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引用次数: 1
摘要
摘要设𝐾和𝐷是有限群𝐺的共轭类,并设K n=D∪D -1 K^{n}=D \cup D^{-1}对于某整数n≥2 n \geq 2。在这些假设下,我们推测⟨K⟩\langle K \rangle必须是𝐺的一个(正规的)可解的子群。最近研发。Camina已经证明了这个猜想对任何n≥4 n \geq 4都是有效的,这是通过应用组合结果来完成的,其中主要涉及有限群中具有小倍的子集。在这篇笔记中,我们通过求助于其他的组合结果来解决n= 3n =3的情况,例如有限群中两个正态集积的基数的估计,以及一些最新的技术和定理。
Abstract Let 𝐾 and 𝐷 be conjugacy classes of a finite group 𝐺, and suppose that we have K n = D ∪ D - 1 K^{n}=D\cup D^{-1} for some integer n ≥ 2 n\geq 2 . Under these assumptions, it was conjectured that ⟨ K ⟩ \langle K\rangle must be a (normal) solvable subgroup of 𝐺. Recently R. D. Camina has demonstrated that the conjecture is valid for any n ≥ 4 n\geq 4 , and this is done by applying combinatorial results, the main of which concerns subsets with small doubling in a finite group. In this note, we solve the case n = 3 n=3 by appealing to other combinatorial results, such as an estimate of the cardinality of the product of two normal sets in a finite group as well as to some recent techniques and theorems.
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