论与\(Sp_{2n}(2)\)的仿射子群相关的群

IF 0.9 Q2 MATHEMATICS
D. M. Musyoka, A. L. Prins, L. N. Njuguna, L. Chikamai
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引用次数: 0

摘要

交映群 \(Sp_{2n}(2)\) 有一个仿射最大结构子群 \(ASp_n=2^{2n-1}{:}Sp_{2n-2}(2)\) ,它是\(G=Sp_{2n-2}(2)\) 的基本无边 2 群 \(N=2^{2n-1}\) 的分裂扩展。向量空间 \(N=2^{2n-1}\) 和它的对偶 \(N^{*}\) 作为 GF(2) 上的(2n-1)维 G 模块是不等价的。因此,存在一个形式为 \(\overline{G}_n=N^{*}{:}Sp_{2n-2}(2)\ncong N{:}Sp_{2n-2}(2)\) 的分裂扩展。在本文中,我们将证明:\(overline{G}_n\cong \text {Aut}(2^{2n-2}{:}Sp_{2n-2}(2))= \left( 2^{2n-2}{:}Sp_{2n-2}(2)\right) {:}2) for \(n\ge 3\).此外,我们还通过费歇尔-克利福德理论的视角研究了 \(\overline{G}_n\) 的普通不可还原字符。举例来说,费舍尔-克利福德矩阵技术被用来构造 \(\overline{G}_5)\ 群的集合 Irr\((\overline{G}_5=2^9{:}Sp_{8}(2)\) ,它与\(Sp_{10}(2)\)的仿射子群 \(ASp_5=2^9{:}Sp_{8}(2)\) 相关联。)
本文章由计算机程序翻译,如有差异,请以英文原文为准。
On groups associated with the affine subgroups of \(Sp_{2n}(2)\)

The symplectic group \(Sp_{2n}(2)\) has an affine maximal subgroup of structure \(ASp_n=2^{2n-1}{:}Sp_{2n-2}(2)\) which is a split extension of an elementary abelian 2-group \(N=2^{2n-1}\) by \(G=Sp_{2n-2}(2)\). The vector space \(N=2^{2n-1}\) and its dual \(N^{*}\) are not equivalent as \(2n-1\) dimensional G-modules over GF(2). Therefore, a split extension of the form \(\overline{G}_n=N^{*}{:}Sp_{2n-2}(2)\ncong N{:}Sp_{2n-2}(2)\) exists. In this paper, it will be shown that \(\overline{G}_n\cong \text {Aut}(2^{2n-2}{:}Sp_{2n-2}(2))= \left( 2^{2n-2}{:}Sp_{2n-2}(2)\right) {:} 2\) for \(n\ge 3\). Moreover, the ordinary irreducible characters of \(\overline{G}_n\) are studied through the lens of Fischer-Clifford theory. As an example, the Fischer-Clifford matrix technique is used to construct the set Irr\((\overline{G}_5)\) of the group \(\overline{G}_5=2^9{:}Sp_{8}(2)\) which is associated with the affine subgroup \(ASp_5=2^9{:}Sp_{8}(2)\) of \(Sp_{10}(2)\).

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来源期刊
Afrika Matematika
Afrika Matematika MATHEMATICS-
CiteScore
2.00
自引率
9.10%
发文量
96
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