English

Transitivity in finite general linear groups

Group Theory 2022-09-19 v1 Combinatorics

Abstract

It is known that the notion of a transitive subgroup of a permutation group GG extends naturally to subsets of GG. We consider subsets of the general linear group GL(n,q)\operatorname{GL}(n,q) acting transitively on flag-like structures, which are common generalisations of tt-dimensional subspaces of Fqn\mathbb{F}_q^n and bases of tt-dimensional subspaces of Fqn\mathbb{F}_q^n. We give structural characterisations of transitive subsets of GL(n,q)\operatorname{GL}(n,q) using the character theory of GL(n,q)\operatorname{GL}(n,q) and interprete such subsets as designs in the conjugacy class association scheme of GL(n,q)\operatorname{GL}(n,q). In particular we generalise a theorem of Perin on subgroups of GL(n,q)\operatorname{GL}(n,q) acting transitively on tt-dimensional subspaces. We survey transitive subgroups of GL(n,q)\operatorname{GL}(n,q), showing that there is no subgroup of GL(n,q)\operatorname{GL}(n,q) with 1<t<n1<t<n acting transitively on tt-dimensional subspaces unless it contains SL(n,q)\operatorname{SL}(n,q) or is one of two exceptional groups. On the other hand, for all fixed tt, we show that there exist nontrivial subsets of GL(n,q)\operatorname{GL}(n,q) that are transitive on linearly independent tt-tuples of Fqn\mathbb{F}_q^n, which also shows the existence of nontrivial subsets of GL(n,q)\operatorname{GL}(n,q) that are transitive on more general flag-like structures. We establish connections with orthogonal polynomials, namely the Al-Salam-Carlitz polynomials, and generalise a result by Rudvalis and Shinoda on the distribution of the number of fixed points of the elements in GL(n,q)\operatorname{GL}(n,q). Many of our results can be interpreted as qq-analogs of corresponding results for the symmetric group.

Keywords

Cite

@article{arxiv.2209.07927,
  title  = {Transitivity in finite general linear groups},
  author = {Alena Ernst and Kai-Uwe Schmidt},
  journal= {arXiv preprint arXiv:2209.07927},
  year   = {2022}
}

Comments

28 pages

R2 v1 2026-06-28T01:27:09.534Z