{"title":"Homological Eigenvalues of graph p-Laplacians","authors":"Dong Zhang","doi":"10.1142/s1793525323500346","DOIUrl":null,"url":null,"abstract":"Inspired by persistent homology in topological data analysis, we introduce the homological eigenvalues of the graph $p$-Laplacian $\\Delta_p$, which allows us to analyse and classify non-variational eigenvalues. We show the stability of homological eigenvalues, and we prove that for any homological eigenvalue $\\lambda(\\Delta_p)$, the function $p\\mapsto p(2\\lambda(\\Delta_p))^{\\frac1p}$ is locally increasing, while the function $p\\mapsto 2^{-p}\\lambda(\\Delta_p)$ is locally decreasing. As a special class of homological eigenvalues, the min-max eigenvalues $\\lambda_1(\\Delta_p)$, $\\cdots$, $\\lambda_k(\\Delta_p)$, $\\cdots$, are locally Lipschitz continuous with respect to $p\\in[1,+\\infty)$. We also establish the monotonicity of $p(2\\lambda_k(\\Delta_p))^{\\frac1p}$ and $2^{-p}\\lambda_k(\\Delta_p)$ with respect to $p\\in[1,+\\infty)$. These results systematically establish a refined analysis of $\\Delta_p$-eigenvalues for varying $p$, which lead to several applications, including: (1) settle an open problem by Amghibech on the monotonicity of some function involving eigenvalues of $p$-Laplacian with respect to $p$; (2) resolve a question asking whether the third eigenvalue of graph $p$-Laplacian is of min-max form; (3) refine the higher order Cheeger inequalities for graph $p$-Laplacians by Tudisco and Hein, and extend the multi-way Cheeger inequality by Lee, Oveis Gharan and Trevisan to the $p$-Laplacian case. Furthermore, for the 1-Laplacian case, we characterize the homological eigenvalues and min-max eigenvalues from the perspective of topological combinatorics, where our idea is similar to the authors' work on discrete Morse theory.","PeriodicalId":49151,"journal":{"name":"Journal of Topology and Analysis","volume":null,"pages":null},"PeriodicalIF":0.5000,"publicationDate":"2021-10-12","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"4","resultStr":null,"platform":"Semanticscholar","paperid":null,"PeriodicalName":"Journal of Topology and Analysis","FirstCategoryId":"100","ListUrlMain":"https://doi.org/10.1142/s1793525323500346","RegionNum":3,"RegionCategory":"数学","ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"Q3","JCRName":"MATHEMATICS","Score":null,"Total":0}
引用次数: 4
Abstract
Inspired by persistent homology in topological data analysis, we introduce the homological eigenvalues of the graph $p$-Laplacian $\Delta_p$, which allows us to analyse and classify non-variational eigenvalues. We show the stability of homological eigenvalues, and we prove that for any homological eigenvalue $\lambda(\Delta_p)$, the function $p\mapsto p(2\lambda(\Delta_p))^{\frac1p}$ is locally increasing, while the function $p\mapsto 2^{-p}\lambda(\Delta_p)$ is locally decreasing. As a special class of homological eigenvalues, the min-max eigenvalues $\lambda_1(\Delta_p)$, $\cdots$, $\lambda_k(\Delta_p)$, $\cdots$, are locally Lipschitz continuous with respect to $p\in[1,+\infty)$. We also establish the monotonicity of $p(2\lambda_k(\Delta_p))^{\frac1p}$ and $2^{-p}\lambda_k(\Delta_p)$ with respect to $p\in[1,+\infty)$. These results systematically establish a refined analysis of $\Delta_p$-eigenvalues for varying $p$, which lead to several applications, including: (1) settle an open problem by Amghibech on the monotonicity of some function involving eigenvalues of $p$-Laplacian with respect to $p$; (2) resolve a question asking whether the third eigenvalue of graph $p$-Laplacian is of min-max form; (3) refine the higher order Cheeger inequalities for graph $p$-Laplacians by Tudisco and Hein, and extend the multi-way Cheeger inequality by Lee, Oveis Gharan and Trevisan to the $p$-Laplacian case. Furthermore, for the 1-Laplacian case, we characterize the homological eigenvalues and min-max eigenvalues from the perspective of topological combinatorics, where our idea is similar to the authors' work on discrete Morse theory.
期刊介绍:
This journal is devoted to topology and analysis, broadly defined to include, for instance, differential geometry, geometric topology, geometric analysis, geometric group theory, index theory, noncommutative geometry, and aspects of probability on discrete structures, and geometry of Banach spaces. We welcome all excellent papers that have a geometric and/or analytic flavor that fosters the interactions between these fields. Papers published in this journal should break new ground or represent definitive progress on problems of current interest. On rare occasion, we will also accept survey papers.