Zeta functions and the Fried conjecture for smooth pseudo-Anosov flows

Abstract

To a transitive pseudo-Anosov flow on a 3-manifold M and a representation of π1(M), we associate a zeta function ζ,(s) defined for s 1, generalizing the Anosov case. For a class of ``smooth pseudo-Anosov flows'', we prove that ζ,(s) has a meromorphic continuation to C. We also prove a version of the Fried conjecture for smooth pseudo-Anosov flows which, under some conditions on , relates ζ,(0) to the Reidemeister torsion of M. Finally we prove a topological analogue of the Dirichlet class number formula. In order to deal with singularities, we use C∞ versions of the approaches of Rugh and Sanchez--Morgado, based on Markov partitions.