1 (* Copyright (C) 2003-2005, HELM Team.
3 * This file is part of HELM, an Hypertextual, Electronic
4 * Library of Mathematics, developed at the Computer Science
5 * Department, University of Bologna, Italy.
7 * HELM is free software; you can redistribute it and/or
8 * modify it under the terms of the GNU General Public License
9 * as published by the Free Software Foundation; either version 2
10 * of the License, or (at your option) any later version.
12 * HELM is distributed in the hope that it will be useful,
13 * but WITHOUT ANY WARRANTY; without even the implied warranty of
14 * MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
15 * GNU General Public License for more details.
17 * You should have received a copy of the GNU General Public License
18 * along with HELM; if not, write to the Free Software
19 * Foundation, Inc., 59 Temple Place - Suite 330, Boston,
22 * For details, see the HELM World-Wide-Web page,
23 * http://cs.unibo.it/helm/.
29 module N = CicNotationPt
31 (* functions to be moved ****************************************************)
33 let list_map2_filter map l1 l2 =
34 let rec filter l = function
36 | None :: tl -> filter l tl
37 | Some a :: tl -> filter (a :: l) tl
39 filter [] (List.rev_map2 map l1 l2)
41 let rec list_split n l =
42 if n = 0 then [], l else
43 let l1, l2 = list_split (pred n) (List.tl l) in
46 let cont sep a = match sep with
48 | Some sep -> sep :: a
50 let list_rev_map_concat map sep a l =
51 let rec aux a = function
54 | x :: y :: l -> aux (sep :: map a x) (y :: l)
58 (****************************************************************************)
61 type what = Cic.annterm
63 type using = Cic.annterm
66 type where = (name * name) option
68 type step = Note of note
69 | Theorem of name * what * note
72 | Intros of count option * name list * note
73 | Cut of name * what * note
74 | LetIn of name * what * note
75 | Rewrite of how * what * where * note
76 | Elim of what * using option * note
77 | Apply of what * note
78 | Branch of step list list * note
80 (* annterm constructors *****************************************************)
82 let mk_arel i b = Cic.ARel ("", "", i, b)
84 (* grafite ast constructors *************************************************)
86 let floc = H.dummy_floc
88 let mk_note str = G.Comment (floc, G.Note (floc, str))
90 let mk_theorem name t =
91 let obj = N.Theorem (`Theorem, name, t, None) in
92 G.Executable (floc, G.Command (floc, G.Obj (floc, obj)))
95 G.Executable (floc, G.Command (floc, G.Qed floc))
97 let mk_tactic tactic =
98 G.Executable (floc, G.Tactical (floc, G.Tactic (floc, tactic), None))
101 let tactic = G.IdTac floc in
104 let mk_intros xi ids =
105 let tactic = G.Intros (floc, xi, ids) in
108 let mk_cut name what =
109 let tactic = G.Cut (floc, Some name, what) in
112 let mk_letin name what =
113 let tactic = G.LetIn (floc, what, name) in
116 let mk_rewrite direction what where =
117 let hole = C.AImplicit ("", Some `Hole) in
118 let direction = if direction then `RightToLeft else `LeftToRight in
119 let pattern, rename = match where with
120 | None -> (None, [], Some hole), []
121 | Some (premise, name) -> (None, [premise, hole], None), [name]
123 let tactic = G.Rewrite (floc, direction, what, pattern, rename) in
126 let mk_elim what using =
127 let tactic = G.Elim (floc, what, using, Some 0, []) in
131 let tactic = G.Apply (floc, t) in
134 let mk_dot = G.Executable (floc, G.Tactical (floc, G.Dot floc, None))
136 let mk_sc = G.Executable (floc, G.Tactical (floc, G.Semicolon floc, None))
138 let mk_ob = G.Executable (floc, G.Tactical (floc, G.Branch floc, None))
140 let mk_cb = G.Executable (floc, G.Tactical (floc, G.Merge floc, None))
142 let mk_vb = G.Executable (floc, G.Tactical (floc, G.Shift floc, None))
144 (* rendering ****************************************************************)
146 let rec render_step sep a = function
147 | Note s -> mk_note s :: a
148 | Theorem (n, t, s) -> mk_note s :: mk_theorem n t :: a
149 | Qed s -> mk_note s :: mk_qed :: a
150 | Id s -> mk_note s :: cont sep (mk_id :: a)
151 | Intros (c, ns, s) -> mk_note s :: cont sep (mk_intros c ns :: a)
152 | Cut (n, t, s) -> mk_note s :: cont sep (mk_cut n t :: a)
153 | LetIn (n, t, s) -> mk_note s :: cont sep (mk_letin n t :: a)
154 | Rewrite (b, t, w, s) -> mk_note s :: cont sep (mk_rewrite b t w :: a)
155 | Elim (t, xu, s) -> mk_note s :: cont sep (mk_elim t xu :: a)
156 | Apply (t, s) -> mk_note s :: cont sep (mk_apply t :: a)
157 | Branch ([], s) -> a
158 | Branch ([ps], s) -> render_steps a ps
160 let a = mk_ob :: a in
161 let body = mk_cb :: list_rev_map_concat render_steps mk_vb a pss in
162 mk_note s :: cont sep body
164 and render_steps a = function
166 | [p] -> render_step None a p
167 | (Note _ | Theorem _ | Qed _ as p) :: ps ->
168 render_steps (render_step None a p) ps
169 | p :: ((Branch ([], _) :: _) as ps) ->
170 render_steps (render_step None a p) ps
171 | p :: ((Branch (_ :: _ :: _, _) :: _) as ps) ->
172 render_steps (render_step (Some mk_sc) a p) ps
174 render_steps (render_step (Some mk_dot) a p) ps
176 (* counting *****************************************************************)
178 let rec count_step a = function
182 | Branch (pps, _) -> List.fold_left count_steps a pps
185 and count_steps a = List.fold_left count_step a