HepLean Documentation

Mathlib.Logic.Equiv.Nat

Equivalences involving #

This file defines some additional constructive equivalences using Encodable and the pairing function on .

An equivalence between Bool × ℕ and , by mapping (true, x) to 2 * x + 1 and (false, x) to 2 * x.

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    @[simp]
    theorem Equiv.boolProdNatEquivNat_symm_apply (a✝ : ) :
    Equiv.boolProdNatEquivNat.symm a✝ = a✝.boddDiv2
    @[simp]
    theorem Equiv.boolProdNatEquivNat_apply (a✝ : Bool × ) :
    Equiv.boolProdNatEquivNat a✝ = Function.uncurry Nat.bit a✝

    An equivalence between ℕ ⊕ ℕ and , by mapping (Sum.inl x) to 2 * x and (Sum.inr x) to 2 * x + 1.

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      @[simp]
      theorem Equiv.natSumNatEquivNat_symm_apply (a✝ : ) :
      Equiv.natSumNatEquivNat.symm a✝ = Bool.rec (Sum.inl a✝.div2) (Sum.inr a✝.div2) a✝.bodd
      @[simp]
      theorem Equiv.natSumNatEquivNat_apply :
      Equiv.natSumNatEquivNat = Sum.elim (fun (x : ) => 2 * x) fun (x : ) => 2 * x + 1

      An equivalence between and , through ℤ ≃ ℕ ⊕ ℕ and ℕ ⊕ ℕ ≃ ℕ.

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        def Equiv.prodEquivOfEquivNat {α : Type u_1} (e : α ) :
        α × α α

        An equivalence between α × α and α, given that there is an equivalence between α and .

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