "x:nat; x':=x; f:forall x, x=x -> Prop |- f _ (refl_equal x')" * we want the hole to be instantiated by x', not by x (which would have the * case in [invert_instance] if x' had disappear of the instance). * Note that at any time, if, in some context env, the instance of * declaration x:A is t and the instance of definition x':=phi(x) is u, then * we have the property that u and phi(t) are convertible in env. *) let push_rel_context_to_named_context env typ = (* compute the instances relative to the named context and rel_context *) let ids = List.map pi1 (named_context env) in let inst_vars = List.map mkVar ids in let inst_rels = List.rev (rel_list 0 (nb_rel env)) in (* move the rel context to a named context and extend the named instance *) (* with vars of the rel context *) (* We do keep the instances corresponding to local definition (see above) *) let (subst, _, env) = Sign.fold_rel_context (fun (na,c,t) (subst, avoid, env) -> let id = next_name_away na avoid in let d = (id,Option.map (substl subst) c,substl subst t) in (mkVar id :: subst, id::avoid, push_named d env)) (rel_context env) ~init:([], ids, env) in (named_context_val env, substl subst typ, inst_rels@inst_vars) (* [new_evar] declares a new existential in an env env with type typ *) (* Converting the env into the sign of the evar to define *) let new_evar evd env ?(src=(dummy_loc,InternalHole)) ?filter typ = let sign,typ',instance = push_rel_context_to_named_context env typ in new_evar_instance sign evd typ' ~src:src ?filter instance (* The same using side-effect *) let e_new_evar evdref env ?(src=(dummy_loc,InternalHole)) ?filter ty = let (evd',ev) = new_evar !evdref env ~src:src ?filter ty in evdref := evd'; ev (*------------------------------------* * operations on the evar constraints * *------------------------------------*) (* Pb: defined Rels and Vars should not be considered as a pattern... *) let is_pattern inst = let rec is_hopat l = function [] -> true | t :: tl -> (isRel t or isVar t) && not (List.mem t l) && is_hopat (t::l) tl in is_hopat [] (Array.to_list inst) let evar_well_typed_body evd ev evi body = try let env = evar_unfiltered_env evi in let ty = evi.evar_concl in Typing.check env (evars_of evd) body ty; true with e -> pperrnl (str "Ill-typed evar instantiation: " ++ fnl() ++ pr_evar_defs evd ++ fnl() ++ str "----> " ++ int ev ++ str " := " ++ print_constr body); false (* We have x1..xq |- ?e1 and had to solve something like * Σ; Γ |- ?e1[u1..uq] = (...\y1 ... \yk ... c), where c is typically some * ?e2[v1..vn], hence flexible. We had to go through k binders and now * virtually have x1..xq, y1..yk | ?e1' and the equation * Γ, y1..yk |- ?e1'[u1..uq y1..yk] = c. * What we do is to formally introduce ?e1' in context x1..xq, Γ, y1..yk, * but forbidding it to use the variables of Γ (otherwise said, * Γ is here only for ensuring the correct typing of ?e1'). * * In fact, we optimize a little and try to compute a maximum * common subpart of x1..xq and Γ. This is done by detecting the * longest subcontext x1..xp such that Γ = x1'..xp' z1..zm and * u1..up = x1'..xp'. * * At the end, we return ?e1'[x1..xn z1..zm y1..yk] so that ?e1 can be * instantiated by (...\y1 ... \yk ... ?e1[x1..xn z1..zm y1..yk]) and the * new problem is Σ; Γ, y1..yk |- ?e1'[u1..un z1..zm y1..yk] = c, * making the z1..zm unavailable. * * This is what [extend_evar Γ evd k (?e1[u1..uq]) c] does. *) let shrink_context env subst ty = let rev_named_sign = List.rev (named_context env) in let rel_sign = rel_context env in (* We merge the contexts (optimization) *) let rec shrink_rel i subst rel_subst rev_rel_sign = match subst,rev_rel_sign with | (id,c)::subst,_::rev_rel_sign when c = mkRel i -> shrink_rel (i-1) subst (mkVar id::rel_subst) rev_rel_sign | _ -> substl_rel_context rel_subst (List.rev rev_rel_sign), substl rel_subst ty in let rec shrink_named subst named_subst rev_named_sign = match subst,rev_named_sign with | (id,c)::subst,(id',b',t')::rev_named_sign when c = mkVar id' -> shrink_named subst ((id',mkVar id)::named_subst) rev_named_sign | _::_, [] -> let nrel = List.length rel_sign in let rel_sign, ty = shrink_rel nrel subst [] (List.rev rel_sign) in [], map_rel_context (replace_vars named_subst) rel_sign, replace_vars named_subst ty | _ -> map_named_context (replace_vars named_subst) (List.rev rev_named_sign), rel_sign, ty in shrink_named subst [] rev_named_sign let extend_evar env evdref k (evk1,args1) c = let ty = get_type_of env (evars_of !evdref) c in let overwrite_first v1 v2 = let v = Array.copy v1 in let n = Array.length v - Array.length v2 in for i = 0 to Array.length v2 - 1 do v.