Groups of isometries of ultrametric Urysohn spaces and their unitary representations

Abstract

We consider groups I of isometries of ultrametric Urysohn spaces U. Such spaces U admit transparent realizations as boundaries of certain R-trees and the groups I are groups of automorphisms of these R-trees. Denote by I[X]⊂ I stabilizers of finite subspaces X⊂ U. Double cosets I[X]· g· I[Y], where g∈ I, are enumerated by ultrametrics on union of spaces X Y. We construct natural associative multiplications on double coset spaces I[X] I/I[X] and, more generally, multiplications I[X] I/I[Y]\,×\, I[Y] I/I[Z] I[X] I/I[Z]. These operations are a kind of canonical amalgamations of ultrametric spaces. On the other hand, this product can be interpreted in terms of partial isomorphisms of certain R-trees (in particular, we come to an inverse category). This allows us to classify all unitary representations of the groups I and to prove that groups I have type I. We also describe a universal semigroup compactification of I whose image in any unitary representation of I is compact.

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