lean2/tests/lean/run/fibrant_class1.lean

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inductive fibrant [class] (T : Type) : Type :=
fibrant_mk : fibrant T
inductive path {A : Type'} [fA : fibrant A] (a : A) : A → Type :=
idpath : path a a
notation a ≈ b := path a b
axiom path_fibrant {A : Type'} [fA : fibrant A] (a b : A) : fibrant (path a b)
instance [persistent] path_fibrant
axiom imp_fibrant {A : Type'} {B : Type'} [C1 : fibrant A] [C2 : fibrant B] : fibrant (A → B)
instance imp_fibrant
definition test {A : Type} [fA : fibrant A] {x y : A} :
Π (z : A), y ≈ z → fibrant (x ≈ y → x ≈ z) := _