(* *)
(***************************************************************************)
+let p_mtr a b = Mpresentation.Mtr(a,b)
+let p_mtd a b = Mpresentation.Mtd(a,b)
+let p_mtable a b = Mpresentation.Mtable(a,b)
+let p_mtext a b = Mpresentation.Mtext(a,b)
+let p_mi a b = Mpresentation.Mi(a,b)
+let p_mo a b = Mpresentation.Mo(a,b)
+let p_mrow a b = Mpresentation.Mrow(a,b)
+let p_mphantom a b = Mpresentation.Mphantom(a,b)
+
+
let rec split n l =
if n = 0 then [],l
else let l1,l2 =
(match prem.Con.premise_binder with
Some s -> current_size + (String.length s)
| None -> current_size + 7)
+ | Con.Lemma lemma ->
+ current_size + (String.length lemma.Con.lemma_name)
| Con.Term t -> countterm current_size t
| Con.ArgProof p -> countp current_size p
| Con.ArgMethod s -> (maxsize + 1)) in
let is_big = is_big_general (Cexpr2pres.countterm)
;;
-let make_row items concl =
+let get_xref =
+ let module Con = Content in
+ function
+ `Declaration d
+ | `Hypothesis d -> d.Con.dec_id
+ | `Proof p -> p.Con.proof_id
+ | `Definition d -> d.Con.def_id
+ | `Joint jo -> jo.Con.joint_id
+;;
+
+let make_row ?(attrs=[]) items concl =
let module P = Mpresentation in
(match concl with
P.Mtable _ -> (* big! *)
- P.Mtable ([None,"align","baseline 1"; None,"equalrows","false";
+ P.Mtable (attrs@[None,"align","baseline 1"; None,"equalrows","false";
None,"columnalign","left"],
[P.Mtr([],[P.Mtd ([],P.Mrow([],items))]);
P.Mtr ([],[P.Mtd ([],P.indented concl)])])
| _ -> (* small *)
- P.Mrow([],items@[P.Mspace([None,"width","0.1cm"]);concl]))
+ P.Mrow(attrs,items@[P.Mspace([None,"width","0.1cm"]);concl]))
;;
-let make_concl verb concl =
+let make_concl ?(attrs=[]) verb concl =
let module P = Mpresentation in
(match concl with
P.Mtable _ -> (* big! *)
- P.Mtable ([None,"align","baseline 1"; None,"equalrows","false";
+ P.Mtable (attrs@[None,"align","baseline 1"; None,"equalrows","false";
None,"columnalign","left"],
[P.Mtr([],[P.Mtd ([],P.Mtext([None,"mathcolor","Red"],verb))]);
P.Mtr ([],[P.Mtd ([],P.indented concl)])])
| _ -> (* small *)
- P.Mrow([],
+ P.Mrow(attrs,
[P.Mtext([None,"mathcolor","Red"],verb);
P.Mspace([None,"width","0.1cm"]);
concl]))
let make_args_for_apply term2pres args =
let module Con = Content in
let module P = Mpresentation in
- let rec make_arg_for_apply is_first arg row =
- (match arg with
+ let make_arg_for_apply is_first arg row =
+ let res =
+ match arg with
Con.Aux n -> assert false
| Con.Premise prem ->
let name =
None -> "previous"
| Some s -> s) in
P.Mi([],name)::row
+ | Con.Lemma lemma ->
+ P.Mi([],lemma.Con.lemma_name)::row
| Con.Term t ->
if is_first then
(term2pres t)::row
- else P.Mspace([None,"width","0.1cm"])::P.Mi([],"_")::row
+ else P.Mi([],"_")::row
| Con.ArgProof _
| Con.ArgMethod _ ->
- P.Mspace([None,"width","0.1cm"])::P.Mi([],"_")::row) in
- match args with
- hd::tl ->
- make_arg_for_apply true hd
- (List.fold_right (make_arg_for_apply false) tl [])
- | _ -> assert false;;
+ P.Mi([],"_")::row
+ in
+ if is_first then res else P.smallskip::res
+ in
+ match args with
+ hd::tl ->
+ make_arg_for_apply true hd
+ (List.fold_right (make_arg_for_apply false) tl [])
+ | _ -> assert false
+;;
