Integer group determinants of order 16

Yuka Yamaguchi, Naoya Yamaguchi
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Abstract

Let \(\textrm{C}_{n}\) and \(\textrm{Q}_{n}\) denote the cyclic group and the generalized quaternion group of order n, respectively. We determine all possible values of the integer group determinants of \(\textrm{C}_{8} \rtimes _{3} \textrm{C}_{2}\) and \(\textrm{Q}_{8} \rtimes \textrm{C}_{2}\), which are the unresolved groups of order 16 (Serrano, Paudel and Pinner also obtained a complete description of the integer group determinants of \(\textrm{Q}_{8} \rtimes \textrm{C}_{2}\) independently of this paper and presented it a few days earlier than this paper). Also, we give a diagram of the set inclusion relations between the integer group determinants for all groups of order 16

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16 阶整数组行列式
让 \(\textrm{C}_{n}\) 和 \(\textrm{Q}_{n}\) 分别表示阶数为 n 的循环群和广义四元数群。我们确定了 \(\textrm{C}_{8} \rtimes _{3} \textrm{C}_{2}\) 和 \(\textrm{Q}_{8} \rtimes \textrm{C}_{2}\)的整群行列式的所有可能值,它们是阶数为 16 的未解群(Serrano、Paudel 和 Pinner 也在本文之外得到了关于 \(\textrm{Q}_{8} \rtimes \textrm{C}_{2}\) 的整数群行列式的完整描述,并且比本文早几天发表)。此外,我们还给出了所有阶为 16 的整数群行列式之间的集合包含关系图。
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On the periods of twisted moments of the Kloosterman connection Ramanujan’s missing hyperelliptic inversion formula A q-analog of the Stirling–Eulerian Polynomials Integer group determinants of order 16 Diophantine approximation with prime denominator in quadratic number fields under GRH
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