Amenability of compact hypergroup algebras

## Abstract In the present paper we introduce a new definition for the Fourier space __A__ (__K__) of a locally compact Hausdorff hypergroup __K__ and prove that it is a Banach subspace of __B__ (__K__). This definition coincides with that of Amini and Medghalchi in the case where __K__ is a tensor

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

We investigate amenability, weak amenability and α t -amenability of the L 1 -algebra of polynomial hypergroups, and derive from these properties some applications for the corresponding orthogonal polynomials.

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.