Invariance of the Schur multiplier, the Bogomolov multiplier and the minimal number of generators under a variant of isoclinism

Pub Date : 2023-11-27 DOI:10.1515/jgth-2023-0066

Ammu E. Antony, Sathasivam Kalithasan, Viji Z. Thomas

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引用次数: 0

Abstract

We introduce the 𝑞-Bogomolov multiplier as a generalization of the Bogomolov multiplier, and we prove that it is invariant under 𝑞-isoclinism. We prove that the 𝑞-Schur multiplier is invariant under 𝑞-exterior isoclinism, and as an easy consequence, we prove that the Schur multiplier is invariant under exterior isoclinism. We also prove that if 𝐺 and 𝐻 are 𝑝-groups with G / Z ∧ ⁢ ( G ) ≅ H / Z ∧ ⁢ ( H )

G/Z^{\wedge}(G)\cong H/Z^{\wedge}(H)

, then the cardinalities of the minimal number of generators of 𝐺 and 𝐻 are the same. Moreover, we prove some structural results about non-abelian 𝑞-tensor square of groups.

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Schur乘法器、Bogomolov乘法器和最小发生器数在等斜变型下的不变性

引入了𝑞-Bogomolov乘子作为Bogomolov乘子的推广，并证明了它在𝑞-isoclinism下是不变的。我们证明了𝑞-Schur乘子在𝑞-exterior等斜下是不变的，作为一个简单的结果，我们证明了Schur乘子在外等斜下是不变的。我们还证明了如果𝐺和𝐻是𝑝-groups with G/Z∧∧(G) = H/Z∧∧(H) G/Z^{\wedge}(G)\cong H/Z^{\wedge}(H)，则𝐺和𝐻的最小生成器数的基数是相同的。此外，我们还证明了群的非阿贝尔𝑞-tensor平方的一些结构结果。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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