let rec justification term2pres p =
let module Con = Content in
| `Hypothesis _ -> true
| _ -> false) in
((List.filter is_decl p.Con.proof_context) != []) in
+ let omit_conclusion = (not indent) && (p.Con.proof_context != []) in
let concl =
(match p.Con.proof_conclude.Con.conclude_conclusion with
None -> None
| Some t -> Some (term2pres t)) in
let body =
- let presconclude = conclude2pres p.Con.proof_conclude indent in
+ let presconclude =
+ conclude2pres p.Con.proof_conclude indent omit_conclusion in
let presacontext =
acontext2pres p.Con.proof_apply_context presconclude indent in
context2pres p.Con.proof_context presacontext in
-(*
- P.Mtable ([("align","baseline 1");("equalrows","false");
- ("columnalign","left")],
- (context2pres_old p.Con.proof_context)@
- (acontext2pres_old p.Con.proof_apply_context indent)@
- [conclude2pres_old p.Con.proof_conclude indent]) in *)
match p.Con.proof_name with
None -> body
| Some name ->
- let ac =
- (match concl with
- None -> P.Mtext([],"NO PROOF!!!")
- | Some c -> c) in
let action =
- P.Maction([None,"actiontype","toggle"],
- [(make_concl "proof of" ac);
- body]) in
+ match concl with
+ None -> body
+(*
+ P.Maction
+ ([None,"actiontype","toggle" ; None,"selection","1"],
+ [P.Mtext [] "proof" ; body])
+*)
+ | Some ac ->
+ P.Maction
+ ([None,"actiontype","toggle" ; None,"selection","1"],
+ [(make_concl ~attrs:[Some "helm", "xref", p.Con.proof_id]
+ "proof of" ac); body])
+ in
P.Mtable ([None,"align","baseline 1"; None,"equalrows","false";
None,"columnalign","left"],
[P.Mtr ([],[P.Mtd ([],P.Mfenced([],[P.Mtext ([],name)]))]);
P.Mtr ([],[P.Mtd ([], P.indented action)])])
+(*
+ P.Mtable ([None,"align","baseline 1"; None,"equalrows","false";
+ None,"columnalign","left";Some "helm", "xref", p.Con.proof_id],
+ [P.Mtr ([],[P.Mtd ([],P.Mfenced([],[P.Mtext ([],name)]))]);
+ P.Mtr ([],[P.Mtd ([], P.indented action)])]) *)
and context2pres c continuation =
+ (* we generate a subtable for each context element, for selection
+ purposes
+ The table generated by the head-element does not have an xref;
+ the whole context-proof is already selectable *)
let module P = Mpresentation in
- List.fold_right
- (fun ce continuation ->
+ match c with
+ [] -> continuation
+ | hd::tl ->
+ let continuation' =
+ List.fold_right
+ (fun ce continuation ->
+ let xref = get_xref ce in
+ P.Mtable([None,"align","baseline 1"; None,"equalrows","false";
+ None,"columnalign","left"; Some "helm", "xref", xref ],
+ [P.Mtr([Some "helm", "xref", "ce_"^xref],[P.Mtd ([],ce2pres ce)]);
+ P.Mtr([],[P.Mtd ([], continuation)])])) tl continuation in
+ let hd_xref= get_xref hd in
P.Mtable([None,"align","baseline 1"; None,"equalrows","false";
- None,"columnalign","left"],
- [P.Mtr([],[P.Mtd ([],ce2pres ce)]);
- P.Mtr([],[P.Mtd ([], continuation)])])) c continuation
-
- and context2pres_old c =
- let module P = Mpresentation in
- List.map
- (function ce -> P.Mtr ([], [P.Mtd ([], ce2pres ce)])) c
-
+ None,"columnalign","left"],
+ [P.Mtr([Some "helm", "xref", "ce_"^hd_xref],
+ [P.Mtd ([],ce2pres hd)]);
+ P.Mtr([],[P.Mtd ([], continuation')])])
+
and ce2pres =
let module P = Mpresentation in
let module Con = Content in
