Fractal uncertainty for transfer operators
Abstract
We show directly that the fractal uncertainty principle of Bourgain-Dyatlov [arXiv:1612.09040] implies that there exists σ > 0 for which the Selberg zeta function for a convex co-compact hyperbolic surface has only finitely many zeros with s ≥ 12 - σ. That eliminates advanced microlocal techniques of Dyatlov-Zahl [arXiv:1504.06589] though we stress that these techniques are still needed for resolvent bounds and for possible generalizations to the case of non-constant curvature.
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