Qigang Liang scite author profile

Qigang Liang

4Publications

4Citation Statements Received

52Citation Statements Given

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109

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Tongji University

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A two-level preconditioned Helmholtz-Jacobi-Davidson method for the Maxwell eigenvalue problem

Liang¹,

Xu²

2021

Math. Comp.

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In this paper, based on a domain decomposition method, we propose an efficient two-level preconditioned Helmholtz-Jacobi-Davidson (PHJD) method for solving the algebraic eigenvalue problem resulting from the edge element approximation of the Maxwell eigenvalue problem. In order to eliminate the components in orthogonal complement space of the eigenvalue, we shall solve a parallel preconditioned system and a Helmholtz projection system together in fine space. After one coarse space correction in each iteration and minimizing the Rayleigh quotient in a small dimensional Davidson space, we finally get the error reduction of this two-level PHJD method as γ = c ( H ) ( 1 − C δ 2 H 2 ) \gamma =c(H)(1-C\frac {\delta ^{2}}{H^{2}}) , where C C is a constant independent of the mesh size h h and the diameter of subdomains H H , δ \delta is the overlapping size among the subdomains, and c ( H ) c(H) decreasing monotonically to 1 1 as H → 0 H\to 0 , which means the greater the number of subdomains, the better the convergence rate. Numerical results supporting our theory are given.

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A Two-Level Preconditioned Helmholtz-Jacobi-Davidson Method for the Maxwell Eigenvalue Problem

Liang¹,

Xu²

2021

Preprint

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In this paper, based on a domain decomposition (DD) method, we shall propose an efficient two-level preconditioned Helmholtz-Jacobi-Davidson (PHJD) method for solving the algebraic eigenvalue problem resulting from the edge element approximation of the Maxwell eigenvalue problem. In order to eliminate the components in orthogonal complement space of the eigenvalue, we shall solve a parallel preconditioned system and a Helmholtz projection system together in fine space. After one coarse space correction in each iteration and minimizing the Rayleigh quotient in a small dimensional Davidson space, we finally get the error reduction of this two-level PHJD method as, where C is a constant independent of the mesh size h and the diameter of subdomains H, δ is the overlapping size among the subdomains, and c(H) decreasing as H → 0, which means the greater the number of subdomains, the better the convergence rate. Numerical results supporting our theory shall be given.

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A Two-Level Preconditioned Helmholtz Subspace Iterative Method for Maxwell Eigenvalue Problems

Liang

2023

SIAM J. Numer. Anal.

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A Weak Galerkin Finite Element Method Can Compute Both Upper and Lower Eigenvalue Bounds

Liang

Yuan

2022

J Sci Comput

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Qigang Liang

A two-level preconditioned Helmholtz-Jacobi-Davidson method for the Maxwell eigenvalue problem

A Two-Level Preconditioned Helmholtz-Jacobi-Davidson Method for the Maxwell Eigenvalue Problem

A Two-Level Preconditioned Helmholtz Subspace Iterative Method for Maxwell Eigenvalue Problems

A Weak Galerkin Finite Element Method Can Compute Both Upper and Lower Eigenvalue Bounds

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