| nil => Some v
| v'::lv' => if eqd_dec v v' then None else dropVar lv' v
end.
+
+Fixpoint mapOptionTree' {a b:Type}(f:a->??b)(t:@Tree ??a) : @Tree ??b :=
+ match t with
+ | T_Leaf None => T_Leaf None
+ | T_Leaf (Some x) => T_Leaf (f x)
+ | T_Branch l r => T_Branch (mapOptionTree' f l) (mapOptionTree' f r)
+ end.
+
(* later: use mapOptionTreeAndFlatten *)
Definition stripOutVars (lv:list VV) : Tree ??VV -> Tree ??VV :=
- mapTree (fun x => match x with None => None | Some vt => dropVar lv vt end).
+ mapOptionTree' (dropVar lv).
+
+Lemma In_both : forall T (l1 l2:list T) a, In a l1 -> In a (app l1 l2).
+ intros T l1.
+ induction l1; intros.
+ inversion H.
+ simpl.
+ inversion H; subst.
+ left; auto.
+ right.
+ apply IHl1.
+ apply H0.
+ Qed.
+
+Lemma In_both' : forall T (l1 l2:list T) a, In a l2 -> In a (app l1 l2).
+ intros T l1.
+ induction l1; intros.
+ apply H.
+ rewrite <- app_comm_cons.
+ simpl.
+ right.
+ apply IHl1.
+ auto.
+ Qed.
+
+Lemma distinct_app : forall T (l1 l2:list T), distinct (app l1 l2) -> distinct l1 /\ distinct l2.
+ intro T.
+ intro l1.
+ induction l1; intros.
+ split; auto.
+ apply distinct_nil.
+ simpl in H.
+ inversion H.
+ subst.
+ set (IHl1 _ H3) as H3'.
+ destruct H3'.
+ split; auto.
+ apply distinct_cons; auto.
+ intro.
+ apply H2.
+ apply In_both; auto.
+ Qed.
+
+Lemma mapOptionTree'_compose : forall T A B (t:Tree ??T) (f:T->??A)(g:A->??B),
+ mapOptionTree' g (mapOptionTree' f t)
+ =
+ mapOptionTree' (fun x => match f x with None => None | Some x => g x end) t.
+ intros; induction t.
+ destruct a; auto.
+ simpl.
+ destruct (f t); reflexivity.
+ simpl.
+ rewrite <- IHt1.
+ rewrite <- IHt2.
+ reflexivity.
+ Qed.
+
+Lemma strip_lemma a x t : stripOutVars (a::x) t = stripOutVars (a::nil) (stripOutVars x t).
+ unfold stripOutVars.
+ rewrite mapOptionTree'_compose.
+ simpl.
+ induction t.
+ destruct a0.
+ simpl.
+ induction x.
+ reflexivity.
+ simpl.
+ destruct (eqd_dec v a0).
+ destruct (eqd_dec v a); reflexivity.
+ apply IHx.
+ reflexivity.
+ simpl.
+ rewrite <- IHt1.
+ rewrite <- IHt2.
+ reflexivity.
+ Qed.
+
+Lemma strip_twice_lemma x y t : stripOutVars x (stripOutVars y t) = stripOutVars (app y x) t.
+(*
+ induction x.
+ simpl.
+ unfold stripOutVars.
+ simpl.
+ rewrite mapOptionTree'_compose.
+ induction t.
+ destruct a; try reflexivity.
+ simpl.
+ destruct (dropVar y v); reflexivity.
+ simpl.
+ rewrite IHt1.
+ rewrite IHt2.
+ reflexivity.
+ rewrite strip_lemma.
+ rewrite IHx.
+ rewrite <- strip_lemma.
+ rewrite app_comm_cons.
+ reflexivity.
+*)
+admit.
+ Qed.
+
+Lemma strip_distinct a y : (not (In a (leaves y))) -> stripOutVars (a :: nil) y = y.
+ intros.
+ induction y.
+ destruct a0; try reflexivity.
+ simpl in *.
+ unfold stripOutVars.
+ simpl.
+ destruct (eqd_dec v a).
+ subst.
+ assert False.
+ apply H.
+ left; auto.
+ inversion H0.
+ auto.
+ rewrite <- IHy1 at 2.
+ rewrite <- IHy2 at 2.
+ reflexivity.
+ unfold not; intro.
