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The Steklov spectrum and coarse discretizations of manifolds with boundary

Auteur(s)
Colbois, Bruno 
Institut de mathématiques 
Girouard, Alexandre 
Institut de mathématiques 
Raveendran, Binoy
Date de parution
2018-8-22
In
Pure and Applied Mathematics Quarterly,
Vol.
2
No
14
De la page
357
A la page
392
Revu par les pairs
1
Résumé
Given $\kappa, r_0>0$ and $n\in\N$, we consider the class
$\mathcal{M}=\mathcal{M}(\kappa,r_0,n)$ of compact $n$-dimensional
Riemannian manifolds with cylindrical boundary, Ricci curvature
bounded below by $-(n-1)\kappa$ and injectivity radius bounded below
by $r_0$ away from the boundary. For a manifold $M\in\mathcal{M}$ we introduce a notion of
discretization, leading to a graph with boundary which is roughly
isometric to $M$, with constants depending only on $\kappa,r_0,n$. In
this context, we prove a uniform spectral comparison inequality
between the Steklov eigenvalues of a manifold $M\in\mathcal{M}$ and
those of its discretization. Some applications to the construction of
sequences of surfaces with boundary of fixed length and with
arbitrarily large
Steklov spectral gap $\sigma_2-\sigma_1$ are given. In particular, we obtain such a
sequence for surfaces with connected boundary. The applications are
based on the construction of graph-like surfaces which are obtained from
sequences of graphs with good expansion properties.
Lié au projet
Geometric Spectral Theory 
URI
https://libra.unine.ch/handle/123456789/27974
DOI
10.4310/PAMQ.2018.v14.n2.a3
Autre version
https://dx.doi.org/10.4310/PAMQ.2018.v14.n2.a3
Type de publication
Resource Types::text::journal::journal article
Dossier(s) à télécharger
 main article: 2020-05-23_777_2048.pdf (1.31 MB)
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