Datasets:
pkuAI4M
/
lean_github

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https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
simp only [Holds]
D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tail✝ F ↔ Ho...
D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tail✝ F ↔ Ho...
Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
first | apply forall_congr' | apply exists_congr
D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tail✝ F ↔ Ho...
case h D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tail✝...
Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
intro d
case h D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tail✝...
case h D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tail✝...
Please generate a tactic in lean4 to solve the state. STATE: case h D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
cases h1
case h D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tail✝...
case h.inl D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) t...
Please generate a tactic in lean4 to solve the state. STATE: case h D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
case inl h1 => contradiction
D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tail✝ F ↔ Ho...
no goals
Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
case inr h1 => simp only [Function.updateITE_comm V v x d (V' t) c1] apply phi_ih (Function.updateITE V x d) (binders ∪ {x}) h1 simp only [Function.updateITE] simp push_neg intros v' a1 a2 simp only [if_neg a2] exact h2 v' a1
D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tail✝ F ↔ Ho...
no goals
Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
apply forall_congr'
D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tail✝ F ↔ Ho...
case h D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tail✝...
Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
apply exists_congr
D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tail✝ F ↔ Ho...
case h D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tail✝...
Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
contradiction
D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tail✝ F ↔ Ho...
no goals
Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
simp only [Function.updateITE_comm V v x d (V' t) c1]
D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tail✝ F ↔ Ho...
D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tail✝ F ↔ Ho...
Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
apply phi_ih (Function.updateITE V x d) (binders ∪ {x}) h1
D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tail✝ F ↔ Ho...
D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tail✝ F ↔ Ho...
Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
simp only [Function.updateITE]
D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tail✝ F ↔ Ho...
D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tail✝ F ↔ Ho...
Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
simp
D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tail✝ F ↔ Ho...
D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tail✝ F ↔ Ho...
Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
push_neg
D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tail✝ F ↔ Ho...
D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tail✝ F ↔ Ho...
Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
intros v' a1 a2
D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tail✝ F ↔ Ho...
D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tail✝ F ↔ Ho...
Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
simp only [if_neg a2]
D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tail✝ F ↔ Ho...
D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tail✝ F ↔ Ho...
Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
exact h2 v' a1
D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tail✝ F ↔ Ho...
no goals
Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D v t : VarName head✝ : Definition tail✝ : List Definition tail_ih✝ : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
unfold Function.updateITE
D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I V tl (f...
D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I V tl (f...
Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
congr! 1
D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I V tl (f...
case a.h₁.a D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds...
Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
case _ => simp
D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I V tl (f...
no goals
Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
simp
D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I V tl (f...
no goals
Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
apply Holds_coincide_Var
D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I V tl (f...
case h1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I...
Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
intro v' a1
case h1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I...
case h1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I...
Please generate a tactic in lean4 to solve the state. STATE: case h1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
simp
case h1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I...
case h1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I...
Please generate a tactic in lean4 to solve the state. STATE: case h1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
simp only [eq_comm]
case h1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I...
case h1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I...
Please generate a tactic in lean4 to solve the state. STATE: case h1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
have s1 : (List.map (fun (x : VarName) => if v = x then V' t else V x) xs) = (List.map (V ∘ fun (x : VarName) => if v = x then t else x) xs)
case h1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I...
case s1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I...
Please generate a tactic in lean4 to solve the state. STATE: case h1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
{ simp only [List.map_eq_map_iff] intro x a2 simp split_ifs case _ c2 => apply h2 subst c2 exact h1 a2 case _ c2 => rfl }
case s1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I...
case h1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I...
Please generate a tactic in lean4 to solve the state. STATE: case s1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
simp only [s1]
case h1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I...
case h1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I...
Please generate a tactic in lean4 to solve the state. STATE: case h1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
apply Function.updateListITE_mem_eq_len
case h1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I...
case h1.h1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds ...
Please generate a tactic in lean4 to solve the state. STATE: case h1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
simp only [List.map_eq_map_iff]
case s1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I...
case s1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I...
Please generate a tactic in lean4 to solve the state. STATE: case s1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
intro x a2
case s1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I...
case s1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I...
Please generate a tactic in lean4 to solve the state. STATE: case s1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
simp
case s1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I...
case s1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I...
Please generate a tactic in lean4 to solve the state. STATE: case s1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
split_ifs
case s1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I...
case pos D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D ...
Please generate a tactic in lean4 to solve the state. STATE: case s1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
case _ c2 => apply h2 subst c2 exact h1 a2
D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I V tl (f...
no goals
Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
case _ c2 => rfl
D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I V tl (f...
no goals
Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
apply h2
D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I V tl (f...
case a D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I ...
Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
subst c2
case a D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I ...
case a D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I ...
Please generate a tactic in lean4 to solve the state. STATE: case a D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
exact h1 a2
case a D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I ...
no goals
Please generate a tactic in lean4 to solve the state. STATE: case a D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
rfl
D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I V tl (f...
no goals
Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
simp only [isFreeIn_iff_mem_freeVarSet] at a1
case h1.h1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds ...
case h1.h1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds ...
Please generate a tactic in lean4 to solve the state. STATE: case h1.h1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
simp only [← List.mem_toFinset]
case h1.h1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds ...
case h1.h1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds ...
Please generate a tactic in lean4 to solve the state. STATE: case h1.h1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
exact Finset.mem_of_subset hd.h1 a1
case h1.h1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds ...
no goals
Please generate a tactic in lean4 to solve the state. STATE: case h1.h1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
simp at c1
case h1.h2 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds ...
case h1.h2 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds ...
