超特殊$p$-群的自同态半群与自同构轨道。

C. Kumar, S. Pradhan
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引用次数: 0

摘要

对于奇数素数$p$和正整数$n$,已知有两种特殊的$p$- p^{2n+1}$的群,第一种是指数为$p$的海森堡群,第二种是指数为$p^2$的群。本文给出了一种表示指数$p$的特殊$p$-群的新方法。这些表示提供了一种明确的方法,可以为这两种类型的特殊$p$-群$G$的任何自同构和任何自同构找到公式。在这些公式的基础上,描述了自同构半群$End(G)$和自同构群$Aut(G)$。找到了$G$中任意元素的自同构半群像,并确定了自同构群$Aut(G)$作用下的轨道。由此推导出,在$G$中元退化的概念下,当$G$为Heisenberg群时,自同构半群$End(G)$在自同构轨道上诱导出偏序,而当$G$为指数$p^2$的特殊$p$-群时,不诱导出偏序。最后证明了非简并辛空间中任意定维各向同性子空间的基数是p$中具有非负整数系数的多项式。使用这个事实,我们计算$End(G)$的基数。
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On the Endomorphism Semigroups of Extra-special $p$-groups and Automorphism Orbits.
For an odd prime $p$ and a positive integer $n$, it is well known that there are two types of extra-special $p$-groups of order $p^{2n+1}$, first one is the Heisenberg group which has exponent $p$ and the second one is of exponent $p^2$. In this article, a new way of representing the extra-special $p$-group of exponent $p^2$ is given. These representations facilitate an explicit way of finding formulae for any endomorphism and any automorphism of an extra-special $p$-group $G$ for both the types. Based on these formulae, the endomorphism semigroup $End(G)$ and the automorphism group $Aut(G)$ are described. The endomorphism semigroup image of any element in $G$ is found and the orbits under the action of the automorphism group $Aut(G)$ are determined. As a consequence it is deduced that, under the notion of degeneration of elements in $G$, the endomorphism semigroup $End(G)$ induces a partial order on the automorphism orbits when $G$ is the Heisenberg group and does not induce when $G$ is the extra-special $p$-group of exponent $p^2$. Finally we prove that the cardinality of isotropic subspaces of any fixed dimension in a non-degenerate symplectic space is a polynomial in $p$ with non-negative integer coefficients. Using this fact we compute the cardinality of $End(G)$.
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