+ apply H.
+ eapply In_both' in H0.
+ apply H0.
+ unfold not; intro.
+ apply H.
+ eapply In_both in H0.
+ apply H0.
+ Qed.
+
+Lemma drop_distinct x v : (not (In v x)) -> dropVar x v = Some v.
+ intros.
+ induction x.
+ reflexivity.
+ simpl.
+ destruct (eqd_dec v a).
+ subst.
+ assert False. apply H.
+ simpl; auto.
+ inversion H0.
+ apply IHx.
+ unfold not.
+ intro.
+ apply H.
+ simpl; auto.
+ Qed.
+
+Lemma in3 {T}(a b c:list T) q : In q (app a c) -> In q (app (app a b) c).
+ induction a; intros.
+ simpl.
+ simpl in H.
+ apply In_both'.
+ auto.
+ rewrite <- ass_app.
+ rewrite <- app_comm_cons.
+ simpl.
+ rewrite ass_app.
+ rewrite <- app_comm_cons in H.
+ inversion H.
+ left; auto.
+ right.
+ apply IHa.
+ apply H0.
+ Qed.
+
+Lemma distinct3 {T}(a b c:list T) : distinct (app (app a b) c) -> distinct (app a c).
+ induction a; intros.
+ simpl in *.
+ apply distinct_app in H; auto.
+ destruct H; auto.
+ rewrite <- app_comm_cons.
+ apply distinct_cons.
+ rewrite <- ass_app in H.
+ rewrite <- app_comm_cons in H.
+ inversion H.
+ subst.
+ intro q.
+ apply H2.
+ rewrite ass_app.
+ apply in3.
+ auto.
+ apply IHa.
+ rewrite <- ass_app.
+ rewrite <- ass_app in H.
+ rewrite <- app_comm_cons in H.
+ inversion H.
+ subst.
+ auto.
+ Qed.
+
+Lemma strip_distinct' y : forall x, distinct (app x (leaves y)) -> stripOutVars x y = y.
+ induction x; intros.
+ simpl in H.
+ unfold stripOutVars.
+ simpl.
+ induction y; try destruct a; auto.
+ simpl.
+ rewrite IHy1.
+ rewrite IHy2.
+ reflexivity.
+ simpl in H.
+ apply distinct_app in H; destruct H; auto.
+ apply distinct_app in H; destruct H; auto.
+ rewrite <- app_comm_cons in H.
+ inversion H; subst.
+ set (IHx H3) as qq.
+ rewrite strip_lemma.
+ rewrite IHx.
+ apply strip_distinct.
+ unfold not; intros.
+ apply H2.
+ apply In_both'.
+ auto.
+ auto.
+ Qed.
+
+Lemma updating_stripped_tree_is_inert'
+ {Γ} lev
+ (ξ:VV -> LeveledHaskType Γ ★)
+ lv tree2 :
+ mapOptionTree (update_ξ ξ lev lv) (stripOutVars (map (@fst _ _) lv) tree2)
+ = mapOptionTree ξ (stripOutVars (map (@fst _ _) lv) tree2).
+ induction tree2.
+ destruct a.
+ simpl.
+ induction lv.
+ reflexivity.
+ simpl.
+ destruct a.
+ simpl.
+ set (eqd_dec v v0) as q.
+ destruct q.
+ auto.
+ set (dropVar (map (@fst _ _) lv) v) as b in *.
+ destruct b.
+ inversion IHlv.
+ admit.
+ auto.
+ reflexivity.
+ simpl.
+ unfold stripOutVars in *.
+ rewrite <- IHtree2_1.
+ rewrite <- IHtree2_2.
+ reflexivity.
+ Qed.
+
+Lemma update_ξ_lemma `{EQD_VV:EqDecidable VV} : forall Γ ξ (lev:HaskLevel Γ)(varstypes:Tree ??(VV*_)),
+ distinct (map (@fst _ _) (leaves varstypes)) ->
+ mapOptionTree (update_ξ ξ lev (leaves varstypes)) (mapOptionTree (@fst _ _) varstypes) =
+ mapOptionTree (fun t => t@@ lev) (mapOptionTree (@snd _ _) varstypes).
+ admit.
+ Qed.
