Ultrametric skeletons

Abstract

We prove that for every ε∈ (0,1) there exists Cε∈ (0,∞) with the following property. If (X,d) is a compact metric space and μ is a Borel probability measure on X then there exists a compact subset S⊂eq X that embeds into an ultrametric space with distortion O(1/ε), and a probability measure supported on S satisfying (Bd(x,r)) (μ(Bd(x,Cε r))1-ε for all x∈ X and r∈ (0,∞). The dependence of the distortion on ε is sharp. We discuss an extension of this statement to multiple measures, as well as how it implies Talagrand's majorizing measures theorem.