* http://cs.unibo.it/helm/.
*)
+(* let _profiler = <:profiler<_profiler>>;; *)
+
(* $Id: inference.ml 6245 2006-04-05 12:07:51Z tassi $ *)
type rule = SuperpositionRight | SuperpositionLeft | Demodulation
type uncomparable = int -> int
+
type equality =
uncomparable * (* trick to break structural equality *)
int * (* weight *)
(* subst, (rule,eq1, eq2,predicate) *)
and goal_proof = (rule * Utils.pos * int * Subst.substitution * Cic.term) list
;;
+(* the hashtbl eq_id -> proof, max_eq_id *)
+type equality_bag = (int,equality) Hashtbl.t * int ref
+
+type goal = goal_proof * Cic.metasenv * Cic.term
(* globals *)
-let maxid = ref 0;;
-let id_to_eq = Hashtbl.create 1024;;
+let mk_equality_bag () =
+ Hashtbl.create 1024, ref 0
+;;
-let freshid () =
- incr maxid; !maxid
+let freshid (_,i) =
+ incr i; !i
;;
-let reset () =
- maxid := 0;
- Hashtbl.clear id_to_eq
+let add_to_bag (id_to_eq,_) id eq =
+ Hashtbl.add id_to_eq id eq
;;
let uncomparable = fun _ -> 0
-let mk_equality (weight,p,(ty,l,r,o),m) =
- let id = freshid () in
+let mk_equality bag (weight,p,(ty,l,r,o),m) =
+ let id = freshid bag in
let eq = (uncomparable,weight,p,(ty,l,r,o),m,id) in
- Hashtbl.add id_to_eq id eq;
+ add_to_bag bag id eq;
eq
;;
id w (CicPp.ppterm ty)
(CicPp.ppterm left)
(Utils.string_of_comparison o) (CicPp.ppterm right)
- (String.concat ", " (List.map (fun (i,_,_) -> string_of_int i) m))
+(* (String.concat ", " (List.map (fun (i,_,_) -> string_of_int i) m)) *)
+ "..."
| Some (_, context, _) ->
let names = Utils.names_of_context context in
let w, _, (ty, left, right, o), m , id = open_equality eq in
id w (CicPp.pp ty names)
(CicPp.pp left names) (Utils.string_of_comparison o)
(CicPp.pp right names)
- (String.concat ", " (List.map (fun (i,_,_) -> string_of_int i) m))
+(* (String.concat ", " (List.map (fun (i,_,_) -> string_of_int i) m)) *)
+ "..."
;;
let compare (_,_,_,s1,_,_) (_,_,_,s2,_,_) =
Pervasives.compare s1 s2
;;
-let proof_of_id id =
+let rec max_weight_in_proof ((id_to_eq,_) as bag) current =
+ function
+ | Exact _ -> current
+ | Step (_, (_,id1,(_,id2),_)) ->
+ let eq1 = Hashtbl.find id_to_eq id1 in
+ let eq2 = Hashtbl.find id_to_eq id2 in
+ let (w1,p1,(_,_,_,_),_,_) = open_equality eq1 in
+ let (w2,p2,(_,_,_,_),_,_) = open_equality eq2 in
+ let current = max current w1 in
+ let current = max_weight_in_proof bag current p1 in
+ let current = max current w2 in
+ max_weight_in_proof bag current p2
+
+let max_weight_in_goal_proof ((id_to_eq,_) as bag) =
+ List.fold_left
+ (fun current (_,_,id,_,_) ->
+ let eq = Hashtbl.find id_to_eq id in
+ let (w,p,(_,_,_,_),_,_) = open_equality eq in
+ let current = max current w in
+ max_weight_in_proof bag current p)
+
+let max_weight bag goal_proof proof =
+ let current = max_weight_in_proof bag 0 proof in
+ max_weight_in_goal_proof bag current goal_proof
+
+let proof_of_id (id_to_eq,_) id =
try
let (_,p,(_,l,r,_),_,_) = open_equality (Hashtbl.find id_to_eq id) in
p,l,r
Not_found -> assert false
-let string_of_proof ?(names=[]) p gp =
+let string_of_proof ?(names=[]) bag p gp =
let str_of_pos = function
| Utils.Left -> "left"
| Utils.Right -> "right"
Printf.sprintf "%s%s(%s|%d with %d dir %s pred %s))\n"
