Compact homomorphisms of regular banach algebras

Recent work by various authors has considered the implications of Banach algebra amenability for various algebras defined over locally compact groups, one of the basic tools being the fact that a continuous homomorphic image of an amenable algebra is again amenable. In the present paper we look at t

Extensive development of noncommutative geometry requires elaboration of the theory of differential Banach \*-algebras, that is, dense \*-subalgebras of C\*-algebras whose properties are analogous to the properties of algebras of differentiable functions. We consider a specific class of such algebra

We investigate amenable and weakly amenable Banach algebras with compact multiplication. Any amenable Banach algebra with compact multiplication is biprojective. As a consequence, every semisimple such algebra which has the approximation property is a topological direct sum of full matrix algebras.

This paper is a contribution to the theory of weakly sequentially complete Banach algebras A. We require them to have bounded approximate identities and, for the most part, to be ideals in their second duals, so that examples are the group algebras L 1 (G) for compact groups G or the Fourier algebra

Let S be a locally compact semigroup, let ω be a weight function on S, and let Ma(S, ω) be the weighted semigroup algebra of S. Let L ∞ 0 (S; Ma(S, ω)) be the C \* -algebra of all Ma(S, ω)-measurable functions g on S such that g/ω vanishes at infinity. We introduce and study an Arens multiplication