Please generate a tactic in lean4 to solve the state. STATE: case h1.h2 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
simp
case h1.h2 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds ...
case h1.h2 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds ...
Please generate a tactic in lean4 to solve the state. STATE: case h1.h2 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
tauto
case h1.h2 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds ...
no goals
Please generate a tactic in lean4 to solve the state. STATE: case h1.h2 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
apply ih V binders
D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I V tl (f...
case h1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I...
Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
simp only [fastAdmitsAux]
case h1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I...
case h1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I...
Please generate a tactic in lean4 to solve the state. STATE: case h1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
exact h1
case h1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I...
no goals
Please generate a tactic in lean4 to solve the state. STATE: case h1 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem_aux
[1001, 1]
[1136, 17]
exact h2
case h2 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → (Holds D I (Function.updateITE V v (V' t)) tl F ↔ Holds D I...
no goals
Please generate a tactic in lean4 to solve the state. STATE: case h2 D : Type I : Interpretation D V' : VarAssignment D v t : VarName hd : Definition tl : List Definition ih : ∀ (V : VarAssignment D) (binders : Finset VarName) (F : Formula), fastAdmitsAux v t binders F → (∀ v ∉ binders, V' v = V v) → ...
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem
[1139, 1]
[1153, 7]
simp only [fastAdmits] at h1
D : Type I : Interpretation D V : VarAssignment D E : Env v t : VarName F : Formula h1 : fastAdmits v t F ⊢ Holds D I (Function.updateITE V v (V t)) E F ↔ Holds D I V E (fastReplaceFree v t F)
D : Type I : Interpretation D V : VarAssignment D E : Env v t : VarName F : Formula h1 : fastAdmitsAux v t ∅ F ⊢ Holds D I (Function.updateITE V v (V t)) E F ↔ Holds D I V E (fastReplaceFree v t F)
Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V : VarAssignment D E : Env v t : VarName F : Formula h1 : fastAdmits v t F ⊢ Holds D I (Function.updateITE V v (V t)) E F ↔ Holds D I V E (fastReplaceFree v t F) TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem
[1139, 1]
[1153, 7]
apply substitution_theorem_aux D I V V E v t ∅ F h1
D : Type I : Interpretation D V : VarAssignment D E : Env v t : VarName F : Formula h1 : fastAdmitsAux v t ∅ F ⊢ Holds D I (Function.updateITE V v (V t)) E F ↔ Holds D I V E (fastReplaceFree v t F)
D : Type I : Interpretation D V : VarAssignment D E : Env v t : VarName F : Formula h1 : fastAdmitsAux v t ∅ F ⊢ ∀ v ∉ ∅, V v = V v
Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V : VarAssignment D E : Env v t : VarName F : Formula h1 : fastAdmitsAux v t ∅ F ⊢ Holds D I (Function.updateITE V v (V t)) E F ↔ Holds D I V E (fastReplaceFree v t F) TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_theorem
[1139, 1]
[1153, 7]
simp
D : Type I : Interpretation D V : VarAssignment D E : Env v t : VarName F : Formula h1 : fastAdmitsAux v t ∅ F ⊢ ∀ v ∉ ∅, V v = V v
no goals
Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V : VarAssignment D E : Env v t : VarName F : Formula h1 : fastAdmitsAux v t ∅ F ⊢ ∀ v ∉ ∅, V v = V v TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_is_valid
[1156, 1]
[1168, 11]
simp only [IsValid] at h2
v t : VarName F : Formula h1 : fastAdmits v t F h2 : F.IsValid ⊢ (fastReplaceFree v t F).IsValid
v t : VarName F : Formula h1 : fastAdmits v t F h2 : ∀ (D : Type) (I : Interpretation D) (V : VarAssignment D) (E : Env), Holds D I V E F ⊢ (fastReplaceFree v t F).IsValid
Please generate a tactic in lean4 to solve the state. STATE: v t : VarName F : Formula h1 : fastAdmits v t F h2 : F.IsValid ⊢ (fastReplaceFree v t F).IsValid TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_is_valid
[1156, 1]
[1168, 11]
simp only [IsValid]
