Convolution dominated operators on compact extensions of abelian groups

Abstract

If G is a locally compact group, CD(G) the algebra of convolution dominated operators on L2(G) then an important question is: Is C1+CD(G) (respectively CD(G) if G is discrete) inverse-closed in the bounded operators on L2(G)? In this note we answer this question in the affirmative provided G is such that one of the following properties is fulfilled (1) There is a discrete, rigidly symmetric, and amenable subgroup H⊂ G and a (measurable) relatively compact neighbourhood of the identity U invariant under conjugation by elements of H such that \hU\;:\;h∈ H\ is a partition of G. (2) The commutator subgroup of G is relatively compact. (If G is connected this just means that G is an IN group.) All known examples where CD(G) is inverse-closed in B(L2(G)) are covered by this.