Minimal Product Set in Non-Abelian Metacyclic Groups of Even Order
Abstract
Given a finite group G and positive integers r and s, a problem of interest in algebra is determining the minimum cardinality of the product set AB, where A and B are subsets of G such that |A|=r and |B|=s. This problem has been solved for the class of abelian groups; however, it remains open for finite non-abelian groups. In this paper, we prove that the result obtained for abelian groups can be extended to the class of metacyclic groups Km,n= a,b \ : \ am=1,b2n=ag,bab-1=a-1. Consequently, we provide a new proof of the result for the dihedral group Dn and dicylic group Q4n.
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