X-Git-Url: http://git.megacz.com/?p=coq-hetmet.git;a=blobdiff_plain;f=src%2FNaturalDeduction.v;h=06b6efe8fa3e909f666acc669f2772b7351483b9;hp=855b66a7614d31985359c0d5eb8ec09f8054aeda;hb=992203bb4a221ea2f415c0d14bb34d35af2ee637;hpb=f60f9ed58ad2ea12fd293dfbcc015c3ffb827a20 diff --git a/src/NaturalDeduction.v b/src/NaturalDeduction.v index 855b66a..06b6efe 100644 --- a/src/NaturalDeduction.v +++ b/src/NaturalDeduction.v @@ -333,11 +333,56 @@ Section Natural_Deduction. | cnd_branch c1 c2 cnd1 cnd2 => nd_llecnac ;; nd_prod (closedNDtoNormalND cnd1) (closedNDtoNormalND cnd2) end. + Section Sequents. + Context {S:Type}. (* type of sequent components *) + Context (sequent:S->S->Judgment). + Context (ndr:ND_Relation). + Notation "a |= b" := (sequent a b). + Notation "a === b" := (@ndr_eqv ndr _ _ a b) : nd_scope. + + Class SequentCalculus := + { nd_seq_reflexive : forall a, ND [ ] [ a |= a ] + }. + + Class CutRule := + { nd_cutrule_seq :> SequentCalculus + ; nd_cut : forall a b c, [ a |= b ] ,, [ b |= c ] /⋯⋯/ [ a |= c ] + ; nd_cut_left_identity : forall a b, (( (nd_seq_reflexive a)**(nd_id _));; nd_cut _ _ b) === nd_cancell + ; nd_cut_right_identity : forall a b, (((nd_id _)**(nd_seq_reflexive a) );; nd_cut b _ _) === nd_cancelr + ; nd_cut_associativity : forall {a b c d}, + (nd_cut a b c ** nd_id1 (c|=d)) ;; (nd_cut a c d) === nd_assoc ;; (nd_id1 (a|=b) ** nd_cut b c d) ;; nd_cut a b d + }. + + End Sequents. + + Section SequentsOfTrees. + Context {T:Type}{sequent:Tree ??T -> Tree ??T -> Judgment}(sc:SequentCalculus sequent). + Context (ndr:ND_Relation). + Notation "a |= b" := (sequent a b). + Notation "a === b" := (@ndr_eqv ndr _ _ a b) : nd_scope. + + Class TreeStructuralRules := + { tsr_ant_assoc : forall {x a b c}, Rule [((a,,b),,c) |= x] [(a,,(b,,c)) |= x] + ; tsr_ant_cossa : forall {x a b c}, Rule [(a,,(b,,c)) |= x] [((a,,b),,c) |= x] + ; tsr_ant_cancell : forall {x a }, Rule [ [],,a |= x] [ a |= x] + ; tsr_ant_cancelr : forall {x a }, Rule [a,,[] |= x] [ a |= x] + ; tsr_ant_llecnac : forall {x a }, Rule [ a |= x] [ [],,a |= x] + ; tsr_ant_rlecnac : forall {x a }, Rule [ a |= x] [ a,,[] |= x] + }. + + Class SequentExpansion := + { se_expand_left : forall tau {Gamma Sigma}, Rule [ Gamma |= Sigma ] [tau,,Gamma|=tau,,Sigma] + ; se_expand_right : forall tau {Gamma Sigma}, Rule [ Gamma |= Sigma ] [Gamma,,tau|=Sigma,,tau] + }. + End SequentsOfTrees. + Close Scope nd_scope. Open Scope pf_scope. End Natural_Deduction. +Coercion nd_cut : CutRule >-> Funclass. + Implicit Arguments ND [ Judgment ]. Hint Constructors Structural. Hint Extern 1 => apply nd_id_structural.