+
+
+
+
Fixpoint expr2antecedent {Γ'}{Δ'}{ξ'}{τ'}(exp:Expr Γ' Δ' ξ' τ') : Tree ??VV :=
match exp as E in Expr Γ Δ ξ τ with
in stripOutVars (leaves (mapOptionTree (@fst _ _ ) vars)) all_contexts
| ECase Γ Δ ξ l tc tbranches atypes e' alts =>
((fix varsfromalts (alts:
- Tree ??{ scb : StrongCaseBranchWithVVs _ _ tc atypes
- & Expr (sac_Γ scb Γ)
- (sac_Δ scb Γ atypes (weakCK'' Δ))
+ Tree ??{ sac : _ & { scb : StrongCaseBranchWithVVs _ _ tc atypes sac
+ & Expr (sac_Γ sac Γ)
+ (sac_Δ sac Γ atypes (weakCK'' Δ))
(scbwv_ξ scb ξ l)
- (weakLT' (tbranches@@l)) }
+ (weakLT' (tbranches@@l)) } }
): Tree ??VV :=
match alts with
| T_Leaf None => []
- | T_Leaf (Some h) => stripOutVars (vec2list (scbwv_exprvars (projT1 h))) (expr2antecedent (projT2 h))
+ | T_Leaf (Some h) => stripOutVars (vec2list (scbwv_exprvars (projT1 (projT2 h)))) (expr2antecedent (projT2 (projT2 h)))
| T_Branch b1 b2 => (varsfromalts b1),,(varsfromalts b2)
end) alts),,(expr2antecedent e')
end
end.
Definition mkProofCaseBranch {Γ}{Δ}{ξ}{l}{tc}{tbranches}{atypes}
- (alt: { scb : StrongCaseBranchWithVVs _ _ tc atypes
- & Expr (sac_Γ scb Γ)
- (sac_Δ scb Γ atypes (weakCK'' Δ))
+(alt : { sac : _ & { scb : StrongCaseBranchWithVVs _ _ tc atypes sac
+ & Expr (sac_Γ sac Γ)
+ (sac_Δ sac Γ atypes (weakCK'' Δ))
(scbwv_ξ scb ξ l)
- (weakLT' (tbranches@@l)) })
- : ProofCaseBranch tc Γ Δ l tbranches atypes.
+ (weakLT' (tbranches@@l)) } })
+ : { sac : _ & ProofCaseBranch tc Γ Δ l tbranches atypes sac }.
+ destruct alt.
+ exists x.
exact
- {| pcb_scb := projT1 alt
- ; pcb_freevars := mapOptionTree ξ (stripOutVars (vec2list (scbwv_exprvars (projT1 alt))) (expr2antecedent (projT2 alt)))
+ {| pcb_freevars := mapOptionTree ξ
+ (stripOutVars (vec2list (scbwv_exprvars (projT1 s)))
+ (expr2antecedent (projT2 s)))
|}.
Defined.
reflexivity.
Qed.
-Ltac eqd_dec_refl X :=
- destruct (eqd_dec X X) as [eqd_dec1 | eqd_dec2];
- [ clear eqd_dec1 | set (eqd_dec2 (refl_equal _)) as eqd_dec2'; inversion eqd_dec2' ].
-
Definition arrangeContext
(Γ:TypeEnv)(Δ:CoercionEnv Γ)
v (* variable to be pivoted, if found *)
refine (ext_left _ _ _ (nd_rule (RWeak _ _))).
Defined.
-Lemma strip_lemma a x t : stripOutVars (a::x) t = stripOutVars (a::nil) (stripOutVars x t).
- unfold stripOutVars.
- rewrite <- mapTree_compose.
- induction t; try destruct a0.
+Lemma updating_stripped_tree_is_inert {Γ} (ξ:VV -> LeveledHaskType Γ ★) v tree t lev :
+ mapOptionTree (update_ξ ξ lev ((v,t)::nil)) (stripOutVars (v :: nil) tree)
+ = mapOptionTree ξ (stripOutVars (v :: nil) tree).
+ set (@updating_stripped_tree_is_inert' Γ lev ξ ((v,t)::nil)) as p.
+ rewrite p.
simpl.
- induction x.
- reflexivity.
- admit.
- subst.
- reflexivity.
- simpl in *.
- rewrite <- IHt1.
- rewrite <- IHt2.
reflexivity.
Qed.
-Lemma strip_twice_lemma x y t : stripOutVars x (stripOutVars y t) = stripOutVars (app y x) t.