P.Mrow ([],
[P.Mtext([None,"mathcolor","Red"],"Suppose");
P.Mspace([None,"width","0.1cm"]);
- P.Mtext([],"(");
+ P.Mo([],"(");
P.Mi ([],s);
- P.Mtext([],")");
+ P.Mo([],")");
P.Mspace([None,"width","0.1cm"]);
ty])
| None ->
prerr_endline "NO NAME!!"; assert false)
- | `Proof p -> proof2pres p
+ | `Proof p ->
+ proof2pres p
| `Definition d ->
(match d.Con.def_name with
Some s ->
P.Mtext ([],"jointdef")
and acontext2pres ac continuation indent =
+ let module Con = Content in
let module P = Mpresentation in
List.fold_right
(fun p continuation ->
else
proof2pres p in
P.Mtable([None,"align","baseline 1"; None,"equalrows","false";
- None,"columnalign","left"],
- [P.Mtr([],[P.Mtd ([],hd)]);
+ None,"columnalign","left"; Some "helm","xref",p.Con.proof_id],
+ [P.Mtr([Some "helm","xref","ace_"^p.Con.proof_id],[P.Mtd ([],hd)]);
P.Mtr([],[P.Mtd ([], continuation)])])) ac continuation
- and acontext2pres_old ac indent =
- let module P = Mpresentation in
- List.map
- (function p ->
- if indent then
- P.Mtr ([], [P.Mtd ([], P.indented (proof2pres p))])
- else
- P.Mtr ([],
- [P.Mtd ([], proof2pres p)])) ac
-
- and conclude2pres conclude indent =
+ and conclude2pres conclude indent omit_conclusion =
+ let module Con = Content in
let module P = Mpresentation in
- if indent then
- P.indented (conclude_aux conclude)
+ let tconclude_body =
+ match conclude.Con.conclude_conclusion with
+ Some t when
+ not omit_conclusion or
+ (* CSC: I ignore the omit_conclusion flag in this case. *)
+ (* CSC: Is this the correct behaviour? In the stylesheets *)
+ (* CSC: we simply generated nothing (i.e. the output type *)
+ (* CSC: of the function should become an option. *)
+ conclude.Con.conclude_method = "BU_Conversion" ->
+ let concl = (term2pres t) in
+ if conclude.Con.conclude_method = "BU_Conversion" then
+ make_concl "that is equivalent to" concl
+ else if conclude.Con.conclude_method = "FalseInd" then
+ (* false ind is in charge to add the conclusion *)
+ falseind conclude
+ else
+ let conclude_body = conclude_aux conclude in
+ let ann_concl =
+ if conclude.Con.conclude_method = "TD_Conversion" then
+ make_concl "that is equivalent to" concl
+ else make_concl "we conclude" concl in
+ P.Mtable ([None,"align","baseline 1"; None,"equalrows","false";
+ None,"columnalign","left"],
+ [P.Mtr ([],[P.Mtd ([],conclude_body)]);
+ P.Mtr ([],[P.Mtd ([],ann_concl)])])
+ | _ -> conclude_aux conclude in
+ if indent then
+ P.indented (P.Mrow ([Some "helm", "xref", conclude.Con.conclude_id],
+ [tconclude_body]))
else
- conclude_aux conclude
+ P.Mrow ([Some "helm", "xref", conclude.Con.conclude_id],[tconclude_body])
- and conclude2pres_old conclude indent =
- let module P = Mpresentation in
- if indent then
- P.Mtr ([], [P.Mtd ([], P.indented (conclude_aux conclude))])
- else
- P.Mtr ([],
- [P.Mtd ([], conclude_aux conclude)])
and conclude_aux conclude =
let module Con = Content in
P.Mtr([],[P.Mtd([],make_concl "or equivalently" synth)]);
P.Mtr([],[P.Mtd([],proof2pres subproof)])])
else if conclude.Con.conclude_method = "BU_Conversion" then
- let conclusion =
- (match conclude.Con.conclude_conclusion with
- None -> P.Mtext([],"NO Conclusion!!!")
