Classifying homogeneous ultrametric spaces up to coarse equivalence

Abstract

For every metric space X we introduce two cardinal characteristics cov(X) and cov(X) describing the capacity of balls in X. We prove that these cardinal characteristics are invariant under coarse equivalence and prove that two ultrametric spaces X,Y are coarsely equivalent if cov(X)=cov(X)=cov(Y)=cov(Y). This result implies that an ultrametric space X is coarsely equivalent to an isometrically homogeneous ultrametric space if and only if cov(X)=cov(X). Moreover, two isometrically homogeneous ultrametric spaces X,Y are coarsely equivalent if and only if cov(X)=cov(Y) if and only if each of these spaces coarsely embeds into the other space. This means that the coarse structure of an isometrically homogeneous ultrametric space X is completely determined by the value of the cardinal cov(X)=cov(X).