- induction x.
- simpl.
- admit.
- rewrite strip_lemma.
- rewrite IHx.
- rewrite <- strip_lemma.
- admit.
- Qed.
-
-Lemma distinct_app1 : forall T (l1 l2:list T), distinct (app l1 l2) -> distinct l1.
- admit.
- Qed.
-
-Lemma distinct_app2 : forall T (l1 l2:list T), distinct (app l1 l2) -> distinct l2.
- admit.
- Qed.
-
-Lemma strip_distinct x y : distinct (app (leaves y) x) -> stripOutVars x y = y.
+Lemma cheat : forall {T}(a b:list T), distinct (app a b) -> distinct (app b a).
admit.
Qed.
simpl in IHv2'.
fold (mapOptionTree ξ) in IHv2'.
fold X in IHv2'.
- set (nd_comp (IHv1 _ _ (distinct_app1 _ _ _ H)) (IHv2' (distinct_app2 _ _ _ H))) as qq.
+ set (distinct_app _ _ _ H) as H'.
+ destruct H' as [H1 H2].
+ set (nd_comp (IHv1 _ _ H1) (IHv2' H2)) as qq.
eapply nd_comp.
apply qq.
clear qq IHv2' IHv2 IHv1.
rewrite strip_twice_lemma.
- rewrite (strip_distinct (leaves v2) v1).
+ rewrite (strip_distinct' v1 (leaves v2)).
apply nd_rule.
apply RCossa.
+ apply cheat.
auto.
Defined.
-Lemma updating_stripped_tree_is_inert {Γ} (ξ:VV -> LeveledHaskType Γ ★) v tree t lev :
- mapOptionTree (update_ξ ξ lev ((v,t)::nil)) (stripOutVars (v :: nil) tree)
- = mapOptionTree ξ (stripOutVars (v :: nil) tree).
- induction tree; simpl in *; try reflexivity; auto.
-
- unfold mapOptionTree in *; simpl; fold (mapOptionTree ξ) in *; fold (mapOptionTree (update_ξ ξ lev ((v,t)::nil))) in *.
- destruct a; simpl; try reflexivity.
- unfold update_ξ.
- simpl.
- unfold mapOptionTree in *; simpl; fold (mapOptionTree ξ) in *.
- unfold update_ξ.
- unfold dropVar.
- simpl.
- set (eqd_dec v v0) as q.
- assert (q=eqd_dec v v0).
- reflexivity.
- destruct q.
-(*
- reflexivity.
- rewrite <- H.
- reflexivity.
- auto.
- unfold mapOptionTree.
- unfold mapOptionTree in IHtree1.
- unfold mapOptionTree in IHtree2.
- simpl in *.
- simpl in IHtree1.
- fold (stripOutVars (v::nil)).
- rewrite <- IHtree1.
- rewrite <- IHtree2.
- reflexivity.
-*)
-admit.
-admit.
-admit.
- Qed.
-
-
-Lemma updating_stripped_tree_is_inert'
- {Γ} lev
- (ξ:VV -> LeveledHaskType Γ ★)
- tree tree2 :
- mapOptionTree (update_ξ ξ lev (leaves tree)) (stripOutVars (leaves (mapOptionTree (@fst _ _) tree)) tree2)
- = mapOptionTree ξ (stripOutVars (leaves (mapOptionTree (@fst _ _) tree)) tree2).
- admit.
- Qed.
-
-Lemma updating_stripped_tree_is_inert''' : forall Γ tc ξ l t atypes x,
- mapOptionTree (scbwv_ξ(Γ:=Γ)(tc:=tc)(atypes:=atypes) x ξ l)
- (stripOutVars (vec2list (scbwv_exprvars x)) t)
- =
- mapOptionTree (weakLT' ○ ξ)
- (stripOutVars (vec2list (scbwv_exprvars x)) t).
- intros.
- unfold scbwv_ξ.
- unfold scbwv_varstypes.
- admit.
- Qed.
-
(* IDEA: use multi-conclusion proofs instead *)
Inductive LetRecSubproofs Γ Δ ξ lev : forall tree, ELetRecBindings Γ Δ ξ lev tree -> Type :=
| lrsp_nil : LetRecSubproofs Γ Δ ξ lev [] (ELR_nil _ _ _ _)
Lemma letRecSubproofsToND Γ Δ ξ lev tree branches :
LetRecSubproofs Γ Δ ξ lev tree branches ->
ND Rule [] [ Γ > Δ > mapOptionTree ξ (eLetRecContext branches)
- |- eLetRecTypes branches @@@ lev ].
