Mass and radius of balls in Gromov-Hausdorff-Prokhorov convergent sequences

Abstract

We survey some properties of Gromov--Hausdorff--Prokhorov convergent sequences (Xn, dXn, Xn)n 1 of random compact metric spaces equipped with Borel probability measures. We formalize that if the limit is almost surely non-atomic, then for large n each open ball in Xn with small radius must have small mass. Conversely, if the limit is almost surely fully supported, then each closed ball in Xn with small mass must have small radius. We do not claim any new results, but justifications are provided for properties for which we could not find explicit references.