Convolutions as Bilinear and Linear Operators

Abstract

Throughout this paper X denotes a fixed Hausdorff locally compact group with left Haar measure dx. Various spaces of functions and measures on X will recur in the discussion, so we name and describe them forthwith. All functions and measures on X will be scalarvalued, though it matters little whether the scalars are real or complex.C = C(X) is the space of all continuous functions on X, C_c = C_c(X) its subspace formed of functions with compact supports. M = M(X) denotes the space of all (Radon) measures on X, M_c = M_C(X) the subspace formed of those measures with compact supports. In general we denote the support of a function or a measure ξ by [ξ].