Strong pseudo-amenability of some Banach algebras

Abstract

In this paper we introduce a new notion of strong pseudo-amenability for Banach algebras. We study strong pseudo-amenability of some Matrix algebras. Using this tool, we characterize strong pseudo-amenability of 1(S), provided that S is a uniformly locally finite semigroup. As an application we show that for a Brandt semigroup S=M0(G,I), 1(S) is strong pseudo-amenable if and only if G is amenable and I is finite. We give some examples to show the differences of strong pseudo-amenability and other classical notions of amenability.