A characterization of spaces of homogeneous type induced by continuous ellipsoid covers of Rn

Abstract

We study the relationship between the concept of a continuous ellipsoid cover of Rn, which was introduced by Dahmen, Dekel, and Petrushev, and the space of homogeneous type induced by . We characterize the class of quasi-distances on Rn (up to equivalence) which correspond to continuous ellipsoid covers. This places firmly continuous ellipsoid covers as a subclass of spaces of homogeneous type on Rn satisfying quasi-convexity and 1-Ahlfors-regularity.