Isometry groups and countable groups with the L\'evy property

Abstract

A topological group G is said to have the L\'evy property if it admits a dense subgroup which is decomposed as the union of an increasing sequence of compact subgroups G=\Gi:i∈N\ of G which exhibits concentration of measure in the sense of Gromov and Milman. We say that G has the strong L\'evy property whenever the sequence G is comprised of finite subgroups. In this paper we give several new classes of isometry groups and countable topological groups with the strong L\'evy property. We prove that if is a countable distance value set with arbitrarily small values, then Iso(U), the isometry group of the Urysohn -metric space equipped with the pointwise convergence topology, where U is equipped with the metric topology, has the strong L\'evy property. We also prove that if L is a Lipschitz continuous signature, then Iso(UL), the isometry group of the unique separable Urysohn L-structure, has the strong L\'evy property. In addition, our approach shows that any countable omnigenous locally finite group can be given a topology with the L\'evy property. As a consequence to our results, we obtain at least continuum many pairwise nonisomorphic countable topological groups or isometry groups with the strong L\'evy property.

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