16 lines
361 B
Text
16 lines
361 B
Text
import logic data.nat.basic
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open nat
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inductive vec (A : Type) : nat → Type :=
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vnil : vec A zero,
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vone : A → vec A (succ zero),
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vtwo : A → A → vec A (succ (succ zero))
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namespace vec
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theorem eone {A : Type} {P : vec A (succ zero) → Type} (H : Π a, P (vone a)) (v : vec A (succ zero)) : P v :=
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begin
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cases v,
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-- apply (H a)
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end
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end vec
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