Distance sets of universal and Urysohn metric spaces

Abstract

A metric space M=(M;) is homogeneous if for every isometry f of a finite subspace of M to a subspace of M there exists an isometry of M onto M extending f. A metric space U is an Urysohn metric space if it is homogeneous and separable and complete and if it isometrically embeds every separable metric space M with (M)⊂eq (U). (With (M) being the set of distances between points in M.) The main results are: (1) A characterization of the sets (U) for Urysohn metric spaces U. (2) If R is the distance set of an Urysohn metric space and M and N are two metric spaces, of any cardinality with distances in R, then they amalgamate disjointly to a metric space with distances in R. (3) The completion of a homogeneous separable metric space M which embeds isometrically every finite metric space F with (F)⊂eq (M) is homogeneous.