prefix (string_of_rule rule) (Subst.ppsubst ~names subst) eq1 eq2 (str_of_pos pos)
(CicPp.pp pred names)^
- aux (margin+1) (Printf.sprintf "%d" eq1) (fst3 (proof_of_id eq1)) ^
- aux (margin+1) (Printf.sprintf "%d" eq2) (fst3 (proof_of_id eq2))
+ aux (margin+1) (Printf.sprintf "%d" eq1) (fst3 (proof_of_id bag eq1)) ^
+ aux (margin+1) (Printf.sprintf "%d" eq2) (fst3 (proof_of_id bag eq2))
in
aux 0 "" p ^
String.concat "\n"
(Printf.sprintf
"GOAL: %s %s %d %s %s\n" (string_of_rule r)
(str_of_pos pos) i (Subst.ppsubst ~names s) (CicPp.pp t names)) ^
- aux 1 (Printf.sprintf "%d " i) (fst3 (proof_of_id i)))
+ aux 1 (Printf.sprintf "%d " i) (fst3 (proof_of_id bag i)))
gp)
;;
-let rec depend eq id seen =
+let rec depend ((id_to_eq,_) as bag) eq id seen =
let (_,p,(_,_,_,_),_,ideq) = open_equality eq in
if List.mem ideq seen then
false,seen
let seen = ideq::seen in
let eq1 = Hashtbl.find id_to_eq id1 in
let eq2 = Hashtbl.find id_to_eq id2 in
- let b1,seen = depend eq1 id seen in
- if b1 then b1,seen else depend eq2 id seen
+ let b1,seen = depend bag eq1 id seen in
+ if b1 then b1,seen else depend bag eq2 id seen
;;
-let depend eq id = fst (depend eq id []);;
+let depend bag eq id = fst (depend bag eq id []);;
let ppsubst = Subst.ppsubst ~names:[];;
;;
let mk_eq_ind uri ty what pred p1 other p2 =
- Cic.Appl [Cic.Const (uri, []); ty; what; pred; p1; other; p2]
+ let ens, args = build_ens uri [ty; what; pred; p1; other; p2] in
+ Cic.Appl (Cic.Const (uri, ens) :: args)
;;
let p_of_sym ens tl =
CicSubstitution.subst (Cic.Rel 1) t
;;
-
-let canonical t =
+let canonical t context menv =
let rec remove_refl t =
match t with
| Cic.Appl (((Cic.Const(uri_trans,ens))::tl) as args)
Cic.LetIn (name,remove_refl bo,remove_refl rest)
| _ -> t
in
- let rec canonical t =
+ let rec canonical context t =
match t with
- | Cic.LetIn(name,bo,rest) -> Cic.LetIn(name,canonical bo,canonical rest)
+ | Cic.LetIn(name,bo,rest) ->
+ let context' = (Some (name,Cic.Def (bo,None)))::context in
+ Cic.LetIn(name,canonical context bo,canonical context' rest)
| Cic.Appl (((Cic.Const(uri_sym,ens))::tl) as args)
when LibraryObjects.is_sym_eq_URI uri_sym ->
(match p_of_sym ens tl with
| Cic.Appl ((Cic.Const(uri,ens))::tl)
when LibraryObjects.is_sym_eq_URI uri ->
- canonical (p_of_sym ens tl)
+ canonical context (p_of_sym ens tl)
| Cic.Appl ((Cic.Const(uri_trans,ens))::tl)
when LibraryObjects.is_trans_eq_URI uri_trans ->
let ty,l,m,r,p1,p2 = open_trans ens tl in
mk_trans uri_trans ty r m l
- (canonical (mk_sym uri_sym ty m r p2))
- (canonical (mk_sym uri_sym ty l m p1))
- | Cic.Appl (((Cic.Const(uri_ind,ens)) as he)::tl)
- when LibraryObjects.is_eq_ind_URI uri_ind ||
- LibraryObjects.is_eq_ind_r_URI uri_ind ->
- let ty, what, pred, p1, other, p2 =
- match tl with
- | [ty;what;pred;p1;other;p2] -> ty, what, pred, p1, other, p2
- | _ -> assert false
- in
- let pred,l,r =
- match pred with
- | Cic.Lambda (name,s,Cic.Appl [Cic.MutInd(uri,0,ens);ty;l;r])
- when LibraryObjects.is_eq_URI uri ->
- Cic.Lambda
- (name,s,Cic.Appl [Cic.MutInd(uri,0,ens);ty;r;l]),l,r
- | _ ->
- prerr_endline (CicPp.ppterm pred);
- assert false