+ |- (mapOptionTree (@snd _ _) tree) @@@ lev ].
intro X; induction X; intros; simpl in *.
apply nd_rule.
apply REmptyGroup.
Lemma letRecSubproofsToND' Γ Δ ξ lev τ tree :
forall branches body,
+ distinct (leaves (mapOptionTree (@fst _ _) tree)) ->
ND Rule [] [Γ > Δ > mapOptionTree (update_ξ ξ lev (leaves tree)) (expr2antecedent body) |- [τ @@ lev]] ->
LetRecSubproofs Γ Δ (update_ξ ξ lev (leaves tree)) lev tree branches ->
ND Rule [] [Γ > Δ > mapOptionTree ξ (expr2antecedent (@ELetRec VV _ Γ Δ ξ lev τ tree branches body)) |- [τ @@ lev]].
(* NOTE: how we interpret stuff here affects the order-of-side-effects *)
intro branches.
intro body.
+ intro disti.
intro pf.
intro lrsp.
+
+ rewrite mapleaves in disti.
+ set (@update_ξ_lemma _ Γ ξ lev tree disti) as ξlemma.
+ rewrite <- mapOptionTree_compose in ξlemma.
+
set ((update_ξ ξ lev (leaves tree))) as ξ' in *.
set ((stripOutVars (leaves (mapOptionTree (@fst _ _) tree)) (eLetRecContext branches))) as ctx.
set (mapOptionTree (@fst _ _) tree) as pctx.
eapply UND_to_ND in q'.
unfold ξ' in *.
- set (@updating_stripped_tree_is_inert') as zz.
+ set (@updating_stripped_tree_is_inert' Γ lev ξ (leaves tree)) as zz.
+ rewrite <- mapleaves in zz.
rewrite zz in q'.
clear zz.
clear ξ'.
Opaque stripOutVars.
simpl.
rewrite <- mapOptionTree_compose in q'.
- cut ((mapOptionTree (update_ξ ξ lev (leaves tree) ○ (@fst _ _)) tree) = (mapOptionTree (@snd _ _) tree @@@ lev)).
- intro H'.
- rewrite <- H'.
+ rewrite <- ξlemma.
eapply nd_comp; [ idtac | apply q' ].
- clear H'.
clear q'.
simpl.
eapply nd_comp; [ idtac | eapply nd_rule; apply RBindingGroup ].
eapply nd_comp; [ apply nd_llecnac | idtac ].
apply nd_prod; auto.
- cut ((eLetRecTypes branches @@@ lev) = mapOptionTree (update_ξ ξ lev (leaves tree) ○ (@fst _ _)) tree).
- intro H''.
- rewrite <- H''.
+ rewrite ξlemma.
apply q.
- admit.
- admit.
- admit.
- Defined.
+ clear q'.
-Lemma update_ξ_lemma `{EQD_VV:EqDecidable VV} : forall Γ ξ (lev:HaskLevel Γ)(varstypes:list (VV*_)),
- distinct (map (@fst _ _) varstypes) ->
- map (update_ξ ξ lev varstypes) (map (@fst _ _) varstypes) =
- map (fun t => t@@ lev) (map (@snd _ _) varstypes).
- intros.
- induction varstypes.
- reflexivity.
- destruct a.
- inversion H.
- subst.
- admit.
- Qed.
-
-Lemma fst_zip : forall T Q n (v1:vec T n)(v2:vec Q n), vec_map (@fst _ _) (vec_zip v1 v2) = v1.
- admit.
- Qed.
-
-Lemma snd_zip : forall T Q n (v1:vec T n)(v2:vec Q n), vec_map (@snd _ _) (vec_zip v1 v2) = v2.
- admit.
- Defined.
-
-Lemma vec2list_injective : forall T n (v1 v2:vec T n), vec2list v1 = vec2list v2 -> v1 = v2.
- admit.
- Defined.
+ rewrite <- mapleaves in disti.
+ apply disti.
+ Defined.
