d9ee994281
Signed-off-by: Leonardo de Moura <leonardo@microsoft.com>
32 lines
1.3 KiB
Text
32 lines
1.3 KiB
Text
-- Copyright (c) 2014 Microsoft Corporation. All rights reserved.
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-- Released under Apache 2.0 license as described in the file LICENSE.
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-- Author: Leonardo de Moura
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import logic bool
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using logic
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inductive inhabited (A : Type) : Type :=
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| inhabited_intro : A → inhabited A
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theorem inhabited_elim {A : Type} {B : Type} (H1 : inhabited A) (H2 : A → B) : B
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:= inhabited_rec H2 H1
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theorem inhabited_fun [instance] (A : Type) {B : Type} (H : inhabited B) : inhabited (A → B)
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:= inhabited_elim H (take (b : B), inhabited_intro (λ a : A, b))
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theorem inhabited_sum_left [instance] {A : Type} (B : Type) (H : inhabited A) : inhabited (A + B)
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:= inhabited_elim H (λ a, inhabited_intro (inl B a))
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theorem inhabited_sum_right [instance] (A : Type) {B : Type} (H : inhabited B) : inhabited (A + B)
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:= inhabited_elim H (λ b, inhabited_intro (inr A b))
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theorem inhabited_product [instance] {A : Type} {B : Type} (Ha : inhabited A) (Hb : inhabited B) : inhabited (A × B)
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:= inhabited_elim Ha (λ a, (inhabited_elim Hb (λ b, inhabited_intro (a, b))))
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theorem inhabited_bool [instance] : inhabited bool
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:= inhabited_intro true
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theorem inhabited_unit [instance] : inhabited unit
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:= inhabited_intro ⋆
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theorem inhabited_sigma_pr1 {A : Type} {B : A → Type} (p : Σ x, B x) : inhabited A
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:= inhabited_intro (dpr1 p)
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