| Article ID | Journal | Published Year | Pages | File Type |
|---|---|---|---|---|
| 4655381 | Journal of Combinatorial Theory, Series A | 2014 | 14 Pages |
Abstract
Let G be an additive finite abelian group of exponent exp(G)exp(G). For every positive integer k , let skexp(G)(G)skexp(G)(G) denote the smallest integer t such that every sequence over G of length t contains a zero-sum subsequence of length kexp(G)kexp(G). We prove that if exp(G)exp(G) is sufficiently larger than |G|exp(G) then skexp(G)(G)=kexp(G)+D(G)−1skexp(G)(G)=kexp(G)+D(G)−1 for all k⩾2k⩾2, where D(G)D(G) is the Davenport constant of G.
Keywords
Related Topics
Physical Sciences and Engineering
Mathematics
Discrete Mathematics and Combinatorics
Authors
Weidong Gao, Dongchun Han, Jiangtao Peng, Fang Sun,