Zero Lie product determined Banach algebras, II

Abstract

A Banach algebra A is said to be zero Lie product determined if every continuous bilinear functional A× A C satisfying (a,b)=0 whenever ab=ba is of the form (a,b)=ω(ab-ba) for some ω∈ A*. We prove that A has this property provided that any of the following three conditions holds: (i) A is a weakly amenable Banach algebra with property B and having a bounded approximate identity, (ii) every continuous cyclic Jordan derivation from A into A* is an inner derivation, (iii) A is the algebra of all n× n matrices, where n 2, over a cyclically amenable Banach algebra with a bounded approximate identity.