The AF structure of non commutative toroidal Z/4Z orbifolds

Abstract

For any irrational theta and rational number p/q such that q|qtheta-p|<1, a projection e of trace q|qtheta-p| is constructed in the the irrational rotation algebra Atheta that is invariant under the Fourier transform. (The latter is the order four automorphism U mapped to V, V mapped to U-1, where U, V are the canonical unitaries generating Atheta.) Further, the projection e is approximately central, the cut down algebra eAtheta e contains a Fourier invariant q x q matrix algebra whose unit is e, and the cut downs eUe, eVe are approximately inside the matrix algebra. (In particular, there are Fourier invariant projections of trace k|qtheta-p| for k=1,...,q.) It is also shown that for all theta the crossed product Atheta rtimes Z4 satisfies the Universal Coefficient Theorem. (Z4 := Z/4Z.) As a consequence, using the Classification Theorem of G. Elliott and G. Gong for AH-algebras, a theorem of M. Rieffel, and by recent results of H. Lin, we show that Atheta rtimes Z4 is an AF-algebra for all irrational theta in a dense Gdelta.

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