Exotic group C*-algebras of simple Lie groups with real rank one

Abstract

Exotic group C*-algebras are C*-algebras that lie between the universal and the reduced group C*-algebra of a locally compact group. We consider simple Lie groups G with real rank one and investigate their exotic group C*-algebras C*Lp+(G), which are defined through Lp-integrability properties of matrix coefficients of unitary representations. First, we show that the subset of equivalence classes of irreducible unitary Lp+-representations forms a closed ideal of the unitary dual of these groups. This result holds more generally for groups with the Kunze-Stein property. Second, for every classical simple Lie group G with real rank one and every 2 ≤ q < p ≤ ∞, we determine whether the canonical quotient map C*Lp+(G) C*Lq+(G) has non-trivial kernel. Our results generalize, with different methods, recent results of Samei and Wiersma on exotic group C*-algebras of SO0(n,1) and SU(n,1). In particular, our approach also works for groups with property (T).