A generalization of the Brauer–Fowler theorem-Reference-Cited by-同舟云学术

A generalization of the Brauer–Fowler theorem

Published:2024-03-15 Issue: Volume: Page:
ISSN:1433-5883
Container-title:Journal of Group Theory
language:en
Short-container-title:

Author:

Skresanov Saveliy V.¹

Affiliation:

1. 68572 Sobolev Institute of Mathematics , 4 Acad. Koptyug avenue , Novosibirsk , Russia

Abstract

Abstract The famous Brauer–Fowler theorem states that the order of a finite simple group can be bounded in terms of the order of the centralizer of an involution. Using the classification of finite simple groups, we generalize this theorem and prove that if a simple locally finite group has an involution which commutes with at most 𝑛 involutions, then the group is finite and its order is bounded in terms of 𝑛 only. This answers a question of Strunkov from the Kourovka notebook.

Funder

Sobolev Institute of Mathematics, Siberian Branch, Russian Academy of Sciences

Publisher

Walter de Gruyter GmbH

Link

https://www.degruyter.com/document/doi/10.1515/jgth-2024-0041/pdf

Reference15 articles.

1. M. Aschbacher and G. M. Seitz, Involutions in Chevalley groups over fields of even order, Nagoya Math. J. 63 (1976), 1–91.

2. R. Brauer and K. A. Fowler, On groups of even order, Ann. of Math. (2) 62 (1955), 565–583.

3. B. E. Durakov, On some groups of 2-rank one, Proc. Steklov Inst. Math. 313 (2021), no. 1, S54–S57.

4. D. Gorenstein, R. Lyons and R. Solomon, The Classification of the Finite Simple Groups. Number 2, Math. Surveys Monogr. 40, American Mathematical Society, Providence, 1994.

5. D. Gorenstein, R. Lyons and R. Solomon, The Classification of the Finite Simple Groups. Number 3, Math. Surveys Monogr. 40, American Mathematical Society, Providence, 1994.