Eigenvalues and Linear Quasirandom Hypergraphs
Abstract
Let p(k) denote the partition function of k. For each k >= 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 of Kohayakawa-R\"odl-Skokan and Conlon-H\`{a}n-Person-Schacht and the spectral approach of Friedman-Wigderson. For each of the quasirandom properties that are described, we define a largest and second largest eigenvalue. 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-H\`{a}n-Person-Schacht. Our work can be viewed as a partial extension to hypergraphs of the seminal spectral results of Chung-Graham-Wilson for graphs.
Cite
@article{arxiv.1208.4863,
title = {Eigenvalues and Linear Quasirandom Hypergraphs},
author = {John Lenz and Dhruv Mubayi},
journal= {arXiv preprint arXiv:1208.4863},
year = {2013}
}
Comments
26 pages, 5 figures