2014-11-07 16:21:42 +00:00
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import logic data.num
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2014-09-03 23:00:38 +00:00
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open tactic inhabited
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2014-07-09 01:21:22 +00:00
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2014-09-04 22:03:59 +00:00
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namespace foo
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2014-07-10 12:12:53 +00:00
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inductive sum (A : Type) (B : Type) : Type :=
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2015-02-26 01:00:10 +00:00
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| inl : A → sum A B
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| inr : B → sum A B
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2014-07-09 01:21:22 +00:00
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theorem inl_inhabited {A : Type} (B : Type) (H : inhabited A) : inhabited (sum A B)
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2014-09-04 23:36:06 +00:00
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:= inhabited.destruct H (λ a, inhabited.mk (sum.inl B a))
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2014-07-09 01:21:22 +00:00
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theorem inr_inhabited (A : Type) {B : Type} (H : inhabited B) : inhabited (sum A B)
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2014-09-04 23:36:06 +00:00
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:= inhabited.destruct H (λ b, inhabited.mk (sum.inr A b))
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2014-07-09 01:21:22 +00:00
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2014-10-21 00:10:16 +00:00
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infixl `..`:10 := append
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2014-07-09 01:21:22 +00:00
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2015-04-28 00:46:13 +00:00
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notation `(` h `|` r:(foldl `|` (e r, tactic.or_else r e) h) `)` := r
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infixl `;`:15 := tactic.and_then
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2014-07-09 01:21:22 +00:00
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definition my_tac := repeat (trace "iteration"; state;
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( apply @inl_inhabited; trace "used inl"
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.. apply @inr_inhabited; trace "used inr"
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2014-09-15 17:31:03 +00:00
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.. apply @num.is_inhabited; trace "used num")) ; now
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2014-07-09 01:21:22 +00:00
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2014-10-07 16:44:01 +00:00
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tactic_hint my_tac
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2014-07-09 01:21:22 +00:00
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2014-09-04 23:36:06 +00:00
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theorem T : inhabited (sum false num)
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2014-09-04 22:03:59 +00:00
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end foo
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