- | Some c -> term2pres c) in
- make_concl "that is equivalent to" conclusion
+ assert false
else if conclude.Con.conclude_method = "Exact" then
- let conclusion =
- (match conclude.Con.conclude_conclusion with
- None -> P.Mtext([],"NO Conclusion!!!")
- | Some c -> term2pres c) in
let arg =
(match conclude.Con.conclude_args with
[Con.Term t] -> term2pres t
| _ -> assert false) in
- make_row
- [arg;P.Mspace([None,"width","0.1cm"]);P.Mtext([],"proves")] conclusion
+ (match conclude.Con.conclude_conclusion with
+ None ->
+ p_mrow []
+ [p_mtext [None, "mathcolor", "red"] "Consider" ; P.smallskip; arg]
+ | Some c -> let conclusion = term2pres c in
+ make_row
+ [arg; P.Mspace([None,"width","0.1cm"]);P.Mtext([],"proves")]
+ conclusion
+ )
else if conclude.Con.conclude_method = "Intros+LetTac" then
+ (match conclude.Con.conclude_args with
+ [Con.ArgProof p] -> proof2pres p
+ | _ -> assert false)
+(* OLD CODE
let conclusion =
(match conclude.Con.conclude_conclusion with
None -> P.Mtext([],"NO Conclusion!!!")
None,"columnalign","left"],
[P.Mtr([],[P.Mtd([],proof2pres p)]);
P.Mtr([],[P.Mtd([],
- (make_concl "we proved *" conclusion))])]);
+ (make_concl "we proved 1" conclusion))])]);
| _ -> assert false)
+*)
else if (conclude.Con.conclude_method = "ByInduction") then
byinduction conclude
+ else if (conclude.Con.conclude_method = "Exists") then
+ exists conclude
+ else if (conclude.Con.conclude_method = "AndInd") then
+ andind conclude
+ else if (conclude.Con.conclude_method = "FalseInd") then
+ falseind conclude
else if (conclude.Con.conclude_method = "Rewrite") then
let justif =
(match (List.nth conclude.Con.conclude_args 6) with
let term2 =
(match List.nth conclude.Con.conclude_args 5 with
Con.Term t -> term2pres t
- | _ -> assert false) in
- let conclusion =
- (match conclude.Con.conclude_conclusion with
- None -> P.Mtext([],"NO Conclusion!!!")
