The centre-quotient property and weak centrality for C*-algebras

Abstract

We give a number of equivalent conditions (including weak centrality) for a general C*-algebra to have the centre-quotient property. We show that every C*-algebra A has a largest weakly central ideal Jwc(A). For an ideal I of a unital C*-algebra A, we find a necessary and sufficient condition for a central element of A/I to lift to a central element of A. This leads to a characterisation of the set VA of elements of an arbitrary C*-algebra A which prevent A from having the centre-quotient property. The complement CQ(A):= A VA always contains Z(A)+Jwc(A) (where Z(A) is the centre of A), with equality if and only if A/Jwc(A) is abelian. Otherwise, CQ(A) fails spectacularly to be a C*-subalgebra of A.