$${text {Sp}}_4({\mathbb {R}})$$ 中的薄超几何单色群的一个环族

Pub Date : 2024-02-19 DOI:10.1007/s10711-024-00893-4

Simion Filip, Charles Fougeron

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摘要

我们展示了一个无穷的离散子群族，这些子群具有许多显著的性质：({{\,\mathrm{textbf{Sp}}\,}}_4(\mathbb {R})\)。我们的结果是通过证明每个群在一组适当的锥上打乒乓球而建立起来的。对于任意整数（N\ge 4\），这些群都是超几何微分方程的单romy，其参数为：$\left(\tfrac{N-3}{2N},\tfrac{N-1}{2N},\tfrac{N+1}{2N},\tfrac{N+3}{2N}right) $在无穷远处，最大单势单romy在零处。此外，我们将用于乒乓球的圆锥与弯曲表面联系起来，然后用它们来展示拉格朗日格拉斯曼中单色群的不连续域。这些不连续域导致了霍奇数为（1，1，1，1）的霍奇结构变化的统一化。

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A cyclotomic family of thin hypergeometric monodromy groups in $${\text {Sp}}_4({\mathbb {R}})$$

We exhibit an infinite family of discrete subgroups of ${{\,\mathrm{\textbf{Sp}}\,}}_4(\mathbb {R})$ which have a number of remarkable properties. Our results are established by showing that each group plays ping-pong on an appropriate set of cones. The groups arise as the monodromy of hypergeometric differential equations with parameters $\left( \tfrac{N-3}{2N},\tfrac{N-1}{2N}, \tfrac{N+1}{2N}, \tfrac{N+3}{2N}\right) $ at infinity and maximal unipotent monodromy at zero, for any integer $N\ge 4$. Additionally, we relate the cones used for ping-pong in $\mathbb {R}^4$ with crooked surfaces, which we then use to exhibit domains of discontinuity for the monodromy groups in the Lagrangian Grassmannian. These domains of discontinuity lead to uniformizations of variations of Hodge structure with Hodge numbers (1, 1, 1, 1).

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