add inversion lemmas (without proof)
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@ -17,6 +17,8 @@ typing/typing.v
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lemmas/subst_lemmas.v
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lemmas/typing_weakening.v
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lemmas/typing_regular.v
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lemmas/typing_inv.v
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lemmas/transl_inv.v
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soundness/translate_morph.v
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soundness/translate_expr.v
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43
coq/lemmas/transl_inv.v
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43
coq/lemmas/transl_inv.v
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@ -0,0 +1,43 @@
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From Coq Require Import Lists.List.
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Require Import Atom.
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Require Import Environment.
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Require Import Metatheory.
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Require Import debruijn.
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Require Import subtype.
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Require Import env.
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Require Import morph.
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Require Import subst_lemmas.
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Require Import typing.
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Lemma transl_inv_let : forall Γ s s' σ t t' τ,
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(Γ |- s \is σ) ->
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(Γ |- [[ [{ let s in t }] \is τ ]] = [{ let s' in t' }]) ->
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forall L x, x `notin` L ->
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((x, σ) :: Γ |- [[expr_open [{$ x}] t \is τ]] = expr_open [{$ x}] t')
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.
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Proof.
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Admitted.
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Lemma transl_inv_abs : forall Γ σ e e' τ,
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(Γ |- [[ [{ λ σ ↦ e }] \is τ ]] = [{ λ σ ↦ e' }]) ->
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forall L x, x `notin` L ->
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((x, σ) :: Γ |- [[expr_open [{$ x}] e \is τ]] = expr_open [{$ x}] e')
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.
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Proof.
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Admitted.
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Lemma transl_inv_morph : forall Γ σ e e' τ,
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(Γ |- [[ [{ λ σ ↦morph e }] \is τ ]] = [{ λ σ ↦morph e' }]) ->
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forall L x, x `notin` L ->
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((x, σ) :: Γ |- [[expr_open [{$ x}] e \is τ]] = expr_open [{$ x}] e')
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.
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Proof.
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Admitted.
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Lemma transl_inv_tabs : forall Γ e e' τ,
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(Γ |- [[ [{ Λ e }] \is [< ∀ τ >] ]] = [{ Λ e' }]) ->
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forall L x, x `notin` L ->
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(Γ |- [[ (expr_open_type (ty_fvar x) e) \is τ]] = expr_open_type (ty_fvar x) e')
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.
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Proof.
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Admitted.
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53
coq/lemmas/typing_inv.v
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53
coq/lemmas/typing_inv.v
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From Coq Require Import Lists.List.
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Require Import Atom.
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Require Import Environment.
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Require Import Metatheory.
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Require Import debruijn.
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Require Import subtype.
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Require Import env.
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Require Import morph.
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Require Import subst_lemmas.
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Require Import typing.
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Lemma typing_inv_tabs : forall Γ t τ,
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(Γ |- [{ Λ t }] \is [< ∀ τ >]) ->
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forall L x, x `notin` L ->
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(Γ |- (expr_open_type (ty_fvar x) t) \is τ)
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.
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Proof.
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Admitted.
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Lemma typing_inv_abs : forall Γ σ t τ,
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(Γ |- [{ λ σ ↦ t }] \is [< σ -> τ >]) ->
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forall L x, x `notin` L ->
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((x,σ)::Γ |- (expr_open (ex_fvar x) t) \is τ)
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.
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Proof.
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Admitted.
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Lemma typing_inv_morph : forall Γ σ t τ,
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(Γ |- [{ λ σ ↦morph t }] \is [< σ ->morph τ >]) ->
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forall L x, x `notin` L ->
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((x,σ)::Γ |- (expr_open (ex_fvar x) t) \is τ)
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.
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Proof.
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intros.
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inversion H.
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subst.
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Admitted.
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Lemma typing_inv_let : forall Γ s σ t τ,
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(Γ |- s \is σ) ->
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(Γ |- [{ let s in t }] \is [< τ >]) ->
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forall L x, x `notin` L ->
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((x,σ)::Γ |- (expr_open (ex_fvar x) t) \is τ)
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.
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Proof.
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Admitted.
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