Subgroups of isometries of Urysohn-Katetov metric spaces of uncountable density

Abstract

According to Kat (1988), for every infinite cardinal m satisfying m n≤ m for all n< m, there exists a unique m-homogeneous universal metric space m of weight m. This object generalizes the classical Urysohn universal metric space = _0. We show that for m uncountable, the isometry group () with the topology of simple convergence is not a universal group of weight m: for instance, it does not contain () as a topological subgroup. More generally, every topological subgroup of () having density < m and possessing the bounded orbit property (OB) is functionally balanced: right uniformly continuous bounded functions are left uniformly continuous. This stands in sharp contrast with Uspenskij's 1990 result about the group () being a universal Polish group.