中文

Sharp Lower Bounds for Sumsets in Hypercubes

组合数学 2026-07-01 v1 经典分析与常微分方程 度量几何

摘要

We prove a sharp lower bound for the cardinality of sumsets of subsets of Zd\mathbb{Z}^d confined to a hypercube, resolving in strong form a conjecture that was made explicit by Becker, Ivanisvili, Krachun and Madrid and had circulated in the folklore of the field for some time. Specifically, for sets Aj{0,1,2,,m}dA_j\subseteq \{0,1,2,\dots,m\}^d we show that A1++An    (A1An)1/p,p=nlog(m+1)log(nm+1),|A_1+\dots+A_n|\;\geq\; (|A_1|\cdots|A_n|)^{1/p},\qquad p=\frac{n\log(m+1)}{\log(nm+1)}, with the exponent best possible. The only previously known sharp cases were Aj{0,1}dA_j\subseteq \{0,1\}^d, for all n1n\ge1, and Aj{0,1,2}dA_j\subseteq \{0,1,2\}^d for n=2n=2. We also prove a sharp inequality in the case when Aj{0,1,,mj}dA_j\subseteq\{0,1,\dots,m_j\}^d for different mjm_j. We obtain the above inequality as a corollary of a stronger result on sup-convolution of functions on Zd\mathbb{Z}^d, whose proof is based on a novel mixed volume representation of a lattice path norm, together with a sharp one-dimensional functional inequality.

引用

@article{arxiv.2607.01458,
  title  = {Sharp Lower Bounds for Sumsets in Hypercubes},
  author = {Felipe Gonçalves and Danylo Radchenko},
  journal= {arXiv preprint arXiv:2607.01458},
  year   = {2026}
}

备注

21 pages, 3 figures