Dynamical zeta functions for billiards

Abstract

Let D ⊂ Rd,\: d ≥slant 2, be the union of a finite collection of pairwise disjoint strictly convex compact obstacles. Let μj ∈ C,\: Im\: μj > 0, be the resonances of the Laplacian in the exterior of D with Neumann or Dirichlet boundary condition on ∂ D. For d odd, u(t) = Σj ei |t| μj is a distribution in D'( R \0\) and the Laplace transforms of the leading singularities of u(t) yield the dynamical zeta functions η N,\: η D for Neumann and Dirichlet boundary conditions, respectively. These zeta functions play a crucial role in the analysis of the distribution of the resonances. Under the non-eclipse condition (1.1), for d ≥slant 2 we show that η N and η D admit a meromorphic continuation to the whole complex plane. In the particular case when the boundary ∂ D is real analytic, by using a result of Fried (1995), we prove that the function ηD cannot be entire. Following the result of Ikawa (1988), this implies the existence of a strip \z ∈ C: \: 0 < Im\: z ≤α\ containing an infinite number of resonances μj for the Dirichlet problem. Moreover, for α 1 we obtain a lower bound for the resonances lying in this strip.