English

Powers in finite orthogonal and symplectic groups: A generating function approach

Group Theory 2022-08-19 v2 Combinatorics

Abstract

For an integer M2M\geq 2 and a finite group GG, an element αG\alpha\in G is called an MM-th power if it satisfies AM=αA^M=\alpha for some AGA\in G. In this article, we will deal with the case when GG is finite symplectic or orthogonal group over a field of order qq. We introduce the notion of MM^*-power SRIM polynomials. This, amalgamated with the concept of MM-power polynomial, we provide the complete classification of the conjugacy classes of regular semisimple, semisimple, cyclic and regular elements in GG, which are MM-th powers, when (M,q)=1(M,q)=1. The approach here is of generating functions, as worked on by Jason Fulman, Peter M. Neumann, and Cheryl Praeger in the memoir "A generating function approach to the enumeration of matrices in classical groups over finite fields". As a byproduct, we obtain the corresponding probabilities, in terms of generating functions.

Keywords

Cite

@article{arxiv.2202.11513,
  title  = {Powers in finite orthogonal and symplectic groups: A generating function approach},
  author = {Saikat Panja and Anupam Singh},
  journal= {arXiv preprint arXiv:2202.11513},
  year   = {2022}
}

Comments

Several changes have been implemented. Some results have been removed. Contains an improved introduction and concluding remarks. Almost the final version of the paper

R2 v1 2026-06-24T09:51:10.300Z