Linearly rigid metric spaces and the embedding problem
Functional Analysis
2008-04-12 v4 Metric Geometry
Abstract
We consider the problem of isometric embedding of metric spaces to the Banach spaces; and introduce and study the remarkable class of so-called linearly rigid metric spaces: these are the spaces that admit a unique, up to isometry, linearly dense isometric embedding into a Banach space. The first nontrivial example of such a space was given by R. Holmes; he proved that the universal Urysohn space has this property. We give a criterion of linear rigidity of a metric space, which allows us to give a simple proof of the linear rigidity of the Urysohn space and some other metric spaces. The various properties of linearly rigid spaces and related spaces are considered.
Keywords
Cite
@article{arxiv.math/0611049,
title = {Linearly rigid metric spaces and the embedding problem},
author = {J. Melleray and F. V. Petrov and A. M. Vershik},
journal= {arXiv preprint arXiv:math/0611049},
year = {2008}
}
Comments
23 pp. Ref.19