The semiclassical zeta function for geodesic flows on negatively curved manifolds

Abstract

We consider the semi-classical (or Gutzwiller-Voros) zeta function for C∞ contact Anosov flows. Analyzing the spectrum of transfer operators associated to the flow, we prove, for any τ>0, that its zeros are contained in the union of the τ-neighborhood of the imaginary axis, |(s)|<τ, and the region (s)<-0+τ, up to finitely many exceptions, where 0>0 is the hyperbolicity exponent of the flow. Further we show that the zeros in the neighborhood of the imaginary axis satisfy an analogue of the Weyl law.