Dirac spectral flow and Floer theory of hyperbolic three-manifolds

Abstract

We study the interplay between hyperbolic geometry and monopole Floer homology for a closed oriented three-manifold Y with b1=1 equipped with a torsion spinc structure s. We show that, under favorable circumstances, one can completely describe the Floer theory of (Y,s) purely in terms of geometric data such as the lengths and holonomies of closed geodesics. In particular, we perform the first computations of monopole Floer chain complexes with non-trivial homology for hyperbolic three-manifolds. The examples we consider admit no irreducible solutions to the Seiberg-Witten equations, and the non-triviality of the Floer homology groups is a consequence of the geometry of the 1-parameter family of Dirac operators associated to flat spinc connections. The main technical challenge is to understand explicitly how the Dirac eigenvalues with small absolute value cross the value zero in this family; we tackle this using Fourier analytic tools via the corresponding 1-parameter family of odd Selberg trace formulas and its derivative.