Split (1)

train · 219k rows

url stringclasses 147 values	commit stringclasses 147 values	file_path stringlengths 7 101	full_name stringlengths 1 94	start stringlengths 6 10	end stringlengths 6 11	tactic stringlengths 1 11.2k	state_before stringlengths 3 2.09M	state_after stringlengths 6 2.09M	input stringlengths 73 2.09M
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	simp	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 q_0 : ℕ xs : List (ℕ ⊕ σ_0 ⊕ σ_1) x : EpsilonArrow σ_0 a2_left : x ∈ M_0.epsilon_arrow_list a2_right_left : x.start_state = p_0 a2_right_right : List.map (Sum.inr ∘ Sum.inl) x.stop_state_list = xs ⊢ Sum.inl q_0 ∉ List....	no goals	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 q_0 : ℕ xs : List (ℕ ⊕ σ_0 ⊕ σ_1) x : EpsilonArrow σ_0 a2_left : x ∈ M_0.epsilon_arrow_list a2_right_left : x.start_state = p_0 a2_right_right : List.map (Su...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	cases right	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 q_0 : ℕ xs : List (ℕ ⊕ σ_0 ⊕ σ_1) right : ∃ a ∈ M_0.accepting_state_list, a = p_0 ∧ List.map (Sum.inr ∘ Sum.inr) M_1.starting_state_list = xs ⊢ Sum.inl q_0 ∉ xs	case intro α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 q_0 : ℕ xs : List (ℕ ⊕ σ_0 ⊕ σ_1) w✝ : σ_0 h✝ : w✝ ∈ M_0.accepting_state_list ∧ w✝ = p_0 ∧ List.map (Sum.inr ∘ Sum.inr) M_1.starting_state_list = xs ⊢ Sum.inl q_0 ∉ xs	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 q_0 : ℕ xs : List (ℕ ⊕ σ_0 ⊕ σ_1) right : ∃ a ∈ M_0.accepting_state_list, a = p_0 ∧ List.map (Sum.inr ∘ Sum.inr) M_1.starting_state_list = xs ⊢ Sum.inl q_0 ∉...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	case _ x a2 => cases a2 case _ a2_left a2_right => cases a2_right case _ a2_right_left a2_right_right => simp only [← a2_right_right] simp	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 q_0 : ℕ xs : List (ℕ ⊕ σ_0 ⊕ σ_1) x : σ_0 a2 : x ∈ M_0.accepting_state_list ∧ x = p_0 ∧ List.map (Sum.inr ∘ Sum.inr) M_1.starting_state_list = xs ⊢ Sum.inl q_0 ∉ xs	no goals	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 q_0 : ℕ xs : List (ℕ ⊕ σ_0 ⊕ σ_1) x : σ_0 a2 : x ∈ M_0.accepting_state_list ∧ x = p_0 ∧ List.map (Sum.inr ∘ Sum.inr) M_1.starting_state_list = xs ⊢ Sum.inl q...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	cases a2	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 q_0 : ℕ xs : List (ℕ ⊕ σ_0 ⊕ σ_1) x : σ_0 a2 : x ∈ M_0.accepting_state_list ∧ x = p_0 ∧ List.map (Sum.inr ∘ Sum.inr) M_1.starting_state_list = xs ⊢ Sum.inl q_0 ∉ xs	case intro α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 q_0 : ℕ xs : List (ℕ ⊕ σ_0 ⊕ σ_1) x : σ_0 left✝ : x ∈ M_0.accepting_state_list right✝ : x = p_0 ∧ List.map (Sum.inr ∘ Sum.inr) M_1.starting_state_list = xs ⊢ Sum.inl q_0 ∉ xs	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 q_0 : ℕ xs : List (ℕ ⊕ σ_0 ⊕ σ_1) x : σ_0 a2 : x ∈ M_0.accepting_state_list ∧ x = p_0 ∧ List.map (Sum.inr ∘ Sum.inr) M_1.starting_state_list = xs ⊢ Sum.inl q...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	case _ a2_left a2_right => cases a2_right case _ a2_right_left a2_right_right => simp only [← a2_right_right] simp	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 q_0 : ℕ xs : List (ℕ ⊕ σ_0 ⊕ σ_1) x : σ_0 a2_left : x ∈ M_0.accepting_state_list a2_right : x = p_0 ∧ List.map (Sum.inr ∘ Sum.inr) M_1.starting_state_list = xs ⊢ Sum.inl q_0 ∉ xs	no goals	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 q_0 : ℕ xs : List (ℕ ⊕ σ_0 ⊕ σ_1) x : σ_0 a2_left : x ∈ M_0.accepting_state_list a2_right : x = p_0 ∧ List.map (Sum.inr ∘ Sum.inr) M_1.starting_state_list = ...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	cases a2_right	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 q_0 : ℕ xs : List (ℕ ⊕ σ_0 ⊕ σ_1) x : σ_0 a2_left : x ∈ M_0.accepting_state_list a2_right : x = p_0 ∧ List.map (Sum.inr ∘ Sum.inr) M_1.starting_state_list = xs ⊢ Sum.inl q_0 ∉ xs	case intro α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 q_0 : ℕ xs : List (ℕ ⊕ σ_0 ⊕ σ_1) x : σ_0 a2_left : x ∈ M_0.accepting_state_list left✝ : x = p_0 right✝ : List.map (Sum.inr ∘ Sum.inr) M_1.starting_state_list = xs ⊢ Sum.inl q_0 ∉ xs	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 q_0 : ℕ xs : List (ℕ ⊕ σ_0 ⊕ σ_1) x : σ_0 a2_left : x ∈ M_0.accepting_state_list a2_right : x = p_0 ∧ List.map (Sum.inr ∘ Sum.inr) M_1.starting_state_list = ...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	case _ a2_right_left a2_right_right => simp only [← a2_right_right] simp	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 q_0 : ℕ xs : List (ℕ ⊕ σ_0 ⊕ σ_1) x : σ_0 a2_left : x ∈ M_0.accepting_state_list a2_right_left : x = p_0 a2_right_right : List.map (Sum.inr ∘ Sum.inr) M_1.starting_state_list = xs ⊢ Sum.inl q_0 ∉ xs	no goals	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 q_0 : ℕ xs : List (ℕ ⊕ σ_0 ⊕ σ_1) x : σ_0 a2_left : x ∈ M_0.accepting_state_list a2_right_left : x = p_0 a2_right_right : List.map (Sum.inr ∘ Sum.inr) M_1.st...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	simp only [← a2_right_right]	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 q_0 : ℕ xs : List (ℕ ⊕ σ_0 ⊕ σ_1) x : σ_0 a2_left : x ∈ M_0.accepting_state_list a2_right_left : x = p_0 a2_right_right : List.map (Sum.inr ∘ Sum.inr) M_1.starting_state_list = xs ⊢ Sum.inl q_0 ∉ xs	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 q_0 : ℕ xs : List (ℕ ⊕ σ_0 ⊕ σ_1) x : σ_0 a2_left : x ∈ M_0.accepting_state_list a2_right_left : x = p_0 a2_right_right : List.map (Sum.inr ∘ Sum.inr) M_1.starting_state_list = xs ⊢ Sum.inl q_0 ∉ List.map (Sum.inr ∘ Su...	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 q_0 : ℕ xs : List (ℕ ⊕ σ_0 ⊕ σ_1) x : σ_0 a2_left : x ∈ M_0.accepting_state_list a2_right_left : x = p_0 a2_right_right : List.map (Sum.inr ∘ Sum.inr) M_1.st...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	simp	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 q_0 : ℕ xs : List (ℕ ⊕ σ_0 ⊕ σ_1) x : σ_0 a2_left : x ∈ M_0.accepting_state_list a2_right_left : x = p_0 a2_right_right : List.map (Sum.inr ∘ Sum.inr) M_1.starting_state_list = xs ⊢ Sum.inl q_0 ∉ List.map (Sum.inr ∘ Su...	no goals	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 q_0 : ℕ xs : List (ℕ ⊕ σ_0 ⊕ σ_1) x : σ_0 a2_left : x ∈ M_0.accepting_state_list a2_right_left : x = p_0 a2_right_right : List.map (Sum.inr ∘ Sum.inr) M_1.st...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	cases q_0	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 q_0 : σ_0 ⊕ σ_1 ⊢ (∃ stop_state_list, { start_state := Sum.inr (Sum.inl p_0), stop_state_list := stop_state_list } ∈ List.map (fun arrow => { start_state := Sum.inr arr...	case inl α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 val✝ : σ_0 ⊢ (∃ stop_state_list, { start_state := Sum.inr (Sum.inl p_0), stop_state_list := stop_state_list } ∈ List.map (fun arrow => { start_state := Sum.inr arrow...	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 q_0 : σ_0 ⊕ σ_1 ⊢ (∃ stop_state_list, { start_state := Sum.inr (Sum.inl p_0), stop_state_list := stop_state_list } ∈ List.map ...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	case _ q_0 => simp sorry	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 q_0 : σ_0 ⊢ (∃ stop_state_list, { start_state := Sum.inr (Sum.inl p_0), stop_state_list := stop_state_list } ∈ List.map (fun arrow => { start_state := Sum.inr arrow.start_sta...	no goals	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 q_0 : σ_0 ⊢ (∃ stop_state_list, { start_state := Sum.inr (Sum.inl p_0), stop_state_list := stop_state_list } ∈ List.map (fun arrow ...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	case _ q_0 => simp sorry	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 q_0 : σ_1 ⊢ (∃ stop_state_list, { start_state := Sum.inr (Sum.inl p_0), stop_state_list := stop_state_list } ∈ List.map (fun arrow => { start_state := Sum.inr arrow.sta...	no goals	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 q_0 : σ_1 ⊢ (∃ stop_state_list, { start_state := Sum.inr (Sum.inl p_0), stop_state_list := stop_state_list } ∈ List.map (fun ...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	simp	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 q_0 : σ_0 ⊢ (∃ stop_state_list, { start_state := Sum.inr (Sum.inl p_0), stop_state_list := stop_state_list } ∈ List.map (fun arrow => { start_state := Sum.inr arrow.start_sta...	