On the spectral sets of Inoue surfaces

Abstract

The Inoue surfaces are certain non-Kaehler complex surfaces that have the structure of a T3 bundle over the circle. We study the Inoue surfaces SM with the Tricerri metric and the canonical spinc structure, and the corresponding chiral Dirac operators twisted by a flat C*--connection. The twisting connection is determined by z ∈ C*, and the points for which the twisted Dirac operators Dz are not invertible are called spectral points. We show that there are no spectral points inside the annulus α-1/4 < |z| < α1/4, where α >1 is the only real eigenvalue of the matrix M that determines SM, and find the spectral points on its boundary. Via Taubes' theory of end-periodic operators, this implies that the corresponding Dirac operators are Fredholm on any end-periodic manifold whose end is modeled on SM.