Deformation of a projection in the multipleir algebra and projection lifting from the corona algebra of a non-simple C*-algebra

Abstract

Let X be a unit interval or a unit circle and let B be a σp-unital, purely infinite, simple C*-algebra such that its multiplier algebra M(B) has real rank zero. Then we determine necessary and sufficient conditions for a projection in the corona algebra of C(X) B to be liftable to a projection in the multiplier algebra. This generalizes a result proved by L. Brown and the author BL. The main technical tools are divided into two parts. The first part is borrowed from the author's previous paper(JFA 260 (2011)). The second part is a proposition showing that we can produce a sub-projection, with an arbitrary rank which is prescribed as K-theoretical data, of a projection or a co-projection in the multiplier algebra of C(X) B under a suitable "infinite rank and co-rank" condition.