v t : VarName F : Formula h1 : fastAdmits v t F h2 : ∀ (D : Type) (I : Interpretation D) (V : VarAssignment D) (E : Env), Holds D I V E F ⊢ (fastReplaceFree v t F).IsValid
v t : VarName F : Formula h1 : fastAdmits v t F h2 : ∀ (D : Type) (I : Interpretation D) (V : VarAssignment D) (E : Env), Holds D I V E F ⊢ ∀ (D : Type) (I : Interpretation D) (V : VarAssignment D) (E : Env), Holds D I V E (fastReplaceFree v t F)
Please generate a tactic in lean4 to solve the state. STATE: v t : VarName F : Formula h1 : fastAdmits v t F h2 : ∀ (D : Type) (I : Interpretation D) (V : VarAssignment D) (E : Env), Holds D I V E F ⊢ (fastReplaceFree v t F).IsValid TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_is_valid
[1156, 1]
[1168, 11]
intro D I V E
v t : VarName F : Formula h1 : fastAdmits v t F h2 : ∀ (D : Type) (I : Interpretation D) (V : VarAssignment D) (E : Env), Holds D I V E F ⊢ ∀ (D : Type) (I : Interpretation D) (V : VarAssignment D) (E : Env), Holds D I V E (fastReplaceFree v t F)
v t : VarName F : Formula h1 : fastAdmits v t F h2 : ∀ (D : Type) (I : Interpretation D) (V : VarAssignment D) (E : Env), Holds D I V E F D : Type I : Interpretation D V : VarAssignment D E : Env ⊢ Holds D I V E (fastReplaceFree v t F)
Please generate a tactic in lean4 to solve the state. STATE: v t : VarName F : Formula h1 : fastAdmits v t F h2 : ∀ (D : Type) (I : Interpretation D) (V : VarAssignment D) (E : Env), Holds D I V E F ⊢ ∀ (D : Type) (I : Interpretation D) (V : VarAssignment D) (E : Env), Holds D I V E (fastReplaceFree v t F) TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_is_valid
[1156, 1]
[1168, 11]
simp only [← substitution_theorem D I V E v t F h1]
v t : VarName F : Formula h1 : fastAdmits v t F h2 : ∀ (D : Type) (I : Interpretation D) (V : VarAssignment D) (E : Env), Holds D I V E F D : Type I : Interpretation D V : VarAssignment D E : Env ⊢ Holds D I V E (fastReplaceFree v t F)
v t : VarName F : Formula h1 : fastAdmits v t F h2 : ∀ (D : Type) (I : Interpretation D) (V : VarAssignment D) (E : Env), Holds D I V E F D : Type I : Interpretation D V : VarAssignment D E : Env ⊢ Holds D I (Function.updateITE V v (V t)) E F
Please generate a tactic in lean4 to solve the state. STATE: v t : VarName F : Formula h1 : fastAdmits v t F h2 : ∀ (D : Type) (I : Interpretation D) (V : VarAssignment D) (E : Env), Holds D I V E F D : Type I : Interpretation D V : VarAssignment D E : Env ⊢ Holds D I V E (fastReplaceFree v t F) TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/NV/Sub/Var/One/Rec/Admits.lean
FOL.NV.Sub.Var.One.Rec.substitution_is_valid
[1156, 1]
[1168, 11]
apply h2
v t : VarName F : Formula h1 : fastAdmits v t F h2 : ∀ (D : Type) (I : Interpretation D) (V : VarAssignment D) (E : Env), Holds D I V E F D : Type I : Interpretation D V : VarAssignment D E : Env ⊢ Holds D I (Function.updateITE V v (V t)) E F
no goals
Please generate a tactic in lean4 to solve the state. STATE: v t : VarName F : Formula h1 : fastAdmits v t F h2 : ∀ (D : Type) (I : Interpretation D) (V : VarAssignment D) (E : Env), Holds D I V E F D : Type I : Interpretation D V : VarAssignment D E : Env ⊢ Holds D I (Function.updateITE V v (V t)) E F TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.lc_at_zero_iff_is_free
[171, 1]
[182, 9]
cases v
v : Var ⊢ Var.lc_at 0 v ↔ v.isFree
case free_ a✝ : String ⊢ Var.lc_at 0 (free_ a✝) ↔ (free_ a✝).isFree case bound_ a✝ : ℕ ⊢ Var.lc_at 0 (bound_ a✝) ↔ (bound_ a✝).isFree
Please generate a tactic in lean4 to solve the state. STATE: v : Var ⊢ Var.lc_at 0 v ↔ v.isFree TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.lc_at_zero_iff_is_free
[171, 1]
[182, 9]
case free_ x => simp only [Var.lc_at] simp only [isFree]
x : String ⊢ Var.lc_at 0 (free_ x) ↔ (free_ x).isFree
no goals
Please generate a tactic in lean4 to solve the state. STATE: x : String ⊢ Var.lc_at 0 (free_ x) ↔ (free_ x).isFree TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.lc_at_zero_iff_is_free
[171, 1]
[182, 9]
case bound_ i => simp only [Var.lc_at] simp only [isFree] simp
i : ℕ ⊢ Var.lc_at 0 (bound_ i) ↔ (bound_ i).isFree
no goals
Please generate a tactic in lean4 to solve the state. STATE: i : ℕ ⊢ Var.lc_at 0 (bound_ i) ↔ (bound_ i).isFree TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.lc_at_zero_iff_is_free
[171, 1]
[182, 9]
simp only [Var.lc_at]
