Greedy Algorithms for High-Dimensional Eigenvalue Problems

Eric Cancès; Virginie Ehrlacher; Tony Lelièvre

doi:10.1007/s00365-014-9266-y

Greedy Algorithms for High-Dimensional Eigenvalue Problems

Eric Cancès
, Virginie Ehrlacher
, Tony Lelièvre

INRIA Institut National de Recherche en Informatique et en Automatique

Research output: Contribution to journal › Article › peer-review

Abstract

In this article, we present two new greedy algorithms for the computation of the lowest eigenvalue (and an associated eigenvector) of a high-dimensional eigenvalue problem and prove some convergence results for these algorithms and their orthogonalized versions. The performance of our algorithms is illustrated on numerical test cases (including the computation of the buckling modes of a microstructured plate) and compared with that of another greedy algorithm for eigenvalue problems introduced by Ammar and Chinesta.

Original language	English
Pages (from-to)	387-423
Number of pages	37
Journal	Constructive Approximation
Volume	40
Issue number	3
DOIs	https://doi.org/10.1007/s00365-014-9266-y
Publication status	Published - 1 Dec 2014

Keywords

Buckling
Eigenvalue
Greedy
High-dimensional
Nonlinear approximation
Plate
Schrödinger

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10.1007/s00365-014-9266-y

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title = "Greedy Algorithms for High-Dimensional Eigenvalue Problems",

abstract = "In this article, we present two new greedy algorithms for the computation of the lowest eigenvalue (and an associated eigenvector) of a high-dimensional eigenvalue problem and prove some convergence results for these algorithms and their orthogonalized versions. The performance of our algorithms is illustrated on numerical test cases (including the computation of the buckling modes of a microstructured plate) and compared with that of another greedy algorithm for eigenvalue problems introduced by Ammar and Chinesta.",

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N2 - In this article, we present two new greedy algorithms for the computation of the lowest eigenvalue (and an associated eigenvector) of a high-dimensional eigenvalue problem and prove some convergence results for these algorithms and their orthogonalized versions. The performance of our algorithms is illustrated on numerical test cases (including the computation of the buckling modes of a microstructured plate) and compared with that of another greedy algorithm for eigenvalue problems introduced by Ammar and Chinesta.

AB - In this article, we present two new greedy algorithms for the computation of the lowest eigenvalue (and an associated eigenvector) of a high-dimensional eigenvalue problem and prove some convergence results for these algorithms and their orthogonalized versions. The performance of our algorithms is illustrated on numerical test cases (including the computation of the buckling modes of a microstructured plate) and compared with that of another greedy algorithm for eigenvalue problems introduced by Ammar and Chinesta.

KW - Buckling

KW - Eigenvalue

KW - Greedy

KW - High-dimensional

KW - Nonlinear approximation

KW - Plate

KW - Schrödinger

UR - https://www.scopus.com/pages/publications/84922080383

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ER -

Greedy Algorithms for High-Dimensional Eigenvalue Problems

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Keywords

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