HepLean Documentation

Mathlib.Data.Int.Cast.Field

Cast of integers into fields #

This file concerns the canonical homomorphism ℤ → F, where F is a field.

Main results #

theorem Int.cast_neg_natCast {R : Type u_2} [DivisionRing R] (n : ) :
(-n) = -n

Auxiliary lemma for norm_cast to move the cast -↑n upwards to ↑-↑n.

(The restriction to DivisionRing is necessary, otherwise this would also apply in the case where R = ℤ and cause nontermination.)

@[simp]
theorem Int.cast_div {α : Type u_1} [DivisionRing α] {m n : } (n_dvd : n m) (hn : n 0) :
(m / n) = m / n