Transitivity in finite general linear groups

Abstract

It is known that the notion of a transitive subgroup of a permutation group G extends naturally to subsets of G. We consider subsets of the general linear group GL(n,q) acting transitively on flag-like structures, which are common generalisations of t-dimensional subspaces of Fqn and bases of t-dimensional subspaces of Fqn. We give structural characterisations of transitive subsets of GL(n,q) using the character theory of GL(n,q) and interprete such subsets as designs in the conjugacy class association scheme of GL(n,q). In particular we generalise a theorem of Perin on subgroups of GL(n,q) acting transitively on t-dimensional subspaces. We survey transitive subgroups of GL(n,q), showing that there is no subgroup of GL(n,q) with 1<t<n acting transitively on t-dimensional subspaces unless it contains SL(n,q) or is one of two exceptional groups. On the other hand, for all fixed t, we show that there exist nontrivial subsets of GL(n,q) that are transitive on linearly independent t-tuples of Fqn, which also shows the existence of nontrivial subsets of 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). Many of our results can be interpreted as q-analogs of corresponding results for the symmetric group.