Computable K-theory for C*-algebras: UHF algebras

Abstract

We initiate the study of the effective content of K-theory for C*-algebras. We prove that there are computable functors which associate, to a computably enumerable presentation of a C*-algebra , computably enumerable presentations of the abelian groups K0() and K1(). When is stably finite, we show that the positive cone of K0() is computably enumerable. We strengthen the results in the case that is a UHF algebra by showing that the aforementioned presentation of K0() is actually computable. In the UHF case, we also show that has a computable presentation precisely when K0() has a computable presentation, which in turn is equivalent to the supernatural number of being lower semicomputable; we give an example that shows that this latter equivalence cannot be improved to requiring that the supernatural number of is computable. Finally, we prove that every UHF algebra is computably categorical.