English

The Generalized Makeev Problem Revisited

Combinatorics 2024-03-12 v3 Metric Geometry

Abstract

Based on a result of Makeev, in 2012 Blagojevi\'c and Karasev proposed the following problem: given any positive integers mm and 1k1\leq \ell\leq k, find the minimum dimension d=Δ(m;/k)d=\Delta(m;\ell/k) such that for any mm mass distributions on Rd\mathbb{R}^d, there exist kk hyperplanes, any \ell of which equipartition each mass. The =k\ell=k case is a central question in geometric and topological combinatorics which remains open except for few values of mm and kk. For <k\ell< k and arbitrary mm, we establish new upper bounds on Δ(m;/k)\Delta(m;\ell/k) when (1) =2\ell=2 and kk is arbitrary and (2) =3\ell=3 and k=4k=4. When =k1\ell=k-1 and m+1m+1 is a power of two these bounds are nearly optimal and are exponentially smaller than the current best upper bounds when =k\ell=k. Similar remarks apply to our upper bounds when the hyperplanes are prescribed to be pairwise orthogonal. Lastly, we provide transversal extensions of our results along the lines recently established by Frick et al.: given mm families of compact convex sets in Rd\mathbb{R}^d such that no 22^\ell members of any family are pairwise disjoint, we show that every member of each family is pierced by the union of any \ell of some collection of kk hyperplanes.

Keywords

Cite

@article{arxiv.2305.03818,
  title  = {The Generalized Makeev Problem Revisited},
  author = {Andres Mejia and Steven Simon and Jialin Zhang},
  journal= {arXiv preprint arXiv:2305.03818},
  year   = {2024}
}

Comments

17 pages. Final version, corrects typos

R2 v1 2026-06-28T10:27:21.717Z