On the number of fully weighted zero-sum subsequences
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Publication:5380763
DOI10.1142/S179304211950057XzbMath1459.11073arXiv1811.03890WikidataQ128845979 ScholiaQ128845979MaRDI QIDQ5380763
B. K. Moriya, Abílio Lemos, Allan de Oliveira Moura, Anderson Silva
Publication date: 6 June 2019
Published in: International Journal of Number Theory (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1811.03890
Cites Work
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- On the number of subsequences with a given sum in a finite abelian group
- Contributions to zero-sum problems
- On the number of zero-sum subsequences
- Two theorems on the addition of residue classes
- Representation of finite abelian group elements by subsequence sums
- On the number of subsequences with given sum
- On the number of zero sum subsequences
- An addition theorem and maximal zero-sum free sets in \(\mathbb{Z}/p\mathbb{Z}\)
- On the number of subsequences with given sum of sequences over finite abelian \(p\)-groups
- A combinatorial problem on finite Abelian groups. II
- A combinatorial problem on finite Abelian groups. I
- Remarks on the plus–minus weighted Davenport constant
- On the Number of Zero-Sum Subsequences of Restricted Size
- The number of zero sums modulo m in a sequence of length n
- On the number of m-term zero-sum subsequences
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