English

Generating functions for the powers in $\text{GL}(n,q)$

Group Theory 2024-04-04 v2 Combinatorics

Abstract

Consider the set of all powers GL(n,q)M={xMxGL(n,q)}\text{GL}(n ,q)^M = \{x^M \mid x\in \text{GL}(n, q)\} for an integer M2M\geq 2. In this article, we aim to enumerate the regular, regular semisimple and semisimple elements as well as conjugacy classes in the set GL(n,q)M\text{GL}(n, q)^M, i.e., the elements or classes of these kinds which are MthM^{th} powers. We get the generating functions for (i) regular and regular semisimple elements (and classes) when (q,M)=1(q,M)=1, (ii) for semisimple elements and all elements (and classes) when MM is a prime power and (q,M)=1(q,M)=1, and (iii) for all kinds when MM is a prime and qq is a power of MM.

Keywords

Cite

@article{arxiv.2003.14057,
  title  = {Generating functions for the powers in $\text{GL}(n,q)$},
  author = {Rijubrata Kundu and Anupam Singh},
  journal= {arXiv preprint arXiv:2003.14057},
  year   = {2024}
}
R2 v1 2026-06-23T14:33:25.606Z