- | Some c -> term2pres c) in
+ | _ -> assert false) in
P.Mtable ([None,"align","baseline 1";None,"equalrows","false";
- None,"columnalign","left"],
- [P.Mtr ([],[P.Mtd ([],P.Mrow([],[
- P.Mtext([None,"mathcolor","Red"],"rewrite");
- P.Mspace([None,"width","0.1cm"]);term1;
- P.Mspace([None,"width","0.1cm"]);
- P.Mtext([None,"mathcolor","Red"],"with");
- P.Mspace([None,"width","0.1cm"]);term2]))]);
- P.Mtr ([],[P.Mtd ([],P.indented justif)]);
- P.Mtr ([],[P.Mtd ([],make_concl "we proved" conclusion)])])
+ None,"columnalign","left"],
+ [P.Mtr ([],[P.Mtd ([],P.Mrow([],[
+ P.Mtext([None,"mathcolor","Red"],"rewrite");
+ P.Mspace([None,"width","0.1cm"]);term1;
+ P.Mspace([None,"width","0.1cm"]);
+ P.Mtext([None,"mathcolor","Red"],"with");
+ P.Mspace([None,"width","0.1cm"]);term2]))]);
+ P.Mtr ([],[P.Mtd ([],P.indented justif)])]);
else if conclude.Con.conclude_method = "Apply" then
let pres_args =
- make_args_for_apply term2pres conclude.Con.conclude_args in
- let by =
- P.Mrow([],
- P.Mtext([None,"mathcolor","Red"],"by")::P.Mspace([None,"width","0.1cm"])::
- P.Mo([],"(")::pres_args@[P.Mo([],")")]) in
- match conclude.Con.conclude_conclusion with
- None -> P.Mrow([],[P.Mtext([],"QUA");by])
- | Some t ->
- let concl = (term2pres t) in
- let ann_concl = make_concl "we proved" concl in
- P.Mtable ([None,"align","baseline 1"; None,"equalrows","false";
- None,"columnalign","left"],
- [P.Mtr ([],[P.Mtd ([],by)]);
- P.Mtr ([],[P.Mtd ([],ann_concl)])])
- else let body =
+ make_args_for_apply term2pres conclude.Con.conclude_args in
+ P.Mrow([],
+ P.Mtext([None,"mathcolor","Red"],"by")::
+ P.Mspace([None,"width","0.1cm"])::
+ P.Mo([],"(")::pres_args@[P.Mo([],")")])
+ else
P.Mtable
([None,"align","baseline 1"; None,"equalrows","false"; None,"columnalign","left"],
[P.Mtr ([],[P.Mtd ([],P.Mtext([],"Apply method" ^ conclude.Con.conclude_method ^ " to"))]);
(P.Mtable
([None,"align","baseline 1"; None,"equalrows","false";
None,"columnalign","left"],
- args2pres conclude.Con.conclude_args))))])]) in
- match conclude.Con.conclude_conclusion with
- None -> body
- | Some t ->
- let concl = (term2pres t) in
- let ann_concl = make_concl "we proved" concl in
- P.Mtable ([None,"align","baseline 1"; None,"equalrows","false";
- None,"columnalign","left"],
- [P.Mtr ([],[P.Mtd ([],body)]);
- P.Mtr ([],[P.Mtd ([],ann_concl)])])
+ args2pres conclude.Con.conclude_args))))])])
and args2pres l =
let module P = Mpresentation in
let module Con = Content in
function
Con.Aux n ->
- P.Mtext ([],"aux " ^ string_of_int n)
+ P.Mtext ([],"aux " ^ n)
| Con.Premise prem ->
P.Mtext ([],"premise")
+ | Con.Lemma lemma ->
+ P.Mtext ([],"lemma")
| Con.Term t ->
term2pres t
| Con.ArgProof p ->
let inductive_arg,args_for_cases =
(match conclude.Con.conclude_args with
Con.Aux(n)::_::tl ->
- let l1,l2 = split n tl in
+ let l1,l2 = split (int_of_string n) tl in
let last_pos = (List.length l2)-1 in
List.nth l2 last_pos,l1
| _ -> assert false) in
(match prem.Con.premise_binder with
None -> P.Mtext ([],"the previous result")
| Some n -> P.Mi([],n))
+ | Con.Lemma lemma -> P.Mi([],lemma.Con.lemma_name)
| Con.Term t ->
