We consider the Helmholtz equation and the fractional Laplacian in the case of the complex-valued unbounded variable coefficient wave number (Formula presented.), approximated by finite differences. In a recent analysis, singular value clustering and eigenvalue clustering have been proposed for a (Formula presented.) preconditioning when the variable coefficient wave number (Formula presented.) is uniformly bounded. Here, we extend the analysis to the unbounded case by focusing on the case of a power singularity. Several numerical experiments concerning the spectral behavior and convergence of the related preconditioned GMRES are presented.
Adriani, A., Serra-Capizzano, S., Tablino Possio, C. (2024). Clustering/Distribution Analysis and Preconditioned Krylov Solvers for the Approximated Helmholtz Equation and Fractional Laplacian in the Case of Complex-Valued, Unbounded Variable Coefficient Wave Number μ. ALGORITHMS, 17(3) [10.3390/a17030100].
Clustering/Distribution Analysis and Preconditioned Krylov Solvers for the Approximated Helmholtz Equation and Fractional Laplacian in the Case of Complex-Valued, Unbounded Variable Coefficient Wave Number μ
Tablino Possio, C
2024
Abstract
We consider the Helmholtz equation and the fractional Laplacian in the case of the complex-valued unbounded variable coefficient wave number (Formula presented.), approximated by finite differences. In a recent analysis, singular value clustering and eigenvalue clustering have been proposed for a (Formula presented.) preconditioning when the variable coefficient wave number (Formula presented.) is uniformly bounded. Here, we extend the analysis to the unbounded case by focusing on the case of a power singularity. Several numerical experiments concerning the spectral behavior and convergence of the related preconditioned GMRES are presented.
I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
