Factorizations of groups of small order

Abstract

Let G be a finite group and let A1,…,Ak be a collection of subsets of G such that G=A1… Ak is the product of all the Ai's with |G|=|A1|…|Ak|. We write G=A1·…· Ak and call this a k-fold factorization of G of the form (|A1|,…,|Ak|) or more briefly an (|A1|,…,|Ak|)-factorization of G. Let k≥2 be a fixed integer. If G has an (a1,…,ak)-factorization, whenever |G|=a1… ak with ai>1, i=1,…,k, we say that G is k-factorizable. We say that G is multifold-factorizable if G is k-factorizable for any possible integer k≥2. In this paper we prove that there are exactly 6 non-multifold-factorizable groups among the groups of order at most 60. Here is their complete list: A4, (C2× C2) C9, A4× C3, (C2× C2× C2) C7, A5, A4× C5. Some related open questions are presented.