Approximate semi-amenability of Banach algebras

Abstract

Let A be a Banach algebra, and X a Banach A-bimodule. A bounded linear mapping D:A→ X is approximately semi-inner derivation if there eixist nets (α)α and (μα)α in X such that, for each a∈A, D(a)=α(a.α-μα.a). A is called approximately semi-amenable if for every Banach A-bimodule X, every D∈Z1(A,X*) is approximtely semi-inner. There are some Banach algebras which are approximately semi-amenable, but not approximately amenable. In this manuscript, we investigate some properties of approximate semi-amenability of Banach algebras. Also in Theorem ee we prove the approximate semi-amenability of Segal algebras on a locally compact group G.