+ (canonical context (mk_sym uri_sym ty m r p2))
+ (canonical context (mk_sym uri_sym ty l m p1))
+ | Cic.Appl (([Cic.Const(uri_feq,ens);ty1;ty2;f;x;y;p])) ->
+ let eq = LibraryObjects.eq_URI_of_eq_f_URI uri_feq in
+ let eq_f_sym =
+ Cic.Const (LibraryObjects.eq_f_sym_URI ~eq, [])
in
- let l = CicSubstitution.subst what l in
- let r = CicSubstitution.subst what r in
- Cic.Appl
- [he;ty;what;pred;
- canonical (mk_sym uri_sym ty l r p1);other;canonical p2]
+ Cic.Appl (([eq_f_sym;ty1;ty2;f;x;y;p]))
| Cic.Appl [Cic.MutConstruct (uri, 0, 1,_);_;_] as t
when LibraryObjects.is_eq_URI uri -> t
- | _ -> Cic.Appl (List.map canonical args))
- | Cic.Appl l -> Cic.Appl (List.map canonical l)
+ | _ -> Cic.Appl (List.map (canonical context) args))
+ | Cic.Appl l -> Cic.Appl (List.map (canonical context) l)
| _ -> t
in
- remove_refl (canonical t)
+ remove_refl (canonical context t)
;;
-let ty_of_lambda = function
- | Cic.Lambda (_,ty,_) -> ty
- | _ -> assert false
-;;
-
let compose_contexts ctx1 ctx2 =
ProofEngineReduction.replace_lifting
~equality:(=) ~what:[Cic.Implicit(Some `Hole)] ~with_what:[ctx2] ~where:ctx1
;;
let mk_eq uri ty l r =
- Cic.Appl [Cic.MutInd(uri,0,[]);ty;l;r]
+ let ens, args = build_ens uri [ty; l; r] in
+ Cic.Appl (Cic.MutInd(uri,0,ens) :: args)
;;
let mk_refl uri ty t =
- Cic.Appl [Cic.MutConstruct(uri,0,1,[]);ty;t]
+ let ens, args = build_ens uri [ty; t] in
+ Cic.Appl (Cic.MutConstruct(uri,0,1,ens) :: args)
;;
let open_eq = function
| _ -> assert false
;;
+let mk_feq uri_feq ty ty1 left pred right t =
+ let ens, args = build_ens uri_feq [ty;ty1;pred;left;right;t] in
+ Cic.Appl (Cic.Const(uri_feq,ens) :: args)
+;;
+
+let rec look_ahead aux = function
+ | Cic.Appl ((Cic.Const(uri_ind,ens))::tl) as t
+ when LibraryObjects.is_eq_ind_URI uri_ind ||
+ LibraryObjects.is_eq_ind_r_URI uri_ind ->
+ let ty1,what,pred,p1,other,p2 = open_eq_ind tl in
+ let ty2,eq,lp,rp = open_pred pred in
+ let hole = Cic.Implicit (Some `Hole) in
+ let ty2 = CicSubstitution.subst hole ty2 in
+ aux ty1 (CicSubstitution.subst other lp) (CicSubstitution.subst other rp) hole ty2 t
+ | Cic.Lambda (n,s,t) -> Cic.Lambda (n,s,look_ahead aux t)
+ | t -> t
+;;
+
let contextualize uri ty left right t =
let hole = Cic.Implicit (Some `Hole) in
- (* aux [uri] [ty] [left] [right] [ctx] [t]
+ (* aux [uri] [ty] [left] [right] [ctx] [ctx_ty] [t]
*
* the parameters validate this invariant
* t: eq(uri) ty left right
* that is used only by the base case
*
* ctx is a term with an hole. Cic.Implicit(Some `Hole) is the empty context
- * ty_ctx is the type of ctx_d
+ * ctx_ty is the type of ctx
*)
let rec aux uri ty left right ctx_d ctx_ty = function
| Cic.Appl ((Cic.Const(uri_sym,ens))::tl)
let ty,l,r,p = open_sym ens tl in
mk_sym uri_sym ty l r (aux uri ty l r ctx_d ctx_ty p)
| Cic.LetIn (name,body,rest) ->
- (* we should go in body *)
- Cic.LetIn (name,body,aux uri ty left right ctx_d ctx_ty rest)
+ Cic.LetIn (name,look_ahead (aux uri) body, aux uri ty left right ctx_d ctx_ty rest)
| Cic.Appl ((Cic.Const(uri_ind,ens))::tl)
when LibraryObjects.is_eq_ind_URI uri_ind ||
LibraryObjects.is_eq_ind_r_URI uri_ind ->
mk_trans uri_trans ctx_ty a b c paeqb pbeqc
