| GrafiteAst.Right _ -> Tactics.right
| GrafiteAst.Ring _ -> Tactics.ring
| GrafiteAst.Split _ -> Tactics.split
+ | GrafiteAst.Subst (_, hyp) -> Tactics.subst ~hyp
| GrafiteAst.Symmetry _ -> Tactics.symmetry
| GrafiteAst.Transitivity (_, term) -> Tactics.transitivity term
(* Implementazioni Aggiunte *)
| GrafiteAst.Assume (_, id, t) -> Declarative.assume id t
| GrafiteAst.Suppose (_, t, id, t1) -> Declarative.suppose t id t1
| GrafiteAst.By_term_we_proved (_, t, ty, id, t1) ->
- Declarative.by_term_we_proved t ty id t1
+ Declarative.by_term_we_proved ~dbd:(LibraryDb.instance()) t ty id t1
| GrafiteAst.We_need_to_prove (_, t, id, t2) ->
Declarative.we_need_to_prove t id t2
- | GrafiteAst.Bydone (_, t) -> Declarative.bydone t
+ | GrafiteAst.Bydone (_, t) -> Declarative.bydone ~dbd:(LibraryDb.instance()) t
| GrafiteAst.We_proceed_by_induction_on (_, t, t1) ->
Declarative.we_proceed_by_induction_on t t1
- | GrafiteAst.Byinduction (_, t, id) -> Declarative.byinduction id t
+ | GrafiteAst.Byinduction (_, t, id) -> Declarative.byinduction t id
| GrafiteAst.Thesisbecomes (_, t) -> Declarative.thesisbecomes t
| GrafiteAst.ExistsElim (_, t, id1, t1, id2, t2) ->
Declarative.existselim t id1 t1 id2 t2
| GrafiteAst.Case (_,id,params) -> Declarative.case id params
| GrafiteAst.AndElim(_,t,id1,t1,id2,t2) -> Declarative.andelim t id1 t1 id2 t2
| GrafiteAst.RewritingStep (_,termine,t1,t2,cont) ->
- Declarative.rewritingstep termine t1 t2 cont
+ Declarative.rewritingstep ~dbd:(LibraryDb.instance ()) termine t1 t2 cont
let classify_tactic tactic =
match tactic with