Cartan subalgebras and the UCT problem

Abstract

We show that a separable, nuclear C*-algebra satisfies the UCT if it has a Cartan subalgebra. Furthermore, we prove that the UCT is closed under crossed products by group actions which respect Cartan subalgebras. This observation allows us to deduce, among other things, that a crossed product O2α Zp satisfies the UCT if there is some automorphism γ of O2 with the property that γ( D2)⊂eq O2α Zp is regular, where D2 denotes the canonical masa of O2. We prove that this condition is automatic if γ( D2)⊂eq O2α Zp is not a masa or α(γ( D2)) is inner conjugate to γ( D2). Finally, we relate the UCT problem for separable, nuclear, M2∞-absorbing C*-algebras to Cartan subalgebras and order two automorphisms of O2.