ON THE INDEX-CONJECTURE OF LENGTH FOUR MINIMAL ZERO-SUM SEQUENCES II
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Publication:5408827
DOI10.1142/S179304211350111XzbMath1303.11024arXiv1401.7981OpenAlexW2139368414WikidataQ123316823 ScholiaQ123316823MaRDI QIDQ5408827
Publication date: 11 April 2014
Published in: International Journal of Number Theory (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1401.7981
Finite abelian groups (20K01) Sequences (mod (m)) (11B50) Arithmetic combinatorics; higher degree uniformity (11B30)
Related Items
On the structure of n-zero-sum free sequences over cyclic groups of order n ⋮ The index of small length sequences ⋮ Solution to the index conjecture in zero-sum theory ⋮ On the index conjecture in zero-sum theory: Singular case
Cites Work
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- Combinatorial number theory and additive group theory. With a foreword by Javier Cilleruelo, Marc Noy and Oriol Serra (Coordinators of the DocCourse)
- Indexes of unsplittable minimal zero-sum sequences of length \(I(C_n)-1\)
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- Structural additive theory. Based on courses given at Karl-Franzens-Universität Graz, Austria, 2008--2012
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- ON THE INDEX-CONJECTURE ON LENGTH FOUR MINIMAL ZERO-SUM SEQUENCES
- MINIMAL ZERO-SUM SEQUENCES OF LENGTH FOUR OVER FINITE CYCLIC GROUPS II
- On the index of sequences over cyclic groups
- REPRESENTATIONS OF INTEGERS BY THE FORM x2 + xy + y2 + z2 + zt + t2
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