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 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 we show that with the exponent best possible. The only previously known sharp cases were , for all , and for . We also prove a sharp inequality in the case when for different . We obtain the above inequality as a corollary of a stronger result on sup-convolution of functions on , 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