Exotic C*-algebras of geometric groups

Abstract

We consider a new class of potentially exotic group C*-algebras C*PFp*(G) for a locally compact group G, and its connection with the class of potentially exotic group C*-algebras C*Lp(G) introduced by Brown and Guentner. Surprisingly, these two classes of C*-algebras are intimately related. By exploiting this connection, we show C*Lp(G)=C*PFp*(G) for p∈ (2,∞), and the C*-algebras C*Lp(G) are pairwise distinct for p∈ (2,∞) when G belongs to a large class of nonamenable groups possessing the Haagerup property and either the rapid decay property or Kunze-Stein phenomenon by characterizing the positive definite functions that extend to positive linear functionals of C*Lp(G) and C*PFp*(G). This greatly generalizes earlier results of Okayasu and the second author on the pairwise distinctness of C*Lp(G) for 2<p<∞ when G is either a noncommutative free group or the group SL(2, R), respectively. As a byproduct of our techniques, we present two applications to the theory of unitary representations of a locally compact group G. Firstly, we give a short proof of the well-known Cowling-Haagerup-Howe Theorem which presents sufficient condition implying the weak containment of a cyclic unitary representation of G in the left regular representation of G. Also we give a near solution to a 1978 conjecture of Cowling. This conjecture of Cowling states if G is a Kunze-Stein group and π is a unitary representation of G with cyclic vector such that the map G s π(s), belongs to Lp(G) for some 2< p <∞, then Aπ⊂eq Lp(G). We show Bπ⊂eq Lp+ε(G) for every ε>0 (recall Aπ⊂eq Bπ).