The Koopman representation for self-similar groupoid actions

Abstract

We introduce the C*-algebra C*() generated by the Koopman representation of an \'etale groupoid G acting on a measure space (X,μ). We prove that for a level transitive self-similar action (G,E) with E finite and |uE1| constant, there is an invariant measure on X=E∞ and that C*() is residually finite-dimensional with a normalized self-similar trace. We also discus p-fold similarities of Hilbert spaces in connection to representations of the graph algebra C*(E) and self-similar representations of G in connection to the Cuntz-Pimsner algebra C*(G,E).

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