x : String ⊢ Var.lc_at 0 (free_ x) ↔ (free_ x).isFree
x : String ⊢ True ↔ (free_ x).isFree
Please generate a tactic in lean4 to solve the state. STATE: x : String ⊢ Var.lc_at 0 (free_ x) ↔ (free_ x).isFree TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.lc_at_zero_iff_is_free
[171, 1]
[182, 9]
simp only [isFree]
x : String ⊢ True ↔ (free_ x).isFree
no goals
Please generate a tactic in lean4 to solve the state. STATE: x : String ⊢ True ↔ (free_ x).isFree TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.lc_at_zero_iff_is_free
[171, 1]
[182, 9]
simp only [Var.lc_at]
i : ℕ ⊢ Var.lc_at 0 (bound_ i) ↔ (bound_ i).isFree
i : ℕ ⊢ i < 0 ↔ (bound_ i).isFree
Please generate a tactic in lean4 to solve the state. STATE: i : ℕ ⊢ Var.lc_at 0 (bound_ i) ↔ (bound_ i).isFree TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.lc_at_zero_iff_is_free
[171, 1]
[182, 9]
simp only [isFree]
i : ℕ ⊢ i < 0 ↔ (bound_ i).isFree
i : ℕ ⊢ i < 0 ↔ False
Please generate a tactic in lean4 to solve the state. STATE: i : ℕ ⊢ i < 0 ↔ (bound_ i).isFree TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.lc_at_zero_iff_is_free
[171, 1]
[182, 9]
simp
i : ℕ ⊢ i < 0 ↔ False
no goals
Please generate a tactic in lean4 to solve the state. STATE: i : ℕ ⊢ i < 0 ↔ False TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.free_var_list_to_string_list
[186, 1]
[210, 24]
induction vs
vs : List Var h1 : ∀ v ∈ vs, Var.lc_at 0 v ⊢ ∃ xs, vs = List.map free_ xs
case nil h1 : ∀ v ∈ [], Var.lc_at 0 v ⊢ ∃ xs, [] = List.map free_ xs case cons head✝ : Var tail✝ : List Var tail_ih✝ : (∀ v ∈ tail✝, Var.lc_at 0 v) → ∃ xs, tail✝ = List.map free_ xs h1 : ∀ v ∈ head✝ :: tail✝, Var.lc_at 0 v ⊢ ∃ xs, head✝ :: tail✝ = List.map free_ xs
Please generate a tactic in lean4 to solve the state. STATE: vs : List Var h1 : ∀ v ∈ vs, Var.lc_at 0 v ⊢ ∃ xs, vs = List.map free_ xs TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.free_var_list_to_string_list
[186, 1]
[210, 24]
case nil => apply Exists.intro [] simp
h1 : ∀ v ∈ [], Var.lc_at 0 v ⊢ ∃ xs, [] = List.map free_ xs
no goals
Please generate a tactic in lean4 to solve the state. STATE: h1 : ∀ v ∈ [], Var.lc_at 0 v ⊢ ∃ xs, [] = List.map free_ xs TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.free_var_list_to_string_list
[186, 1]
[210, 24]
case cons hd tl ih => simp at h1 cases h1 case intro h1_left h1_right => specialize ih h1_right apply Exists.elim ih intro xs a1 cases hd case free_ x => apply Exists.intro (x :: xs) simp exact a1 case bound_ i => simp only [Var.lc_at] at h1_left simp at h1_le...
hd : Var tl : List Var ih : (∀ v ∈ tl, Var.lc_at 0 v) → ∃ xs, tl = List.map free_ xs h1 : ∀ v ∈ hd :: tl, Var.lc_at 0 v ⊢ ∃ xs, hd :: tl = List.map free_ xs
no goals
Please generate a tactic in lean4 to solve the state. STATE: hd : Var tl : List Var ih : (∀ v ∈ tl, Var.lc_at 0 v) → ∃ xs, tl = List.map free_ xs h1 : ∀ v ∈ hd :: tl, Var.lc_at 0 v ⊢ ∃ xs, hd :: tl = List.map free_ xs TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.free_var_list_to_string_list
[186, 1]
[210, 24]
apply Exists.intro []
h1 : ∀ v ∈ [], Var.lc_at 0 v ⊢ ∃ xs, [] = List.map free_ xs
h1 : ∀ v ∈ [], Var.lc_at 0 v ⊢ [] = List.map free_ []
Please generate a tactic in lean4 to solve the state. STATE: h1 : ∀ v ∈ [], Var.lc_at 0 v ⊢ ∃ xs, [] = List.map free_ xs TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.free_var_list_to_string_list
[186, 1]
[210, 24]
simp
h1 : ∀ v ∈ [], Var.lc_at 0 v ⊢ [] = List.map free_ []
no goals
Please generate a tactic in lean4 to solve the state. STATE: h1 : ∀ v ∈ [], Var.lc_at 0 v ⊢ [] = List.map free_ [] TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.free_var_list_to_string_list
[186, 1]
[210, 24]
simp at h1
hd : Var tl : List Var ih : (∀ v ∈ tl, Var.lc_at 0 v) → ∃ xs, tl = List.map free_ xs h1 : ∀ v ∈ hd :: tl, Var.lc_at 0 v ⊢ ∃ xs, hd :: tl = List.map free_ xs
hd : Var tl : List Var ih : (∀ v ∈ tl, Var.lc_at 0 v) → ∃ xs, tl = List.map free_ xs h1 : Var.lc_at 0 hd ∧ ∀ a ∈ tl, Var.lc_at 0 a ⊢ ∃ xs, hd :: tl = List.map free_ xs
Please generate a tactic in lean4 to solve the state. STATE: hd : Var tl : List Var ih : (∀ v ∈ tl, Var.lc_at 0 v) → ∃ xs, tl = List.map free_ xs h1 : ∀ v ∈ hd :: tl, Var.lc_at 0 v ⊢ ∃ xs, hd :: tl = List.map free_ xs TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.free_var_list_to_string_list
