Universal inequalities for Dirichlet eigenvalues on discrete groups

Bobo Hua; Ariel Yadin

doi:10.48550/arXiv.2007.13157

Universal inequalities for Dirichlet eigenvalues on discrete groups

Bobo Hua, Ariel Yadin

Department of Mathematics

Ben-Gurion University of the Negev

Research output: Working paper › Preprint

Abstract

We prove universal inequalities for Laplacian eigenvalues with Dirichlet boundary conditions on subsets of certain discrete groups. The study of universal inequalities on Riemannian manifolds was initiated by Weyl, Polya, Yau, and others. Here we focus on a version by Cheng and Yang. Specifically, we prove Yang-type universal inequalities for Cayley graphs of finitely generated amenable groups, as well as for the d-regular tree (simple random walk on the free group).

Original language	American English
DOIs	https://doi.org/10.48550/arXiv.2007.13157
State	Published - 26 Jul 2020

Keywords

Mathematics - Differential Geometry
Mathematics - Group Theory
Mathematics - Probability

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10.48550/arXiv.2007.13157

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abstract = "We prove universal inequalities for Laplacian eigenvalues with Dirichlet boundary conditions on subsets of certain discrete groups. The study of universal inequalities on Riemannian manifolds was initiated by Weyl, Polya, Yau, and others. Here we focus on a version by Cheng and Yang. Specifically, we prove Yang-type universal inequalities for Cayley graphs of finitely generated amenable groups, as well as for the d-regular tree (simple random walk on the free group).",

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AU - Yadin, Ariel

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N2 - We prove universal inequalities for Laplacian eigenvalues with Dirichlet boundary conditions on subsets of certain discrete groups. The study of universal inequalities on Riemannian manifolds was initiated by Weyl, Polya, Yau, and others. Here we focus on a version by Cheng and Yang. Specifically, we prove Yang-type universal inequalities for Cayley graphs of finitely generated amenable groups, as well as for the d-regular tree (simple random walk on the free group).

AB - We prove universal inequalities for Laplacian eigenvalues with Dirichlet boundary conditions on subsets of certain discrete groups. The study of universal inequalities on Riemannian manifolds was initiated by Weyl, Polya, Yau, and others. Here we focus on a version by Cheng and Yang. Specifically, we prove Yang-type universal inequalities for Cayley graphs of finitely generated amenable groups, as well as for the d-regular tree (simple random walk on the free group).

KW - Mathematics - Differential Geometry

KW - Mathematics - Group Theory

KW - Mathematics - Probability

U2 - 10.48550/arXiv.2007.13157

DO - 10.48550/arXiv.2007.13157

M3 - Preprint

BT - Universal inequalities for Dirichlet eigenvalues on discrete groups

ER -

Universal inequalities for Dirichlet eigenvalues on discrete groups

Abstract

Keywords

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