Conjectures on the normal covering number of the finite symmetric and alternating groups

Abstract

Let γ(Sn) be the minimum number of proper subgroups Hi of the symmetric group Sn such that each element in Sn lies in some conjugate of one of the Hi. In this paper we conjecture that γ(Sn)=n2(1-1p1) (1-1p2)+2, where p1,p2 are the two smallest primes in the factorization of n and n is neither a prime power nor a product of two primes. Support for the conjecture is given by a previous result for n=p1α1p2α2, with (α1,α2)≠ (1,1). We give further evidence by confirming the conjecture for integers of the form n=15q for an infinite set of primes q, and by reporting on a Magma computation. We make a similar conjecture for γ(An), when n is even, and provide a similar amount of evidence.