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 q_0 : σ_0 ⊢ (∃ stop_state_list, ((∃ a ∈ M_0.epsilon_arrow_list, a.start_state = p_0 ∧ List.map (Sum.inr ∘ Sum.inl) a.stop_state_list = stop_state_list) ∨ ∃ a ∈ M_0.accepting_state_list, ...	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 q_0 : σ_0 ⊢ (∃ stop_state_list, { start_state := Sum.inr (Sum.inl p_0), stop_state_list := stop_state_list } ∈ List.map (fun arrow ...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	sorry	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 q_0 : σ_0 ⊢ (∃ stop_state_list, ((∃ a ∈ M_0.epsilon_arrow_list, a.start_state = p_0 ∧ List.map (Sum.inr ∘ Sum.inl) a.stop_state_list = stop_state_list) ∨ ∃ a ∈ M_0.accepting_state_list, ...	no goals	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 q_0 : σ_0 ⊢ (∃ stop_state_list, ((∃ a ∈ M_0.epsilon_arrow_list, a.start_state = p_0 ∧ List.map (Sum.inr ∘ Sum.inl) a.stop_state_list = stop_state...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	simp	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 q_0 : σ_1 ⊢ (∃ stop_state_list, { start_state := Sum.inr (Sum.inl p_0), stop_state_list := stop_state_list } ∈ List.map (fun arrow => { start_state := Sum.inr arrow.sta...	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 q_0 : σ_1 ⊢ (∃ stop_state_list, ((∃ a ∈ M_0.epsilon_arrow_list, a.start_state = p_0 ∧ List.map (Sum.inr ∘ Sum.inl) a.stop_state_list = stop_state_list) ∨ ∃ a ∈ M_0.accepting_state_list, ...	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 q_0 : σ_1 ⊢ (∃ stop_state_list, { start_state := Sum.inr (Sum.inl p_0), stop_state_list := stop_state_list } ∈ List.map (fun ...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	sorry	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 q_0 : σ_1 ⊢ (∃ stop_state_list, ((∃ a ∈ M_0.epsilon_arrow_list, a.start_state = p_0 ∧ List.map (Sum.inr ∘ Sum.inl) a.stop_state_list = stop_state_list) ∨ ∃ a ∈ M_0.accepting_state_list, ...	no goals	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 q_0 : σ_1 ⊢ (∃ stop_state_list, ((∃ a ∈ M_0.epsilon_arrow_list, a.start_state = p_0 ∧ List.map (Sum.inr ∘ Sum.inl) a.stop_state_list = stop...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	cases q	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 q : ℕ ⊕ σ_0 ⊕ σ_1 p_0 : σ_1 ⊢ (∃ stop_state_list, { start_state := Sum.inr (Sum.inr p_0), stop_state_list := stop_state_list } ∈ List.map (fun arrow => { start_state := Sum.inr a...	case inl α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 val✝ : ℕ ⊢ (∃ stop_state_list, { start_state := Sum.inr (Sum.inr p_0), stop_state_list := stop_state_list } ∈ List.map (fun arrow => { start_state := Sum.inr a...	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 q : ℕ ⊕ σ_0 ⊕ σ_1 p_0 : σ_1 ⊢ (∃ stop_state_list, { start_state := Sum.inr (Sum.inr p_0), stop_state_list := stop_state_list } ∈ List.map ...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	case _ q_0 => simp intro xs x a1 a2 a3 simp only [← a3] simp	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 q_0 : ℕ ⊢ (∃ stop_state_list, { start_state := Sum.inr (Sum.inr p_0), stop_state_list := stop_state_list } ∈ List.map (fun arrow => { start_state := Sum.inr arrow.start...	no goals	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 q_0 : ℕ ⊢ (∃ stop_state_list, { start_state := Sum.inr (Sum.inr p_0), stop_state_list := stop_state_list } ∈ List.map (fun ar...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	case _ q_0 => cases q_0 case _ q_0 => simp intro xs x a1 a2 a3 simp only [← a3] simp case _ q_0 => simp sorry	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 q_0 : σ_0 ⊕ σ_1 ⊢ (∃ stop_state_list, { start_state := Sum.inr (Sum.inr p_0), stop_state_list := stop_state_list } ∈ List.map (fun arrow => { start_state := Sum.inr arr...	no goals	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 q_0 : σ_0 ⊕ σ_1 ⊢ (∃ stop_state_list, { start_state := Sum.inr (Sum.inr p_0), stop_state_list := stop_state_list } ∈ List.map ...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	simp	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 q_0 : ℕ ⊢ (∃ stop_state_list, { start_state := Sum.inr (Sum.inr p_0), stop_state_list := stop_state_list } ∈ List.map (fun arrow => { start_state := Sum.inr arrow.start...	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 q_0 : ℕ ⊢ ∀ (x : List (ℕ ⊕ σ_0 ⊕ σ_1)), ∀ x_1 ∈ M_1.epsilon_arrow_list, x_1.start_state = p_0 → List.map (Sum.inr ∘ Sum.inr) x_1.stop_state_list = x → Sum.inl q_0 ∉ x	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 q_0 : ℕ ⊢ (∃ stop_state_list, { start_state := Sum.inr (Sum.inr p_0), stop_state_list := stop_state_list } ∈ List.map (fun ar...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	intro xs x a1 a2 a3	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 q_0 : ℕ ⊢ ∀ (x : List (ℕ ⊕ σ_0 ⊕ σ_1)), ∀ x_1 ∈ M_1.epsilon_arrow_list, x_1.start_state = p_0 → List.map (Sum.inr ∘ Sum.inr) x_1.stop_state_list = x → Sum.inl q_0 ∉ x	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 q_0 : ℕ xs : List (ℕ ⊕ σ_0 ⊕ σ_1) x : EpsilonArrow σ_1 a1 : x ∈ M_1.epsilon_arrow_list a2 : x.start_state = p_0 a3 : List.map (Sum.inr ∘ Sum.inr) x.stop_state_list = xs ⊢ Sum.inl q_0 ∉ xs	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 q_0 : ℕ ⊢ ∀ (x : List (ℕ ⊕ σ_0 ⊕ σ_1)), ∀ x_1 ∈ M_1.epsilon_arrow_list, x_1.start_state = p_0 → List.map (Sum.inr ∘ Sum.inr) x_1.stop_state_list = ...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	simp only [← a3]	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 q_0 : ℕ xs : List (ℕ ⊕ σ_0 ⊕ σ_1) x : EpsilonArrow σ_1 a1 : x ∈ M_1.epsilon_arrow_list a2 : x.start_state = p_0 a3 : List.map (Sum.inr ∘ Sum.inr) x.stop_state_list = xs ⊢ Sum.inl q_0 ∉ xs	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 q_0 : ℕ xs : List (ℕ ⊕ σ_0 ⊕ σ_1) x : EpsilonArrow σ_1 a1 : x ∈ M_1.epsilon_arrow_list a2 : x.start_state = p_0 a3 : List.map (Sum.inr ∘ Sum.inr) x.stop_state_list = xs ⊢ Sum.inl q_0 ∉ List.map (Sum.inr ∘ Sum.inr) x.st...	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 q_0 : ℕ xs : List (ℕ ⊕ σ_0 ⊕ σ_1) x : EpsilonArrow σ_1 a1 : x ∈ M_1.epsilon_arrow_list a2 : x.start_state = p_0 a3 : List.map (Sum.inr ∘ Sum.inr) x.stop_stat...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	simp	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 q_0 : ℕ xs : List (ℕ ⊕ σ_0 ⊕ σ_1) x : EpsilonArrow σ_1 a1 : x ∈ M_1.epsilon_arrow_list a2 : x.start_state = p_0 a3 : List.map (Sum.inr ∘ Sum.inr) x.stop_state_list = xs ⊢ Sum.inl q_0 ∉ List.map (Sum.inr ∘ Sum.inr) x.st...	no goals	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 q_0 : ℕ xs : List (ℕ ⊕ σ_0 ⊕ σ_1) x : EpsilonArrow σ_1 a1 : x ∈ M_1.epsilon_arrow_list a2 : x.start_state = p_0 a3 : List.map (Sum.inr ∘ Sum.inr) x.stop_stat...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	cases q_0	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 q_0 : σ_0 ⊕ σ_1 ⊢ (∃ stop_state_list, { start_state := Sum.inr (Sum.inr p_0), stop_state_list := stop_state_list } ∈ List.map (fun arrow => { start_state := Sum.inr arr...	case inl α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 val✝ : σ_0 ⊢ (∃ stop_state_list, { start_state := Sum.inr (Sum.inr p_0), stop_state_list := stop_state_list } ∈ List.map (fun arrow => { start_state := Sum.inr...	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 q_0 : σ_0 ⊕ σ_1 ⊢ (∃ stop_state_list, { start_state := Sum.inr (Sum.inr p_0), stop_state_list := stop_state_list } ∈ List.map ...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	case _ q_0 => simp intro xs x a1 a2 a3 simp only [← a3] simp	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 q_0 : σ_0 ⊢ (∃ stop_state_list, { start_state := Sum.inr (Sum.inr p_0), stop_state_list := stop_state_list } ∈ List.map (fun arrow => { start_state := Sum.inr arrow.sta...	no goals	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 q_0 : σ_0 ⊢ (∃ stop_state_list, { start_state := Sum.inr (Sum.inr p_0), stop_state_list := stop_state_list } ∈ List.map (fun ...