[186, 1]
[210, 24]
cases h1
hd : Var tl : List Var ih : (∀ v ∈ tl, Var.lc_at 0 v) → ∃ xs, tl = List.map free_ xs h1 : Var.lc_at 0 hd ∧ ∀ a ∈ tl, Var.lc_at 0 a ⊢ ∃ xs, hd :: tl = List.map free_ xs
case intro hd : Var tl : List Var ih : (∀ v ∈ tl, Var.lc_at 0 v) → ∃ xs, tl = List.map free_ xs left✝ : Var.lc_at 0 hd right✝ : ∀ a ∈ tl, Var.lc_at 0 a ⊢ ∃ xs, hd :: tl = List.map free_ xs
Please generate a tactic in lean4 to solve the state. STATE: hd : Var tl : List Var ih : (∀ v ∈ tl, Var.lc_at 0 v) → ∃ xs, tl = List.map free_ xs h1 : Var.lc_at 0 hd ∧ ∀ a ∈ tl, Var.lc_at 0 a ⊢ ∃ xs, hd :: tl = List.map free_ xs TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.free_var_list_to_string_list
[186, 1]
[210, 24]
case intro h1_left h1_right => specialize ih h1_right apply Exists.elim ih intro xs a1 cases hd case free_ x => apply Exists.intro (x :: xs) simp exact a1 case bound_ i => simp only [Var.lc_at] at h1_left simp at h1_left
hd : Var tl : List Var ih : (∀ v ∈ tl, Var.lc_at 0 v) → ∃ xs, tl = List.map free_ xs h1_left : Var.lc_at 0 hd h1_right : ∀ a ∈ tl, Var.lc_at 0 a ⊢ ∃ xs, hd :: tl = List.map free_ xs
no goals
Please generate a tactic in lean4 to solve the state. STATE: hd : Var tl : List Var ih : (∀ v ∈ tl, Var.lc_at 0 v) → ∃ xs, tl = List.map free_ xs h1_left : Var.lc_at 0 hd h1_right : ∀ a ∈ tl, Var.lc_at 0 a ⊢ ∃ xs, hd :: tl = List.map free_ xs TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.free_var_list_to_string_list
[186, 1]
[210, 24]
specialize ih h1_right
hd : Var tl : List Var ih : (∀ v ∈ tl, Var.lc_at 0 v) → ∃ xs, tl = List.map free_ xs h1_left : Var.lc_at 0 hd h1_right : ∀ a ∈ tl, Var.lc_at 0 a ⊢ ∃ xs, hd :: tl = List.map free_ xs
hd : Var tl : List Var h1_left : Var.lc_at 0 hd h1_right : ∀ a ∈ tl, Var.lc_at 0 a ih : ∃ xs, tl = List.map free_ xs ⊢ ∃ xs, hd :: tl = List.map free_ xs
Please generate a tactic in lean4 to solve the state. STATE: hd : Var tl : List Var ih : (∀ v ∈ tl, Var.lc_at 0 v) → ∃ xs, tl = List.map free_ xs h1_left : Var.lc_at 0 hd h1_right : ∀ a ∈ tl, Var.lc_at 0 a ⊢ ∃ xs, hd :: tl = List.map free_ xs TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.free_var_list_to_string_list
[186, 1]
[210, 24]
apply Exists.elim ih
hd : Var tl : List Var h1_left : Var.lc_at 0 hd h1_right : ∀ a ∈ tl, Var.lc_at 0 a ih : ∃ xs, tl = List.map free_ xs ⊢ ∃ xs, hd :: tl = List.map free_ xs
hd : Var tl : List Var h1_left : Var.lc_at 0 hd h1_right : ∀ a ∈ tl, Var.lc_at 0 a ih : ∃ xs, tl = List.map free_ xs ⊢ ∀ (a : List String), tl = List.map free_ a → ∃ xs, hd :: tl = List.map free_ xs
Please generate a tactic in lean4 to solve the state. STATE: hd : Var tl : List Var h1_left : Var.lc_at 0 hd h1_right : ∀ a ∈ tl, Var.lc_at 0 a ih : ∃ xs, tl = List.map free_ xs ⊢ ∃ xs, hd :: tl = List.map free_ xs TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.free_var_list_to_string_list
[186, 1]
[210, 24]
intro xs a1
hd : Var tl : List Var h1_left : Var.lc_at 0 hd h1_right : ∀ a ∈ tl, Var.lc_at 0 a ih : ∃ xs, tl = List.map free_ xs ⊢ ∀ (a : List String), tl = List.map free_ a → ∃ xs, hd :: tl = List.map free_ xs
hd : Var tl : List Var h1_left : Var.lc_at 0 hd h1_right : ∀ a ∈ tl, Var.lc_at 0 a ih : ∃ xs, tl = List.map free_ xs xs : List String a1 : tl = List.map free_ xs ⊢ ∃ xs, hd :: tl = List.map free_ xs
Please generate a tactic in lean4 to solve the state. STATE: hd : Var tl : List Var h1_left : Var.lc_at 0 hd h1_right : ∀ a ∈ tl, Var.lc_at 0 a ih : ∃ xs, tl = List.map free_ xs ⊢ ∀ (a : List String), tl = List.map free_ a → ∃ xs, hd :: tl = List.map free_ xs TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.free_var_list_to_string_list
[186, 1]
[210, 24]
cases hd
hd : Var tl : List Var h1_left : Var.lc_at 0 hd h1_right : ∀ a ∈ tl, Var.lc_at 0 a ih : ∃ xs, tl = List.map free_ xs xs : List String a1 : tl = List.map free_ xs ⊢ ∃ xs, hd :: tl = List.map free_ xs
case free_ tl : List Var h1_right : ∀ a ∈ tl, Var.lc_at 0 a ih : ∃ xs, tl = List.map free_ xs xs : List String a1 : tl = List.map free_ xs a✝ : String h1_left : Var.lc_at 0 (free_ a✝) ⊢ ∃ xs, free_ a✝ :: tl = List.map free_ xs case bound_ tl : List Var h1_right : ∀ a ∈ tl, Var.lc_at 0 a ih : ∃ xs, tl = List.map free_ ...