(n+i) <- v2.(i) done; v in let evi1 = Evd.find (evars_of !evdref) evk1 in let named_sign',rel_sign',ty = if k = 0 then [], [], ty else shrink_context env (List.rev (make_pure_subst evi1 args1)) ty in let extenv = List.fold_right push_rel rel_sign' (List.fold_right push_named named_sign' (evar_unfiltered_env evi1)) in let nb_to_hide = rel_context_length rel_sign' - k in let rel_filter = list_map_i (fun i _ -> i > nb_to_hide) 1 rel_sign' in let named_filter1 = List.map (fun _ -> true) (evar_context evi1) in let named_filter2 = List.map (fun _ -> false) named_sign' in let filter = rel_filter@named_filter2@named_filter1 in let evar1' = e_new_evar evdref extenv ~filter:filter ty in let evk1',args1'_in_env = destEvar evar1' in let args1'_in_extenv = Array.map (lift k) (overwrite_first args1'_in_env args1) in (evar1',(evk1',args1'_in_extenv)) let subfilter p filter l = let (filter,_,l) = List.fold_left (fun (filter,l,newl) b -> if b then let a,l' = match l with a::args -> a,args | _ -> assert false in if p a then (true::filter,l',a::newl) else (false::filter,l',newl) else (false::filter,l,newl)) ([],l,[]) filter in (List.rev filter,List.rev l) let restrict_upon_filter evd evi evk p args = let filter = evar_filter evi in let newfilter,newargs = subfilter p filter args in if newfilter <> filter then let (evd,newev) = new_evar evd (evar_unfiltered_env evi) ~src:(evar_source evk evd) ~filter:newfilter evi.evar_concl in let evd = Evd.evar_define evk newev evd in evd,fst (destEvar newev),newargs else evd,evk,args exception Dependency_error of identifier module EvkOrd = struct type t = Term.existential_key let compare = Pervasives.compare end module EvkSet = Set.Make(EvkOrd) let rec check_and_clear_in_constr evdref c ids hist = (* returns a new constr where all the evars have been 'cleaned' (ie the hypotheses ids have been removed from the contexts of evars *) let check id' = if List.mem id' ids then raise (Dependency_error id') in match kind_of_term c with | ( Rel _ | Meta _ | Sort _ ) -> c | ( Const _ | Ind _ | Construct _ ) -> let vars = Environ.vars_of_global (Global.env()) c in List.iter check vars; c | Var id' -> check id'; mkVar id' | Evar (evk,l as ev) -> if Evd.is_defined_evar !evdref ev then (* If evk is already defined we replace it by its definition *) let nc = nf_evar (evars_of !evdref) c in (check_and_clear_in_constr evdref nc ids hist) else if EvkSet.mem evk hist then (* Loop detection => do nothing *) c else (* We check for dependencies to elements of ids in the evar_info corresponding to e and in the instance of arguments. Concurrently, we build a new evar corresponding to e where hypotheses of ids have been removed *) let evi = Evd.find (evars_of !evdref) evk in let ctxt = Evd.evar_filtered_context evi in let (nhyps,nargs,rids) = List.fold_right2 (fun (rid,ob,c as h) a (hy,ar,ri) -> match kind_of_term a with | Var id -> if List.mem id ids then (hy,ar,id::ri) else (h::hy,a::ar,ri) | _ -> (h::hy,a::ar,ri) ) ctxt (Array.to_list l) ([],[],[]) in (* nconcl must be computed ids (non instanciated hyps) *) let nconcl = check_and_clear_in_constr evdref (evar_concl evi) rids (EvkSet.add evk hist) in let env = Sign.fold_named_context push_named nhyps ~init:(empty_env) in let ev'= e_new_evar evdref env ~src:(evar_source evk !evdref) nconcl in evdref := Evd.evar_define evk ev' !evdref; let (evk',_) = destEvar ev' in mkEvar(evk', Array.of_list nargs) | _ -> map_constr (fun c -> check_and_clear_in_constr evdref c ids hist) c let clear_hyps_in_evi evdref hyps concl ids = (* clear_evar_hyps erases hypotheses ids in hyps, checking if some hypothesis does not depend on a element of ids, and erases ids in the contexts of the evars occuring in evi *) let nconcl = try check_and_clear_in_constr evdref concl ids EvkSet.empty with Dependency_error id' -> error (string_of_id id' ^ " is used in conclusion") in let (nhyps,_) = let check_context (id,ob,c) = try (id, (match ob with None -> None | Some b -> Some (check_and_clear_in_constr evdref b ids EvkSet.empty)), check_and_clear_in_constr evdref c ids EvkSet.empty) with Dependency_error id' -> error (string_of_id id' ^ " is used in hypothesis " ^ string_of_id id) in let check_value vk = match !vk with | VKnone -> vk | VKvalue (v,d) -> if (List.for_all (fun e -> not (Idset.mem e d)) ids) then (* v does depend on any of ids, it's ok *) vk else (* v depends on one of the cleared hyps: we forget the computed value *) ref VKnone in remove_hyps ids check_context check_value