Unitary Representations of the Isometry Groups of Urysohn Spaces

Abstract

We obtain a complete classification of the continuous unitary representations of the isometry group of the rational Urysohn space QU. As a consequence, we show that Isom(QU) has property (T). We also derive several ergodic theoretic consequences from this classification: (i) every probability measure-preserving action of Isom(QU) is either essentially free or essentially transitive, (ii) every ergodic Isom(QU)-invariant probability measure on [0,1]QU is a product measure. We obtain the same results for isometry groups of variations of QU, such as the rational Urysohn sphere QU1, the integral Urysohn space ZU, etc.

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