A characterization of nilpotent bicyclic groups

Abstract

A group is called (m,n)-bicyclic if it can be expressed as a product of two cyclic subgroups of orders m and n, respectively. The classification and characterization of finite bicyclic groups have long been important problems in group theory, with applications extending to symmetric embeddings of the complete bipartite graphs. A classical result by Douglas establishes that every bicyclic group is supersolvable. More recently, Fan and Li (2018) proved that every finite (m,n)-bicyclic group is abelian if and only if (m,φ(n))=(n,φ(m))=1, where φ is Euler's totient function. In this paper we generalize this result further and show that every (m,n)-bicyclic group is nilpotent if and only if (n,φ(rad(m)))=(m,φ(rad(n)))=1, where rad(m) denotes the radical of m (the product of its distinct prime divisors).