Complete factorizations of finite groups

Abstract

Let G be a group. The subsets A1,…,Ak of G form a complete factorization of group G if if they are pairwise disjoint and each element g∈ G is uniquely represented as g=a1… ak, with ai∈ Ai. We prove the following theorem: Let G be a finite nilpotent group. If |G|=m1… mk where m1,…,mk are integers greater 1 and k≥3, then there exist subsets A1,…,Ak of G which form a complete factorization of group G and |Ai|=mi for all i=1,2,…,k. In addition, we give several examples of building complete factorization for some groups and formulate one open question.

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