Twisted convolution algebras with coefficients in a differential subalgebra

Abstract

Let ( G,α, ω, B) be a measurable twisted action of the locally compact group G on a Banach *-algebra B and A a differential Banach *-subalgebra of B, which is stable under said action. We observe that L1α,ω( G, A) is a differential subalgebra of L1α,ω( G, B). We use this fact to provide new examples of groups with symmetric Banach *-algebras. In particular, we prove that discrete rigidly symmetric extensions of compact groups are symmetric or that semidirect products K H, with H symmetric and K compact, are symmetric.