| t when ctx_d = hole -> t
| t ->
- let uri_sym = LibraryObjects.sym_eq_URI ~eq:uri in
- let uri_ind = LibraryObjects.eq_ind_URI ~eq:uri in
+(* let uri_sym = LibraryObjects.sym_eq_URI ~eq:uri in *)
+(* let uri_ind = LibraryObjects.eq_ind_URI ~eq:uri in *)
+
+ let uri_feq = LibraryObjects.eq_f_URI ~eq:uri in
let pred =
- (* ctx_d will go under a lambda, but put_in_ctx substitutes Rel 1 *)
- let r = CicSubstitution.lift 1 (put_in_ctx ctx_d left) in
+(* let r = CicSubstitution.lift 1 (put_in_ctx ctx_d left) in *)
let l =
let ctx_d = CicSubstitution.lift 1 ctx_d in
put_in_ctx ctx_d (Cic.Rel 1)
in
- let lty = CicSubstitution.lift 1 ctx_ty in
- Cic.Lambda (Cic.Name "foo",ty,(mk_eq uri lty l r))
+(* let lty = CicSubstitution.lift 1 ctx_ty in *)
+(* Cic.Lambda (Cic.Name "foo",ty,(mk_eq uri lty l r)) *)
+ Cic.Lambda (Cic.Name "foo",ty,l)
in
- let d_left = put_in_ctx ctx_d left in
- let d_right = put_in_ctx ctx_d right in
- let refl_eq = mk_refl uri ctx_ty d_left in
- mk_sym uri_sym ctx_ty d_right d_left
- (mk_eq_ind uri_ind ty left pred refl_eq right t)
+(* let d_left = put_in_ctx ctx_d left in *)
+(* let d_right = put_in_ctx ctx_d right in *)
+(* let refl_eq = mk_refl uri ctx_ty d_left in *)
+(* mk_sym uri_sym ctx_ty d_right d_left *)
+(* (mk_eq_ind uri_ind ty left pred refl_eq right t) *)
+ (mk_feq uri_feq ty ctx_ty left pred right t)
in
aux uri ty left right hole ty t
;;
function
| Exact t -> Exact (Subst.apply_subst subst t)
| Step (s,(rule, id1, (pos,id2), pred)) ->
- Step (Subst.concat subst s,(rule, id1, (pos,id2), pred))
+ Step (Subst.concat subst s,(rule, id1, (pos,id2), pred))
;;
let build_proof_step eq lift subst p1 p2 pos l r pred =
;;
let parametrize_proof p l r ty =
- let parameters =
- CicUtil.metas_of_term p @ CicUtil.metas_of_term l @ CicUtil.metas_of_term r
- in (* ?if they are under a lambda? *)
+ let uniq l = HExtlib.list_uniq (List.sort Pervasives.compare l) in
+ let mot = CicUtil.metas_of_term_set in
+ let parameters = uniq (mot p @ mot l @ mot r) in
+ (* ?if they are under a lambda? *)
+(*
let parameters =
HExtlib.list_uniq (List.sort Pervasives.compare parameters)
in
+*)
let what = List.map (fun (i,l) -> Cic.Meta (i,l)) parameters in
let with_what, lift_no =
List.fold_right (fun _ (acc,n) -> ((Cic.Rel n)::acc),n+1) what ([],1)
(fun (instance,p,n) m ->
(instance@[m],
Cic.Lambda
- (Cic.Name ("x"^string_of_int n),
+ (Cic.Name ("X"^string_of_int n),
CicSubstitution.lift (lift_no - n - 1) (ty_of_m m),
p),
n+1))
proof, instance
;;
-let wfo goalproof proof id =
+let wfo bag goalproof proof id =
let rec aux acc id =
- let p,_,_ = proof_of_id id in
+ let p,_,_ = proof_of_id bag id in
match p with
| Exact _ -> if (List.mem id acc) then acc else id :: acc
| Step (_,(_,id1, (_,id2), _)) ->
List.fold_left (fun acc (_,_,id,_,_) -> aux acc id) acc goalproof
;;
-let string_of_id names id =
+let string_of_id (id_to_eq,_) names id =
if id = 0 then "" else
try
let (_,p,(_,l,r,_),m,_) = open_equality (Hashtbl.find id_to_eq id) in
| Exact t ->
Printf.sprintf "%d = %s: %s = %s [%s]" id
(CicPp.pp t names) (CicPp.pp l names) (CicPp.pp r names)
- (String.concat ", " (List.map (fun (i,_,_) -> string_of_int i) m))
+ "..."
