Analytic continuation of the resolvent of the Laplacian and the dynamical zeta function

Abstract

Let s0 < 0 be the abscissa of absolute convergence of the dynamical zeta function Z(s) for several disjoint strictly convex compact obstacles Ki ⊂ N, i = 1,..., 0,\: 0 ≥ 3, and let R(z) = (-D - z2)-1,\: ∈ C0∞(N), be the cut-off resolvent of the Dirichlet Laplacian -D in = N i = 1k0 Ki. We prove that there exists σ1 < s0 such that Z(s) is analytic for (s) ≥ σ1 and the cut-off resolvent R(z) has an analytic continuation for (z) < - σ1,\: | (z)| ≥ C > 0.