Sp(4) 和 Sp(6) 中的薄单色性

Pub Date : 2024-10-11 DOI:10.1016/j.jalgebra.2024.09.022
Jitendra Bajpai , Daniele Dona , Martin Nitsche
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引用次数: 0

摘要

我们采用计算机辅助乒乓球的新方法,探索了 Sp(4) 和 Sp(6) 型超几何群的稀疏性。我们证明了 Sp(6) 中 17 个具有最大单势单色性的超几何群的稀疏性,完成了所有 40 个此类群的算术稀疏性分类。此外,我们还建立了 Sp(6) 中另外 46 个超几何群和 Sp(4) 中 3 个超几何群的稀疏性,完成了所有 Sp(4) 超几何群的分类。据我们所知,这篇文章在实秩为三的扎里斯基密集非算术超几何单色群的旋光族中首次提出了 63 个例子。
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Thin monodromy in Sp(4) and Sp(6)
We explore the thinness of hypergeometric groups of type Sp(4) and Sp(6) by applying a new approach of computer-assisted ping-pong. We prove the thinness of 17 hypergeometric groups with maximally unipotent monodromy in Sp(6), completing the classification of all 40 such groups into arithmetic and thin cases.
In addition, we establish the thinness of an additional 46 hypergeometric groups in Sp(6), and of three hypergeometric groups in Sp(4), completing the classification of all Sp(4) hypergeometric groups. To the best of our knowledge, this article produces the first 63 examples in the cyclotomic family of Zariski dense non-arithmetic hypergeometric monodromy groups of real rank three.
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