Abelian coverings of finite general linear groups and an application to their non-commuting graph

Abstract

In this paper we introduce and study a family An(q) of abelian subgroups of n(q) covering every element of n(q). We show that An(q) contains all the centralisers of cyclic matrices and equality holds if q>n. Also, for q>2, we prove a simple closed formula for the size of An(q) and give an upper bound if q=2. A subset X of a finite group G is said to be pairwise non-commuting if xy=yx, for distinct elements x, y in X. As an application of our results on An(q), we prove lower and upper bounds for the maximum size of a pairwise non-commuting subset of n(q). (This is the clique number of the non-commuting graph.) Moreover, in the case where q>n, we give an explicit formula for the maximum size of a pairwise non-commuting set.