Metric spaces admitting low-distortion embeddings into all n-dimensional Banach spaces

Abstract

For a fixed K 1 and n∈N, n 1, we study metric spaces which admit embeddings with distortion K into each n-dimensional Banach space. Classical examples include spaces embeddable into n-dimensional Euclidean spaces, and equilateral spaces. We prove that good embeddability properties are preserved under the operation of metric composition of metric spaces. In particular, we prove that any n-point ultrametric can be embedded with uniformly bounded distortion into any Banach space of dimension n. The main result of the paper is a new example of a family of finite metric spaces which are not metric compositions of classical examples and which do embed with uniformly bounded distortion into any Banach space of dimension n. This partially answers a question of G. Schechtman.