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	case _ q_0 => simp sorry	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 q_0 : σ_1 ⊢ (∃ stop_state_list, { start_state := Sum.inr (Sum.inr p_0), stop_state_list := stop_state_list } ∈ List.map (fun arrow => { start_state := Sum.inr arrow.start_sta...	no goals	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 q_0 : σ_1 ⊢ (∃ stop_state_list, { start_state := Sum.inr (Sum.inr p_0), stop_state_list := stop_state_list } ∈ List.map (fun arrow ...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	simp	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 q_0 : σ_0 ⊢ (∃ stop_state_list, { start_state := Sum.inr (Sum.inr p_0), stop_state_list := stop_state_list } ∈ List.map (fun arrow => { start_state := Sum.inr arrow.sta...	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 q_0 : σ_0 ⊢ ∀ (x : List (ℕ ⊕ σ_0 ⊕ σ_1)), ∀ x_1 ∈ M_1.epsilon_arrow_list, x_1.start_state = p_0 → List.map (Sum.inr ∘ Sum.inr) x_1.stop_state_list = x → Sum.inr (Sum.inl q_0) ∉ x	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 q_0 : σ_0 ⊢ (∃ stop_state_list, { start_state := Sum.inr (Sum.inr p_0), stop_state_list := stop_state_list } ∈ List.map (fun ...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	intro xs x a1 a2 a3	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 q_0 : σ_0 ⊢ ∀ (x : List (ℕ ⊕ σ_0 ⊕ σ_1)), ∀ x_1 ∈ M_1.epsilon_arrow_list, x_1.start_state = p_0 → List.map (Sum.inr ∘ Sum.inr) x_1.stop_state_list = x → Sum.inr (Sum.inl q_0) ∉ x	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 q_0 : σ_0 xs : List (ℕ ⊕ σ_0 ⊕ σ_1) x : EpsilonArrow σ_1 a1 : x ∈ M_1.epsilon_arrow_list a2 : x.start_state = p_0 a3 : List.map (Sum.inr ∘ Sum.inr) x.stop_state_list = xs ⊢ Sum.inr (Sum.inl q_0) ∉ xs	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 q_0 : σ_0 ⊢ ∀ (x : List (ℕ ⊕ σ_0 ⊕ σ_1)), ∀ x_1 ∈ M_1.epsilon_arrow_list, x_1.start_state = p_0 → List.map (Sum.inr ∘ Sum.inr) x_1.stop_state_list ...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	simp only [← a3]	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 q_0 : σ_0 xs : List (ℕ ⊕ σ_0 ⊕ σ_1) x : EpsilonArrow σ_1 a1 : x ∈ M_1.epsilon_arrow_list a2 : x.start_state = p_0 a3 : List.map (Sum.inr ∘ Sum.inr) x.stop_state_list = xs ⊢ Sum.inr (Sum.inl q_0) ∉ xs	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 q_0 : σ_0 xs : List (ℕ ⊕ σ_0 ⊕ σ_1) x : EpsilonArrow σ_1 a1 : x ∈ M_1.epsilon_arrow_list a2 : x.start_state = p_0 a3 : List.map (Sum.inr ∘ Sum.inr) x.stop_state_list = xs ⊢ Sum.inr (Sum.inl q_0) ∉ List.map (Sum.inr ∘ S...	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 q_0 : σ_0 xs : List (ℕ ⊕ σ_0 ⊕ σ_1) x : EpsilonArrow σ_1 a1 : x ∈ M_1.epsilon_arrow_list a2 : x.start_state = p_0 a3 : List.map (Sum.inr ∘ Sum.inr) x.stop_st...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	simp	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 q_0 : σ_0 xs : List (ℕ ⊕ σ_0 ⊕ σ_1) x : EpsilonArrow σ_1 a1 : x ∈ M_1.epsilon_arrow_list a2 : x.start_state = p_0 a3 : List.map (Sum.inr ∘ Sum.inr) x.stop_state_list = xs ⊢ Sum.inr (Sum.inl q_0) ∉ List.map (Sum.inr ∘ S...	no goals	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 q_0 : σ_0 xs : List (ℕ ⊕ σ_0 ⊕ σ_1) x : EpsilonArrow σ_1 a1 : x ∈ M_1.epsilon_arrow_list a2 : x.start_state = p_0 a3 : List.map (Sum.inr ∘ Sum.inr) x.stop_st...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	simp	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 q_0 : σ_1 ⊢ (∃ stop_state_list, { start_state := Sum.inr (Sum.inr p_0), stop_state_list := stop_state_list } ∈ List.map (fun arrow => { start_state := Sum.inr arrow.start_sta...	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 q_0 : σ_1 ⊢ (∃ stop_state_list, (∃ a ∈ M_1.epsilon_arrow_list, a.start_state = p_0 ∧ List.map (Sum.inr ∘ Sum.inr) a.stop_state_list = stop_state_list) ∧ Sum.inr (Sum.inr q_0) ∈ stop_state_list) ↔ ...	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 q_0 : σ_1 ⊢ (∃ stop_state_list, { start_state := Sum.inr (Sum.inr p_0), stop_state_list := stop_state_list } ∈ List.map (fun arrow ...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	sorry	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 q_0 : σ_1 ⊢ (∃ stop_state_list, (∃ a ∈ M_1.epsilon_arrow_list, a.start_state = p_0 ∧ List.map (Sum.inr ∘ Sum.inr) a.stop_state_list = stop_state_list) ∧ Sum.inr (Sum.inr q_0) ∈ stop_state_list) ↔ ...	no goals	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 q_0 : σ_1 ⊢ (∃ stop_state_list, (∃ a ∈ M_1.epsilon_arrow_list, a.start_state = p_0 ∧ List.map (Sum.inr ∘ Sum.inr) a.stop_state_list = stop_state_li...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	constructor	case right.right α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 ⊢ ((fun state => state ∈ List.map Sum.inr (List.map Sum.inl M_0.starting_state_list)) = fun p => match p with \| Sum.inr (Sum.inl p') => p' ∈ M_0.starting_state_list \| x => False) ∧ (fun sta...	case right.right.left α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 ⊢ (fun state => state ∈ List.map Sum.inr (List.map Sum.inl M_0.starting_state_list)) = fun p => match p with \| Sum.inr (Sum.inl p') => p' ∈ M_0.starting_state_list \| x => False case right.right...	Please generate a tactic in lean4 to solve the state. STATE: case right.right α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 ⊢ ((fun state => state ∈ List.map Sum.inr (List.map Sum.inl M_0.starting_state_list)) = fun p => match p with \| Sum.inr (Sum.inl p') => p'...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	funext p	case right.right.left α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 ⊢ (fun state => state ∈ List.map Sum.inr (List.map Sum.inl M_0.starting_state_list)) = fun p => match p with \| Sum.inr (Sum.inl p') => p' ∈ M_0.starting_state_list \| x => False	case right.right.left.h α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p : ℕ ⊕ σ_0 ⊕ σ_1 ⊢ (p ∈ List.map Sum.inr (List.map Sum.inl M_0.starting_state_list)) = match p with \| Sum.inr (Sum.inl p') => p' ∈ M_0.starting_state_list \| x => False	Please generate a tactic in lean4 to solve the state. STATE: case right.right.left α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 ⊢ (fun state => state ∈ List.map Sum.inr (List.map Sum.inl M_0.starting_state_list)) = fun p => match p with \| Sum.inr (Sum.inl p') => p'...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	cases p	case right.right.left.h α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p : ℕ ⊕ σ_0 ⊕ σ_1 ⊢ (p ∈ List.map Sum.inr (List.map Sum.inl M_0.starting_state_list)) = match p with \| Sum.inr (Sum.inl p') => p' ∈ M_0.starting_state_list \| x => False	case right.right.left.h.inl α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 val✝ : ℕ ⊢ (Sum.inl val✝ ∈ List.map Sum.inr (List.map Sum.inl M_0.starting_state_list)) = match Sum.inl val✝ with \| Sum.inr (Sum.inl p') => p' ∈ M_0.starting_state_list \| x => False case ...	Please generate a tactic in lean4 to solve the state. STATE: case right.right.left.h α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p : ℕ ⊕ σ_0 ⊕ σ_1 ⊢ (p ∈ List.map Sum.inr (List.map Sum.inl M_0.starting_state_list)) = match p with \| Sum.inr (Sum.inl p') => p' ∈ M_0...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	case _ p_0 => simp	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : ℕ ⊢ (Sum.inl p_0 ∈ List.map Sum.inr (List.map Sum.inl M_0.starting_state_list)) = match Sum.inl p_0 with \| Sum.inr (Sum.inl p') => p' ∈ M_0.starting_state_list \| x => False	no goals	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : ℕ ⊢ (Sum.inl p_0 ∈ List.map Sum.inr (List.map Sum.inl M_0.starting_state_list)) = match Sum.inl p_0 with \| Sum.inr (Sum.inl p') => p' ∈ M_0.starting_stat...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	case _ p_0 => cases p_0 case _ p_0 => simp case _ p_0 => simp	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 ⊕ σ_1 ⊢ (Sum.inr p_0 ∈ List.map Sum.inr (List.map Sum.inl M_0.starting_state_list)) = match Sum.inr p_0 with \| Sum.inr (Sum.inl p') => p' ∈ M_0.starting_state_list \| x => False	no goals	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 ⊕ σ_1 ⊢ (Sum.inr p_0 ∈ List.map Sum.inr (List.map Sum.inl M_0.starting_state_list)) = match Sum.inr p_0 with \| Sum.inr (Sum.inl p') => p' ∈ M_0.start...