The Covering Numbers of the McLaughlin Group and some Primitive Groups of Low Degree

Abstract

A finite cover of a group G is a finite collection C of proper subgroups of G with the property that C = G. A finite group admits a finite cover if and only if it is noncyclic. More generally, it is known that a group admits a finite cover if and only if it has a finite, noncyclic homomorphic image. If C is a finite cover of a group G, and no cover of G with fewer subgroups exists, then C is said to be a minimal cover of G, and the cardinality of C is called the covering number of G, denoted by σ(G). Here we investigate the covering numbers of the McLaughlin sporadic simple group and some low degree primitive groups.