Sequential ends and nonstandard infinite boundaries of coarse spaces

Abstract

This paper is an addendum to the author's previous paper [#Im20a]. Miller et al. [#MSM10] introduced a functor σpCoarseSets, where pCoarse is the category of pointed coarse spaces and coarse maps. DeLyser et al. [#DLT13] introduced a functor pCoarseSets, and proved that coincides with σ on pMetr (the full subcategory of metrisable spaces). Using techniques of nonstandard analysis, the author in [#Ima20a] provided a functor C⊂eqpCoarseSets, where C is an arbitrary small full subcategory, and a natural transformation ωσC⇒. The surjectivity of ω has been proved for all proper geodesic metrisable spaces, while the injectivity has remained open. In this note, we first pointed out that ω is the composition of two natural transformations CσC⇒C and ω'C⇒, and then show that ω' is injective for all spaces in C. As a corollary, ω is injective for all metrisable spaces in C. This partially answers some of the problems posed in [#Ima20a].