Please generate a tactic in lean4 to solve the state. STATE: hd : Var tl : List Var h1_left : Var.lc_at 0 hd h1_right : ∀ a ∈ tl, Var.lc_at 0 a ih : ∃ xs, tl = List.map free_ xs xs : List String a1 : tl = List.map free_ xs ⊢ ∃ xs, hd :: tl = List.map free_ xs TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.free_var_list_to_string_list
[186, 1]
[210, 24]
case free_ x => apply Exists.intro (x :: xs) simp exact a1
tl : List Var h1_right : ∀ a ∈ tl, Var.lc_at 0 a ih : ∃ xs, tl = List.map free_ xs xs : List String a1 : tl = List.map free_ xs x : String h1_left : Var.lc_at 0 (free_ x) ⊢ ∃ xs, free_ x :: tl = List.map free_ xs
no goals
Please generate a tactic in lean4 to solve the state. STATE: tl : List Var h1_right : ∀ a ∈ tl, Var.lc_at 0 a ih : ∃ xs, tl = List.map free_ xs xs : List String a1 : tl = List.map free_ xs x : String h1_left : Var.lc_at 0 (free_ x) ⊢ ∃ xs, free_ x :: tl = List.map free_ xs TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.free_var_list_to_string_list
[186, 1]
[210, 24]
case bound_ i => simp only [Var.lc_at] at h1_left simp at h1_left
tl : List Var h1_right : ∀ a ∈ tl, Var.lc_at 0 a ih : ∃ xs, tl = List.map free_ xs xs : List String a1 : tl = List.map free_ xs i : ℕ h1_left : Var.lc_at 0 (bound_ i) ⊢ ∃ xs, bound_ i :: tl = List.map free_ xs
no goals
Please generate a tactic in lean4 to solve the state. STATE: tl : List Var h1_right : ∀ a ∈ tl, Var.lc_at 0 a ih : ∃ xs, tl = List.map free_ xs xs : List String a1 : tl = List.map free_ xs i : ℕ h1_left : Var.lc_at 0 (bound_ i) ⊢ ∃ xs, bound_ i :: tl = List.map free_ xs TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.free_var_list_to_string_list
[186, 1]
[210, 24]
apply Exists.intro (x :: xs)
tl : List Var h1_right : ∀ a ∈ tl, Var.lc_at 0 a ih : ∃ xs, tl = List.map free_ xs xs : List String a1 : tl = List.map free_ xs x : String h1_left : Var.lc_at 0 (free_ x) ⊢ ∃ xs, free_ x :: tl = List.map free_ xs
tl : List Var h1_right : ∀ a ∈ tl, Var.lc_at 0 a ih : ∃ xs, tl = List.map free_ xs xs : List String a1 : tl = List.map free_ xs x : String h1_left : Var.lc_at 0 (free_ x) ⊢ free_ x :: tl = List.map free_ (x :: xs)
Please generate a tactic in lean4 to solve the state. STATE: tl : List Var h1_right : ∀ a ∈ tl, Var.lc_at 0 a ih : ∃ xs, tl = List.map free_ xs xs : List String a1 : tl = List.map free_ xs x : String h1_left : Var.lc_at 0 (free_ x) ⊢ ∃ xs, free_ x :: tl = List.map free_ xs TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.free_var_list_to_string_list
[186, 1]
[210, 24]
simp
tl : List Var h1_right : ∀ a ∈ tl, Var.lc_at 0 a ih : ∃ xs, tl = List.map free_ xs xs : List String a1 : tl = List.map free_ xs x : String h1_left : Var.lc_at 0 (free_ x) ⊢ free_ x :: tl = List.map free_ (x :: xs)
tl : List Var h1_right : ∀ a ∈ tl, Var.lc_at 0 a ih : ∃ xs, tl = List.map free_ xs xs : List String a1 : tl = List.map free_ xs x : String h1_left : Var.lc_at 0 (free_ x) ⊢ tl = List.map free_ xs
Please generate a tactic in lean4 to solve the state. STATE: tl : List Var h1_right : ∀ a ∈ tl, Var.lc_at 0 a ih : ∃ xs, tl = List.map free_ xs xs : List String a1 : tl = List.map free_ xs x : String h1_left : Var.lc_at 0 (free_ x) ⊢ free_ x :: tl = List.map free_ (x :: xs) TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.free_var_list_to_string_list
[186, 1]
[210, 24]
exact a1
tl : List Var h1_right : ∀ a ∈ tl, Var.lc_at 0 a ih : ∃ xs, tl = List.map free_ xs xs : List String a1 : tl = List.map free_ xs x : String h1_left : Var.lc_at 0 (free_ x) ⊢ tl = List.map free_ xs
no goals
Please generate a tactic in lean4 to solve the state. STATE: tl : List Var h1_right : ∀ a ∈ tl, Var.lc_at 0 a ih : ∃ xs, tl = List.map free_ xs xs : List String a1 : tl = List.map free_ xs x : String h1_left : Var.lc_at 0 (free_ x) ⊢ tl = List.map free_ xs TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.free_var_list_to_string_list
[186, 1]
[210, 24]
simp only [Var.lc_at] at h1_left
tl : List Var h1_right : ∀ a ∈ tl, Var.lc_at 0 a ih : ∃ xs, tl = List.map free_ xs xs : List String a1 : tl = List.map free_ xs i : ℕ h1_left : Var.lc_at 0 (bound_ i) ⊢ ∃ xs, bound_ i :: tl = List.map free_ xs
tl : List Var h1_right : ∀ a ∈ tl, Var.lc_at 0 a ih : ∃ xs, tl = List.map free_ xs xs : List String a1 : tl = List.map free_ xs i : ℕ h1_left : i < 0 ⊢ ∃ xs, bound_ i :: tl = List.map free_ xs
