The Local Multiplier Algebra of a C*-Algebra, II

AbstractLet A be a separable C*-algebra and let Mloc(A) be the local multiplier algebra of A. It is shown that every minimal closed prime ideal of Mloc(A) is primitive. If Prim(A) has a dense Gδ consisting of closed points (for instance, if Prim(A) is a T1-space) and A is unital, then Mloc(A) is its own local multiplier algebra and has only inner derivations. The same is true for Mloc(Mloc(A)) if A is non-unital. If A is postliminal then Mloc(Mloc((A)) is the regular σ-completion of A, which is an AW*-algebra