Metric dimension reduction modulus for superlogarithmic distortion

Abstract

The metric dimension reduction modulus kαn(∞) is the smallest k such that every n--point metric space can be embedded into some k-dimensional normed space, with bi--Lipschitz distortion at most α. Determining sharp asymptotics for kαn(∞) is a fundamental task in metric geometry, with α=( n) bearing particular interest. A line of advances over the past decades has led to an upper bound on kαn(∞) for α = ( n), but a matching lower bound has remained open. We close this gap, establishing: for every fixed β > 0, kαn(∞) =( n(α n+1)) for every α≥ β n. This resolves a question from Naor's 2018 ICM plenary lecture. Our result is obtained by characterizing the minimum dimension d for which, with high probability, a random regular graph admits an α--embedding into some d--dimensional normed space.