2014-07-10 13:43:55 +00:00
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import standard
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namespace setoid
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inductive setoid : Type :=
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2014-07-22 16:43:18 +00:00
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| mk_setoid: Π (A : Type'), (A → A → Prop) → setoid
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2014-07-10 13:43:55 +00:00
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set_option pp.universes true
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check setoid
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definition test : Type.{2} := setoid.{0}
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definition carrier (s : setoid)
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:= setoid_rec (λ a eq, a) s
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2014-07-22 16:43:18 +00:00
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definition eqv {s : setoid} : carrier s → carrier s → Prop
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2014-07-10 13:43:55 +00:00
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:= setoid_rec (λ a eqv, eqv) s
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infix `≈`:50 := eqv
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coercion carrier
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inductive morphism (s1 s2 : setoid) : Type :=
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| mk_morphism : Π (f : s1 → s2), (∀ x y, x ≈ y → f x ≈ f y) → morphism s1 s2
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check mk_morphism
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check λ (s1 s2 : setoid), s1
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check λ (s1 s2 : Type), s1
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inductive morphism2 (s1 : setoid) (s2 : setoid) : Type :=
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| mk_morphism2 : Π (f : s1 → s2), (∀ x y, x ≈ y → f x ≈ f y) → morphism2 s1 s2
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check morphism2
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check mk_morphism2
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inductive my_struct : Type :=
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| mk_foo : Π (s1 s2 : setoid) (s3 s4 : setoid), morphism2 s1 s2 → morphism2 s3 s4 → my_struct
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check my_struct
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definition tst2 : Type.{4} := my_struct.{1 2}
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2014-08-07 23:59:08 +00:00
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end setoid
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