Selectors of discrete coarse spaces

Abstract

Given a coarse space (X, E) with the bornology B of bounded subsets, we extend the coarse structure E from X× X to the natural coarse structure on ( B )× ( B ) and say that a macro-uniform mapping f: ( B )→ X (resp. f: [ X]2 → X) is a selector (resp. 2-selector) of (X, E) if f(A)∈ A for each A∈ B (resp. A ∈ [X]2 ). We prove that a discrete coarse space (X, E) admits a selector if and only if (X, E) admits a 2-selector if and only if there exists a linear order ≤ on X such that the family of intervals [a, b]: a,b∈ X, \ a≤ b \ is a base for the bornology B.