English

Cheeger Inequalities for Directed Graphs and Hypergraphs Using Reweighted Eigenvalues

Data Structures and Algorithms 2022-11-18 v1 Discrete Mathematics Machine Learning Combinatorics Probability

Abstract

We derive Cheeger inequalities for directed graphs and hypergraphs using the reweighted eigenvalue approach that was recently developed for vertex expansion in undirected graphs [OZ22,KLT22,JPV22]. The goal is to develop a new spectral theory for directed graphs and an alternative spectral theory for hypergraphs. The first main result is a Cheeger inequality relating the vertex expansion ψ(G)\vec{\psi}(G) of a directed graph GG to the vertex-capacitated maximum reweighted second eigenvalue λ2v\vec{\lambda}_2^{v*}: λ2vψ(G)λ2vlog(Δ/λ2v). \vec{\lambda}_2^{v*} \lesssim \vec{\psi}(G) \lesssim \sqrt{\vec{\lambda}_2^{v*} \cdot \log (\Delta/\vec{\lambda}_2^{v*})}. This provides a combinatorial characterization of the fastest mixing time of a directed graph by vertex expansion, and builds a new connection between reweighted eigenvalued, vertex expansion, and fastest mixing time for directed graphs. The second main result is a stronger Cheeger inequality relating the edge conductance ϕ(G)\vec{\phi}(G) of a directed graph GG to the edge-capacitated maximum reweighted second eigenvalue λ2e\vec{\lambda}_2^{e*}: λ2eϕ(G)λ2elog(1/λ2e). \vec{\lambda}_2^{e*} \lesssim \vec{\phi}(G) \lesssim \sqrt{\vec{\lambda}_2^{e*} \cdot \log (1/\vec{\lambda}_2^{e*})}. This provides a certificate for a directed graph to be an expander and a spectral algorithm to find a sparse cut in a directed graph, playing a similar role as Cheeger's inequality in certifying graph expansion and in the spectral partitioning algorithm for undirected graphs. We also use this reweighted eigenvalue approach to derive the improved Cheeger inequality for directed graphs, and furthermore to derive several Cheeger inequalities for hypergraphs that match and improve the existing results in [Lou15,CLTZ18]. These are supporting results that this provides a unifying approach to lift the spectral theory for undirected graphs to more general settings.

Keywords

Cite

@article{arxiv.2211.09776,
  title  = {Cheeger Inequalities for Directed Graphs and Hypergraphs Using Reweighted Eigenvalues},
  author = {Lap Chi Lau and Kam Chuen Tung and Robert Wang},
  journal= {arXiv preprint arXiv:2211.09776},
  year   = {2022}
}

Comments

51 pages, 3 figures

R2 v1 2026-06-28T06:09:11.157Z