hyps in (nhyps,nconcl) (* Expand rels and vars that are bound to other rels or vars so that dependencies in variables are canonically associated to the most ancient variable in its family of aliased variables *) let rec expand_var env x = match kind_of_term x with | Rel n -> begin try match pi2 (lookup_rel n env) with | Some t when isRel t -> expand_var env (lift n t) | _ -> x with Not_found -> x end | Var id -> begin match pi2 (lookup_named id env) with | Some t when isVar t -> expand_var env t | _ -> x end | _ -> x let rec expand_vars_in_term env t = match kind_of_term t with | Rel _ | Var _ -> expand_var env t | _ -> map_constr_with_full_binders push_rel expand_vars_in_term env t (* [find_projectable_vars env sigma y subst] finds all vars of [subst] * that project on [y]. It is able to find solutions to the following * two kinds of problems: * * - ?n[...;x:=y;...] = y * - ?n[...;x:=?m[args];...] = y with ?m[args] = y recursively solvable * * (see test-suite/success/Fixpoint.v for an example of application of * the second kind of problem). * * The seek for [y] is up to variable aliasing. In case of solutions that * differ only up to aliasing, the binding that requires the less * steps of alias reduction is kept. At the end, only one solution up * to aliasing is kept. * * [find_projectable_vars] also unifies against evars that themselves mention * [y] and recursively. * * In short, the following situations give the following solutions: * * problem evar ctxt soluce remark * z1; z2:=z1 |- ?ev[z1;z2] = z1 y1:A; y2:=y1 y1 \ thanks to defs kept in * z1; z2:=z1 |- ?ev[z1;z2] = z2 y1:A; y2:=y1 y2 / subst and preferring = * z1; z2:=z1 |- ?ev[z1] = z2 y1:A y1 thanks to expand_var * z1; z2:=z1 |- ?ev[z2] = z1 y1:A y1 thanks to expand_var * z3 |- ?ev[z3;z3] = z3 y1:A; y2:=y1 y2 see make_projectable_subst * * Remark: [find_projectable_vars] assumes that identical instances of * variables in the same set of aliased variables are already removed (see * [make_projectable_subst]) *) exception NotUnique type evar_projection = | ProjectVar | ProjectEvar of existential * evar_info * identifier * evar_projection let rec find_projectable_vars env sigma y subst = let is_projectable (id,(idc,y')) = let y' = whd_evar sigma y' in if y = y' or expand_var env y = expand_var env y' then (idc,(y'=y,(id,ProjectVar))) else if isEvar y' then let (evk,argsv as t) = destEvar y' in let evi = Evd.find sigma evk in let subst = make_projectable_subst sigma evi argsv in let l = find_projectable_vars env sigma y subst in match l with | [id',p] -> (idc,(true,(id,ProjectEvar (t,evi,id',p)))) | _ -> failwith "" else failwith "" in let l = map_succeed is_projectable subst in let l = list_partition_by (fun (idc,_) (idc',_) -> idc = idc') l in let l = List.map (List.map snd) l in List.map (fun l -> try List.assoc true l with Not_found -> snd (List.hd l)) l (* [filter_solution] checks if one and only one possible projection exists * among a set of solutions to a projection problem *) let filter_solution = function | [] -> raise Not_found | (id,p)::_::_ -> raise NotUnique | [id,p] -> (mkVar id, p) let project_with_effects env sigma effects t subst = let c, p = filter_solution (find_projectable_vars env sigma t subst) in effects := p :: !effects; c (* In case the solution to a projection problem requires the instantiation of * subsidiary evars, [do_projection_effects] performs them; it * also try to instantiate the type of those subsidiary evars if their * type is an evar too. * * Note: typing creates new evar problems, which induces a recursive dependency * with [evar_define]. To avoid a too large set of recursive functions, we * pass [evar_define] to [do_projection_effects] as a parameter. *) let rec do_projection_effects define_fun env ty evd = function | ProjectVar -> evd | ProjectEvar ((evk,argsv),evi,id,p) -> let evd = Evd.evar_define evk (mkVar id) evd in (* TODO: simplify constraints involving evk *) let evd = do_projection_effects define_fun env ty evd p in let ty = whd_betadeltaiota env (evars_of evd) (Lazy.force ty) in if not (isSort ty) then (* Don't try to instantiate if a sort because if evar_concl is an evar it may commit to a univ level which is not the right one (however, regarding coercions, because t is obtained by unif, we know that no coercion can be inserted) *) let subst = make_pure_subst evi argsv in let ty' = replace_vars subst evi.evar_concl in let ty' = whd_evar (evars_of evd) ty' in if isEvar ty' then define_fun env (destEvar ty') ty evd else evd else evd (* Assuming Σ; Γ, y1..yk |- c, [invert_subst Γ k Σ [x1:=u1;...;xn:=un] c] * tries to return φ(x1..xn) such that equation φ(u1..un) = c is valid. * The strategy is to imitate the structure of c and then to invert * the variables of c (i.e. rels or vars of Γ) using the algorithm * implemented by project_with_effects/find_projectable_vars. * It returns either a unique solution or says whether 0 or more than * 1 solutions is found. * * Precondition: Σ; Γ, y1..yk |- c /\ Σ; Γ |- u1..un * Postcondition: if φ(x1..xn) is returned then * Σ; Γ, y1..yk |- φ(u1..un) = c /\ x1..xn |- φ(x1..xn) * * The effects correspond to evars instantiated while trying to project. * * [invert_subst] is used on instances of evars. Since the evars are flexible, * these instances are potentially erasable. This is why we don't investigate * whether evars in the instances of evars are unifiable, to the contrary of * [invert_definition]. *) type projectibility_kind = | NoUniqueProjection | UniqueProjection of constr * evar_projection list type projectibility_status = | CannotInvert | Invertible of projectibility_kind let invert_arg_from_subst env k sigma subst_in_env c_in_env_extended_with_k_binders = let effects = ref [] in let rec aux k t = let t = whd_evar sigma t in match kind_of_term t with | Rel i when i>k -> project_with_effects env sigma effects (mkRel (i-k)) subst_in_env | Var id -> project_with_effects env sigma effects t subst_in_env | _ -> map_constr_with_binders succ aux k t in try let c = aux k c_in_env_extended_with_k_binders in Invertible (UniqueProjection (c,!effects)) with | Not_found -> CannotInvert | NotUnique -> Invertible NoUniqueProjection let invert_arg env k sigma (evk,args_in_env) c_in_env_extended_with_k_binders = let subst_in_env = make_projectable_subst sigma (Evd.find sigma evk) args_in_env in invert_arg_from_subst env k sigma subst_in_env c_in_env_extended_with_k_binders let effective_projections = map_succeed (function Invertible c -> c | _ -> failwith"") let instance_of_projection f env t evd projs = let ty = lazy (Retyping.get_type_of env (evars_of evd) t) in match projs with | NoUniqueProjection -> raise NotUnique | UniqueProjection (c,effects) -> (List.fold_left (do_projection_effects f env ty) evd effects, c) let filter_of_projection = function CannotInvert -> false | _ -> true let filter_along_projs projs v = let l = Array.to_list v in let _,l = list_filter2 (fun b c -> filter_of_projection b) (projs,l) in Array.of_list l (* Redefines an evar with a smaller context (i.e. it may depend on less * variables) such that c becomes closed. * Example: in "fun (x:?1) (y:list ?2[x]) => x = y :> ?3[x,y] /\ x = nil bool" * ?3 <-- ?1 no pb: env of ?3 is larger than ?1's * ?1 <-- list ?2 pb: ?2 may depend on x, but not ?1. * What we do is that ?2 is defined by a new evar ?4 whose context will be * a prefix of ?2's env, included in ?1's env. * * If "hyps |- ?e : T" and "filter" selects a subset hyps' of hyps then * [do_restrict_hyps evd ?e filter] sets ?e:=?e'[hyps'] and returns ?e' * such that "hyps' |- ?e : T" *) let do_restrict_hyps evd evk projs = let filter = List.map filter_of_projection projs in if List.for_all (fun x -> x) filter then evd,evk else (* What to do with dependencies? Assume we have x:A, y:B(x), z:C(x,y) |- ?e:T(x,y,z) and restrict on y. - If y is in a non-erasable position in C(x,y) (i.e. it is not below an occurrence of x in the hnf of C), then z should be removed too. - If y is in a non-erasable position in T(x,y,z) then the problem is unsolvable. Computing whether y is erasable or not may be costly and the interest for this early detection in practice is not obvious. We let it for future work. Anyway, thanks to the use of filters, the whole context remains consistent. *) let evi = Evd.find (evars_of evd) evk in let env = evar_unfiltered_env evi in let oldfilter = evar_filter evi in let filter,_ = List.fold_right (fun oldb (l,filter) -> if oldb then List.hd filter::l,List.tl filter else (false::l,filter)) oldfilter ([],List.rev filter) in let evd,nc = new_evar evd env ~src:(evar_source evk evd) ~filter:filter evi.evar_concl in let evd = Evd.evar_define evk nc evd in let evk',_ = destEvar nc in evd,evk' (* [postpone_evar_term] postpones an equation of the form ?e[σ] = c *) let postpone_evar_term env evd (evk,argsv) rhs = let rhs = expand_vars_in_term env rhs in let evi = Evd.find (evars_of evd) evk in let evd,evk,args = restrict_upon_filter evd evi evk (* Keep only variables that depends in rhs *) (* This is not safe: is the variable is a local def, its body *) (* may contain