关于2次的厄米爱森斯坦级数

Adrian Hauffe-Waschbusch, A. Krieg, Brandon Williams
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引用次数: 2

摘要

我们考虑了与虚二次数域$\mathbb{K}$相关的阶为$2$、权重为$K$的Hermitian-Essenstein级数$E^{(\mathbb{K})}_K$,并确定了$\mathbb{K}$对算术及其傅立叶系数增长的影响。我们发现它们满足恒等式$E^{{(\mathbb{K})}^2}_4=E^{{(\math bb{K})}_8$,这对于度为$2$的Siegel模形式是众所周知的,当且仅当$\mathbb{K}=\mathbb}Q}(\sqrt{-3})$。作为一个应用,我们证明了每当$\mathbb{K}\neq\mathbb{Q}(\sqrt{-3})$时,Eisenstein级数$E^{(\mathbb}K)}_K$,$K=4,6,8,10,12$是代数独立的。Siegel和Hermitian对Siegel半空间的限制之间的区别是Maas空间中的尖点形式,对于足够大的权重,该尖点形式不会完全消失;然而,当权重固定时,我们会看到它倾向于$0$,因为判别式倾向于$-\infty$。最后,我们证明了当$\mathbb{K}$在虚二次数域上变化时,这些形式在作为Hecke代数上的模的Maas-Spezialschar中生成尖点形式的空间。
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On Hermitian Eisenstein series of degree $2$
We consider the Hermitian Eisenstein series $E^{(\mathbb{K})}_k$ of degree $2$ and weight $k$ associated with an imaginary-quadratic number field $\mathbb{K}$ and determine the influence of $\mathbb{K}$ on the arithmetic and the growth of its Fourier coefficients. We find that they satisfy the identity $E^{{(\mathbb{K})}^2}_4 = E^{{(\mathbb{K})}}_8$, which is well-known for Siegel modular forms of degree $2$, if and only if $\mathbb{K} = \mathbb{Q} (\sqrt{-3})$. As an application, we show that the Eisenstein series $E^{(\mathbb{K})}_k$, $k=4,6,8,10,12$ are algebraically independent whenever $\mathbb{K}\neq \mathbb{Q}(\sqrt{-3})$. The difference between the Siegel and the restriction of the Hermitian to the Siegel half-space is a cusp form in the Maass space that does not vanish identically for sufficiently large weight; however, when the weight is fixed, we will see that it tends to $0$ as the discriminant tends to $-\infty$. Finally, we show that these forms generate the space of cusp forms in the Maass Spezialschar as a module over the Hecke algebra as $\mathbb{K}$ varies over imaginary-quadratic number fields.
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来源期刊
CiteScore
0.80
自引率
20.00%
发文量
14
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