+(* (String.concat ", " (List.map (fun (i,_,_) -> string_of_int i) m)) *)
| Step (_,(step,id1, (_,id2), _) ) ->
Printf.sprintf "%6d: %s %6d %6d %s = %s [%s]" id
(string_of_rule step)
id1 id2 (CicPp.pp l names) (CicPp.pp r names)
- (String.concat ", " (List.map (fun (i,_,_) -> string_of_int i) m))
+(* (String.concat ", " (List.map (fun (i,_,_) -> string_of_int i) m)) *)
+ "..."
with
Not_found -> assert false
-let pp_proof names goalproof proof subst id initial_goal =
- String.concat "\n" (List.map (string_of_id names) (wfo goalproof proof id)) ^
+let pp_proof bag names goalproof proof subst id initial_goal =
+ String.concat "\n" (List.map (string_of_id bag names) (wfo bag goalproof proof id)) ^
"\ngoal:\n " ^
(String.concat "\n "
(fst (List.fold_right
module M = Map.Make(OT)
-let rec find_deps m i =
+let rec find_deps bag m i =
if M.mem i m then m
else
- let p,_,_ = proof_of_id i in
+ let p,_,_ = proof_of_id bag i in
match p with
| Exact _ -> M.add i [] m
| Step (_,(_,id1,(_,id2),_)) ->
- let m = find_deps m id1 in
- let m = find_deps m id2 in
+ let m = find_deps bag m id1 in
+ let m = find_deps bag m id2 in
(* without the uniq there is a stack overflow doing concatenation *)
let xxx = [id1;id2] @ M.find id1 m @ M.find id2 m in
let xxx = HExtlib.list_uniq (List.sort Pervasives.compare xxx) in
M.add i xxx m
;;
-let topological_sort l =
+let topological_sort bag l =
(* build the partial order relation *)
- let m =
- List.fold_left (fun m i -> find_deps m i)
- M.empty l
+ let m = List.fold_left (fun m i -> find_deps bag m i) M.empty l in
+ let m = (* keep only deps inside l *)
+ List.fold_left
+ (fun m' i ->
+ M.add i (List.filter (fun x -> List.mem x l) (M.find i m)) m')
+ M.empty l
in
let m = M.map (fun x -> Some x) m in
(* utils *)
let res = ok @ res in
if ok = [] then res else aux m res
in
- aux m []
+ let rc = List.rev (aux m []) in
+ rc
;;
(* returns the list of ids that should be factorized *)
-let get_duplicate_step_in_wfo l p =
+let get_duplicate_step_in_wfo bag l p =
let ol = List.rev l in
let h = Hashtbl.create 13 in
(* NOTE: here the n parameter is an approximation of the dependency
between equations. To do things seriously we should maintain a
dependency graph. This approximation is not perfect. *)
let add i =
- let p,_,_ = proof_of_id i in
+ let p,_,_ = proof_of_id bag i in
match p with
| Exact _ -> true
| _ ->
| Step (_,(_,i1,(_,i2),_)) ->
let go_on_1 = add i1 in
let go_on_2 = add i2 in
- if go_on_1 then aux (let p,_,_ = proof_of_id i1 in p);
- if go_on_2 then aux (let p,_,_ = proof_of_id i2 in p)
+ if go_on_1 then aux (let p,_,_ = proof_of_id bag i1 in p);
+ if go_on_2 then aux (let p,_,_ = proof_of_id bag i2 in p)
in
aux p;
List.iter
- (fun (_,_,id,_,_) -> aux (let p,_,_ = proof_of_id id in p))
+ (fun (_,_,id,_,_) -> aux (let p,_,_ = proof_of_id bag id in p))
ol;
(* now h is complete *)
let proofs = Hashtbl.fold (fun k count acc-> (k,count)::acc) h [] in
let proofs = List.filter (fun (_,c) -> c > 1) proofs in
- let res = topological_sort (List.map (fun (i,_) -> i) proofs) in
+ let res = topological_sort bag (List.map (fun (i,_) -> i) proofs) in
res
;;
-let build_proof_term eq h lift proof =
+let build_proof_term bag eq h lift proof =
let proof_of_id aux id =
- let p,l,r = proof_of_id id in
+ let p,l,r = proof_of_id bag id in
try List.assoc id h,l,r with Not_found -> aux p, l, r