references to variables that are removed, leading to *) (* a ill-formed context. We would actually need a notion of filter *) (* that says that the body is hidden. Note that expand_vars_in_term *) (* expands only rels and vars aliases, not rels or vars bound to an *) (* arbitrary complex term *) (fun a -> not (isRel a || isVar a) || dependent a rhs) (Array.to_list argsv) in let args = Array.of_list args in let pb = (Reduction.CONV,env,mkEvar(evk,args),rhs) in Evd.add_conv_pb pb evd (* [postpone_evar_evar] postpones an equation of the form ?e1[σ1] = ?e2[σ2] *) let postpone_evar_evar env evd projs1 (evk1,args1) projs2 (evk2,args2) = (* Leave an equation between (restrictions of) ev1 andv ev2 *) let args1' = filter_along_projs projs1 args1 in let evd,evk1' = do_restrict_hyps evd evk1 projs1 in let args2' = filter_along_projs projs2 args2 in let evd,evk2' = do_restrict_hyps evd evk2 projs2 in let pb = (Reduction.CONV,env,mkEvar(evk1',args1'),mkEvar (evk2',args2')) in add_conv_pb pb evd (* [solve_evar_evar f Γ Σ ?e1[u1..un] ?e2[v1..vp]] applies an heuristic * to solve the equation Σ; Γ ⊢ ?e1[u1..un] = ?e2[v1..vp]: * - if there are at most one φj for each vj s.t. vj = φj(u1..un), * we first restrict ?2 to the subset v_k1..v_kq of the vj that are * inversible and we set ?1[x1..xn] := ?2[φk1(x1..xn)..φkp(x1..xn)] * - symmetrically if there are at most one ψj for each uj s.t. * uj = ψj(v1..vp), * - otherwise, each position i s.t. ui does not occur in v1..vp has to * be restricted and similarly for the vi, and we leave the equation * as an open equation (performed by [postpone_evar]) * * Warning: the notion of unique φj is relative to some given class * of unification problems * * Note: argument f is the function used to instantiate evars. *) exception CannotProject of projectibility_status list let solve_evar_evar_l2r f env evd (evk1,args1) (evk2,_ as ev2) = let proj1 = array_map_to_list (invert_arg env 0 (evars_of evd) ev2) args1 in try (* Instantiate ev2 with (a restriction of) ev1 if uniquely projectable *) let proj1' = effective_projections proj1 in let evd,args1' = list_fold_map (instance_of_projection f env (mkEvar ev2)) evd proj1' in let evd,evk1' = do_restrict_hyps evd evk1 proj1 in Evd.evar_define evk2 (mkEvar(evk1',Array.of_list args1')) evd with NotUnique -> raise (CannotProject proj1) let solve_evar_evar f env evd ev1 ev2 = try solve_evar_evar_l2r f env evd ev1 ev2 with CannotProject projs1 -> try solve_evar_evar_l2r f env evd ev2 ev1 with CannotProject projs2 -> postpone_evar_evar env evd projs1 ev1 projs2 ev2 let expand_rhs env sigma subst rhs = let d = (named_hd env rhs Anonymous,Some rhs,get_type_of env sigma rhs) in let rhs' = lift 1 rhs in let f (id,(idc,t)) = (id,(idc,replace_term rhs' (mkRel 1) (lift 1 t))) in push_rel d env, List.map f subst, mkRel 1 (* We try to instantiate the evar assuming the body won't depend * on arguments that are not Rels or Vars, or appearing several times * (i.e. we tackle a generalization of Miller-Pfenning patterns unification) * * 1) Let "env |- ?ev[hyps:=args] = rhs" be the unification problem * 2) We limit it to a patterns unification problem "env |- ev[subst] = rhs" * where only Rel's and Var's are relevant in subst * 3) We recur on rhs, "imitating" the term, and failing if some Rel/Var is * not in the scope of ?ev. For instance, the problem * "y:nat |- ?x[] = y" where "|- ?1:nat" is not satisfiable because * ?1 would be instantiated by y which is not in the scope of ?1. * 4) We try to "project" the term if the process of imitation fails * and that only one projection is possible * * Note: we don't assume rhs in normal form, it may fail while it would * have succeeded after some reductions. * * This is the work of [invert_definition Γ Σ ?ev[hyps:=args] * Precondition: Σ; Γ, y1..yk |- c /\ Σ; Γ |- u1..un * Postcondition: if φ(x1..xn) is returned then * Σ; Γ, y1..yk |- φ(u1..un) = c /\ x1..xn |- φ(x1..xn) *) exception NotInvertibleUsingOurAlgorithm of constr exception NotEnoughInformationToProgress let rec invert_definition env evd (evk,argsv as ev) rhs = let evdref = ref evd in let progress = ref false in let evi = Evd.find (evars_of evd) evk in let subst = make_projectable_subst (evars_of evd) evi argsv in (* Projection *) let project_variable env' t_in_env k t_in_env' = (* Evar/Var problem: unifiable iff variable projectable from ev subst *) try let sols = find_projectable_vars env (evars_of !evdref) t_in_env subst in let c, p = filter_solution sols in let ty = lazy (Retyping.get_type_of env (evars_of !evdref) t_in_env) in