Abstract
The first named author has given a classification of all separable, nuclear C*-algebras A that absorb the Cuntz algebra O∞. (We say that A absorbs O∞ if A is isomorphic to A⊗O∞.) Motivated by this classification we investigate here if one can give an intrinsic characterization of C*-algebras that absorb O∞. This investigation leads us to three different notions of pure infiniteness of a C*-algebra, all given in terms of local, algebraic conditions on the C*-algebra. The strongest of the three properties, strongly purely infinite, is shown to be equivalent to absorbing O∞ for separable, nuclear C*-algebras that either are stable or have an approximate unit consisting of projections. In a previous paper (2000, Amer. J. Math.122, 637–666), we studied an intermediate, and perhaps more natural, condition: purely infinite, that extends a well known property for simple C*-algebras. The weakest condition of the three, weakly purely infinite, is shown to be equivalent to the absence of quasitraces in an ultrapower of the C*-algebra. The three conditions may be equivalent for all C*-algebras, and we prove this to be the case for C*-algebras that are either simple, of real rank zero, or approximately divisible.
Published Version
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