Semilattices of groups and nonstable K-theory of extended Cuntz limits

Abstract

We give an elementary characterization of those (abelian) semigroups M that are direct limits of countable sequences of finite direct products of monoids of the form C\0\ for monogenic groups C. This characterization involves the Riesz refinement property together with lattice-theoretical properties of the collection of subgroups of M, and it makes it possible to express M as a certain submonoid of a direct product S× G, where S is a distributive semilattice with zero and G is an abelian group. When applied to the monoids V(A) appearing in the nonstable K-theory of C*-algebras, our results yield a full description of V(A) for C*-inductive limits A of finite products of full matrix algebras over either Cuntz algebras O\n, where 2≤ n<∞, or corners of O\∞ by projections, thus extending to the case including O\∞ earlier work by the authors together with K.R. Goodearl.

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