Nilpotent covers and non-nilpotent subsets of finite groups of Lie type

Abstract

Let G be a finite group, and c an element of Z \∞\. A subgroup H of G is said to be c-nilpotent if it is nilpotent, and has nilpotency class at most c. A subset X of G is said to be non-c-nilpotent if it contains no two elements x and y such that the subgroup < x,y> is c-nilpotent. In this paper we study the quantity ωc(G), defined to be the size of the largest non-c-nilpotent subset of L. In the case that L is a finite group of Lie type, we identify covers of L by c-nilpotent subgroups, and we use these covers to construct large non-c-nilpotent sets in L. We prove that for groups L of fixed rank r, there exist constants Dr and Er such that Dr N ≤ ω∞(L) ≤ Er N, where N is the number of maximal tori in L. In the case of groups L with twisted rank 1, we provide exact formulae for ωc(L) for all c∈Z \∞\. If we write q for the level of the Frobenius endomorphism associated with L and assume that q>5, then ω∞(G) may be expressed as a polynomial in q with coefficients in \0,1\.