Semiflat Orbifold Projections

Abstract

We compute the semiflat positive cone K0+SF(Aθσ) of the K0-group of the irrational rotation orbifold Aθσ under the noncommutative Fourier transform σ and show that it is determined by classes of positive trace and the vanishing of two topological invariants. The semiflat orbifold projections are 3-dimensional and come in three basic topological genera: (2,0,0), (1,1,2), (0,0,2). (A projection is called semiflat when it has the form h + σ(h) where h is a flip-invariant projection such that hσ(h)=0.) Among other things, we also show that every number in (0,1) (2 Z + 2 Zθ) is the trace of a semiflat projection in Aθ. The noncommutative Fourier transform is the order 4 automorphism σ: V U V-1 (and the flip is σ2: U U-1,\ V V-1), where U,V are the canonical unitary generators of the rotation algebra Aθ satisfying VU = e2π iθ UV.