A note on non-empty cross-intersecting families

IF 1 3区数学 Q1 MATHEMATICS European Journal of Combinatorics Pub Date : 2024-04-08 DOI:10.1016/j.ejc.2024.103968

Menglong Zhang, Tao Feng

引用次数: 0

Abstract

The families $F_{1} \subseteq (\frac{[n]}{k_{1}}), F_{2} \subseteq (\frac{[n]}{k_{2}}), \dots, F_{r} \subseteq (\frac{[n]}{k_{r}})$ are said to be cross-intersecting if $| F_{i} \cap F_{j} | ⩾ 1$ for any $1 ⩽ i < j ⩽ r$ and $F_{i} \in F_{i}$ , $F_{j} \in F_{j}$ . Cross-intersecting families $F_{1}, F_{2}, \dots, F_{r}$ are said to be non-empty if $F_{i} \neq 0̸$ for any $1 ⩽ i ⩽ r$ . This paper shows that if $F_{1} \subseteq (\frac{[n]}{k_{1}}), F_{2} \subseteq (\frac{[n]}{k_{2}}), \dots, F_{r} \subseteq (\frac{[n]}{k_{r}})$ are non-empty cross-intersecting families with $k_{1} ⩾ k_{2} ⩾ \dots ⩾ k_{r}$ and $n ⩾ k_{1} + k_{2}$ , then $\sum_{i = 1}^{r} | F_{i} | ⩽ max {(\frac{n}{k_{1}}) - (\frac{n - k_{r}}{k_{1}}) + \sum_{i = 2}^{r} (\frac{n - k_{r}}{k_{i} - k_{r}}), \sum_{i = 1}^{r} (\frac{n - 1}{k_{i} - 1})}$ . This solves a problem posed by Shi, Frankl and Qian recently. The extremal families attaining the upper bounds are also characterized.

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关于非空交叉相交族的说明

对于任意 1⩽i<j⩽r，且 Fi∈Fi, Fj∈Fj 的族 F1⊆[n]k1,F2⊆[n]k2,...,Fr⊆[n]kr，如果 |Fi∩Fj|⩾1 称为交叉族。如果对于任意 1⩽i⩽r，Fi≠0̸，则交叉族 F1，F2，...，Fr 称为非空。本文证明，如果 F1⊆[n]k1,F2⊆[n]k2,...,Fr⊆[n]kr 是 k1⩾k2⩾⋯⩾kr 和 n⩾k1+k2的非空交叉族，那么∑i=1r|Fi|⩽max{nk1-n-krk1+∑i=2rn-krki-kr,∑i=1rn-1ki-1}。这解决了 Shi、Frankl 和 Qian 最近提出的一个问题。达到上界的极值族也得到了表征。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

European Journal of Combinatorics 数学-数学

CiteScore

2.10

自引率

10.00%

发文量

124

审稿时长

4-8 weeks

期刊介绍： The European Journal of Combinatorics is a high standard, international, bimonthly journal of pure mathematics, specializing in theories arising from combinatorial problems. The journal is primarily open to papers dealing with mathematical structures within combinatorics and/or establishing direct links between combinatorics and other branches of mathematics and the theories of computing. The journal includes full-length research papers on important topics.

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