Weighted Davenport’s constant and the weighted EGZ Theorem |
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| Authors: | Xiangneng Zeng Pingzhi Yuan |
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| Affiliation: | aDepartment of Mathematics, Sun Yat-Sen University, Guangzhou 510275, PR China;bSchool of Mathematics, South China Normal University, Guangzhou 510631, PR China |
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| Abstract: | Let G∗,G be finite abelian groups with nontrivial homomorphism group  . Let Ψ be a non-empty subset of  . Let DΨ(G) denote the minimal integer, such that any sequence over G∗ of length DΨ(G) must contain a nontrivial subsequence s1,…,sr, such that  for some ψi∈Ψ. Let EΨ(G) denote the minimal integer such that any sequence over G∗ of length EΨ(G) must contain a nontrivial subsequence of length |G|,s1,…,s|G|, such that  for some ψi∈Ψ. In this paper, we show that EΨ(G)=|G|+DΨ(G)−1. |
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| Keywords: | Zero-sum problems Weighted Davenport&rsquo s constant Weighted EGZ Theorem Setpartition |
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