On zero-sum problems over metacyclic groups Cn s C2
Abstract
Let G be a finite group. A finite collection of elements from G, where the order is disregarded and repetitions are allowed, is said to be a product-one sequence if its elements can be ordered such that their product in G equals the identity element of G. Then, the Gao's constant E (G) of G is the smallest integer such that every sequence of length at least has a product-one subsequence of length |G|. For a positive integer n, we denote by Cn a cyclic group of order n. Let G = Cn s C2 with s2 1 n be a metacyclic group. The direct and inverse problems of E (G) were settled recently, except for the case that G=C3n2s C2 with n2≠ 1, (n2,6)=1, s -1 3, and s 1 n2. In this paper, we complete the remaining case and hence for all metacyclic groups of the form G=Cn C2, the Gao's constant and the associated inverse problem are now fully settled (see Theorem 1.2).
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