Abstract
Let$p(k)$denote the partition function of$k$. For each$k\geqslant 2$, we describe a list of$p(k)-1$quasirandom properties that a$k$-uniform hypergraph can have. Our work connects previous notions on linear hypergraph quasirandomness by Kohayakawa, Rödl, and Skokan, and by Conlon, Hàn, Person, and Schacht, and the spectral approach of Friedman and Wigderson. For each of the quasirandom properties that is described, we define the largest and the second largest eigenvalues. We show that a hypergraph satisfies these quasirandom properties if and only if it has a large spectral gap. This answers a question of Conlon, Hàn, Person, and Schacht. Our work can be viewed as a partial extension to hypergraphs of the seminal spectral results of Chung, Graham, and Wilson for graphs.
Publisher
Cambridge University Press (CUP)
Subject
Computational Mathematics,Discrete Mathematics and Combinatorics,Geometry and Topology,Mathematical Physics,Statistics and Probability,Algebra and Number Theory,Theoretical Computer Science,Analysis
Cited by
24 articles.
订阅此论文施引文献
订阅此论文施引文献,注册后可以免费订阅5篇论文的施引文献,订阅后可以查看论文全部施引文献
1. Natural quasirandomness properties;Random Structures & Algorithms;2023-05-03
2. Tiling multipartite hypergraphs in quasi-random hypergraphs;Journal of Combinatorial Theory, Series B;2023-05
3. F$F$‐factors in Quasi‐random Hypergraphs;Journal of the London Mathematical Society;2022-05-02
4. Factors and loose Hamilton cycles in sparse pseudo‐random hypergraphs;Random Structures & Algorithms;2021-10-14
5. Spectra of Random Regular Hypergraphs;The Electronic Journal of Combinatorics;2021-07-30