30 lines
1.5 KiB
Text
30 lines
1.5 KiB
Text
universe l
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constants (A : Type.{l})
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definition q (x : A) : A := x
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definition h (x : A) : A := q x
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definition g (x y : A) := h y
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definition f (x y z : A) := g (g x y) z
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definition d (x y z w : A) := f (f x y z) (f y z w) (f x w z)
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definition h.def [defeq] (x : A) : h x = q x := rfl
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definition g.def [defeq] (x y : A) : g x y = h y := rfl
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definition f.def [defeq] (x y z : A) : f x y z = g (g x y) z := rfl
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definition d.def [defeq] (x y z w : A) : d x y z w = f (f x y z) (f y z w) (f x w z) := rfl
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#defeq_simplify env λ x y z w, (λ x, d x) (g (f x y z) (f z y x)) (g x z) (f y z w) (q (g x z))
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#defeq_simplify env Π x y z w, (λ x, d x) (g (f x y z) (f z y x)) (g x z) (f y z w) (q (g x z)) = (λ x, x) w
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set_option defeq_simplify.exhaustive false
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#defeq_simplify env λ x y z w, (λ x, d x) (g (f x y z) (f z y x)) (g x z) (f y z w) (q (g x z))
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#defeq_simplify env Π x y z w, (λ x, d x) (g (f x y z) (f z y x)) (g x z) (f y z w) (q (g x z)) = (λ x, x) w
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set_option defeq_simplify.top_down true
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#defeq_simplify env λ x y z w, (λ x, d x) (g (f x y z) (f z y x)) (g x z) (f y z w) (q (g x z))
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#defeq_simplify env Π x y z w, (λ x, d x) (g (f x y z) (f z y x)) (g x z) (f y z w) (q (g x z)) = (λ x, x) w
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attribute q [reducible]
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set_option defeq_simplify.exhaustive true
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set_option defeq_simplify.top_down false
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#defeq_simplify env λ x y z w, (λ x, d x) (g (f x y z) (f z y x)) (g x z) (f y z w) (q (g x z))
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#defeq_simplify env Π x y z w, (λ x, d x) (g (f x y z) (f z y x)) (g x z) (f y z w) (q (g x z)) = (λ x, x) w
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