On Certain Spectral Invariants of Dirac Operators on Noncommutative Tori

Abstract

The spectral eta function for certain families of Dirac operators on noncommutative 3-torus is considered and the regularity at zero is proved. By using variational techniques, we show that ηD(0) is a conformal invariant. By studying the Laurent expansion at zero of TR (|D|-z), the conformal invariance of ζ'|D|(0) for noncommutative 3-torus is proved. Finally, for the coupled Dirac operator, a local formula for the variation ∂AηD+A(0) is derived which is the analogue of the so called induced Chern-Simons term in quantum field theory literature.