English

A Tighter Relation Between Hereditary Discrepancy and Determinant Lower Bound

Data Structures and Algorithms 2021-11-03 v2

Abstract

In seminal work, Lov\'asz, Spencer, and Vesztergombi [European J. Combin., 1986] proved a lower bound for the hereditary discrepancy of a matrix ARm×nA \in \mathbb{R}^{m \times n} in terms of the maximum det(B)1/k|\det(B)|^{1/k} over all k×kk \times k submatrices BB of AA. We show algorithmically that this determinant lower bound can be off by at most a factor of O(log(m)log(n))O(\sqrt{\log (m) \cdot \log (n)}), improving over the previous bound of O(log(mn)log(n))O(\log(mn) \cdot \sqrt{\log (n)}) given by Matou\v{s}ek [Proc. of the AMS, 2013]. Our result immediately implies herdisc(F1F2)O(log(m)log(n))max(herdisc(F1),herdisc(F2))\mathrm{herdisc}(\mathcal{F}_1 \cup \mathcal{F}_2) \leq O(\sqrt{\log (m) \cdot \log (n)}) \cdot \max(\mathrm{herdisc}(\mathcal{F}_1), \mathrm{herdisc}(\mathcal{F}_2)), for any two set systems F1,F2\mathcal{F}_1, \mathcal{F}_2 over [n][n] satisfying F1F2=m|\mathcal{F}_1 \cup \mathcal{F}_2| = m. Our bounds are tight up to constants when m=O(poly(n))m = O(\mathrm{poly}(n)) due to a construction of P\'alv\"olgyi [Discrete Comput. Geom., 2010] or the counterexample to Beck's three permutation conjecture by Newman, Neiman and Nikolov [FOCS, 2012].

Keywords

Cite

@article{arxiv.2108.07945,
  title  = {A Tighter Relation Between Hereditary Discrepancy and Determinant Lower Bound},
  author = {Haotian Jiang and Victor Reis},
  journal= {arXiv preprint arXiv:2108.07945},
  year   = {2021}
}

Comments

To appear in SOSA 2022. 8 pages

R2 v1 2026-06-24T05:12:35.079Z