Please generate a tactic in lean4 to solve the state. STATE: tl : List Var h1_right : ∀ a ∈ tl, Var.lc_at 0 a ih : ∃ xs, tl = List.map free_ xs xs : List String a1 : tl = List.map free_ xs i : ℕ h1_left : Var.lc_at 0 (bound_ i) ⊢ ∃ xs, bound_ i :: tl = List.map free_ xs TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.free_var_list_to_string_list
[186, 1]
[210, 24]
simp at h1_left
tl : List Var h1_right : ∀ a ∈ tl, Var.lc_at 0 a ih : ∃ xs, tl = List.map free_ xs xs : List String a1 : tl = List.map free_ xs i : ℕ h1_left : i < 0 ⊢ ∃ xs, bound_ i :: tl = List.map free_ xs
no goals
Please generate a tactic in lean4 to solve the state. STATE: tl : List Var h1_right : ∀ a ∈ tl, Var.lc_at 0 a ih : ∃ xs, tl = List.map free_ xs xs : List String a1 : tl = List.map free_ xs i : ℕ h1_left : i < 0 ⊢ ∃ xs, bound_ i :: tl = List.map free_ xs TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.VarOpenFreeVarSet
[216, 1]
[238, 11]
cases v
j : ℕ z : String v : Var ⊢ (Var.open j (free_ z) v).freeVarSet ⊆ v.freeVarSet ∪ {free_ z}
case free_ j : ℕ z a✝ : String ⊢ (Var.open j (free_ z) (free_ a✝)).freeVarSet ⊆ (free_ a✝).freeVarSet ∪ {free_ z} case bound_ j : ℕ z : String a✝ : ℕ ⊢ (Var.open j (free_ z) (bound_ a✝)).freeVarSet ⊆ (bound_ a✝).freeVarSet ∪ {free_ z}
Please generate a tactic in lean4 to solve the state. STATE: j : ℕ z : String v : Var ⊢ (Var.open j (free_ z) v).freeVarSet ⊆ v.freeVarSet ∪ {free_ z} TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.VarOpenFreeVarSet
[216, 1]
[238, 11]
case free_ x => simp only [Var.open] simp only [Var.freeVarSet] simp
j : ℕ z x : String ⊢ (Var.open j (free_ z) (free_ x)).freeVarSet ⊆ (free_ x).freeVarSet ∪ {free_ z}
no goals
Please generate a tactic in lean4 to solve the state. STATE: j : ℕ z x : String ⊢ (Var.open j (free_ z) (free_ x)).freeVarSet ⊆ (free_ x).freeVarSet ∪ {free_ z} TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.VarOpenFreeVarSet
[216, 1]
[238, 11]
case bound_ i => simp only [Var.open] split_ifs case _ c1 => simp only [Var.freeVarSet] simp case _ c1 c2 => simp only [Var.freeVarSet] simp case _ c1 c2 => simp only [Var.freeVarSet] simp
j : ℕ z : String i : ℕ ⊢ (Var.open j (free_ z) (bound_ i)).freeVarSet ⊆ (bound_ i).freeVarSet ∪ {free_ z}
no goals
Please generate a tactic in lean4 to solve the state. STATE: j : ℕ z : String i : ℕ ⊢ (Var.open j (free_ z) (bound_ i)).freeVarSet ⊆ (bound_ i).freeVarSet ∪ {free_ z} TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.VarOpenFreeVarSet
[216, 1]
[238, 11]
simp only [Var.open]
j : ℕ z x : String ⊢ (Var.open j (free_ z) (free_ x)).freeVarSet ⊆ (free_ x).freeVarSet ∪ {free_ z}
j : ℕ z x : String ⊢ (free_ x).freeVarSet ⊆ (free_ x).freeVarSet ∪ {free_ z}
Please generate a tactic in lean4 to solve the state. STATE: j : ℕ z x : String ⊢ (Var.open j (free_ z) (free_ x)).freeVarSet ⊆ (free_ x).freeVarSet ∪ {free_ z} TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.VarOpenFreeVarSet
[216, 1]
[238, 11]
simp only [Var.freeVarSet]
j : ℕ z x : String ⊢ (free_ x).freeVarSet ⊆ (free_ x).freeVarSet ∪ {free_ z}
j : ℕ z x : String ⊢ {free_ x} ⊆ {free_ x} ∪ {free_ z}
Please generate a tactic in lean4 to solve the state. STATE: j : ℕ z x : String ⊢ (free_ x).freeVarSet ⊆ (free_ x).freeVarSet ∪ {free_ z} TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.VarOpenFreeVarSet
[216, 1]
[238, 11]
simp
j : ℕ z x : String ⊢ {free_ x} ⊆ {free_ x} ∪ {free_ z}
no goals
Please generate a tactic in lean4 to solve the state. STATE: j : ℕ z x : String ⊢ {free_ x} ⊆ {free_ x} ∪ {free_ z} TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.VarOpenFreeVarSet
[216, 1]
[238, 11]
simp only [Var.open]
j : ℕ z : String i : ℕ ⊢ (Var.open j (free_ z) (bound_ i)).freeVarSet ⊆ (bound_ i).freeVarSet ∪ {free_ z}
j : ℕ z : String i : ℕ ⊢ (if i < j then bound_ i else if i = j then free_ z else bound_ (i - 1)).freeVarSet ⊆ (bound_ i).freeVarSet ∪ {free_ z}
Please generate a tactic in lean4 to solve the state. STATE: j : ℕ z : String i : ℕ ⊢ (Var.open j (free_ z) (bound_ i)).freeVarSet ⊆ (bound_ i).freeVarSet ∪ {free_ z} TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.VarOpenFreeVarSet
[216, 1]
[238, 11]
split_ifs
j : ℕ z : String i : ℕ ⊢ (if i < j then bound_ i else if i = j then free_ z else bound_ (i - 1)).freeVarSet ⊆ (bound_ i).freeVarSet ∪ {free_ z}
case pos j : ℕ z : String i : ℕ h✝ : i < j ⊢ (bound_ i).freeVarSet ⊆ (bound_ i).freeVarSet ∪ {free_ z} case pos j : ℕ z : String i : ℕ h✝¹ : ¬i < j h✝ : i = j ⊢ (free_ z).freeVarSet ⊆ (bound_ i).freeVarSet ∪ {free_ z} case neg j : ℕ z : String i : ℕ h✝¹ : ¬i < j h✝ : ¬i = j ⊢ (bound_ (i - 1)).freeVarSet ⊆ (bound_ i)....
