The article focuses on developing efficient preprocessing algorithms to accelerate the solution of large-scale linear equation systems. It introduces three inner iteration methods - RPCG, ADI, and Kaczmarz - that can be used to generate preprocessing matrices for the BA-GMRES outer iteration.
The RPCG-BA-GMRES method uses the Restricted Preconditioned Conjugate Gradient (RPCG) method as the inner iteration to generate a preconditioning matrix. The convergence analysis shows that this approach can effectively reduce the condition number of the original problem.
The ADI-BA-GMRES method uses the Alternating Direction Implicit (ADI) iteration as the inner iteration. The convergence of the ADI method is analyzed, proving that it converges unconditionally.
The Kaczmarz-BA-GMRES method uses the Kaczmarz method and its variants, including random Kaczmarz with constant and adaptive step sizes, as the inner iterations. Convergence rates are derived for these Kaczmarz-based methods.
The article also provides numerical examples demonstrating the effectiveness of these preprocessing approaches in improving the solution rate compared to solving the original linear system directly.
Til et annet språk
fra kildeinnhold
arxiv.org
Viktige innsikter hentet fra
by Juan Zhang,Y... klokken arxiv.org 04-10-2024
https://arxiv.org/pdf/2404.06018.pdfDypere Spørsmål