term2pres t
| Con.ArgProof p ->
(make_concl "we proceede by induction on" arg) in
let to_prove =
(make_concl "to prove" proof_conclusion) in
- let we_proved =
- (make_concl "we proved" proof_conclusion) in
P.Mtable
- ([None,"align","baseline 1"; None,"equalrows","false"; None,"columnalign","left"],
+ ([None,"align","baseline 1"; None,"equalrows","false";
+ None,"columnalign","left"],
P.Mtr ([],[P.Mtd ([],induction_on)])::
P.Mtr ([],[P.Mtd ([],to_prove)])::
- (make_cases args_for_cases) @
- [P.Mtr ([],[P.Mtd ([],we_proved)])])
-
+ (make_cases args_for_cases))
+
and make_cases args_for_cases =
let module P = Mpresentation in
List.map
| Some t -> term2pres t) in
let asubconcl =
P.Mtr([],[P.Mtd([],
- make_concl "the thesis becomes" subconcl)]) in
+ P.indented (make_concl "the thesis becomes" subconcl))]) in
let induction_hypothesis =
(match indhyps with
[] -> []
None -> "no name"
| Some s -> s) in
P.indented (P.Mrow ([],
- [P.Mtext([],"(");
+ [P.Mo([],"(");
P.Mi ([],name);
- P.Mtext([],")");
+ P.Mo([],")");
P.Mspace([None,"width","0.1cm"]);
term2pres h.Con.dec_type]))
| _ -> assert false in
text::hyps) in
(* let acontext =
acontext2pres_old p.Con.proof_apply_context true in *)
- let body = conclude2pres p.Con.proof_conclude true in
+ let body = conclude2pres p.Con.proof_conclude true false in
let presacontext =
- acontext2pres p.Con.proof_apply_context body true in
+ let acontext_id =
+ match p.Con.proof_apply_context with
+ [] -> p.Con.proof_conclude.Con.conclude_id
+ | {Con.proof_id = id}::_ -> id
+ in
+ P.Maction([None,"actiontype","toggle" ; None,"selection","1"],
+ [P.indented
+ (P.Mtext
+ ([None,"mathcolor","Red" ;
+ Some "helm", "xref", acontext_id],"Proof")) ;
+ acontext2pres p.Con.proof_apply_context body true]) in
P.Mtable ([None,"align","baseline 1"; None,"equalrows","false";
None,"columnalign","left"],
pattern::asubconcl::induction_hypothesis@
[P.Mtr([],[P.Mtd([],presacontext)])])
- | _ -> assert false in
+ | _ -> assert false
+
+ and falseind conclude =
+ let module P = Mpresentation in
+ let module Con = Content in
+ let proof_conclusion =
+ (match conclude.Con.conclude_conclusion with
+ None -> P.Mtext([],"No conclusion???")
+ | Some t -> term2pres t) in
+ let case_arg =
+ (match conclude.Con.conclude_args with
+ [Con.Aux(n);_;case_arg] -> case_arg
+ | _ -> assert false;
+ (*
+ List.map (ContentPp.parg 0) conclude.Con.conclude_args;
+ assert false *)) in
+ let arg =
+ (match case_arg with
+ Con.Aux n -> assert false
+ | Con.Premise prem ->
+ (match prem.Con.premise_binder with
+ None -> [P.Mtext([],"Contradiction, hence")]
+ | Some n ->
+ [P.Mi([],n);P.smallskip;P.Mtext([],"is contradictory, hence")])
+ | Con.Lemma lemma ->
+ [P.Mi([],lemma.Con.lemma_name);P.smallskip;P.Mtext([],"is contradictory, hence")]
+ | _ -> assert false) in
+ (* let body = proof2pres {proof with Con.proof_context = tl} in *)
+ make_row arg proof_conclusion
+
+ and andind conclude =
+ let module P = Mpresentation in
+ let module Con = Content in
+ let proof_conclusion =
+ (match conclude.Con.conclude_conclusion with
+ None -> P.Mtext([],"No conclusion???")
