A sharp upper bound for the transversal number of k-uniform connected hypergraphs with given size

For \(k\ge 2\), let H be a k-uniform connected hypergraph on n vertices and m edges. The transversal number \(\tau (H)\) is the minimum number of vertices that intersect every edge. We prove the following inequality: \(\tau (H)\le \frac{(k-1)m+1}{k}\). Furthermore, we characterize the extremal hypergraphs with equality holds. Based on the proofs, some combinatorial algorithms on the transversal number are designed.

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The authors are very indebted to Professor Xujin Chen, Professor Xiaodong Hu and two anonymous referees for their invaluable comments and suggestions.

This research work is supported by National Natural Science Foundation of China under Grant No.11901605, No.12101069, the disciplinary funding of Central University of Finance and Economics, the Emerging Interdisciplinary Project of CUFE, the Fundamental Research Funds for the Central Universities and Innovation Foundation of BUPT for Youth (500422309) and the Innovation Program for Quantum Science and Technology, China (2021ZD0302904).

Authors and Affiliations

1. Center for Discrete Mathematics, Fuzhou University, Fuzhou, 350003, Fujian, China

   Zian Chen

2. Hefei National Laboratory, Hefei, 230088, Anhui, China

   Bin Chen

3. School of Science, Beijing University of Posts and Telecommunications, Beijing, 100876, China

   Zhongzheng Tang

4. School of Statistics and Mathematics, Central University of Finance and Economics, Beijing, 100081, China

   Zhuo Diao

Corresponding author

Correspondence to Zhuo Diao.

Conflict of interest

The authors declare that they have no conflict of interest.

Ethical approval

This article does not contain any studies with human participants or animals performed by any of the authors.

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A preliminary version of this paper appeared in Proceedings of the 16th International Conference on Algorithmic Aspects in Information and Management (AAIM 2022), pp. \(376-387, 2022\).

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