Barycentric gluing and geometry of stable metrics

TL;DR

This paper explores the metric geometry of stable spaces, introduces the concept of upper stability, and extends barycentric gluing techniques to broader contexts, impacting embedding problems and compression theory.

Contribution

It broadens the application of barycentric gluing to general metric spaces, introduces upper stability as a new invariant, and connects these concepts to longstanding embedding problems.

Findings

Embeddability of a metric space into lp_p is determined by its balls.

Upper stability is a new invariant between stability and property alton's property .

Extensions of results from stable metrics to upper stable metrics are established.

Abstract

We discuss various aspects of a local-to-global embedding technique and the metric geometry of stable metric spaces and of two of its important subclasses: locally finite spaces and proper spaces. We explain how the barycentric gluing technique, which has been mostly applied to bi-Lipschitz embedding problems pertaining to locally finite spaces, can be implemented successfully in a much broader context. For instance, we show that the embeddability of an arbitrary metric space into $\ell_p$ is determined by the embeddability of its balls. We also introduce the notion of upper stability. This new metric invariant lies formally between Maurey-Krivine (metric) notion of stability and Kalton's property $\mathcal{Q}$. We show that several results of Raynaud and Kalton for stable metrics can be extended to the broader context of upper stable metrics and we point out the relevance of upper stability to a long-standing embedding problem raised by Kalton. Applications to compression exponent theory are highlighted and we recall old and state new, important open problems. This article was written in a style favoring clarity over conciseness in order to make the material appealing, accessible, and reusable to geometers from a variety of backgrounds, and not only to Banach space geometers.