Group C*-algebras of locally compact groups acting on trees

Abstract

We study the group C*-algebras C*Lp+(G) - constructed from Lp-integrability properties of matrix coefficients of unitary representations - of locally compact groups G acting on (semi-)homogeneous trees of sufficiently large degree. These group C*-algebras lie between the universal and the reduced group C*-algebra. By directly investigating these Lp-integrability properties, we first show that for every non-compact, closed subgroup G of the automorphism group Aut(T) of a (semi-)homogeneous tree T that acts transitively on the boundary ∂ T and every 2 ≤ q < p ≤ ∞, the canonical quotient map C*Lp+(G) C*Lq+(G) is not injective. This reproves a result of Samei and Wiersma. We prove that under the additional assumptions that G acts transitively on T and that it has Tits' independence property, the group C*-algebras C*Lp+(G) are the only group C*-algebras coming from G-invariant ideals in the Fourier-Stieltjes algebra B(G). Additionally, we show that given a group G as before, every group C*-algebra C*μ(G) that is distinguishable (as a group C*-algebra) from the universal group C*-algebra of G and whose dual space C*μ(G)* is a G-invariant ideal in B(G) is abstractly *-isomorphic to the reduced group C*-algebra of G.