Improved fractal Weyl bounds for hyperbolic manifolds

Abstract

We give a new fractal Weyl upper bound for resonances of convex co-compact hyperbolic manifolds in terms of the dimension n of the manifold and the dimension δ of its limit set. More precisely, we show that as R∞, the number of resonances in the box [R,R+1]+i[-β,0] is O(Rm(β,δ)+), where the exponent m(β,δ)=(2δ+2β+1-n,δ) changes its behavior at β=(n-1-δ)/2. In the case δ<(n-1)/2, we also give an improved resolvent upper bound in the standard resonance free strip \Im\ λ\ > δ-(n-1)/2\. Both results use the fractal uncertainty principle point of view recently introduced in [arXiv:1504.06589]. The appendix presents numerical evidence for the Weyl upper bound.