Symmetry and Spectral Invariance for Topologically Graded C*-Algebras and Partial Action Systems

Abstract

A discrete group is called rigidly symmetric if the projective tensor product between the convolution algebra 1() and any C*-algebra is symmetric. We show that in each topologically graded C*-algebra over a rigidly symmetric group there is a 1-type symmetric Banach *-algebra, which is inverse closed in the C*-algebra. This includes new general classes, as algebras admitting dual actions and partial crossed products. Results including convolution dominated kernels, inverse closedness with respect with ideals or weighted versions of the 1-decay are included. Various concrete examples are presented.