English

On non-empty cross-intersecting families

Combinatorics 2020-10-08 v2

Abstract

Let 2[n]2^{[n]} and ([n]i)\binom{[n]}{i} be the power set and the class of all ii-subsets of {1,2,,n}\{1,2,\cdots,n\}, respectively. We call two families A\mathscr{A} and B\mathscr{B} cross-intersecting if ABA\cap B\neq \emptyset for any AAA\in \mathscr{A} and BBB\in \mathscr{B}. In this paper we show that, for nk+l,lr1,c>0n\geq k+l,l\geq r\geq 1,c>0 and A([n]k),B([n]l)\mathscr{A}\subseteq \binom{[n]}{k},\mathscr{B}\subseteq \binom{[n]}{l}, if A\mathscr{A} and B\mathscr{B} are cross-intersecting and (nrlr)B(n1l1)\binom{n-r}{l-r}\leq|\mathscr{B}|\leq \binom{n-1}{l-1}, then A+cBmax{(nk)(nrk)+c(nrlr), (n1k1)+c(n1l1)}|\mathscr{A}|+c|\mathscr{B}|\leq \max\left\{\binom{n}{k}-\binom{n-r}{k}+c\binom{n-r}{l-r},\ \binom{n-1}{k-1}+c\binom{n-1}{l-1}\right\} and the families A\mathscr{A} and B\mathscr{B} attaining the upper bound are also characterized. This generalizes the corresponding result of Hilton and Milner for c=1c=1 and r=k=lr=k=l, and implies a result of Tokushige and the second author (Theorem 1.3).

Keywords

Cite

@article{arxiv.2009.09396,
  title  = {On non-empty cross-intersecting families},
  author = {Chao Shi and Peter Frankl and Jianguo Qian},
  journal= {arXiv preprint arXiv:2009.09396},
  year   = {2020}
}

Comments

12 pages

R2 v1 2026-06-23T18:40:08.900Z