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	simp	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : ℕ ⊢ (Sum.inl p_0 ∈ List.map Sum.inr (List.map Sum.inl M_0.starting_state_list)) = match Sum.inl p_0 with \| Sum.inr (Sum.inl p') => p' ∈ M_0.starting_state_list \| x => False	no goals	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : ℕ ⊢ (Sum.inl p_0 ∈ List.map Sum.inr (List.map Sum.inl M_0.starting_state_list)) = match Sum.inl p_0 with \| Sum.inr (Sum.inl p') => p' ∈ M_0.starting_stat...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	cases p_0	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 ⊕ σ_1 ⊢ (Sum.inr p_0 ∈ List.map Sum.inr (List.map Sum.inl M_0.starting_state_list)) = match Sum.inr p_0 with \| Sum.inr (Sum.inl p') => p' ∈ M_0.starting_state_list \| x => False	case inl α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 val✝ : σ_0 ⊢ (Sum.inr (Sum.inl val✝) ∈ List.map Sum.inr (List.map Sum.inl M_0.starting_state_list)) = match Sum.inr (Sum.inl val✝) with \| Sum.inr (Sum.inl p') => p' ∈ M_0.starting_state_list \| x => False ca...	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 ⊕ σ_1 ⊢ (Sum.inr p_0 ∈ List.map Sum.inr (List.map Sum.inl M_0.starting_state_list)) = match Sum.inr p_0 with \| Sum.inr (Sum.inl p') => p' ∈ M_0.start...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	case _ p_0 => simp	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 ⊢ (Sum.inr (Sum.inl p_0) ∈ List.map Sum.inr (List.map Sum.inl M_0.starting_state_list)) = match Sum.inr (Sum.inl p_0) with \| Sum.inr (Sum.inl p') => p' ∈ M_0.starting_state_list \| x => False	no goals	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 ⊢ (Sum.inr (Sum.inl p_0) ∈ List.map Sum.inr (List.map Sum.inl M_0.starting_state_list)) = match Sum.inr (Sum.inl p_0) with \| Sum.inr (Sum.inl p') => ...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	case _ p_0 => simp	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 ⊢ (Sum.inr (Sum.inr p_0) ∈ List.map Sum.inr (List.map Sum.inl M_0.starting_state_list)) = match Sum.inr (Sum.inr p_0) with \| Sum.inr (Sum.inl p') => p' ∈ M_0.starting_state_list \| x => False	no goals	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 ⊢ (Sum.inr (Sum.inr p_0) ∈ List.map Sum.inr (List.map Sum.inl M_0.starting_state_list)) = match Sum.inr (Sum.inr p_0) with \| Sum.inr (Sum.inl p') => ...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	simp	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 ⊢ (Sum.inr (Sum.inl p_0) ∈ List.map Sum.inr (List.map Sum.inl M_0.starting_state_list)) = match Sum.inr (Sum.inl p_0) with \| Sum.inr (Sum.inl p') => p' ∈ M_0.starting_state_list \| x => False	no goals	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 ⊢ (Sum.inr (Sum.inl p_0) ∈ List.map Sum.inr (List.map Sum.inl M_0.starting_state_list)) = match Sum.inr (Sum.inl p_0) with \| Sum.inr (Sum.inl p') => ...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	simp	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 ⊢ (Sum.inr (Sum.inr p_0) ∈ List.map Sum.inr (List.map Sum.inl M_0.starting_state_list)) = match Sum.inr (Sum.inr p_0) with \| Sum.inr (Sum.inl p') => p' ∈ M_0.starting_state_list \| x => False	no goals	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 ⊢ (Sum.inr (Sum.inr p_0) ∈ List.map Sum.inr (List.map Sum.inl M_0.starting_state_list)) = match Sum.inr (Sum.inr p_0) with \| Sum.inr (Sum.inl p') => ...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	funext p	case right.right.right α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 ⊢ (fun state => state ∈ List.map Sum.inr (List.map Sum.inr M_1.accepting_state_list)) = fun p => match p with \| Sum.inr (Sum.inr p') => p' ∈ M_1.accepting_state_list \| x => False	case right.right.right.h α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p : ℕ ⊕ σ_0 ⊕ σ_1 ⊢ (p ∈ List.map Sum.inr (List.map Sum.inr M_1.accepting_state_list)) = match p with \| Sum.inr (Sum.inr p') => p' ∈ M_1.accepting_state_list \| x => False	Please generate a tactic in lean4 to solve the state. STATE: case right.right.right α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 ⊢ (fun state => state ∈ List.map Sum.inr (List.map Sum.inr M_1.accepting_state_list)) = fun p => match p with \| Sum.inr (Sum.inr p') => ...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	cases p	case right.right.right.h α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p : ℕ ⊕ σ_0 ⊕ σ_1 ⊢ (p ∈ List.map Sum.inr (List.map Sum.inr M_1.accepting_state_list)) = match p with \| Sum.inr (Sum.inr p') => p' ∈ M_1.accepting_state_list \| x => False	case right.right.right.h.inl α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 val✝ : ℕ ⊢ (Sum.inl val✝ ∈ List.map Sum.inr (List.map Sum.inr M_1.accepting_state_list)) = match Sum.inl val✝ with \| Sum.inr (Sum.inr p') => p' ∈ M_1.accepting_state_list \| x => False ca...	Please generate a tactic in lean4 to solve the state. STATE: case right.right.right.h α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p : ℕ ⊕ σ_0 ⊕ σ_1 ⊢ (p ∈ List.map Sum.inr (List.map Sum.inr M_1.accepting_state_list)) = match p with \| Sum.inr (Sum.inr p') => p' ∈ M...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	case _ p_0 => simp	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : ℕ ⊢ (Sum.inl p_0 ∈ List.map Sum.inr (List.map Sum.inr M_1.accepting_state_list)) = match Sum.inl p_0 with \| Sum.inr (Sum.inr p') => p' ∈ M_1.accepting_state_list \| x => False	no goals	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : ℕ ⊢ (Sum.inl p_0 ∈ List.map Sum.inr (List.map Sum.inr M_1.accepting_state_list)) = match Sum.inl p_0 with \| Sum.inr (Sum.inr p') => p' ∈ M_1.accepting_st...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	case _ p_0 => cases p_0 case _ p_0 => simp case _ p_0 => simp	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 ⊕ σ_1 ⊢ (Sum.inr p_0 ∈ List.map Sum.inr (List.map Sum.inr M_1.accepting_state_list)) = match Sum.inr p_0 with \| Sum.inr (Sum.inr p') => p' ∈ M_1.accepting_state_list \| x => False	no goals	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 ⊕ σ_1 ⊢ (Sum.inr p_0 ∈ List.map Sum.inr (List.map Sum.inr M_1.accepting_state_list)) = match Sum.inr p_0 with \| Sum.inr (Sum.inr p') => p' ∈ M_1.acce...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	simp	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : ℕ ⊢ (Sum.inl p_0 ∈ List.map Sum.inr (List.map Sum.inr M_1.accepting_state_list)) = match Sum.inl p_0 with \| Sum.inr (Sum.inr p') => p' ∈ M_1.accepting_state_list \| x => False	no goals	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : ℕ ⊢ (Sum.inl p_0 ∈ List.map Sum.inr (List.map Sum.inr M_1.accepting_state_list)) = match Sum.inl p_0 with \| Sum.inr (Sum.inr p') => p' ∈ M_1.accepting_st...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	cases p_0	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 ⊕ σ_1 ⊢ (Sum.inr p_0 ∈ List.map Sum.inr (List.map Sum.inr M_1.accepting_state_list)) = match Sum.inr p_0 with \| Sum.inr (Sum.inr p') => p' ∈ M_1.accepting_state_list \| x => False	case inl α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 val✝ : σ_0 ⊢ (Sum.inr (Sum.inl val✝) ∈ List.map Sum.inr (List.map Sum.inr M_1.accepting_state_list)) = match Sum.inr (Sum.inl val✝) with \| Sum.inr (Sum.inr p') => p' ∈ M_1.accepting_state_list \| x => False ...	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 ⊕ σ_1 ⊢ (Sum.inr p_0 ∈ List.map Sum.inr (List.map Sum.inr M_1.accepting_state_list)) = match Sum.inr p_0 with \| Sum.inr (Sum.inr p') => p' ∈ M_1.acce...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	case _ p_0 => simp	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 ⊢ (Sum.inr (Sum.inl p_0) ∈ List.map Sum.inr (List.map Sum.inr M_1.accepting_state_list)) = match Sum.inr (Sum.inl p_0) with \| Sum.inr (Sum.inr p') => p' ∈ M_1.accepting_state_list \| x => False	no goals	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 ⊢ (Sum.inr (Sum.inl p_0) ∈ List.map Sum.inr (List.map Sum.inr M_1.accepting_state_list)) = match Sum.inr (Sum.inl p_0) with \| Sum.inr (Sum.inr p') =>...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	case _ p_0 => simp	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 ⊢ (Sum.inr (Sum.inr p_0) ∈ List.map Sum.inr (List.map Sum.inr M_1.accepting_state_list)) = match Sum.inr (Sum.inr p_0) with \| Sum.inr (Sum.inr p') => p' ∈ M_1.accepting_state_list \| x => False	no goals	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 ⊢ (Sum.inr (Sum.inr p_0) ∈ List.map Sum.inr (List.map Sum.inr M_1.accepting_state_list)) = match Sum.inr (Sum.inr p_0) with \| Sum.inr (Sum.inr p') =>...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	simp	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 ⊢ (Sum.inr (Sum.inl p_0) ∈ List.map Sum.inr (List.map Sum.inr M_1.accepting_state_list)) = match Sum.inr (Sum.inl p_0) with \| Sum.inr (Sum.inr p') => p' ∈ M_1.accepting_state_list \| x => False	no goals	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_0 ⊢ (Sum.inr (Sum.inl p_0) ∈ List.map Sum.inr (List.map Sum.inr M_1.accepting_state_list)) = match Sum.inr (Sum.inl p_0) with \| Sum.inr (Sum.inr p') =>...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/Parsing/RegExpToEpsilonNFA.lean	match_concat_EpsilonNFA_toAbstract	[557, 1]	[690, 19]	simp	α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 ⊢ (Sum.inr (Sum.inr p_0) ∈ List.map Sum.inr (List.map Sum.inr M_1.accepting_state_list)) = match Sum.inr (Sum.inr p_0) with \| Sum.inr (Sum.inr p') => p' ∈ M_1.accepting_state_list \| x => False	no goals	Please generate a tactic in lean4 to solve the state. STATE: α : Type inst✝ : DecidableEq α σ_0 σ_1 : Type M_0 : EpsilonNFA α σ_0 M_1 : EpsilonNFA α σ_1 p_0 : σ_1 ⊢ (Sum.inr (Sum.inr p_0) ∈ List.map Sum.inr (List.map Sum.inr M_1.accepting_state_list)) = match Sum.inr (Sum.inr p_0) with \| Sum.inr (Sum.inr p') =>...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Fresh.lean	FOL.NV.finset_var_name_max_len_mem	[23, 1]	[46, 18]	induction xs using Finset.induction_on	x : VarName xs : Finset VarName h1 : x ∈ xs ⊢ x.length ≤ finset_var_name_max_len xs	case empty x : VarName h1 : x ∈ ∅ ⊢ x.length ≤ finset_var_name_max_len ∅ case insert x a✝² : VarName s✝ : Finset VarName a✝¹ : a✝² ∉ s✝ a✝ : x ∈ s✝ → x.length ≤ finset_var_name_max_len s✝ h1 : x ∈ insert a✝² s✝ ⊢ x.length ≤ finset_var_name_max_len (insert a✝² s✝)	Please generate a tactic in lean4 to solve the state. STATE: x : VarName xs : Finset VarName h1 : x ∈ xs ⊢ x.length ≤ finset_var_name_max_len xs TACTIC:
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Fresh.lean	FOL.NV.finset_var_name_max_len_mem	[23, 1]	[46, 18]	case empty => simp at h1	x : VarName h1 : x ∈ ∅ ⊢ x.length ≤ finset_var_name_max_len ∅	no goals	Please generate a tactic in lean4 to solve the state. STATE: x : VarName h1 : x ∈ ∅ ⊢ x.length ≤ finset_var_name_max_len ∅ TACTIC:
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Fresh.lean	FOL.NV.finset_var_name_max_len_mem	[23, 1]	[46, 18]	case insert hd tl a1 ih => simp at h1 cases h1 case inl c1 => subst c1 simp only [finset_var_name_max_len] simp case inr c1 => simp only [finset_var_name_max_len] at ih simp only [finset_var_name_max_len] simp right exact ih c1	x hd : VarName tl : Finset VarName a1 : hd ∉ tl ih : x ∈ tl → x.length ≤ finset_var_name_max_len tl h1 : x ∈ insert hd tl ⊢ x.length ≤ finset_var_name_max_len (insert hd tl)	no goals	Please generate a tactic in lean4 to solve the state. STATE: x hd : VarName tl : Finset VarName a1 : hd ∉ tl ih : x ∈ tl → x.length ≤ finset_var_name_max_len tl h1 : x ∈ insert hd tl ⊢ x.length ≤ finset_var_name_max_len (insert hd tl) TACTIC:
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Fresh.lean	FOL.NV.finset_var_name_max_len_mem	[23, 1]	[46, 18]	simp at h1	x : VarName h1 : x ∈ ∅ ⊢ x.length ≤ finset_var_name_max_len ∅	no goals	Please generate a tactic in lean4 to solve the state. STATE: x : VarName h1 : x ∈ ∅ ⊢ x.length ≤ finset_var_name_max_len ∅ TACTIC:
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Fresh.lean	FOL.NV.finset_var_name_max_len_mem	[23, 1]	[46, 18]	simp at h1	x hd : VarName tl : Finset VarName a1 : hd ∉ tl ih : x ∈ tl → x.length ≤ finset_var_name_max_len tl h1 : x ∈ insert hd tl ⊢ x.length ≤ finset_var_name_max_len (insert hd tl)	x hd : VarName tl : Finset VarName a1 : hd ∉ tl ih : x ∈ tl → x.length ≤ finset_var_name_max_len tl h1 : x = hd ∨ x ∈ tl ⊢ x.length ≤ finset_var_name_max_len (insert hd tl)	Please generate a tactic in lean4 to solve the state. STATE: x hd : VarName tl : Finset VarName a1 : hd ∉ tl ih : x ∈ tl → x.length ≤ finset_var_name_max_len tl h1 : x ∈ insert hd tl ⊢ x.length ≤ finset_var_name_max_len (insert hd tl) TACTIC:
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Fresh.lean	FOL.NV.finset_var_name_max_len_mem	[23, 1]	[46, 18]	cases h1	x hd : VarName tl : Finset VarName a1 : hd ∉ tl ih : x ∈ tl → x.length ≤ finset_var_name_max_len tl h1 : x = hd ∨ x ∈ tl ⊢ x.length ≤ finset_var_name_max_len (insert hd tl)	case inl x hd : VarName tl : Finset VarName a1 : hd ∉ tl ih : x ∈ tl → x.length ≤ finset_var_name_max_len tl h✝ : x = hd ⊢ x.length ≤ finset_var_name_max_len (insert hd tl) case inr x hd : VarName tl : Finset VarName a1 : hd ∉ tl ih : x ∈ tl → x.length ≤ finset_var_name_max_len tl h✝ : x ∈ tl ⊢ x.length ≤ finset_var_n...	Please generate a tactic in lean4 to solve the state. STATE: x hd : VarName tl : Finset VarName a1 : hd ∉ tl ih : x ∈ tl → x.length ≤ finset_var_name_max_len tl h1 : x = hd ∨ x ∈ tl ⊢ x.length ≤ finset_var_name_max_len (insert hd tl) TACTIC:
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Fresh.lean	FOL.NV.finset_var_name_max_len_mem	[23, 1]	[46, 18]	case inl c1 => subst c1 simp only [finset_var_name_max_len] simp	x hd : VarName tl : Finset VarName a1 : hd ∉ tl ih : x ∈ tl → x.length ≤ finset_var_name_max_len tl c1 : x = hd ⊢ x.length ≤ finset_var_name_max_len (insert hd tl)	no goals	Please generate a tactic in lean4 to solve the state. STATE: x hd : VarName tl : Finset VarName a1 : hd ∉ tl ih : x ∈ tl → x.length ≤ finset_var_name_max_len tl c1 : x = hd ⊢ x.length ≤ finset_var_name_max_len (insert hd tl) TACTIC:
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Fresh.lean	FOL.NV.finset_var_name_max_len_mem	[23, 1]	[46, 18]	case inr c1 => simp only [finset_var_name_max_len] at ih simp only [finset_var_name_max_len] simp right exact ih c1	x hd : VarName tl : Finset VarName a1 : hd ∉ tl ih : x ∈ tl → x.length ≤ finset_var_name_max_len tl c1 : x ∈ tl ⊢ x.length ≤ finset_var_name_max_len (insert hd tl)	no goals	Please generate a tactic in lean4 to solve the state. STATE: x hd : VarName tl : Finset VarName a1 : hd ∉ tl ih : x ∈ tl → x.length ≤ finset_var_name_max_len tl c1 : x ∈ tl ⊢ x.length ≤ finset_var_name_max_len (insert hd tl) TACTIC:
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Fresh.lean	FOL.NV.finset_var_name_max_len_mem	[23, 1]	[46, 18]	subst c1	x hd : VarName tl : Finset VarName a1 : hd ∉ tl ih : x ∈ tl → x.length ≤ finset_var_name_max_len tl c1 : x = hd ⊢ x.length ≤ finset_var_name_max_len (insert hd tl)	x : VarName tl : Finset VarName ih : x ∈ tl → x.length ≤ finset_var_name_max_len tl a1 : x ∉ tl ⊢ x.length ≤ finset_var_name_max_len (insert x tl)	Please generate a tactic in lean4 to solve the state. STATE: x hd : VarName tl : Finset VarName a1 : hd ∉ tl ih : x ∈ tl → x.length ≤ finset_var_name_max_len tl c1 : x = hd ⊢ x.length ≤ finset_var_name_max_len (insert hd tl) TACTIC:
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Fresh.lean	FOL.NV.finset_var_name_max_len_mem	[23, 1]	[46, 18]	simp only [finset_var_name_max_len]	x : VarName tl : Finset VarName ih : x ∈ tl → x.length ≤ finset_var_name_max_len tl a1 : x ∉ tl ⊢ x.length ≤ finset_var_name_max_len (insert x tl)	x : VarName tl : Finset VarName ih : x ∈ tl → x.length ≤ finset_var_name_max_len tl a1 : x ∉ tl ⊢ x.length ≤ Finset.fold (fun m n => max m n) 0 (String.length ∘ VarName.toString) (insert x tl)	Please generate a tactic in lean4 to solve the state. STATE: x : VarName tl : Finset VarName ih : x ∈ tl → x.length ≤ finset_var_name_max_len tl a1 : x ∉ tl ⊢ x.length ≤ finset_var_name_max_len (insert x tl) TACTIC:
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Fresh.lean	FOL.NV.finset_var_name_max_len_mem	[23, 1]	[46, 18]	simp	x : VarName tl : Finset VarName ih : x ∈ tl → x.length ≤ finset_var_name_max_len tl a1 : x ∉ tl ⊢ x.length ≤ Finset.fold (fun m n => max m n) 0 (String.length ∘ VarName.toString) (insert x tl)	no goals	Please generate a tactic in lean4 to solve the state. STATE: x : VarName tl : Finset VarName ih : x ∈ tl → x.length ≤ finset_var_name_max_len tl a1 : x ∉ tl ⊢ x.length ≤ Finset.fold (fun m n => max m n) 0 (String.length ∘ VarName.toString) (insert x tl) TACTIC:
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Fresh.lean	FOL.NV.finset_var_name_max_len_mem	[23, 1]	[46, 18]	simp only [finset_var_name_max_len] at ih	x hd : VarName tl : Finset VarName a1 : hd ∉ tl ih : x ∈ tl → x.length ≤ finset_var_name_max_len tl c1 : x ∈ tl ⊢ x.length ≤ finset_var_name_max_len (insert hd tl)	x hd : VarName tl : Finset VarName a1 : hd ∉ tl ih : x ∈ tl → x.length ≤ Finset.fold (fun m n => max m n) 0 (String.length ∘ VarName.toString) tl c1 : x ∈ tl ⊢ x.length ≤ finset_var_name_max_len (insert hd tl)	Please generate a tactic in lean4 to solve the state. STATE: x hd : VarName tl : Finset VarName a1 : hd ∉ tl ih : x ∈ tl → x.length ≤ finset_var_name_max_len tl c1 : x ∈ tl ⊢ x.length ≤ finset_var_name_max_len (insert hd tl) TACTIC:
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Fresh.lean	FOL.NV.finset_var_name_max_len_mem	[23, 1]	[46, 18]	simp only [finset_var_name_max_len]	x hd : VarName tl : Finset VarName a1 : hd ∉ tl ih : x ∈ tl → x.length ≤ Finset.fold (fun m n => max m n) 0 (String.length ∘ VarName.toString) tl c1 : x ∈ tl ⊢ x.length ≤ finset_var_name_max_len (insert hd tl)	x hd : VarName tl : Finset VarName a1 : hd ∉ tl ih : x ∈ tl → x.length ≤ Finset.fold (fun m n => max m n) 0 (String.length ∘ VarName.toString) tl c1 : x ∈ tl ⊢ x.length ≤ Finset.fold (fun m n => max m n) 0 (String.length ∘ VarName.toString) (insert hd tl)	Please generate a tactic in lean4 to solve the state. STATE: x hd : VarName tl : Finset VarName a1 : hd ∉ tl ih : x ∈ tl → x.length ≤ Finset.fold (fun m n => max m n) 0 (String.length ∘ VarName.toString) tl c1 : x ∈ tl ⊢ x.length ≤ finset_var_name_max_len (insert hd tl) TACTIC:
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Fresh.lean	FOL.NV.finset_var_name_max_len_mem	[23, 1]	[46, 18]	simp	x hd : VarName tl : Finset VarName a1 : hd ∉ tl ih : x ∈ tl → x.length ≤ Finset.fold (fun m n => max m n) 0 (String.length ∘ VarName.toString) tl c1 : x ∈ tl ⊢ x.length ≤ Finset.fold (fun m n => max m n) 0 (String.length ∘ VarName.toString) (insert hd tl)	x hd : VarName tl : Finset VarName a1 : hd ∉ tl ih : x ∈ tl → x.length ≤ Finset.fold (fun m n => max m n) 0 (String.length ∘ VarName.toString) tl c1 : x ∈ tl ⊢ x.length ≤ hd.length ∨ x.length ≤ Finset.fold (fun m n => max m n) 0 (fun x => x.length) tl	Please generate a tactic in lean4 to solve the state. STATE: x hd : VarName tl : Finset VarName a1 : hd ∉ tl ih : x ∈ tl → x.length ≤ Finset.fold (fun m n => max m n) 0 (String.length ∘ VarName.toString) tl c1 : x ∈ tl ⊢ x.length ≤ Finset.fold (fun m n => max m n) 0 (String.length ∘ VarName.toString) (insert hd tl) TAC...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Fresh.lean	FOL.NV.finset_var_name_max_len_mem	[23, 1]	[46, 18]	right	x hd : VarName tl : Finset VarName a1 : hd ∉ tl ih : x ∈ tl → x.length ≤ Finset.fold (fun m n => max m n) 0 (String.length ∘ VarName.toString) tl c1 : x ∈ tl ⊢ x.length ≤ hd.length ∨ x.length ≤ Finset.fold (fun m n => max m n) 0 (fun x => x.length) tl	case h x hd : VarName tl : Finset VarName a1 : hd ∉ tl ih : x ∈ tl → x.length ≤ Finset.fold (fun m n => max m n) 0 (String.length ∘ VarName.toString) tl c1 : x ∈ tl ⊢ x.length ≤ Finset.fold (fun m n => max m n) 0 (fun x => x.length) tl	Please generate a tactic in lean4 to solve the state. STATE: x hd : VarName tl : Finset VarName a1 : hd ∉ tl ih : x ∈ tl → x.length ≤ Finset.fold (fun m n => max m n) 0 (String.length ∘ VarName.toString) tl c1 : x ∈ tl ⊢ x.length ≤ hd.length ∨ x.length ≤ Finset.fold (fun m n => max m n) 0 (fun x => x.length) tl TACTIC:...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Fresh.lean	FOL.NV.finset_var_name_max_len_mem	[23, 1]	[46, 18]	exact ih c1	case h x hd : VarName tl : Finset VarName a1 : hd ∉ tl ih : x ∈ tl → x.length ≤ Finset.fold (fun m n => max m n) 0 (String.length ∘ VarName.toString) tl c1 : x ∈ tl ⊢ x.length ≤ Finset.fold (fun m n => max m n) 0 (fun x => x.length) tl	no goals	Please generate a tactic in lean4 to solve the state. STATE: case h x hd : VarName tl : Finset VarName a1 : hd ∉ tl ih : x ∈ tl → x.length ≤ Finset.fold (fun m n => max m n) 0 (String.length ∘ VarName.toString) tl c1 : x ∈ tl ⊢ x.length ≤ Finset.fold (fun m n => max m n) 0 (fun x => x.length) tl TACTIC:
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Fresh.lean	FOL.NV.fresh_not_mem	[69, 1]	[91, 59]	obtain s1 := finset_var_name_max_len_mem x xs h	x : VarName c : Char xs : Finset VarName h : x ∈ xs ⊢ finset_var_name_max_len xs - x.length < finset_var_name_max_len xs + 1 - x.length	x : VarName c : Char xs : Finset VarName h : x ∈ xs s1 : x.length ≤ finset_var_name_max_len xs ⊢ finset_var_name_max_len xs - x.length < finset_var_name_max_len xs + 1 - x.length	Please generate a tactic in lean4 to solve the state. STATE: x : VarName c : Char xs : Finset VarName h : x ∈ xs ⊢ finset_var_name_max_len xs - x.length < finset_var_name_max_len xs + 1 - x.length TACTIC:
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Fresh.lean	FOL.NV.fresh_not_mem	[69, 1]	[91, 59]	simp only [tsub_lt_tsub_iff_right s1]	x : VarName c : Char xs : Finset VarName h : x ∈ xs s1 : x.length ≤ finset_var_name_max_len xs ⊢ finset_var_name_max_len xs - x.length < finset_var_name_max_len xs + 1 - x.length	x : VarName c : Char xs : Finset VarName h : x ∈ xs s1 : x.length ≤ finset_var_name_max_len xs ⊢ finset_var_name_max_len xs < finset_var_name_max_len xs + 1	Please generate a tactic in lean4 to solve the state. STATE: x : VarName c : Char xs : Finset VarName h : x ∈ xs s1 : x.length ≤ finset_var_name_max_len xs ⊢ finset_var_name_max_len xs - x.length < finset_var_name_max_len xs + 1 - x.length TACTIC:
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Fresh.lean	FOL.NV.fresh_not_mem	[69, 1]	[91, 59]	simp	x : VarName c : Char xs : Finset VarName h : x ∈ xs s1 : x.length ≤ finset_var_name_max_len xs ⊢ finset_var_name_max_len xs < finset_var_name_max_len xs + 1	no goals	Please generate a tactic in lean4 to solve the state. STATE: x : VarName c : Char xs : Finset VarName h : x ∈ xs s1 : x.length ≤ finset_var_name_max_len xs ⊢ finset_var_name_max_len xs < finset_var_name_max_len xs + 1 TACTIC:
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Fresh.lean	FOL.NV.fresh_not_mem	[69, 1]	[91, 59]	unfold fresh	x : VarName c : Char xs : Finset VarName h : x ∈ xs this : finset_var_name_max_len xs - x.length < finset_var_name_max_len xs + 1 - x.length ⊢ fresh x c xs ∉ xs	x : VarName c : Char xs : Finset VarName h : x ∈ xs this : finset_var_name_max_len xs - x.length < finset_var_name_max_len xs + 1 - x.length ⊢ (if h : x ∈ xs then let_fun this := ⋯; fresh { toString := x.toString ++ c.toString } c xs else x) ∉ xs	Please generate a tactic in lean4 to solve the state. STATE: x : VarName c : Char xs : Finset VarName h : x ∈ xs this : finset_var_name_max_len xs - x.length < finset_var_name_max_len xs + 1 - x.length ⊢ fresh x c xs ∉ xs TACTIC:
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Fresh.lean	FOL.NV.fresh_not_mem	[69, 1]	[91, 59]	simp	x : VarName c : Char xs : Finset VarName h : x ∈ xs this : finset_var_name_max_len xs - x.length < finset_var_name_max_len xs + 1 - x.length ⊢ (if h : x ∈ xs then let_fun this := ⋯; fresh { toString := x.toString ++ c.toString } c xs else x) ∉ xs	x : VarName c : Char xs : Finset VarName h : x ∈ xs this : finset_var_name_max_len xs - x.length < finset_var_name_max_len xs + 1 - x.length ⊢ (if x ∈ xs then fresh { toString := x.toString ++ c.toString } c xs else x) ∉ xs	Please generate a tactic in lean4 to solve the state. STATE: x : VarName c : Char xs : Finset VarName h : x ∈ xs this : finset_var_name_max_len xs - x.length < finset_var_name_max_len xs + 1 - x.length ⊢ (if h : x ∈ xs then let_fun this := ⋯; fresh { toString := x.toString ++ c.toString } c xs else x) ∉...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Fresh.lean	FOL.NV.fresh_not_mem	[69, 1]	[91, 59]	simp only [if_pos h]	x : VarName c : Char xs : Finset VarName h : x ∈ xs this : finset_var_name_max_len xs - x.length < finset_var_name_max_len xs + 1 - x.length ⊢ (if x ∈ xs then fresh { toString := x.toString ++ c.toString } c xs else x) ∉ xs	x : VarName c : Char xs : Finset VarName h : x ∈ xs this : finset_var_name_max_len xs - x.length < finset_var_name_max_len xs + 1 - x.length ⊢ fresh { toString := x.toString ++ c.toString } c xs ∉ xs	Please generate a tactic in lean4 to solve the state. STATE: x : VarName c : Char xs : Finset VarName h : x ∈ xs this : finset_var_name_max_len xs - x.length < finset_var_name_max_len xs + 1 - x.length ⊢ (if x ∈ xs then fresh { toString := x.toString ++ c.toString } c xs else x) ∉ xs TACTIC:
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Fresh.lean	FOL.NV.fresh_not_mem	[69, 1]	[91, 59]	apply fresh_not_mem	x : VarName c : Char xs : Finset VarName h : x ∈ xs this : finset_var_name_max_len xs - x.length < finset_var_name_max_len xs + 1 - x.length ⊢ fresh { toString := x.toString ++ c.toString } c xs ∉ xs	no goals	Please generate a tactic in lean4 to solve the state. STATE: x : VarName c : Char xs : Finset VarName h : x ∈ xs this : finset_var_name_max_len xs - x.length < finset_var_name_max_len xs + 1 - x.length ⊢ fresh { toString := x.toString ++ c.toString } c xs ∉ xs TACTIC:
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Fresh.lean	FOL.NV.fresh_not_mem	[69, 1]	[91, 59]	unfold fresh	x : VarName c : Char xs : Finset VarName h : x ∉ xs ⊢ fresh x c xs ∉ xs	x : VarName c : Char xs : Finset VarName h : x ∉ xs ⊢ (if h : x ∈ xs then let_fun this := ⋯; fresh { toString := x.toString ++ c.toString } c xs else x) ∉ xs	Please generate a tactic in lean4 to solve the state. STATE: x : VarName c : Char xs : Finset VarName h : x ∉ xs ⊢ fresh x c xs ∉ xs TACTIC:
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Fresh.lean	FOL.NV.fresh_not_mem	[69, 1]	[91, 59]	simp	x : VarName c : Char xs : Finset VarName h : x ∉ xs ⊢ (if h : x ∈ xs then let_fun this := ⋯; fresh { toString := x.toString ++ c.toString } c xs else x) ∉ xs	x : VarName c : Char xs : Finset VarName h : x ∉ xs ⊢ (if x ∈ xs then fresh { toString := x.toString ++ c.toString } c xs else x) ∉ xs	Please generate a tactic in lean4 to solve the state. STATE: x : VarName c : Char xs : Finset VarName h : x ∉ xs ⊢ (if h : x ∈ xs then let_fun this := ⋯; fresh { toString := x.toString ++ c.toString } c xs else x) ∉ xs TACTIC:
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Fresh.lean	FOL.NV.fresh_not_mem	[69, 1]	[91, 59]	simp [if_neg h]	x : VarName c : Char xs : Finset VarName h : x ∉ xs ⊢ (if x ∈ xs then fresh { toString := x.toString ++ c.toString } c xs else x) ∉ xs	x : VarName c : Char xs : Finset VarName h : x ∉ xs ⊢ x ∉ xs	Please generate a tactic in lean4 to solve the state. STATE: x : VarName c : Char xs : Finset VarName h : x ∉ xs ⊢ (if x ∈ xs then fresh { toString := x.toString ++ c.toString } c xs else x) ∉ xs TACTIC:
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Fresh.lean	FOL.NV.fresh_not_mem	[69, 1]	[91, 59]	exact h	x : VarName c : Char xs : Finset VarName h : x ∉ xs ⊢ x ∉ xs	no goals	Please generate a tactic in lean4 to solve the state. STATE: x : VarName c : Char xs : Finset VarName h : x ∉ xs ⊢ x ∉ xs TACTIC:
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Sub/Pred/All/Rec/Option/Sub.lean	FOL.NV.Sub.Pred.All.Rec.Option.substitution_theorem_aux	[90, 1]	[226, 15]	induction F generalizing binders V	D : Type I : Interpretation D V V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) binders : Finset VarName F : Formula h1 : admitsAux τ binders F h2 : ∀ x ∉ binders, V' x = V x ⊢ Holds D { nonempty := ⋯, pred_const_ := I.pred_const_, pred_var_ := fun X ds => ...	case pred_const_ D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) a✝¹ : PredName a✝ : List VarName V : VarAssignment D binders : Finset VarName h1 : admitsAux τ binders (pred_const_ a✝¹ a✝) h2 : ∀ x ∉ binders, V' x = V x ⊢ Holds D { nonempty :=...	Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) binders : Finset VarName F : Formula h1 : admitsAux τ binders F h2 : ∀ x ∉ binders, V' x = V x ⊢ Holds D { nonempty := ⋯, pred_const...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Sub/Pred/All/Rec/Option/Sub.lean	FOL.NV.Sub.Pred.All.Rec.Option.substitution_theorem_aux	[90, 1]	[226, 15]	case pred_const_ X xs => simp only [replace] simp only [Holds]	D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h1 : admitsAux τ binders (pred_const_ X xs) h2 : ∀ x ∉ binders, V' x = V x ⊢ Holds D { nonempty := ⋯, pred_const_ := I....	no goals	Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h1 : admitsAux τ binders (pred_const_ X xs) h2 : ∀ x ∉ binders, ...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Sub/Pred/All/Rec/Option/Sub.lean	FOL.NV.Sub.Pred.All.Rec.Option.substitution_theorem_aux	[90, 1]	[226, 15]	case eq_ x y => simp only [replace] simp only [Holds]	D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) x y : VarName V : VarAssignment D binders : Finset VarName h1 : admitsAux τ binders (eq_ x y) h2 : ∀ x ∉ binders, V' x = V x ⊢ Holds D { nonempty := ⋯, pred_const_ := I.pred_const_, pred_...	no goals	Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) x y : VarName V : VarAssignment D binders : Finset VarName h1 : admitsAux τ binders (eq_ x y) h2 : ∀ x ∉ binders, V' x = V x ⊢ Holds D ...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Sub/Pred/All/Rec/Option/Sub.lean	FOL.NV.Sub.Pred.All.Rec.Option.substitution_theorem_aux	[90, 1]	[226, 15]	case true_ \| false_ => simp only [replace] simp only [Holds]	D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) V : VarAssignment D binders : Finset VarName h1 : admitsAux τ binders false_ h2 : ∀ x ∉ binders, V' x = V x ⊢ Holds D { nonempty := ⋯, pred_const_ := I.pred_const_, pred_var_ := fun X ds ...	no goals	Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) V : VarAssignment D binders : Finset VarName h1 : admitsAux τ binders false_ h2 : ∀ x ∉ binders, V' x = V x ⊢ Holds D { nonempty := ⋯,...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Sub/Pred/All/Rec/Option/Sub.lean	FOL.NV.Sub.Pred.All.Rec.Option.substitution_theorem_aux	[90, 1]	[226, 15]	case not_ phi phi_ih => simp only [admitsAux] at h1 simp only [replace] simp only [Holds] congr! 1 exact phi_ih V binders h1 h2	D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) phi : Formula phi_ih : ∀ (V : VarAssignment D) (binders : Finset VarName), admitsAux τ binders phi → (∀ x ∉ binders, V' x = V x) → (Holds D { nonempty := ⋯, pred_const_ ...	no goals	Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) phi : Formula phi_ih : ∀ (V : VarAssignment D) (binders : Finset VarName), admitsAux τ binders phi → (∀ x ∉ binders, V' x = V x)...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Sub/Pred/All/Rec/Option/Sub.lean	FOL.NV.Sub.Pred.All.Rec.Option.substitution_theorem_aux	[90, 1]	[226, 15]	case forall_ x phi phi_ih \| exists_ x phi phi_ih => simp only [admitsAux] at h1 simp only [replace] simp only [Holds] first \| apply forall_congr' \| apply exists_congr intro d apply phi_ih (Function.updateITE V x d) (binders ∪ {x}) h1 intro v a1 simp only [Function.updateITE] simp at a1 push_neg at a...	D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) x : VarName phi : Formula phi_ih : ∀ (V : VarAssignment D) (binders : Finset VarName), admitsAux τ binders phi → (∀ x ∉ binders, V' x = V x) → (Holds D { nonempty := ⋯, ...	no goals	Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) x : VarName phi : Formula phi_ih : ∀ (V : VarAssignment D) (binders : Finset VarName), admitsAux τ binders phi → (∀ x ∉ binders,...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Sub/Pred/All/Rec/Option/Sub.lean	FOL.NV.Sub.Pred.All.Rec.Option.substitution_theorem_aux	[90, 1]	[226, 15]	simp only [replace]	D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h1 : admitsAux τ binders (pred_const_ X xs) h2 : ∀ x ∉ binders, V' x = V x ⊢ Holds D { nonempty := ⋯, pred_const_ := I....	D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h1 : admitsAux τ binders (pred_const_ X xs) h2 : ∀ x ∉ binders, V' x = V x ⊢ Holds D { nonempty := ⋯, pred_const_ := I....	Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h1 : admitsAux τ binders (pred_const_ X xs) h2 : ∀ x ∉ binders, ...