Introverted subspaces of the duals of measure algebras

Abstract

Let G be a locally compact group. In continuation of our studies on the first and second duals of measure algebras by the use of the theory of generalised functions, here we study the C*-subalgebra GL0( G) of GL( G) as an introverted subspace of M( G)*. In the case where G is non-compact we show that any topological left invariant mean on GL( G) lies in GL0( G). We then endow GL0( G)* with an Arens-type product which contains M( G) as a closed subalgebra and Ma( G) as a closed ideal which is a solid set with respect to absolute continuity in GL0( G)*. Among other things, we prove that G is compact if and only if GL0( G)* has a non-zero left (weakly) completely continuous element.