Disjoint zero-sum subsets in Abelian groups and its application -- survey

Abstract

We provide a summary of research on disjoint zero-sum subsets in finite Abelian groups, which is a branch of additive group theory and combinatorial number theory. An orthomorphism of a group is defined as a bijection such that the mapping g g-1(g) is also bijective. In 1981, Friedlander, Gordon, and Tannenbaum conjectured that when is Abelian, for any k ≥ 2 dividing || -1, there exists an orthomorphism of fixing the identity and permuting the remaining elements as products of disjoint k-cycles. Using the idea of disjoint-zero sum subset we provide a solution of this conjecture for k=3 and || 424. We also present some applications of zero-sum sets in graph labeling.

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