Adaptive-stabilized finite element methods for eigenvalue problems based on residual minimization onto a dual discontinuous Galerkin norm

Behnoudfar, Pouria; Hashemian, Ali; Deng, Quanling; Calo, Victor M.

Adaptive-stabilized finite element methods for eigenvalue problems based on residual minimization onto a dual discontinuous Galerkin norm

Date

2024-12-15

Authors

Behnoudfar, Pouria

Hashemian, Ali

Deng, Quanling

Calo, Victor M.

Abstract

In this paper, we introduce a framework based on the residual minimization method onto dual discontinuous-Galerkin norms for solving the eigenvalue problem of the Laplace operator. Solving a saddle-point problem allows us to obtain a stable continuous approximation for the eigenfunctions. Furthermore, a residual projection onto a discontinuous polynomial space delivers a robust error estimator for each eigenpair and guides the automatic mesh refinement. Our approach approximates the eigenvalues and eigenfunctions with optimal convergence rates. Finally, numerical results verify our analysis and demonstrate the methodology's excellent performance.

Keywords

Adaptive-stabilized residual minimization, Discontinuous Galerkin norm, Eigenvalue analysis, Finite element method

URI

http://www.scopus.com/inward/record.url?scp=85203828630&partnerID=8YFLogxK
https://hdl.handle.net/1885/733752262

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ANU Research Publications

Source

Journal of Computational Physics

Type

Journal article

Entity type

Publication

DOI

10.1016/j.jcp.2024.113421

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Adaptive-stabilized finite element methods for eigenvalue problems based on residual minimization onto a dual discontinuous Galerkin norm

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