+ | Some t -> term2pres t) in
+ let proof,case_arg =
+ (match conclude.Con.conclude_args with
+ [Con.Aux(n);_;Con.ArgProof proof;case_arg] -> proof,case_arg
+ | _ -> assert false;
+ (*
+ List.map (ContentPp.parg 0) conclude.Con.conclude_args;
+ assert false *)) in
+ let arg =
+ (match case_arg with
+ Con.Aux n -> assert false
+ | Con.Premise prem ->
+ (match prem.Con.premise_binder with
+ None -> []
+ | Some n -> [P.Mtext([],"by");P.smallskip;P.Mi([],n)])
+ | Con.Lemma lemma ->
+ [P.Mtext([],"by");P.smallskip;P.Mi([],lemma.Con.lemma_name)]
+ | _ -> assert false) in
+ match proof.Con.proof_context with
+ `Hypothesis hyp1::`Hypothesis hyp2::tl ->
+ let get_name hyp =
+ (match hyp.Con.dec_name with
+ None -> "_"
+ | Some s -> s) in
+ let preshyp1 =
+ P.Mrow ([],
+ [P.Mtext([],"(");
+ P.Mi([],get_name hyp1);
+ P.Mtext([],")");
+ P.smallskip;
+ term2pres hyp1.Con.dec_type]) in
+ let preshyp2 =
+ P.Mrow ([],
+ [P.Mtext([],"(");
+ P.Mi([],get_name hyp2);
+ P.Mtext([],")");
+ P.smallskip;
+ term2pres hyp2.Con.dec_type]) in
+ (* let body = proof2pres {proof with Con.proof_context = tl} in *)
+ let body = conclude2pres proof.Con.proof_conclude false true in
+ let presacontext =
+ acontext2pres proof.Con.proof_apply_context body false in
+ P.Mtable
+ ([None,"align","baseline 1"; None,"equalrows","false";
+ None,"columnalign","left"],
+ [P.Mtr ([],[P.Mtd ([],
+ P.Mrow([],arg@[P.smallskip;P.Mtext([],"we have")]))]);
+ P.Mtr ([],[P.Mtd ([],preshyp1)]);
+ P.Mtr ([],[P.Mtd ([],P.Mtext([],"and"))]);
+ P.Mtr ([],[P.Mtd ([],preshyp2)]);
+ P.Mtr ([],[P.Mtd ([],presacontext)])]);
+ | _ -> assert false
+
+ and exists conclude =
+ let module P = Mpresentation in
+ let module Con = Content in
+ let proof_conclusion =
+ (match conclude.Con.conclude_conclusion with
+ None -> P.Mtext([],"No conclusion???")
+ | Some t -> term2pres t) in
+ let proof =
+ (match conclude.Con.conclude_args with
+ [Con.Aux(n);_;Con.ArgProof proof;_] -> proof
+ | _ -> assert false;
+ (*
+ List.map (ContentPp.parg 0) conclude.Con.conclude_args;
+ assert false *)) in
+ match proof.Con.proof_context with
+ `Declaration decl::`Hypothesis hyp::tl
+ | `Hypothesis decl::`Hypothesis hyp::tl ->
+ let get_name decl =
+ (match decl.Con.dec_name with
+ None -> "_"
+ | Some s -> s) in
+ let presdecl =
+ P.Mrow ([],
+ [P.Mtext([None,"mathcolor","Red"],"let");
+ P.smallskip;
+ P.Mi([],get_name decl);
+ P.Mtext([],":"); term2pres decl.Con.dec_type]) in
+ let suchthat =
+ P.Mrow ([],
+ [P.Mtext([None,"mathcolor","Red"],"such that");
+ P.smallskip;
+ P.Mtext([],"(");
+ P.Mi([],get_name hyp);
+ P.Mtext([],")");
+ P.smallskip;
+ term2pres hyp.Con.dec_type]) in
+ (* let body = proof2pres {proof with Con.proof_context = tl} in *)
+ let body = conclude2pres proof.Con.proof_conclude false true in
