lean2/library/logic/connectives/examples/instances_test.lean

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--- Copyright (c) 2014 Microsoft Corporation. All rights reserved.
--- Released under Apache 2.0 license as described in the file LICENSE.
--- Author: Jeremy Avigad
import ..instances
using relation
using relation.general_operations
using relation.iff_ops
using eq_ops
section
theorem test1 (a b : Prop) (H : a ↔ b) (H1 : a) : b := mp H H1
end
section
theorem test2 (a b c d e : Prop) (H1 : a ↔ b) (H2 : a c → ¬(d → a)) : b c → ¬(d → b) :=
subst iff H1 H2
theorem test3 (a b c d e : Prop) (H1 : a ↔ b) (H2 : a c → ¬(d → a)) : b c → ¬(d → b) :=
H1 ▸ H2
end
theorem test4 (a b c d e : Prop) (H1 : a ↔ b) : (a c → ¬(d → a)) ↔ (b c → ¬(d → b)) :=
congr.infer iff iff (λa, (a c → ¬(d → a))) H1
section
theorem test5 (T : Type) (a b c d : T) (H1 : a = b) (H2 : c = b) (H3 : c = d) : a = d :=
H1 ⬝ H2⁻¹ ⬝ H3
theorem test6 (a b c d : Prop) (H1 : a ↔ b) (H2 : c ↔ b) (H3 : c ↔ d) : a ↔ d :=
H1 ⬝ (H2⁻¹ ⬝ H3)
theorem test7 (T : Type) (a b c d : T) (H1 : a = b) (H2 : c = b) (H3 : c = d) : a = d :=
trans H1 (trans (symm H2) H3)
theorem test8 (a b c d : Prop) (H1 : a ↔ b) (H2 : c ↔ b) (H3 : c ↔ d) : a ↔ d :=
trans H1 (trans (symm H2) H3)
end