Convolution-Dominated Operators on Discrete Groups

Abstract

We study infinite matrices A indexed by a discrete group G that are dominated by a convolution operator in the sense that |(Ac)(x)| ≤ (a |c|)(x) for x∈ G and some a∈ 1(G). This class of "convolution-dominated" matrices forms a Banach-*-algebra contained in the algebra of bounded operators on 2(G). Our main result shows that the inverse of a convolution-dominated matrix is again convolution-dominated, provided that G is amenable and rigidly symmetric. For abelian groups this result goes back to Gohberg, Baskakov, and others, for non-abelian groups completely different techniques are required, such as generalized L1-algebras and the symmetry of group algebras.