Quasi-symmetric group algebras and C*-completions of Hecke algebras

Abstract

We show that for a Hecke pair (G, ) the C*-completions C*(L1(G, )) and pC*(G)p of its Hecke algebra coincide whenever the group algebra L1(G) satisfies a spectral property which we call "quasi-symmetry", a property that is satisfied by all Hermitian groups and all groups with subexponential growth. We generalize in this way a result of Kaliszewski, Landstad and Quigg. Combining this result with our earlier results and a theorem of Tzanev we establish that the full Hecke C*-algebra exists and coincides with the reduced one for several classes of Hecke pairs, particularly all Hecke pairs (G, ) where G is nilpotent group. As a consequence, the category equivalence studied by Hall holds for all such Hecke pairs. We also show that the completions C*(L1(G, )) and pC*(G)p do not always coincide, with the Hecke pair (SL2(Qq), SL2(Zq)) providing one such example.