Please generate a tactic in lean4 to solve the state. STATE: j : ℕ z : String i : ℕ ⊢ (if i < j then bound_ i else if i = j then free_ z else bound_ (i - 1)).freeVarSet ⊆ (bound_ i).freeVarSet ∪ {free_ z} TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.VarOpenFreeVarSet
[216, 1]
[238, 11]
case _ c1 => simp only [Var.freeVarSet] simp
j : ℕ z : String i : ℕ c1 : i < j ⊢ (bound_ i).freeVarSet ⊆ (bound_ i).freeVarSet ∪ {free_ z}
no goals
Please generate a tactic in lean4 to solve the state. STATE: j : ℕ z : String i : ℕ c1 : i < j ⊢ (bound_ i).freeVarSet ⊆ (bound_ i).freeVarSet ∪ {free_ z} TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.VarOpenFreeVarSet
[216, 1]
[238, 11]
case _ c1 c2 => simp only [Var.freeVarSet] simp
j : ℕ z : String i : ℕ c1 : ¬i < j c2 : i = j ⊢ (free_ z).freeVarSet ⊆ (bound_ i).freeVarSet ∪ {free_ z}
no goals
Please generate a tactic in lean4 to solve the state. STATE: j : ℕ z : String i : ℕ c1 : ¬i < j c2 : i = j ⊢ (free_ z).freeVarSet ⊆ (bound_ i).freeVarSet ∪ {free_ z} TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.VarOpenFreeVarSet
[216, 1]
[238, 11]
case _ c1 c2 => simp only [Var.freeVarSet] simp
j : ℕ z : String i : ℕ c1 : ¬i < j c2 : ¬i = j ⊢ (bound_ (i - 1)).freeVarSet ⊆ (bound_ i).freeVarSet ∪ {free_ z}
no goals
Please generate a tactic in lean4 to solve the state. STATE: j : ℕ z : String i : ℕ c1 : ¬i < j c2 : ¬i = j ⊢ (bound_ (i - 1)).freeVarSet ⊆ (bound_ i).freeVarSet ∪ {free_ z} TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.VarOpenFreeVarSet
[216, 1]
[238, 11]
simp only [Var.freeVarSet]
j : ℕ z : String i : ℕ c1 : i < j ⊢ (bound_ i).freeVarSet ⊆ (bound_ i).freeVarSet ∪ {free_ z}
j : ℕ z : String i : ℕ c1 : i < j ⊢ ∅ ⊆ ∅ ∪ {free_ z}
Please generate a tactic in lean4 to solve the state. STATE: j : ℕ z : String i : ℕ c1 : i < j ⊢ (bound_ i).freeVarSet ⊆ (bound_ i).freeVarSet ∪ {free_ z} TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.VarOpenFreeVarSet
[216, 1]
[238, 11]
simp
j : ℕ z : String i : ℕ c1 : i < j ⊢ ∅ ⊆ ∅ ∪ {free_ z}
no goals
Please generate a tactic in lean4 to solve the state. STATE: j : ℕ z : String i : ℕ c1 : i < j ⊢ ∅ ⊆ ∅ ∪ {free_ z} TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.VarOpenFreeVarSet
[216, 1]
[238, 11]
simp only [Var.freeVarSet]
j : ℕ z : String i : ℕ c1 : ¬i < j c2 : i = j ⊢ (free_ z).freeVarSet ⊆ (bound_ i).freeVarSet ∪ {free_ z}
j : ℕ z : String i : ℕ c1 : ¬i < j c2 : i = j ⊢ {free_ z} ⊆ ∅ ∪ {free_ z}
Please generate a tactic in lean4 to solve the state. STATE: j : ℕ z : String i : ℕ c1 : ¬i < j c2 : i = j ⊢ (free_ z).freeVarSet ⊆ (bound_ i).freeVarSet ∪ {free_ z} TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.VarOpenFreeVarSet
[216, 1]
[238, 11]
simp
j : ℕ z : String i : ℕ c1 : ¬i < j c2 : i = j ⊢ {free_ z} ⊆ ∅ ∪ {free_ z}
no goals
Please generate a tactic in lean4 to solve the state. STATE: j : ℕ z : String i : ℕ c1 : ¬i < j c2 : i = j ⊢ {free_ z} ⊆ ∅ ∪ {free_ z} TACTIC:
https://github.com/pthomas505/FOL.git
097a4abea51b641d144539b9a0f7516f3b9d818c
FOL/LN/Paper.lean
LN.VarOpenFreeVarSet
[216, 1]
[238, 11]
simp only [Var.freeVarSet]
j : ℕ z : String i : ℕ c1 : ¬i < j c2 : ¬i = j ⊢ (bound_ (i - 1)).freeVarSet ⊆ (bound_ i).freeVarSet ∪ {free_ z}
j : ℕ z : String i : ℕ c1 : ¬i < j c2 : ¬i = j ⊢ ∅ ⊆ ∅ ∪ {free_ z}
Please generate a tactic in lean4 to solve the state. STATE: j : ℕ z : String i : ℕ c1 : ¬i < j c2 : ¬i = j ⊢ (bound_ (i - 1)).freeVarSet ⊆ (bound_ i).freeVarSet ∪ {free_ z} TACTIC: