chore(builtin/kernel): cleanup
Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>
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Leonardo de Moura
parent
57c0006916
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87b238efcd
2 changed files with 12 additions and 10 deletions
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@ -113,12 +113,12 @@ theorem absurd_elim {a : Bool} (b : Bool) (H1 : a) (H2 : ¬ a) : b
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theorem not_imp_eliml {a b : Bool} (Hnab : ¬ (a → b)) : a
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:= not_not_elim
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(have ¬ ¬ a :
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λ Hna : ¬ a, absurd (have a → b : λ Ha : a, absurd_elim b Ha Hna)
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Hnab)
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λ Hna : ¬ a, absurd (λ Ha : a, absurd_elim b Ha Hna)
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Hnab)
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theorem not_imp_elimr {a b : Bool} (H : ¬ (a → b)) : ¬ b
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:= λ Hb : b, absurd (have a → b : λ Ha : a, Hb)
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(have ¬ (a → b) : H)
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:= λ Hb : b, absurd (λ Ha : a, Hb)
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H
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theorem resolve1 {a b : Bool} (H1 : a ∨ b) (H2 : ¬ a) : b
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:= H1 H2
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@ -197,7 +197,8 @@ theorem boolext {a b : Bool} (Hab : a → b) (Hba : b → a) : a == b
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(λ Hbt : b == true, false_elim (a == b) (subst (Hba (eqt_elim Hbt)) Haf))
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(λ Hbf : b == false, trans Haf (symm Hbf)))
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definition iff_intro {a b : Bool} (Hab : a → b) (Hba : b → a) := boolext Hab Hba
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theorem iff_intro {a b : Bool} (Hab : a → b) (Hba : b → a) : a == b
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:= boolext Hab Hba
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theorem eqt_intro {a : Bool} (H : a) : a == true
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:= boolext (λ H1 : a, trivial)
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@ -209,12 +210,13 @@ theorem or_comm (a b : Bool) : (a ∨ b) == (b ∨ a)
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theorem or_assoc (a b c : Bool) : ((a ∨ b) ∨ c) == (a ∨ (b ∨ c))
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:= boolext (λ H : (a ∨ b) ∨ c,
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or_elim H (λ H1 : a ∨ b, or_elim H1 (λ Ha : a, or_introl Ha (b ∨ c)) (λ Hb : b, or_intror a (or_introl Hb c)))
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(λ Hc : c, or_intror a (or_intror b Hc)))
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or_elim H (λ H1 : a ∨ b, or_elim H1 (λ Ha : a, or_introl Ha (b ∨ c))
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(λ Hb : b, or_intror a (or_introl Hb c)))
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(λ Hc : c, or_intror a (or_intror b Hc)))
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(λ H : a ∨ (b ∨ c),
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or_elim H (λ Ha : a, (or_introl (or_introl Ha b) c))
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(λ H1 : b ∨ c, or_elim H1 (λ Hb : b, or_introl (or_intror a Hb) c)
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(λ Hc : c, or_intror (a ∨ b) Hc)))
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(λ H1 : b ∨ c, or_elim H1 (λ Hb : b, or_introl (or_intror a Hb) c)
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(λ Hc : c, or_intror (a ∨ b) Hc)))
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theorem or_id (a : Bool) : (a ∨ a) == a
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:= boolext (λ H, or_elim H (λ H1, H1) (λ H2, H2))
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@ -316,7 +318,7 @@ theorem eq_exists_intro {A : (Type U)} {P Q : A → Bool} (H : ∀ x : A, P x ==
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theorem not_forall (A : (Type U)) (P : A → Bool) : (¬ (∀ x : A, P x)) == (∃ x : A, ¬ P x)
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:= calc (¬ ∀ x : A, P x) = (¬ ∀ x : A, ¬ ¬ P x) : not_congr (allext (λ x : A, symm (not_not_eq (P x))))
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... = (∃ x : A, ¬ P x) : refl (∃ x : A, ¬ P x)
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... = (∃ x : A, ¬ P x) : refl (∃ x : A, ¬ P x)
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theorem not_forall_elim {A : (Type U)} {P : A → Bool} (H : ¬ (∀ x : A, P x)) : ∃ x : A, ¬ P x
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:= (not_forall A P) ◂ H
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