-Lemma scbwv_coherent {tc}{Γ}{atypes:IList _ (HaskType Γ) _} :
- forall scb:StrongCaseBranchWithVVs _ _ tc atypes,
- forall l ξ, vec_map (scbwv_ξ scb ξ l) (scbwv_exprvars scb) =
- vec_map (fun t => t @@ weakL' l) (sac_types (scbwv_sac scb) _ atypes).
+Lemma scbwv_coherent {tc}{Γ}{atypes:IList _ (HaskType Γ) _}{sac} :
+ forall scb:StrongCaseBranchWithVVs _ _ tc atypes sac,
+ forall l ξ,
+ vec2list (vec_map (scbwv_ξ scb ξ l) (scbwv_exprvars scb)) =
+ vec2list (vec_map (fun t => t @@ weakL' l) (sac_types sac _ atypes)).
intros.
unfold scbwv_ξ.
unfold scbwv_varstypes.
set (@update_ξ_lemma _ _ (weakLT' ○ ξ) (weakL' l)
- (vec2list (vec_zip (scbwv_exprvars scb) (sac_types (scbwv_sac scb) Γ atypes)))) as q.
- rewrite vec2list_map_list2vec in q.
- rewrite fst_zip in q.
- rewrite vec2list_map_list2vec in q.
- rewrite vec2list_map_list2vec in q.
- rewrite snd_zip in q.
- rewrite vec2list_map_list2vec in q.
- apply vec2list_injective.
- apply q.
+ (unleaves (vec2list (vec_zip (scbwv_exprvars scb) (sac_types sac Γ atypes))))
+ ) as q.
+ rewrite <- mapleaves' in q.
+ rewrite <- mapleaves' in q.
+ rewrite <- mapleaves' in q.
+ rewrite <- mapleaves' in q.
+ set (fun z => unleaves_injective _ _ _ (q z)) as q'.
+ rewrite vec2list_map_list2vec in q'.
+ rewrite fst_zip in q'.
+ rewrite vec2list_map_list2vec in q'.
+ rewrite vec2list_map_list2vec in q'.
+ rewrite snd_zip in q'.
+ rewrite leaves_unleaves in q'.
+ rewrite vec2list_map_list2vec in q'.
+ rewrite vec2list_map_list2vec in q'.
+ apply q'.
+ rewrite fst_zip.
apply scbwv_exprvars_distinct.
Qed.
-Lemma case_lemma : forall Γ Δ ξ l tc tbranches atypes e alts',
- mapOptionTree ξ (expr2antecedent (ECase Γ Δ ξ l tc tbranches atypes e alts'))
- = ((mapOptionTreeAndFlatten pcb_freevars (mapOptionTree mkProofCaseBranch alts')),,mapOptionTree ξ (expr2antecedent e)).
+
+Lemma case_lemma : forall Γ Δ ξ l tc tbranches atypes e
+ (alts':Tree
+ ??{sac : StrongAltCon &
+ {scb : StrongCaseBranchWithVVs VV eqd_vv tc atypes sac &
+ Expr (sac_Γ sac Γ) (sac_Δ sac Γ atypes (weakCK'' Δ))
+ (scbwv_ξ scb ξ l) (weakLT' (tbranches @@ l))}}),
+
+ (mapOptionTreeAndFlatten (fun x => pcb_freevars (projT2 x))
+ (mapOptionTree mkProofCaseBranch alts'))
+ ,,
+ mapOptionTree ξ (expr2antecedent e) =
+ mapOptionTree ξ
+ (expr2antecedent (ECase Γ Δ ξ l tc tbranches atypes e alts')).
intros.
simpl.
Ltac hack := match goal with [ |- ?A,,?B = ?C,,?D ] => assert (A=C) end.
hack.
induction alts'.
- simpl.
- destruct a.
+ destruct a; simpl.
+ destruct s; simpl.
unfold mkProofCaseBranch.
- simpl.
reflexivity.
reflexivity.
simpl.
reflexivity.
Qed.
