Representations of Higman-Thompson groups from Cuntz algebras

Abstract

Every representation of the Cuntz algebra On leads to a unitary representation of the Higman-Thompson group Vn. We consider the family \πx\x∈ [0,1[ of permutative representations of On that arise from the interval map f(x)=nx (mod 1) acting on the Hilbert space that underlies each orbit, and then study the unitary equivalence and the irreducibility of the corresponding family \x\x∈ [0,1[ of representations of Higman-Thompson group Vn, showing that that these representations are indeed irreducible and moreover x and y are equivalent if and only if the orbits of x and y coincide.