分形Weyl界与Hecke三角群

Fr'ed'eric Naud, A. Pohl, Louis Soares
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引用次数: 6

摘要

设$\Gamma_{w}$为顶点宽度为$w>2$的非有限Hecke三角群,设$\varrho\colon\Gamma_w\to U(V)$为$\Gamma_w$的有限维酉表示。在这篇笔记中,我们宣布了一个新的分形上界,用于$\Gamma_{w}$被$\varrho$扭曲的Selberg zeta函数。在平行于虚轴并远离实轴的条形中,Selberg zeta函数以$\exp\left( C_{\varepsilon} \vert s\vert^{\delta + \varepsilon} \right)$为界,其中$\delta = \delta_{w}$表示$\Gamma_{w}$的极限集的Hausdorff维数。这个界意味着分形Weyl界在所有几何有限曲面$X=\widetilde{\Gamma}\backslash\mathbb{H}$的拉普拉斯共振上,其中$\widetilde{\Gamma}$是$\Gamma_w$的一个有限指标,无扭转子群。
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Fractal Weyl bounds and Hecke triangle groups
Let $\Gamma_{w}$ be a non-cofinite Hecke triangle group with cusp width $w>2$ and let $\varrho\colon\Gamma_w\to U(V)$ be a finite-dimensional unitary representation of $\Gamma_w$. In this note we announce a new fractal upper bound for the Selberg zeta function of $\Gamma_{w}$ twisted by $\varrho$. In strips parallel to the imaginary axis and bounded away from the real axis, the Selberg zeta function is bounded by $\exp\left( C_{\varepsilon} \vert s\vert^{\delta + \varepsilon} \right)$, where $\delta = \delta_{w}$ denotes the Hausdorff dimension of the limit set of $\Gamma_{w}$. This bound implies fractal Weyl bounds on the resonances of the Laplacian for all geometrically finite surfaces $X=\widetilde{\Gamma}\backslash\mathbb{H}$ where $\widetilde{\Gamma}$ is a finite index, torsion-free subgroup of $\Gamma_w$.
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来源期刊
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0.90
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期刊介绍: Electronic Research Archive (ERA), formerly known as Electronic Research Announcements in Mathematical Sciences, rapidly publishes original and expository full-length articles of significant advances in all branches of mathematics. All articles should be designed to communicate their contents to a broad mathematical audience and must meet high standards for mathematical content and clarity. After review and acceptance, articles enter production for immediate publication. ERA is the continuation of Electronic Research Announcements of the AMS published by the American Mathematical Society, 1995—2007
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