Spectral correspondences for rank one locally symmetric spaces: the case of exceptional parameters

Christian Arends, J. Hilgert
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引用次数: 1

Abstract

In this paper we complete the program of relating the Laplace spectrum for rank one compact locally symmetric spaces with the first band Ruelle-Pollicott resonances of the geodesic flow on its sphere bundle. This program was started by Flaminio and Forni for hyperbolic surfaces, continued by Dyatlov, Faure and Guillarmou for real hyperbolic spaces and by Guillarmou, Hilgert and Weich for general rank one spaces. Except for the case of hyperbolic surfaces a countable set of exceptional spectral parameters always left untreated since the corresponding Poisson transforms are neither injective nor surjective. We use vector valued Poisson transforms to treat also the exceptional spectral parameters. For surfaces the exceptional spectral parameters lead to discrete series representations of $\mathrm{SL}(2,\mathbb R)$. In higher dimensions the situation is more complicated, but can be described completely.
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秩一局部对称空间的谱对应:异常参数的情况
本文完成了将1阶紧致局部对称空间的拉普拉斯谱与其球束上测地流的第一带ruele - policott共振联系起来的程序。这个程序是由Flaminio和Forni开始的,用于双曲曲面,由Dyatlov, Faure和Guillarmou继续用于真正的双曲空间,由Guillarmou, Hilgert和Weich用于一般的一阶空间。除了双曲曲面外,由于相应的泊松变换既不是内射也不是满射,所以一组可计数的例外谱参数总是不加处理。我们还用向量值泊松变换来处理异常的谱参数。对于曲面,异常谱参数导致$\ mathm {SL}(2,\mathbb R)$的离散级数表示。在更高的维度,情况更复杂,但可以完全描述。
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