Modular Images Of Approximately Central Projections

Abstract

It is shown that for any approximately central (AC) projection e in the Flip orbifold Aθ (of the irrational rotation C*-algebra Aθ), and any modular automorphism α (arising from SL(2, Z)), the AC projection α(e) is centrally Murray-von Neumann equivalent to one of the projections e,\ σ(e),\ (e),\ 2(e), σ(e),\ σ2(e) in the S3-orbit of e, where σ, are the Fourier and Cubic transforms of Aθ. (The equivalence being implemented by an approximately central partial isometry in Aθ.) For smooth automorphisms α,β of the Flip orbifold Aθ, it is also shown that if α*=β* on K0(Aθ), then α(e) and β(e) are centrally equivalent for each AC projection e.