Positive definite *-spherical functions, property (T), and C*-completions of Gelfand pairs

Abstract

The study of existence of a universal C*-completion of the *-algebra canonically associated to a Hecke pair was initiated by Hall, who proved that the Hecke algebra associated to (SL2(), SL2()) does not admit a universal C*-completion. Kaliszewski, Landstad and Quigg studied the problem by placing it in the framework of Fell-Rieffel equivalence, and highlighted the role of other C*-completions. In the case of the pair (SLn(), SLn()) for n≥ 3 we show, invoking property (T) of SLn(), that the C*-completion of the L1-Banach algebra and the corner of C*(SLn()) determined by the subgroup are distinct. In fact, we prove a more general result valid for a simple algebraic group of rank at least 2 over a p-adic field with a good choice of a maximal compact open subgroup.