Another view of the coarse invariant σ

Abstract

Miller, Stibich and Moore (2010) developed a set-valued coarse invariant σ(X,) of pointed metric spaces. DeLyser, LaBuz and Tobash (2013) provided a different way to construct σ(X,) (as the set of all sequential ends). This paper provides yet another definition of σ(X,). To do this, we introduce a metric on the set S(X,) of coarse maps (N,0)(X,), and prove that σ(X,) is equal to the set of coarsely connected components of S(X,). As a by-product, our reformulation trivialises some known theorems on σ(X,), including the functoriality and the coarse invariance.