Symmetry and Inverse Closedness for Some Banach *-Algebras Associated to Discrete Groups

Abstract

A discrete group is called rigidly symmetric if for every C*-algebra the projective tensor product 1() is a symmetric Banach *-algebra. For such a group we show that the twisted crossed product 1α,(;) is also a symmetric Banach *-algebra, for every twisted action (α,) of in a C*-algebra \,. We extend this property to other types of decay, replacing the 1-condition. We also make the connection with certain classes of twisted kernels, used in a theory of integral operators involving group 2-cocycles. The algebra of these kernels is studied, both in intrinsic and in represented version.