let evd = do_projection_effects evar_define env ty !evdref p in evdref := evd; c with | Not_found -> raise (NotInvertibleUsingOurAlgorithm t_in_env') | NotUnique -> if not !progress then raise NotEnoughInformationToProgress; let (evar,ev'') = extend_evar env' evdref k ev t_in_env' in let pb = (Reduction.CONV,env',mkEvar ev'',t_in_env') in evdref := Evd.add_conv_pb pb !evdref; evar in let rec imitate (env',k as envk) t = let t = whd_evar (evars_of !evdref) t in match kind_of_term t with | Rel i when i>k -> project_variable env' (mkRel (i-k)) k t | Var id -> project_variable env' t k t | Evar (evk',args' as ev') -> if evk = evk' then error_occur_check env (evars_of evd) evk rhs; (* Evar/Evar problem (but left evar is virtual) *) let projs' = array_map_to_list (invert_arg_from_subst env k (evars_of !evdref) subst) args' in (try (* Try to project (a restriction of) the right evar *) let eprojs' = effective_projections projs' in let evd,args' = list_fold_map (instance_of_projection evar_define env' t) !evdref eprojs' in let evd,evk' = do_restrict_hyps evd evk' projs' in evdref := evd; mkEvar (evk',Array.of_list args') with NotUnique -> assert !progress; (* Make the virtual left evar real *) let (evar'',ev'') = extend_evar env' evdref k ev t in let evd = (* Try to project (a restriction of) the left evar ... *) try solve_evar_evar_l2r evar_define env' !evdref ev'' ev' with CannotProject projs'' -> (* ... or postpone the problem *) postpone_evar_evar env' !evdref projs'' ev'' projs' ev' in evdref := evd; evar'') | _ -> progress := true; (* Evar/Rigid problem (or assimilated if not normal): we "imitate" *) map_constr_with_full_binders (fun d (env,k) -> push_rel d env, k+1) imitate envk t in let rhs = whd_beta rhs (* heuristic *) in let body = imitate (env,0) rhs in (!evdref,body) (* [evar_define] tries to solve the problem "?ev[args] = rhs" when "?ev" is * an (uninstantiated) evar such that "hyps |- ?ev : typ". Otherwise said, * [evar_define] tries to find an instance lhs such that * "lhs [hyps:=args]" unifies to rhs. The term "lhs" must be closed in * context "hyps" and not referring to itself. *) and evar_define env (evk,_ as ev) rhs evd = try let (evd',body) = invert_definition env evd ev rhs in if occur_meta body then error "Meta cannot occur in evar body"; (* invert_definition may have instantiate some evars of rhs with evk *) (* so we recheck acyclicity *) if occur_evar evk body then error_occur_check env (evars_of evd) evk body; (* needed only if an inferred type *) let body = refresh_universes body in (* Cannot strictly type instantiations since the unification algorithm * does not unify applications from left to right. * e.g problem f x == g y yields x==y and f==g (in that order) * Another problem is that type variables are evars of type Type let _ = try let env = evar_env evi in let ty = evi.evar_concl in Typing.check env (evars_of evd') body ty with e -> pperrnl (str "Ill-typed evar instantiation: " ++ fnl() ++ pr_evar_defs evd' ++ fnl() ++ str "----> " ++ int ev ++ str " := " ++ print_constr body); raise e in*) Evd.evar_define evk body evd' with | NotEnoughInformationToProgress -> postpone_evar_term env evd ev rhs | NotInvertibleUsingOurAlgorithm t -> error_not_clean env (evars_of evd) evk t (evar_source evk evd) (*-------------------*) (* Auxiliary functions for the conversion algorithms modulo evars *) let has_undefined_evars evd t = try let _ = local_strong (whd_ise (evars_of evd)) t in false with Uninstantiated_evar _ -> true let is_ground_term evd t = not (has_undefined_evars evd t) let head_evar = let rec hrec c = match kind_of_term c with | Evar (evk,_) -> evk | Case (_,_,c,_) -> hrec c | App (c,_) -> hrec c | Cast (c,_,_) -> hrec c | _ -> failwith "headconstant" in hrec (* Check if an applied evar "?X[args] l" is a Miller's pattern; note that we don't care whether args itself contains Rel's or even Rel's distinct from the ones in l *) let is_unification_pattern_evar env (_,args) l = let l' = Array.to_list args @ l in let l' = List.map (expand_var env) l' in List.for_all (fun a -> isRel a or isVar a) l' & list_distinct l' let is_unification_pattern env f l = match kind_of_term f with | Meta _ -> array_for_all isRel l & array_distinct l | Evar ev -> is_unification_pattern_evar env ev (Array.to_list l) | _ -> false (* From a unification problem "?X l1 = term1 l2" such that l1 is made of distinct rel's, build "\x1...xn.