On the Intersection Numbers of Finite Groups

Abstract

The covering number of a nontrivial finite group G, denoted σ(G), is the smallest number of proper subgroups of G whose set-theoretic union equals G. In this article, we focus on a dual problem to that of covering numbers of groups, which involves maximal subgroups of finite groups. For a nontrivial finite group G, we define the intersection number of G, denoted (G), to be the minimum number of maximal subgroups whose intersection equals the Frattini subgroup of G. We elucidate some basic properties of this invariant, and give an exact formula for (G) when G is a nontrivial finite nilpotent group. In addition, we determine the intersection numbers of a few infinite families of non-nilpotent groups. We conclude by discussing a generalization of the intersection number of a nontrivial finite group and pose some open questions about these invariants.