Harborth Constants for Certain Classes of Metacyclic Groups

Abstract

The Harborth constant of a finite group G is the smallest integer k≥ (G) such that any subset of G of size k contains (G) distinct elements whose product is 1. Generalizing previous work on the Harborth constants of dihedral groups, we compute the Harborth constants for the metacyclic groups of the form Hn, m= x, y xn=1, y2=xm, yx=x-1y . We also solve the "inverse" problem of characterizing all smaller subsets that do not contain (Hn,m) distinct elements whose product is 1.