关于π-根的一个Sharp Baer-Suzuki定理：Lie型群的单幂元

IF 0.4 3区数学 Q4 LOGIC Algebra and Logic Pub Date : 2024-12-21 DOI:10.1007/s10469-024-09760-3

A-M. Liu, Zh. Wang, D. O. Revin

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引用次数: 0

摘要

我们将研究下面的一个猜想，如果它成立，我们就可以对有限群的π-根（这里π是一个任意的素数集合）给出一个与Baer-Suzuki定理不可改进的类比。对于奇数素数r，如果r = 3，则m = r，如果r≥5，则m = r - 1。设L是一个简单非阿贝尔群它的阶有一个素数s使得s = r如果r除|L|和s ＆gt；否则是R。又设x是L的素阶自同构，则群\(\langle L,x\rangle \)中x的m个共轭产生一个能被s整除的阶子群。当L是李型群，x是由一个单幂元诱导的自同构时，证实了这一猜想。

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Toward a Sharp Baer–Suzuki Theorem for the π-Radical: Unipotent Elements of Groups of Lie Type

We will look into the following conjecture, which, if valid, would allow us to formulate an unimprovable analog of the Baer–Suzuki theorem for the π-radical of a finite group (here π is an arbitrary set of primes). For an odd prime number r, put m = r, if r = 3, and m = r - 1 if r ≥ 5. Let L be a simple non-Abelian group whose order has a prime divisor s such that s = r if r divides |L| and s > r otherwise. Suppose also that x is an automorphism of prime order of L. Then some m conjugates of x in the group \(\langle L,x\rangle \) generate a subgroup of order divisible by s. The conjecture is confirmed for the case where L is a group of Lie type and x is an automorphism induced by a unipotent element.

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来源期刊

Algebra and Logic 数学-数学

CiteScore

1.10

自引率

20.00%

发文量

审稿时长

>12 weeks

期刊介绍： This bimonthly journal publishes results of the latest research in the areas of modern general algebra and of logic considered primarily from an algebraic viewpoint. The algebraic papers, constituting the major part of the contents, are concerned with studies in such fields as ordered, almost torsion-free, nilpotent, and metabelian groups; isomorphism rings; Lie algebras; Frattini subgroups; and clusters of algebras. In the area of logic, the periodical covers such topics as hierarchical sets, logical automata, and recursive functions. Algebra and Logic is a translation of ALGEBRA I LOGIKA, a publication of the Siberian Fund for Algebra and Logic and the Institute of Mathematics of the Siberian Branch of the Russian Academy of Sciences. All articles are peer-reviewed.

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