X-Git-Url: http://git.megacz.com/?a=blobdiff_plain;f=src%2FHaskProof.v;h=606b667723acb7cada6a7c63f2ee10d248ac29f5;hb=a9bbdf55d01ad494d42018c0eaa252da1d7b5d97;hp=87dfe2ee7d5e727a29fe0fc12d4d7203b9e3618b;hpb=112daf37524662d6d2267d3f7e50ff3522683b8f;p=coq-hetmet.git diff --git a/src/HaskProof.v b/src/HaskProof.v index 87dfe2e..606b667 100644 --- a/src/HaskProof.v +++ b/src/HaskProof.v @@ -135,4 +135,85 @@ Inductive Rule_Flat : forall {h}{c}, Rule h c -> Prop := Definition UND_to_ND Γ Δ h c : ND (@URule Γ Δ) h c -> ND Rule (mapOptionTree UJudg2judg h) (mapOptionTree UJudg2judg c) := @nd_map' _ (@URule Γ Δ ) _ Rule (@UJudg2judg Γ Δ ) (fun h c r => nd_rule (RURule _ _ h c r)) h c. +Lemma no_urules_with_empty_conclusion : forall Γ Δ c h, @URule Γ Δ c h -> h=[] -> False. + intro. + intro. + induction 1; intros; inversion H. + simpl in *; destruct c; try destruct o; simpl in *; try destruct u; inversion H; simpl in *; apply IHX; auto; inversion H1. + simpl in *; destruct c; try destruct o; simpl in *; try destruct u; inversion H; simpl in *; apply IHX; auto; inversion H1. + Qed. + +Lemma no_rules_with_empty_conclusion : forall c h, @Rule c h -> h=[] -> False. + intros. + destruct X; try destruct c; try destruct o; simpl in *; try inversion H. + apply no_urules_with_empty_conclusion in u. + apply u. + auto. + Qed. + +Lemma no_urules_with_multiple_conclusions : forall Γ Δ c h, + @URule Γ Δ c h -> { h1:Tree ??(UJudg Γ Δ) & { h2:Tree ??(UJudg Γ Δ) & h=(h1,,h2) }} -> False. + intro. + intro. + induction 1; intros. + inversion X; inversion X0; inversion H; inversion X1; destruct c; try destruct o; inversion H2; apply IHX; exists c1;exists c2; auto. + inversion X; inversion X0; inversion H; inversion X1; destruct c; try destruct o; inversion H2; apply IHX; exists c1;exists c2; auto. + inversion X; inversion X0; inversion H; inversion X1; destruct c; try destruct o; inversion H2; apply IHX; exists c1;exists c2; auto. + inversion X; inversion X0; inversion H; inversion X1; destruct c; try destruct o; inversion H2; apply IHX; exists c1;exists c2; auto. + inversion X; inversion X0; inversion H; inversion X1; destruct c; try destruct o; inversion H2; apply IHX; exists c1;exists c2; auto. + inversion X; inversion X0; inversion H; inversion X1; destruct c; try destruct o; inversion H2; apply IHX; exists c1;exists c2; auto. + + apply IHX. + destruct X0. destruct s. destruct c; try destruct o; try destruct u; simpl in *. + inversion e. + inversion e. + exists c1. exists c2. auto. + + apply IHX. + destruct X0. destruct s. destruct c; try destruct o; try destruct u; simpl in *. + inversion e. + inversion e. + exists c1. exists c2. auto. + + inversion X; inversion X0; inversion H; inversion X1; destruct c; try destruct o; inversion H2; apply IHX; exists c1;exists c2; auto. + inversion X; inversion X0; inversion H; inversion X1; destruct c; try destruct o; inversion H2; apply IHX; exists c1;exists c2; auto. + inversion X; inversion X0; inversion H; inversion X1; destruct c; try destruct o; inversion H2; apply IHX; exists c1;exists c2; auto. + Qed. + +Lemma no_rules_with_multiple_conclusions : forall c h, + Rule c h -> { h1:Tree ??Judg & { h2:Tree ??Judg & h=(h1,,h2) }} -> False. + intros. + destruct X; try destruct c; try destruct o; simpl in *; try inversion H; + try apply no_urules_with_empty_conclusion in u; try apply u. + destruct X0; destruct s; inversion e. + auto. + apply (no_urules_with_multiple_conclusions _ _ h (c1,,c2)) in u. inversion u. exists c1. exists c2. auto. + destruct X0; destruct s; inversion e. + destruct X0; destruct s; inversion e. + destruct X0; destruct s; inversion e. + destruct X0; destruct s; inversion e. + destruct X0; destruct s; inversion e. + destruct X0; destruct s; inversion e. + destruct X0; destruct s; inversion e. + destruct X0; destruct s; inversion e. + destruct X0; destruct s; inversion e. + destruct X0; destruct s; inversion e. + destruct X0; destruct s; inversion e. + destruct X0; destruct s; inversion e. + destruct X0; destruct s; inversion e. + destruct X0; destruct s; inversion e. + destruct X0; destruct s; inversion e. + destruct X0; destruct s; inversion e. + destruct X0; destruct s; inversion e. + Qed. + +Lemma systemfc_all_rules_one_conclusion : forall h c1 c2 (r:Rule h (c1,,c2)), False. + intros. + eapply no_rules_with_multiple_conclusions. + apply r. + exists c1. + exists c2. + auto. + Qed. +