+ let presacontext =
+ acontext2pres proof.Con.proof_apply_context body false in
+ P.Mtable
+ ([None,"align","baseline 1"; None,"equalrows","false";
+ None,"columnalign","left"],
+ [P.Mtr ([],[P.Mtd ([],presdecl)]);
+ P.Mtr ([],[P.Mtd ([],suchthat)]);
+ P.Mtr ([],[P.Mtd ([],presacontext)])]);
+ | _ -> assert false in
proof2pres p
;;
exception ToDo;;
let content2pres term2pres (id,params,metasenv,obj) =
- let module Con = Content in
+ let module K = Content in
let module P = Mpresentation in
match obj with
- `Def (Con.Const,thesis,`Proof p) ->
- P.Mtable
+ `Def (K.Const,thesis,`Proof p) ->
+ p_mtable
[None,"align","baseline 1";
None,"equalrows","false";
None,"columnalign","left";
None,"helm:xref","id"]
- [(*P.Mtr []
- [P.Mtd []
- (P.Mrow []
- [P.Mtext [] ("UNFINISHED PROOF" ^ id ^"(" ^ params ^ ")")])] ;
-*)
- P.Mtr []
- [P.Mtd []
- (P.Mrow []
- [P.Mtext [] "THESIS:"])] ;
- P.Mtr []
- [P.Mtd []
- (P.Mrow []
- [P.Mphantom []
- (P.Mtext [] "__") ;
- term2pres thesis])] ;
- P.Mtr []
- [P.Mtd []
- (P.Mrow []
- [proof2pres term2pres p])]]
+ ([p_mtr []
+ [p_mtd []
+ (p_mrow []
+ [p_mtext []
+ ("UNFINISHED PROOF" ^ id ^"(" ^
+ String.concat " ; " (List.map UriManager.string_of_uri params)^
+ ")")])] ;
+ p_mtr []
+ [p_mtd []
+ (p_mrow []
+ [p_mtext [] "THESIS:"])] ;
+ p_mtr []
+ [p_mtd []
+ (p_mrow []
+ [p_mphantom []
+ (p_mtext [] "__") ;
+ term2pres thesis])]] @
+ (match metasenv with
+ None -> []
+ | Some metasenv' ->
+ [p_mtr []
+ [p_mtd []
+ (* Conjectures are in their own table to make *)
+ (* diffing the DOM trees easier. *)
+ (p_mtable
+ [None,"align","baseline 1";
+ None,"equalrows","false";
+ None,"columnalign","left"]
+ ((p_mtr []
+ [p_mtd []
+ (p_mrow []
+ [p_mtext [] "CONJECTURES:"])])::
+ List.map
+ (function
+ (id,n,context,ty) ->
+ p_mtr []
+ [p_mtd []
+ (p_mrow [Some "helm", "xref", id]
+ (List.map
+ (function
+ None ->
+ p_mrow []
+ [ p_mi [] "_" ;
+ p_mo [] ":?" ;
+ p_mi [] "_"]
+ | Some (`Declaration d)
+ | Some (`Hypothesis d) ->
+ let
+ { K.dec_name = dec_name ;
+ K.dec_type = ty } = d
+ in
+ p_mrow []
+ [ p_mi []
+ (match dec_name with
+ None -> "_"
+ | Some n -> n) ;
+ p_mo [] ":" ;
+ term2pres ty]
+ | Some (`Definition d) ->
+ let
+ { K.def_name = def_name ;
+ K.def_term = bo } = d
+ in
+ p_mrow []
+ [ p_mi []
+ (match def_name with
+ None -> "_"
+ | Some n -> n) ;
+ p_mo [] ":=" ;
+ term2pres bo]
+ | Some (`Proof p) ->
+ let proof_name = p.K.proof_name in
+ p_mrow []
+ [ p_mi []
+ (match proof_name with
+ None -> "_"
+ | Some n -> n) ;
+ p_mo [] ":=" ;
+ proof2pres term2pres p]
+ ) (List.rev context) @
+ [ p_mo [] "|-" ] @
+ [ p_mi [] (string_of_int n) ;
+ p_mo [] ":" ;
+ term2pres ty ]
+ ))
+ ]
+ ) metasenv'
+ ))]]
+ ) @
+ [p_mtr []
+ [p_mtd []
+ (p_mrow []
+ [proof2pres term2pres p])]])
| _ -> raise ToDo
;;