English

VC dimension and a union theorem for set systems

Combinatorics 2018-10-16 v2

Abstract

Fix positive integers kk and dd. We show that, as nn\to\infty, any set system A2[n]\mathcal{A} \subset 2^{[n]} for which the VC dimension of {i=1kSiSiA}\{ \triangle_{i=1}^k S_i \mid S_i \in \mathcal{A}\} is at most dd has size at most (2dmodk+o(1))(nd/k)(2^{d\bmod{k}}+o(1))\binom{n}{\lfloor d/k\rfloor}. Here \triangle denotes the symmetric difference operator. This is a kk-fold generalisation of a result of Dvir and Moran, and it settles one of their questions. A key insight is that, by a compression method, the problem is equivalent to an extremal set theoretic problem on kk-wise intersection or union that was originally due to Erd\H{o}s and Frankl. We also give an example of a family A2[n]\mathcal{A} \subset 2^{[n]} such that the VC dimension of AA\mathcal{A}\cap \mathcal{A} and of AA\mathcal{A}\cup \mathcal{A} are both at most dd, while A=Ω(nd)\lvert \mathcal{A} \rvert = \Omega(n^d). This provides a negative answer to another question of Dvir and Moran.

Keywords

Cite

@article{arxiv.1808.02352,
  title  = {VC dimension and a union theorem for set systems},
  author = {Stijn Cambie and António Girão and Ross J. Kang},
  journal= {arXiv preprint arXiv:1808.02352},
  year   = {2018}
}

Comments

7 pages; in v2 added references to earlier work of Frankl

R2 v1 2026-06-23T03:26:47.121Z