lean2/tests/lean/hott/eq1.hlean

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open nat
inductive vector (A : Type) : nat → Type :=
nil {} : vector A zero,
cons : Π {n}, A → vector A n → vector A (succ n)
infixr `::` := vector.cons
definition swap {A : Type} : Π {n}, vector A (succ (succ n)) → vector A (succ (succ n)),
swap (a :: b :: vs) := b :: a :: vs
-- Remark: in the current approach for HoTT, the equation
-- swap (a :: b :: v) = b :: a :: v
-- holds definitionally only when the index is a closed term.
example (a b : num) (v : vector num 5) : swap (a :: b :: v) = b :: a :: v :=
rfl