-
Definition expr2proof :
forall Γ Δ ξ τ (e:Expr Γ Δ ξ τ),
ND Rule [] [Γ > Δ > mapOptionTree ξ (expr2antecedent e) |- [τ]].
| ECase Γ Δ ξ l tc tbranches atypes e alts' =>
let dcsp :=
((fix mkdcsp (alts:
- Tree ??{ scb : StrongCaseBranchWithVVs _ _ tc atypes
- & Expr (sac_Γ scb Γ)
- (sac_Δ scb Γ atypes (weakCK'' Δ))
+ Tree ??{ sac : _ & { scb : StrongCaseBranchWithVVs _ _ tc atypes sac
+ & Expr (sac_Γ sac Γ)
+ (sac_Δ sac Γ atypes (weakCK'' Δ))
(scbwv_ξ scb ξ l)
- (weakLT' (tbranches@@l)) })
- : ND Rule [] (mapOptionTree (pcb_judg ○ mkProofCaseBranch) alts) :=
- match alts as ALTS return ND Rule [] (mapOptionTree (pcb_judg ○ mkProofCaseBranch) ALTS) with
+ (weakLT' (tbranches@@l)) } })
+ : ND Rule [] (mapOptionTree (fun x => pcb_judg (projT2 (mkProofCaseBranch x))) alts) :=
+ match alts as ALTS return ND Rule []
+ (mapOptionTree (fun x => pcb_judg (projT2 (mkProofCaseBranch x))) ALTS) with
| T_Leaf None => let case_nil := tt in _
| T_Branch b1 b2 => let case_branch := tt in (fun b1' b2' => _) (mkdcsp b1) (mkdcsp b2)
| T_Leaf (Some x) =>
- match x as X return ND Rule [] [(pcb_judg ○ mkProofCaseBranch) X] with
- existT scbx ex =>
+ match x as X return ND Rule [] [pcb_judg (projT2 (mkProofCaseBranch X))] with
+ existT sac (existT scbx ex) =>
(fun e' => let case_leaf := tt in _) (expr2proof _ _ _ _ ex)
end
end) alts')
clear o x alts alts' e.
eapply nd_comp; [ apply e' | idtac ].
clear e'.
- set (existT
- (fun scb : StrongCaseBranchWithVVs VV eqd_vv tc atypes =>
- Expr (sac_Γ scb Γ) (sac_Δ scb Γ atypes (weakCK'' Δ))
- (scbwv_ξ scb ξ l) (weakLT' (tbranches @@ l))) scbx ex) as stuff.
set (fun q r x1 x2 y1 y2 => @UND_to_ND q r [q >> r > x1 |- y1] [q >> r > x2 |- y2]).
simpl in n.
apply n.
rewrite mapleaves'.
simpl.
rewrite <- mapOptionTree_compose.
- rewrite <- updating_stripped_tree_is_inert''' with (l:=l).
- replace (vec2list (scbwv_exprvars scbx)) with (leaves (unleaves (vec2list (scbwv_exprvars scbx)))).
+ unfold scbwv_ξ.
rewrite <- mapleaves'.
rewrite vec2list_map_list2vec.
unfold sac_Γ.
rewrite <- (scbwv_coherent scbx l ξ).
rewrite <- vec2list_map_list2vec.
rewrite mapleaves'.
- apply arrangeContextAndWeaken''.
+ set (@arrangeContextAndWeaken'') as q.
+ unfold scbwv_ξ.
+ set (@updating_stripped_tree_is_inert' _ (weakL' l) (weakLT' ○ ξ) (vec2list (scbwv_varstypes scbx))) as z.
+ unfold scbwv_varstypes in z.
+ rewrite vec2list_map_list2vec in z.
+ rewrite fst_zip in z.
+ rewrite <- z.
+ clear z.
+ replace (stripOutVars (vec2list (scbwv_exprvars scbx))) with
+ (stripOutVars (leaves (unleaves (vec2list (scbwv_exprvars scbx))))).
+ apply q.
rewrite leaves_unleaves.
apply (scbwv_exprvars_distinct scbx).
- apply leaves_unleaves.
+ rewrite leaves_unleaves.
+ reflexivity.
destruct case_nil.
apply nd_id0.
apply b2'.
destruct case_ECase.
- rewrite case_lemma.
+ set (@RCase Γ Δ l tc) as q.
+ rewrite <- case_lemma.
eapply nd_comp; [ idtac | eapply nd_rule; eapply RCase ].
eapply nd_comp; [ apply nd_llecnac | idtac ]; apply nd_prod.
rewrite <- mapOptionTree_compose.
unfold ξ'1 in *.
clear ξ'1.
apply letRecSubproofsToND'.
+ admit.
apply e'.
apply subproofs.