On exceptional eigenvalues of the Laplacian for  <IMG WIDTH="61" HEIGHT="41" ALIGN="MIDDLE" BORDER="0" SRC="/proc/2008-136-06/S0002-9939-08-09151-X/gif-title0/img1.gif" ALT="$ \Gamma _{0}(N)$">期刊界 All Journals 搜尽天下杂志传播学术成果专业期刊搜索期刊信息化学术搜索

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On exceptional eigenvalues of the Laplacian for $\Gamma _{0}(N)$

Authors:	Xian-Jin Li

Institution:	Department of Mathematics, Brigham Young University, Provo, Utah 84602

Abstract:	An explicit Dirichlet series is obtained, which represents an analytic function of in the half-plane $\Re s>1/2$ except for having simple poles at points $s_{j}$ that correspond to exceptional eigenvalues $\lambda _{j}$ of the non-Euclidean Laplacian for Hecke congruence subgroups $\Gamma _{0}(N)$ by the relation $\lambda _{j}=s_{j}(1-s_{j})$ for $j=1,2,\cdots , S$ . Coefficients of the Dirichlet series involve all class numbers $h_{d}$ of real quadratic number fields. But, only the terms with $h_{d}\gg d^{1/2-\epsilon }$ for sufficiently large discriminants contribute to the residues $m_{j}/2$ of the Dirichlet series at the poles $s_{j}$ , where $m_{j}$ is the multiplicity of the eigenvalue $\lambda _{j}$ for $j=1,2,\cdots , S$ . This may indicate (I'm not able to prove yet) that the multiplicity of exceptional eigenvalues can be arbitrarily large. On the other hand, by density theorem the multiplicity of exceptional eigenvalues is bounded above by a constant depending only on .

Keywords:	Class numbers Hecke operators Maass wave forms real quadratic fields

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