in
let rec aux = function
- | Exact term -> CicSubstitution.lift lift term
+ | Exact term ->
+ CicSubstitution.lift lift term
| Step (subst,(rule, id1, (pos,id2), pred)) ->
let p1,_,_ = proof_of_id aux id1 in
let p2,l,r = proof_of_id aux id2 in
| Cic.Lambda (_,a,b) -> Cic.Lambda (varname,a,b)
| _ -> assert false
in
- let p = build_proof_step eq lift subst p1 p2 pos l r pred in
+ let p = build_proof_step eq lift subst p1 p2 pos l r pred in
(* let cond = (not (List.mem 302 (Utils.metas_of_term p)) || id1 = 8 || id1 = 132) in
if not cond then
prerr_endline ("ERROR " ^ string_of_int id1 ^ " " ^ string_of_int id2);
aux proof
;;
-let build_goal_proof eq l initial ty se =
+let build_goal_proof bag eq l initial ty se context menv =
let se = List.map (fun i -> Cic.Meta (i,[])) se in
- let lets = get_duplicate_step_in_wfo l initial in
+ let lets = get_duplicate_step_in_wfo bag l initial in
let letsno = List.length lets in
let _,mty,_,_ = open_eq ty in
let lift_list l = List.map (fun (i,t) -> i,CicSubstitution.lift 1 t) l in
let lets,_,h =
List.fold_left
(fun (acc,n,h) id ->
- let p,l,r = proof_of_id id in
- let cic = build_proof_term eq h n p in
+ let p,l,r = proof_of_id bag id in
+ let cic = build_proof_term bag eq h n p in
let real_cic,instance =
parametrize_proof cic l r (CicSubstitution.lift n mty)
in
let rec aux se current_proof = function
| [] -> current_proof,se
| (rule,pos,id,subst,pred)::tl ->
- let p,l,r = proof_of_id id in
- let p = build_proof_term eq h letsno p in
+ let p,l,r = proof_of_id bag id in
+ let p = build_proof_term bag eq h letsno p in
let pos = if pos = Utils.Left then Utils.Right else Utils.Left in
let varname =
match rule with
in
let proof,se = aux se proof tl in
Subst.apply_subst_lift letsno subst proof,
- List.map (fun x -> Subst.apply_subst_lift letsno subst x) se
+ List.map (fun x -> Subst.apply_subst(*_lift letsno*) subst x) se
in
- aux se (build_proof_term eq h letsno initial) l
+ aux se (build_proof_term bag eq h letsno initial) l
in
let n,proof =
let initial = proof in
cic, p))
lets (letsno-1,initial)
in
- canonical (contextualize_rewrites proof (CicSubstitution.lift letsno ty)),
+ canonical
+ (contextualize_rewrites proof (CicSubstitution.lift letsno ty))
+ context menv,
se
;;
Cic.Appl [Cic.MutConstruct (eq_uri, 0, 1, []); ty; term]
;;
-let metas_of_proof p =
+let metas_of_proof bag p =
let eq =
match LibraryObjects.eq_URI () with
| Some u -> u
(ProofEngineTypes.Fail
(lazy "No default equality defined when calling metas_of_proof"))
in
- let p = build_proof_term eq [] 0 p in
+ let p = build_proof_term bag eq [] 0 p in
Utils.metas_of_term p
;;
let menv = Subst.apply_subst_metasenv subst menv @ newmetasenv in
subst, menv, newmeta
-let fix_metas newmeta eq =
+let fix_metas_goal newmeta goal =
+ let (proof, menv, ty) = goal in
+ let to_be_relocated =
+ HExtlib.list_uniq (List.sort Pervasives.compare (Utils.metas_of_term ty))
+ in
+ let subst, menv, newmeta = relocate newmeta menv to_be_relocated in
+ let ty = Subst.apply_subst subst ty in
+ let proof =
+ match proof with
+ | [] -> assert false (* is a nonsense to relocate the initial goal *)
+ | (r,pos,id,s,p) :: tl -> (r,pos,id,Subst.concat subst s,p) :: tl
+ in
+ newmeta+1,(proof, menv, ty)
+;;
+
+let fix_metas bag newmeta eq =
let w, p, (ty, left, right, o), menv,_ = open_equality eq in
