On Erdos-Ginzburg-Ziv inverse theorems for Dihedral and Dicyclic groups

Abstract

Let G be a finite group and exp(G) = lcm\ord(g) ∈ G \. A finite unordered sequence of terms from G, where repetition is allowed, is a product-one sequence if its terms can be ordered such that their product equals the identity element of G. We denote by s (G) (or E (G) respectively) the smallest integer such that every sequence of length at least has a product-one subsequence of length (G) (or |G| respectively). In this paper, we provide the exact values of s (G) and E (G) for Dihedral and Dicyclic groups and we provide explicit characterizations of all sequences of length s (G) - 1 (or E (G) - 1 respectively) having no product-one subsequence of length (G) (or |G| respectively).