A Holomorphic Operator Function Approach for the Laplace Eigenvalue Problem Using Discontinuous Galerkin Method

Yingxia Xi; Xia Ji

doi:10.4208/csiam-am.SO-2021-0012

A Holomorphic Operator Function Approach for the Laplace Eigenvalue Problem Using Discontinuous Galerkin Method

Yingxia Xi^*, Xia Ji^*

^*Corresponding author for this work

School of Mathematics and Statistics

Nanjing University of Science and Technology

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

1 Citation (Scopus)

Abstract

The paper presents a holomorphic operator function approach for the Laplace eigenvalue problem using the discontinuous Galerkin method. We rewrite the problem as the eigenvalue problem of a holomorphic Fredholm operator function of index zero. The convergence for the discontinuous Galerkin method is proved by using the abstract approximation theory for holomorphic operator functions. We employ the spectral indicator method to compute the eigenvalues. Extensive numerical examples are presented to validate the theory.

Original language	English
Pages (from-to)	776-792
Number of pages	17
Journal	CSIAM Transactions on Applied Mathematics
Volume	2
Issue number	4
DOIs	https://doi.org/10.4208/csiam-am.SO-2021-0012
Publication status	Published - 1 Dec 2021

Keywords

Discontinuous Galerkin method
Fredholm operator
eigenvalue problem

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10.4208/csiam-am.SO-2021-0012

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abstract = "The paper presents a holomorphic operator function approach for the Laplace eigenvalue problem using the discontinuous Galerkin method. We rewrite the problem as the eigenvalue problem of a holomorphic Fredholm operator function of index zero. The convergence for the discontinuous Galerkin method is proved by using the abstract approximation theory for holomorphic operator functions. We employ the spectral indicator method to compute the eigenvalues. Extensive numerical examples are presented to validate the theory.",

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AB - The paper presents a holomorphic operator function approach for the Laplace eigenvalue problem using the discontinuous Galerkin method. We rewrite the problem as the eigenvalue problem of a holomorphic Fredholm operator function of index zero. The convergence for the discontinuous Galerkin method is proved by using the abstract approximation theory for holomorphic operator functions. We employ the spectral indicator method to compute the eigenvalues. Extensive numerical examples are presented to validate the theory.

KW - Discontinuous Galerkin method

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A Holomorphic Operator Function Approach for the Laplace Eigenvalue Problem Using Discontinuous Galerkin Method

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Keywords

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