English

Fractal Weyl bounds and Hecke triangle groups

Spectral Theory 2018-10-11 v1

Abstract

Let Γw\Gamma_{w} be a non-cofinite Hecke triangle group with cusp width w>2w>2 and let ϱ ⁣:ΓwU(V)\varrho\colon\Gamma_w\to U(V) be a finite-dimensional unitary representation of Γw\Gamma_w. In this note we announce a new fractal upper bound for the Selberg zeta function of Γw\Gamma_{w} twisted by ϱ\varrho. In strips parallel to the imaginary axis and bounded away from the real axis, the Selberg zeta function is bounded by exp(Cεsδ+ε)\exp\left( C_{\varepsilon} \vert s\vert^{\delta + \varepsilon} \right), where δ=δw\delta = \delta_{w} denotes the Hausdorff dimension of the limit set of Γw\Gamma_{w}. This bound implies fractal Weyl bounds on the resonances of the Laplacian for all geometrically finite surfaces X=Γ~\HX=\widetilde{\Gamma}\backslash\mathbb{H} where Γ~\widetilde{\Gamma} is a finite index, torsion-free subgroup of Γw\Gamma_w.

Keywords

Cite

@article{arxiv.1810.04489,
  title  = {Fractal Weyl bounds and Hecke triangle groups},
  author = {Frederic Naud and Anke Pohl and Louis Soares},
  journal= {arXiv preprint arXiv:1810.04489},
  year   = {2018}
}

Comments

10 pages, 1 figure

R2 v1 2026-06-23T04:34:45.222Z