(term1 l2)" (patterns unification) *) let solve_pattern_eqn env l1 c = let l1 = List.map (expand_var env) l1 in let c' = List.fold_right (fun a c -> let c' = subst_term (lift 1 a) (lift 1 c) in match kind_of_term a with (* Rem: if [a] links to a let-in, do as if it were an assumption *) | Rel n -> let (na,_,t) = lookup_rel n env in mkLambda (na,lift n t,c') | Var id -> let (id,_,t) = lookup_named id env in mkNamedLambda id t c' | _ -> assert false) l1 c in (* Warning: we may miss some opportunity to eta-reduce more since c' is not in normal form *) whd_eta c' (* This code (i.e. solve_pb, etc.) takes a unification * problem, and tries to solve it. If it solves it, then it removes * all the conversion problems, and re-runs conversion on each one, in * the hopes that the new solution will aid in solving them. * * The kinds of problems it knows how to solve are those in which * the usable arguments of an existential var are all themselves * universal variables. * The solution to this problem is to do renaming for the Var's, * to make them match up with the Var's which are found in the * hyps of the existential, to do a "pop" for each Rel which is * not an argument of the existential, and a subst1 for each which * is, again, with the corresponding variable. This is done by * evar_define * * Thus, we take the arguments of the existential which we are about * to assign, and zip them with the identifiers in the hypotheses. * Then, we process all the Var's in the arguments, and sort the * Rel's into ascending order. Then, we just march up, doing * subst1's and pop's. * * NOTE: We can do this more efficiently for the relative arguments, * by building a long substituend by hand, but this is a pain in the * ass. *) let status_changed lev (pbty,_,t1,t2) = try List.mem (head_evar t1) lev or List.mem (head_evar t2) lev with Failure _ -> try List.mem (head_evar t2) lev with Failure _ -> false (* Solve pbs (?i x1..xn) = (?i y1..yn) which arises often in fixpoint * definitions. We try to unify the xi with the yi pairwise. The pairs * that don't unify are discarded (i.e. ?i is redefined so that it does not * depend on these args). *) let solve_refl conv_algo env evd evk argsv1 argsv2 = if argsv1 = argsv2 then evd else let evi = Evd.find (evars_of evd) evk in (* Filter and restrict if needed *) let evd,evk,args = restrict_upon_filter evd evi evk (fun (a1,a2) -> snd (conv_algo env evd Reduction.CONV a1 a2)) (List.combine (Array.to_list argsv1) (Array.to_list argsv2)) in (* Leave a unification problem *) let args1,args2 = List.split args in let argsv1 = Array.of_list args1 and argsv2 = Array.of_list args2 in let pb = (Reduction.CONV,env,mkEvar(evk,argsv1),mkEvar(evk,argsv2)) in Evd.add_conv_pb pb evd (* Tries to solve problem t1 = t2. * Precondition: t1 is an uninstantiated evar * Returns an optional list of evars that were instantiated, or None * if the problem couldn't be solved. *) (* Rq: uncomplete algorithm if pbty = CONV_X_LEQ ! *) let solve_simple_eqn conv_algo env evd (pbty,(evk1,args1 as ev1),t2) = try let t2 = whd_evar (evars_of evd) t2 in let evd = match kind_of_term t2 with | Evar (evk2,args2 as ev2) -> if evk1 = evk2 then solve_refl conv_algo env evd evk1 args1 args2 else if pbty = Reduction.CONV then solve_evar_evar evar_define env evd ev1 ev2 else add_conv_pb (pbty,env,mkEvar ev1,t2) evd | _ -> evar_define env ev1 t2 evd in let (evd,pbs) = extract_changed_conv_pbs evd status_changed in List.fold_left (fun (evd,b as p) (pbty,env,t1,t2) -> if b then conv_algo env evd pbty t1 t2 else p) (evd,true) pbs with e when precatchable_exception e -> (evd,false) (* [check_evars] fails if some unresolved evar remains *) (* it assumes that the defined existentials have already been substituted *) let check_evars env initial_sigma evd c = let sigma = evars_of evd in let c = nf_evar sigma c in let rec proc_rec c = match kind_of_term c with | Evar (evk,args) -> assert (Evd.mem sigma evk); if not (Evd.mem initial_sigma evk) then let (loc,k) = evar_source evk evd in let evi = nf_evar_info sigma (Evd.find sigma evk) in let explain = let f (_,_,t1,t2) = (try head_evar t1 = evk with Failure _ -> false) or (try head_evar t2 = evk with Failure _ -> false) in let check_several c inst = let _,argsv = destEvar c in let l = List.filter (eq_constr inst) (Array.to_list argsv) in let n = List.length l in (* Maybe should we select one instead of failing ... *) if n >= 2 then Some (SeveralInstancesFound n) else None in match List.filter f (snd (extract_all_conv_pbs evd)) with | (_,_,t1,t2)::_ -> if isEvar t2 then check_several t2 t1 else check_several t1 t2 | [] -> None in error_unsolvable_implicit loc env sigma evi k explain | _ -> iter_constr proc_rec c in proc_rec c (* Operations on value/type constraints *) type type_constraint_type = (int * int) option * constr type type_constraint = type_constraint_type option type val_constraint = constr option (* Old comment... * Basically, we have the following kind of constraints (in increasing * strength order): * (false,(None,None)) -> no constraint at all * (true,(None,None)) -> we must build a judgement which _TYPE is a kind * (_,(None,Some ty)) -> we must build a judgement which _TYPE is ty * (_,(Some v,_)) -> we must build a judgement which _VAL is v * Maybe a concrete datatype would be easier to understand. * We differentiate (true,(None,None)) from (_,(None,Some Type)) * because otherwise Case(s) would be misled, as in * (n:nat) Case n of bool [_]nat end would infer the predicate Type instead * of Set. *) (* The empty type constraint *) let empty_tycon = None let mk_tycon_type c = (None, c) let mk_abstr_tycon_type n c = (Some (n, n), c) (* First component is initial abstraction, second is current abstraction *) (* Builds a type constraint *) let mk_tycon ty = Some (mk_tycon_type ty) let mk_abstr_tycon n ty = Some (mk_abstr_tycon_type n ty) (* Constrains the value of a type *) let empty_valcon = None (* Builds a value constraint *) let mk_valcon c = Some c (* Refining an evar to a product or a sort *) (* Declaring any type to be in the sort Type shouldn't be harmful since cumulativity now includes Prop and Set in Type... It is, but that's not too bad *) let define_evar_as_abstraction abs evd (ev,args) = let evi = Evd.find (evars_of evd) ev in let evenv = evar_unfiltered_env evi in let (evd1,dom) = new_evar evd evenv (new_Type()) ~filter:(evar_filter evi) in let nvar = next_ident_away (id_of_string "x") (ids_of_named_context (evar_context evi)) in let newenv = push_named (nvar, None, dom) evenv in let (evd2,rng) = new_evar evd1 newenv ~src:(evar_source ev evd1) (new_Type()) ~filter:(true::evar_filter evi) in let prod = abs (Name nvar, dom, subst_var nvar rng) in let evd3 = Evd.evar_define ev prod evd2 in let evdom = fst (destEvar dom), args in let evrng = fst (destEvar rng), array_cons (mkRel 1) (Array.map (lift 1) args) in let prod' = abs (Name nvar, mkEvar evdom, mkEvar evrng) in (evd3,prod') let define_evar_as_product evd (ev,args) = define_evar_as_abstraction (fun t -> mkProd t) evd (ev,args) let define_evar_as_lambda evd (ev,args) = define_evar_as_abstraction (fun t -> mkLambda t) evd (ev,args) let define_evar_as_sort evd (ev,args) = let s = new_Type () in Evd.evar_define ev s evd, destSort s (* We don't try to guess in which sort the type should be defined, since any type has type Type. May cause some trouble, but not so far... *) let judge_of_new_Type () = Typeops.judge_of_type (new_univ ()) (* Propagation of constraints through application and abstraction: Given a type constraint on a functional term, returns the type constraint on its domain and codomain. If the input constraint is an evar instantiate it with the product of 2 new evars. *) let split_tycon loc env evd tycon = let rec real_split c = let sigma = evars_of evd in let t = whd_betadeltaiota env sigma c in match kind_of_term t with | Prod (na,dom,rng) -> evd, (na, dom, rng) | Evar ev when not (Evd.is_defined_evar evd ev) -> let (evd',prod) = define_evar_as_product evd ev in let (_,dom,rng) = destProd prod in evd',(Anonymous, dom, rng) | _ -> error_not_product_loc loc env sigma c in match tycon with | None -> evd,(Anonymous,None,None) | Some (abs, c) -> (match abs with None -> let evd', (n, dom, rng) = real_split c in evd', (n, mk_tycon dom, mk_tycon rng) | Some (init, cur) -> if cur = 0 then let evd', (x, dom, rng) = real_split c in evd, (Anonymous, Some (Some (init, 0), dom), Some (Some (init, 0), rng)) else evd, (Anonymous, None, Some (Some (init, pred cur), c))) let valcon_of_tycon x = match x with | Some (None, t) -> Some t | _ -> None let lift_abstr_tycon_type n (abs, t) = match abs with None -> raise (Invalid_argument "lift_abstr_tycon_type: not an abstraction") | Some (init, abs) -> let abs' = abs + n in if abs' < 0 then raise (Invalid_argument "lift_abstr_tycon_type") else (Some (init, abs'), t) let lift_tycon_type n (abs, t) = (abs, lift n t) let lift_tycon n = Option.map (lift_tycon_type n) let pr_tycon_type env (abs, t) = match abs with None -> Termops.print_constr_env env t | Some (init, cur) -> str "Abstract (" ++ int init ++ str "," ++ int cur ++ str ") " ++ Termops.print_constr_env env t let pr_tycon env = function None -> str "None" | Some t -> pr_tycon_type env t