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Sub/Pred/All/Rec/Option/Sub.lean	FOL.NV.Sub.Pred.All.Rec.Option.substitution_theorem_aux	[90, 1]	[226, 15]	simp only [Holds]	D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h1 : admitsAux τ binders (pred_const_ X xs) h2 : ∀ x ∉ binders, V' x = V x ⊢ Holds D { nonempty := ⋯, pred_const_ := I....	no goals	Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h1 : admitsAux τ binders (pred_const_ X xs) h2 : ∀ x ∉ binders, ...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Sub/Pred/All/Rec/Option/Sub.lean	FOL.NV.Sub.Pred.All.Rec.Option.substitution_theorem_aux	[90, 1]	[226, 15]	simp only [admitsAux] at h1	D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h1 : admitsAux τ binders (pred_var_ X xs) h2 : ∀ x ∉ binders, V' x = V x ⊢ Holds D { nonempty := ⋯, pred_const_ := I.pr...	D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h2 : ∀ x ∉ binders, V' x = V x h1 : if h : (τ X xs.length).isSome = true then if xs.length = ((τ X xs.length).get ⋯).1....	Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h1 : admitsAux τ binders (pred_var_ X xs) h2 : ∀ x ∉ binders, V'...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Sub/Pred/All/Rec/Option/Sub.lean	FOL.NV.Sub.Pred.All.Rec.Option.substitution_theorem_aux	[90, 1]	[226, 15]	simp at h1	D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h2 : ∀ x ∉ binders, V' x = V x h1 : if h : (τ X xs.length).isSome = true then if xs.length = ((τ X xs.length).get ⋯).1....	D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h2 : ∀ x ∉ binders, V' x = V x h1 : if h : (τ X xs.length).isSome = true then xs.length = ((τ X xs.length).get ⋯).1.len...	Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h2 : ∀ x ∉ binders, V' x = V x h1 : if h : (τ X xs.length).isS...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Sub/Pred/All/Rec/Option/Sub.lean	FOL.NV.Sub.Pred.All.Rec.Option.substitution_theorem_aux	[90, 1]	[226, 15]	simp only [replace]	D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h2 : ∀ x ∉ binders, V' x = V x h1 : if h : (τ X xs.length).isSome = true then xs.length = ((τ X xs.length).get ⋯).1.len...	D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h2 : ∀ x ∉ binders, V' x = V x h1 : if h : (τ X xs.length).isSome = true then xs.length = ((τ X xs.length).get ⋯).1.len...	Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h2 : ∀ x ∉ binders, V' x = V x h1 : if h : (τ X xs.length).isS...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Sub/Pred/All/Rec/Option/Sub.lean	FOL.NV.Sub.Pred.All.Rec.Option.substitution_theorem_aux	[90, 1]	[226, 15]	simp only [Holds]	D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h2 : ∀ x ∉ binders, V' x = V x h1 : if h : (τ X xs.length).isSome = true then xs.length = ((τ X xs.length).get ⋯).1.len...	D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h2 : ∀ x ∉ binders, V' x = V x h1 : if h : (τ X xs.length).isSome = true then xs.length = ((τ X xs.length).get ⋯).1.len...	Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h2 : ∀ x ∉ binders, V' x = V x h1 : if h : (τ X xs.length).isS...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Sub/Pred/All/Rec/Option/Sub.lean	FOL.NV.Sub.Pred.All.Rec.Option.substitution_theorem_aux	[90, 1]	[226, 15]	simp	D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h2 : ∀ x ∉ binders, V' x = V x h1 : if h : (τ X xs.length).isSome = true then xs.length = ((τ X xs.length).get ⋯).1.len...	D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h2 : ∀ x ∉ binders, V' x = V x h1 : if h : (τ X xs.length).isSome = true then xs.length = ((τ X xs.length).get ⋯).1.len...	Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h2 : ∀ x ∉ binders, V' x = V x h1 : if h : (τ X xs.length).isS...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Sub/Pred/All/Rec/Option/Sub.lean	FOL.NV.Sub.Pred.All.Rec.Option.substitution_theorem_aux	[90, 1]	[226, 15]	split_ifs	D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h2 : ∀ x ∉ binders, V' x = V x h1 : if h : (τ X xs.length).isSome = true then xs.length = ((τ X xs.length).get ⋯).1.len...	case pos D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h2 : ∀ x ∉ binders, V' x = V x h1 : if h : (τ X xs.length).isSome = true then xs.length = ((τ X xs.length).get...	Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h2 : ∀ x ∉ binders, V' x = V x h1 : if h : (τ X xs.length).isS...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Sub/Pred/All/Rec/Option/Sub.lean	FOL.NV.Sub.Pred.All.Rec.Option.substitution_theorem_aux	[90, 1]	[226, 15]	case _ c1 c2 => simp only [Holds]	D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h2 : ∀ x ∉ binders, V' x = V x h1 : if h : (τ X xs.length).isSome = true then xs.length = ((τ X xs.length).get ⋯).1.len...	no goals	Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h2 : ∀ x ∉ binders, V' x = V x h1 : if h : (τ X xs.length).isS...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Sub/Pred/All/Rec/Option/Sub.lean	FOL.NV.Sub.Pred.All.Rec.Option.substitution_theorem_aux	[90, 1]	[226, 15]	case _ c1 => simp only [Holds]	D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h2 : ∀ x ∉ binders, V' x = V x h1 : if h : (τ X xs.length).isSome = true then xs.length = ((τ X xs.length).get ⋯).1.len...	no goals	Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h2 : ∀ x ∉ binders, V' x = V x h1 : if h : (τ X xs.length).isS...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Sub/Pred/All/Rec/Option/Sub.lean	FOL.NV.Sub.Pred.All.Rec.Option.substitution_theorem_aux	[90, 1]	[226, 15]	let opt := τ X xs.length	D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h2 : ∀ x ∉ binders, V' x = V x h1 : if h : (τ X xs.length).isSome = true then xs.length = ((τ X xs.length).get ⋯).1.len...	D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h2 : ∀ x ∉ binders, V' x = V x h1 : if h : (τ X xs.length).isSome = true then xs.length = ((τ X xs.length).get ⋯).1.len...	Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h2 : ∀ x ∉ binders, V' x = V x h1 : if h : (τ X xs.length).isS...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Sub/Pred/All/Rec/Option/Sub.lean	FOL.NV.Sub.Pred.All.Rec.Option.substitution_theorem_aux	[90, 1]	[226, 15]	let val := Option.get opt c1	D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h2 : ∀ x ∉ binders, V' x = V x h1 : if h : (τ X xs.length).isSome = true then xs.length = ((τ X xs.length).get ⋯).1.len...	D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h2 : ∀ x ∉ binders, V' x = V x h1 : if h : (τ X xs.length).isSome = true then xs.length = ((τ X xs.length).get ⋯).1.len...	Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h2 : ∀ x ∉ binders, V' x = V x h1 : if h : (τ X xs.length).isS...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Sub/Pred/All/Rec/Option/Sub.lean	FOL.NV.Sub.Pred.All.Rec.Option.substitution_theorem_aux	[90, 1]	[226, 15]	let zs := val.fst	D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h2 : ∀ x ∉ binders, V' x = V x h1 : if h : (τ X xs.length).isSome = true then xs.length = ((τ X xs.length).get ⋯).1.len...	D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h2 : ∀ x ∉ binders, V' x = V x h1 : if h : (τ X xs.length).isSome = true then xs.length = ((τ X xs.length).get ⋯).1.len...	Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h2 : ∀ x ∉ binders, V' x = V x h1 : if h : (τ X xs.length).isS...
https://github.com/pthomas505/FOL.git	097a4abea51b641d144539b9a0f7516f3b9d818c	FOL/NV/Sub/Pred/All/Rec/Option/Sub.lean	FOL.NV.Sub.Pred.All.Rec.Option.substitution_theorem_aux	[90, 1]	[226, 15]	let H := val.snd	D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h2 : ∀ x ∉ binders, V' x = V x h1 : if h : (τ X xs.length).isSome = true then xs.length = ((τ X xs.length).get ⋯).1.len...	D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h2 : ∀ x ∉ binders, V' x = V x h1 : if h : (τ X xs.length).isSome = true then xs.length = ((τ X xs.length).get ⋯).1.len...	Please generate a tactic in lean4 to solve the state. STATE: D : Type I : Interpretation D V' : VarAssignment D E : Env c : Char τ : PredName → ℕ → Option (List VarName × Formula) X : PredName xs : List VarName V : VarAssignment D binders : Finset VarName h2 : ∀ x ∉ binders, V' x = V x h1 : if h : (τ X xs.length).isS...

Subsets and Splits

No community queries yet

The top public SQL queries from the community will appear here once available.