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引用次数: 0
摘要
我们证明了$\rm{GSp}_4$上自形形的加权萨托-塔特定律,该定律是关于水平趋于无穷大的一般同余子群$H$的。当水平无平方时,我们将结果细化为尖顶谱。其要素是$\rm{GSp}_4$库兹涅佐夫公式和$\rm{GSp}_4$爱森斯坦级数的维特克系数所涉及的局部积分的显式计算。我们还讨论了在水平方面约束连续谱的问题如何自然地引出一些组合问题,这些问题涉及每个抛物线子群 $P$ 的 $P\backslash G / H$ 中的双余弦。
A weighted vertical Sato-Tate law for Maaß forms on $\rm{GSp}_4$
We prove a weighted Sato-Tate law for the Satake parameters of automorphic
forms on $\rm{GSp}_4$ with respect to a fairly general congruence subgroup $H$
whose level tends to infinity. When the level is squarefree we refine our
result to the cuspidal spectrum. The ingredients are the $\rm{GSp}_4$ Kuznetsov
formula and the explicit calculation of local integrals involved in the
Whittaker coefficients of $\rm{GSp}_4$ Eisenstein series. We also discuss how
the problem of bounding the continuous spectrum in the level aspect naturally
leads to some combinatorial questions involving the double cosets in $P
\backslash G / H$, for each parabolic subgroup $P$.
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