HepLean Documentation

Mathlib.Data.NNRat.Lemmas

Field and action structures on the nonnegative rationals #

This file provides additional results about NNRat that cannot live in earlier files due to import cycles.

A MulAction over restricts to a MulAction over ℚ≥0.

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A DistribMulAction over restricts to a DistribMulAction over ℚ≥0.

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@[simp]
theorem NNRat.coe_indicator {α : Type u_1} (s : Set α) (f : αℚ≥0) (a : α) :
(s.indicator f a) = s.indicator (fun (x : α) => (f x)) a
theorem Rat.toNNRat_inv (q : ) :
q⁻¹.toNNRat = q.toNNRat⁻¹
theorem Rat.toNNRat_div {p : } {q : } (hp : 0 p) :
(p / q).toNNRat = p.toNNRat / q.toNNRat
theorem Rat.toNNRat_div' {p : } {q : } (hq : 0 q) :
(p / q).toNNRat = p.toNNRat / q.toNNRat

Numerator and denominator #

def NNRat.rec {α : ℚ≥0Sort u_1} (h : (m n : ) → α (m / n)) (q : ℚ≥0) :
α q

A recursor for nonnegative rationals in terms of numerators and denominators.

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Instances For