let to_be_relocated =
(* List.map (fun i ,_,_ -> i) menv *)
Step (Subst.concat s subst,(r,id1,(pos,id2), pred))
in
let p = fix_proof p in
- let eq' = mk_equality (w, p, (ty, left, right, o), metasenv) in
+ let eq' = mk_equality bag (w, p, (ty, left, right, o), metasenv) in
newmeta+1, eq'
exception NotMetaConvertible;;
let meta_convertibility_aux table t1 t2 =
let module C = Cic in
- let rec aux ((table_l, table_r) as table) t1 t2 =
+ let rec aux ((table_l,table_r) as table) t1 t2 =
match t1, t2 with
+ | C.Meta (m1, tl1), C.Meta (m2, tl2) when m1 = m2 -> table
+ | C.Meta (m1, tl1), C.Meta (m2, tl2) when m1 < m2 -> aux table t2 t1
| C.Meta (m1, tl1), C.Meta (m2, tl2) ->
- let tl1, tl2 = [],[] in
let m1_binding, table_l =
try List.assoc m1 table_l, table_l
with Not_found -> m2, (m1, m2)::table_l
in
if (m1_binding <> m2) || (m2_binding <> m1) then
raise NotMetaConvertible
- else (
- try
- List.fold_left2
- (fun res t1 t2 ->
- match t1, t2 with
- | None, Some _ | Some _, None -> raise NotMetaConvertible
- | None, None -> res
- | Some t1, Some t2 -> (aux res t1 t2))
- (table_l, table_r) tl1 tl2
- with Invalid_argument _ ->
- raise NotMetaConvertible
- )
+ else table_l,table_r
| C.Var (u1, ens1), C.Var (u2, ens2)
| C.Const (u1, ens1), C.Const (u2, ens2) when (UriManager.eq u1 u2) ->
aux_ens table ens1 ens2
true
else
try
- let table = meta_convertibility_aux ([], []) left left' in
+ let table = meta_convertibility_aux ([],[]) left left' in
let _ = meta_convertibility_aux table right right' in
true
with NotMetaConvertible ->
try
- let table = meta_convertibility_aux ([], []) left right' in
+ let table = meta_convertibility_aux ([],[]) left right' in
let _ = meta_convertibility_aux table right left' in
true
with NotMetaConvertible ->
true
else
try
- ignore(meta_convertibility_aux ([], []) t1 t2);
+ ignore(meta_convertibility_aux ([],[]) t1 t2);
true
with NotMetaConvertible ->
false
| _ -> false
;;
-let equality_of_term proof term =
+let equality_of_term bag proof term =
match term with
| Cic.Appl [Cic.MutInd (uri, _, _); ty; t1; t2]
when LibraryObjects.is_eq_URI uri ->
let o = !Utils.compare_terms t1 t2 in
let stat = (ty,t1,t2,o) in
let w = Utils.compute_equality_weight stat in
- let e = mk_equality (w, Exact proof, stat,[]) in
+ let e = mk_equality bag (w, Exact proof, stat,[]) in
e
| _ ->
raise TermIsNotAnEquality
let is_weak_identity eq =
let _,_,(_,left, right,_),_,_ = open_equality eq in
- left = right || meta_convertibility left right
+ left = right
+ (* doing metaconv here is meaningless *)
;;
let is_identity (_, context, ugraph) eq =
let _,_,(ty,left,right,_),menv,_ = open_equality eq in
- left = right ||
- (* (meta_convertibility left right)) *)
- fst (CicReduction.are_convertible ~metasenv:menv context left right ugraph)
+ (* doing metaconv here is meaningless *)
+ left = right
+(* fst (CicReduction.are_convertible ~metasenv:menv context left right ugraph)
+ * *)
;;
menv (argsno, t))
;;
-let symmetric eq_ty l id uri m =
+let symmetric bag eq_ty l id uri m =
let eq = Cic.MutInd(uri,0,[]) in
let pred =
Cic.Lambda (Cic.Name "Sym",eq_ty,
[Cic.MutConstruct(uri,0,1,[]);eq_ty;l])
in
let id1 =
- let eq = mk_equality (0,prefl,(eq_ty,l,l,Utils.Eq),m) in
+ let eq = mk_equality bag (0,prefl,(eq_ty,l,l,Utils.Eq),m) in
let (_,_,_,_,id) = open_equality eq in
id
in
(Demodulation,id1,(Utils.Left,id),pred))
