What does a typical metric space look like?
Abstract
The collection of all metric spaces on points whose diameter is at most can naturally be viewed as a compact convex subset of , known as the metric polytope. In this paper, we study the metric polytope for large and show that it is close to the cube in the following two senses. First, the volume of the polytope is not much larger than that of the cube, with the following quantitative estimates: Second, when sampling a metric space from uniformly at random, the minimum distance is at least with high probability, for some . Our proof is based on entropy techniques. We discuss alternative approaches to estimating the volume of using exchangeability, Szemer\'edi's regularity lemma, the hypergraph container method, and the K\H{o}v\'ari--S\'os--Tur\'an theorem.
Cite
@article{arxiv.2104.01689,
title = {What does a typical metric space look like?},
author = {Gady Kozma and Tom Meyerovitch and Ron Peled and Wojciech Samotij},
journal= {arXiv preprint arXiv:2104.01689},
year = {2022}
}
Comments
64 pages, 2 figures. v2: Swapped Sections 5 and 6 and added a reader's guide