Isomorphism and Morita equivalence classes for crossed products of irrational rotation algebras by cyclic subgroups of SL2(Z)

Abstract

Let θ, θ' be irrational numbers and A, B be matrices in SL2(Z) of infinite order. We compute the K-theory of the crossed product AθA Z and show that Aθ AZ and Aθ' B Z are *-isomorphic if and only if θ = θ' Z and I-A-1 is matrix equivalent to I-B-1. Combining this result and an explicit construction of equivariant bimodules, we show that Aθ AZ and Aθ' B Z are Morita equivalent if and only if θ and θ' are in the same GL2(Z) orbit and I-A-1 is matrix equivalent to I-B-1. Finally, we determine the Morita equivalence class of Aθ F for any finite subgroup F of SL2(Z).