Improved fractal Weyl bounds for convex cocompact hyperbolic surfaces and large resonance-free regions

Abstract

Let X be a convex cocompact hyperbolic surface, and let δ denote the Hausdorff dimension of its limit set. Let NX(σ,T) denote the number of resonances of X inside the box [σ, δ] + i[0,T]. We prove that for all σ > δ/2, we have \[ NX(σ,T) ε T1 + δ - 2(2σ - δ) + ε. \] This strengthens the previously established "improved" fractal Weyl bounds due to Naud Naud14 and Dyatlov Dya19. Moreover, this result implies that for every ε > 0, there exist resonance-free rectangular boxes of arbitrary height within the strip \[ \\, s ∈ C : 34δ + ε < Re(s) < δ\, \. \] Our proof combines Naud's approach Naud14 with the refined transfer operator machinery developed by Dyatlov-Zworski DyZw18, as well as a new estimate for oscillatory integrals that arise naturally in our analysis.