English

Improved bounds for zero-sum cycles in $\mathbb{Z}_p^d$

Combinatorics 2024-07-11 v1

Abstract

For a finite Abelian group (Γ,+)(\Gamma,+), let n(Γ)n(\Gamma) denote the smallest positive integer nn such that for each labelling of the arcs of the complete digraph of order nn using elements from Γ\Gamma, there exists a directed cycle such that the total sum of the arc-labels along the cycle equals 00. Alon and Krivelevich initiated the study of the parameter n()n(\cdot) on cyclic groups and proved that n(Zq)=O(qlogq)n(\mathbb{Z}_q)=O(q\log q). Studying the prototypical case when Γ=Zpd\Gamma=\mathbb{Z}_p^d is a power of a cyclic group of prime order, Letzter and Morrison recently showed that n(Zpd)O(pd(logd)2)n(\mathbb{Z}_p^d) \le O(pd(\log d)^2) and that n(Z2d)O(dlogd)n(\mathbb{Z}_2^d)\le O(d \log d). They then posed the problem of proving an (asymptotically optimal) upper bound of n(Zpd)O(pd)n(\mathbb{Z}_p^d)\le O(pd) for all primes pp and dNd \in \mathbb{N}. In this paper, we solve this problem for p=2p=2 and improve their bound for all primes p3p \ge 3 by proving n(Z2d)5dn(\mathbb{Z}_2^d)\le 5d and n(Zpd)O(pdlogd)n(\mathbb{Z}_p^d)\le O(pd\log d). While the first bound determines n(Z2d)n(\mathbb{Z}_2^d) up to a multiplicative error of 55, the second bound is tight up to a logd\log d factor. Moreover, our result shows that a tight bound of n(Zpd)=Θ(pd)n(\mathbb{Z}_p^d)=\Theta(pd) for arbitrary pp and dd would follow from a (strong form) of the well-known conjecture of Jaeger, Linial, Payan and Tarsi on additive bases in Zpd\mathbb{Z}_p^d. Along the way to proving these results, we establish a generalization of a hypergraph matching result by Haxell in a matroidal setting. Concretely, we obtain sufficient conditions for the existence of matchings in a hypergraph whose hyperedges are labelled by the elements of a matroid, with the property that the edges in the matching induce a basis of the matroid. We believe that these statements are of independent interest.

Keywords

Cite

@article{arxiv.2407.07644,
  title  = {Improved bounds for zero-sum cycles in $\mathbb{Z}_p^d$},
  author = {Micha Christoph and Charlotte Knierim and Anders Martinsson and Raphael Steiner},
  journal= {arXiv preprint arXiv:2407.07644},
  year   = {2024}
}

Comments

6 Pages

R2 v1 2026-06-28T17:35:42.116Z