English

Two remarks on even and oddtown problems

Combinatorics 2016-10-26 v1

Abstract

A family A\mathcal A of subsets of an nn-element set is called an eventown (resp. oddtown) if all its sets have even (resp. odd) size and all pairwise intersections have even size. Using tools from linear algebra, it was shown by Berlekamp and Graver that the maximum size of an eventown is 2n/22^{\left\lfloor n/2\right\rfloor}. On the other hand (somewhat surprisingly), it was proven by Berlekamp, that oddtowns have size at most nn. Over the last four decades, many extensions of this even/oddtown problem have been studied. In this paper we present new results on two such extensions. First, extending a result of Vu, we show that a kk-wise eventown (i.e., intersections of kk sets are even) has for k3k \geq 3 a unique extremal configuration and obtain a stability result for this problem. Next we improve some known bounds for the defect version of an \ell-oddtown problem. In this problem we consider sets of size ≢0(mod)\not\equiv 0 \pmod \ell where \ell is a prime number \ell (not necessarily 22) and allow a few pairwise intersections to also have size ≢0(mod)\not\equiv 0 \pmod \ell.

Keywords

Cite

@article{arxiv.1610.07907,
  title  = {Two remarks on even and oddtown problems},
  author = {Benny Sudakov and Pedro Vieira},
  journal= {arXiv preprint arXiv:1610.07907},
  year   = {2016}
}

Comments

18 pages

R2 v1 2026-06-22T16:31:08.531Z