Transversals, duality, and irrational rotation
Abstract
An early result of Noncommutative Geometry was Connes' observation in the 1980's that the Dirac-Dolbeault cycle for the -torus , which induces a Poincar\'e self-duality for , can be 'quantized' to give a spectral triple and a K-homology class in providing the co-unit for a Poincar\'e self-duality for the irrational rotation algebra for any . This spectral triple has been extensively studied since. Connes' proof, however, relied on a K-theory computation and does not supply a representative cycle for the unit of this duality. Since such representatives are vital in applications of duality, we supply such a cycle in unbounded form in this article. Our approach is to construct, for any non-trivial element of the modular group, a finitely generated projective module over by using a reduction-to-a-transversal argument of Muhly, Renault, and Williams, applied to a pair of Kronecker foliations along lines of slope and , using the fact that these flows are transverse to each other. We then compute Connes' dual of for upper triangular, and prove that we obtain an invertible in , represented by what one might regard as a noncommutative bundle of Dirac-Schr\"odinger operators. An application of -equivariant Bott Periodicity proves that twisting the module by the family gives the requisite spectral cycle for the unit, thus proving self-duality for with both unit and co-unit represented by spectral cycles.
Cite
@article{arxiv.1906.00079,
title = {Transversals, duality, and irrational rotation},
author = {Anna Duwenig and Heath Emerson},
journal= {arXiv preprint arXiv:1906.00079},
year = {2021}
}
Comments
substantially revised from first version