English

Dedekind's problem in the hypergrid

Combinatorics 2023-10-20 v1

Abstract

Consider the partially ordered set on [t]n:={0,,t1}n[t]^n:=\{0,\dots,t-1\}^n equipped with the natural coordinate-wise ordering. Let A(t,n)A(t,n) denote the number of antichains of this poset. The quantity A(t,n)A(t,n) has a number of combinatorial interpretations: it is precisely the number of (n1)(n-1)-dimensional partitions with entries from {0,,t}\{0,\dots,t\}, and by a result of Moshkovitz and Shapira, A(t,n)+1A(t,n)+1 is equal to the nn-color Ramsey number of monotone paths of length tt in 3-uniform hypergraphs. This has led to significant interest in the growth rate of A(t,n)A(t,n). A number of results in the literature show that log2A(t,n)=(1+o(1))α(t,n)\log_2 A(t,n)=(1+o(1))\cdot \alpha(t,n), where α(t,n)\alpha(t,n) is the width of [t]n[t]^n, and the o(1)o(1) term goes to 00 for tt fixed and nn tending to infinity. In the present paper, we prove the first bound that is close to optimal in the case where tt is arbitrarily large compared to nn, as well as improve all previous results for sufficiently large nn. In particular, we prove that there is an absolute constant cc such that for every t,n2t,n\geq 2, log2A(t,n)(1+c(logn)3n)α(t,n).\log_2 A(t,n)\leq \left(1+c\cdot \frac{(\log n)^3}{n}\right)\cdot \alpha(t,n). This resolves a conjecture of Moshkovitz and Shapira. A key ingredient in our proof is the construction of a normalized matching flow on the cover graph of the poset [t]n[t]^n in which the distribution of weights is close to uniform, a result that may be of independent interest.

Keywords

Cite

@article{arxiv.2310.12946,
  title  = {Dedekind's problem in the hypergrid},
  author = {Victor Falgas-Ravry and Eero Räty and István Tomon},
  journal= {arXiv preprint arXiv:2310.12946},
  year   = {2023}
}

Comments

28 pages + 4 page Appendix, 3 figures

R2 v1 2026-06-28T12:55:54.429Z