;;
+module IntOT = struct
+ type t = int
+ let compare = Pervasives.compare
+end
+
+module IntSet = Set.Make(IntOT);;
+
+let n_purged = ref 0;;
+
+let collect ((id_to_eq,_) as bag) alive1 alive2 alive3 =
+(* let _ = <:start<collect>> in *)
+ let deps_of id =
+ let p,_,_ = proof_of_id bag id in
+ match p with
+ | Exact _ -> IntSet.empty
+ | Step (_,(_,id1,(_,id2),_)) ->
+ IntSet.add id1 (IntSet.add id2 IntSet.empty)
+ in
+ let rec close s =
+ let news = IntSet.fold (fun id s -> IntSet.union (deps_of id) s) s s in
+ if IntSet.equal news s then s else close news
+ in
+ let l_to_s s l = List.fold_left (fun s x -> IntSet.add x s) s l in
+ let alive_set = l_to_s (l_to_s (l_to_s IntSet.empty alive2) alive1) alive3 in
+ let closed_alive_set = close alive_set in
+ let to_purge =
+ Hashtbl.fold
+ (fun k _ s ->
+ if not (IntSet.mem k closed_alive_set) then
+ k::s else s) id_to_eq []
+ in
+ n_purged := !n_purged + List.length to_purge;
+ List.iter (Hashtbl.remove id_to_eq) to_purge;
+(* let _ = <:stop<collect>> in () *)
+;;
+
+let id_of e =
+ let _,_,_,_,id = open_equality e in id
+;;
+
+let get_stats () = ""
+(*
+ <:show<Equality.>> ^
+ "# of purged eq by the collector: " ^ string_of_int !n_purged ^ "\n"
+*)
+;;
+
+let rec pp_proofterm name t context =
+ let rec skip_lambda tys ctx = function
+ | Cic.Lambda (n,s,t) -> skip_lambda (s::tys) ((Some n)::ctx) t
+ | t -> ctx,tys,t
+ in
+ let rename s name =
+ match name with
+ | Cic.Name s1 -> Cic.Name (s ^ s1)
+ | _ -> assert false
+ in
+ let rec skip_letin ctx = function
+ | Cic.LetIn (n,b,t) ->
+ pp_proofterm (Some (rename "Lemma " n)) b ctx::
+ skip_letin ((Some n)::ctx) t
+ | t ->
+ let ppterm t = CicPp.pp t ctx in
+ let rec pp inner = function
+ | Cic.Appl [Cic.Const (uri,[]);_;l;m;r;p1;p2]
+ when Pcre.pmatch ~pat:"trans_eq" (UriManager.string_of_uri uri)->
+ if not inner then
+ (" " ^ ppterm l) :: pp true p1 @
+ [ " = " ^ ppterm m ] @ pp true p2 @
+ [ " = " ^ ppterm r ]
+ else
+ pp true p1 @
+ [ " = " ^ ppterm m ] @ pp true p2
+ | Cic.Appl [Cic.Const (uri,[]);_;l;m;p]
+ when Pcre.pmatch ~pat:"sym_eq" (UriManager.string_of_uri uri)->
+ pp true p
+ | Cic.Appl [Cic.Const (uri,[]);_;_;_;_;_;p]
+ when Pcre.pmatch ~pat:"eq_f" (UriManager.string_of_uri uri)->
+ pp true p
+ | Cic.Appl [Cic.Const (uri,[]);_;_;_;_;_;p]
+ when Pcre.pmatch ~pat:"eq_f1" (UriManager.string_of_uri uri)->
+ pp true p
+ | Cic.Appl [Cic.MutConstruct (uri,_,_,[]);_;_;t;p]
+ when Pcre.pmatch ~pat:"ex.ind" (UriManager.string_of_uri uri)->
+ [ "witness " ^ ppterm t ] @ pp true p
+ | Cic.Appl (t::_) ->[ " [by " ^ ppterm t ^ "]"]
+ | t ->[ " [by " ^ ppterm t ^ "]"]
+ in
+ let rec compat = function
+ | a::b::tl -> (b ^ a) :: compat tl
+ | h::[] -> [h]
+ | [] -> []
+ in
+ let compat l = List.hd l :: compat (List.tl l) in
+ compat (pp false t) @ ["";""]
+ in
+ let names, tys, body = skip_lambda [] context t in
+ let ppname name = (match name with Some (Cic.Name s) -> s | _ -> "") in
+ ppname name ^ ":\n" ^
+ (if context = [] then
+ let rec pp_l ctx = function
+ | (t,name)::tl ->
+ " " ^ ppname name ^ ": " ^ CicPp.pp t ctx ^ "\n" ^
+ pp_l (name::ctx) tl
+ | [] -> "\n\n"
+ in
+ pp_l [] (List.rev (List.combine tys names))
+ else "")
+ ^
+ String.concat "\n" (skip_letin names body)
+;;
+
+let pp_proofterm t =
+ "\n\n" ^
+ pp_proofterm (Some (Cic.Name "Hypothesis")) t []
+;;
+