http://scholars.ntou.edu.tw/handle/123456789/25346
Title: | Matrix Pencil Optimal Iterative Algorithms and Restarted Versions for Linear Matrix Equation and Pseudoinverse | Authors: | Liu, Chein-Shan Kuo, Chung-Lun Chang, Chih-Wen |
Keywords: | linear matrix equations;matrix pencil Krylov subspace method;double-optimal iterative algorithm;Moore-Penrose pseudoinverse;restarted DOIA;optimized hyperpower method | Issue Date: | 2024 | Publisher: | MDPI | Journal Volume: | 12 | Journal Issue: | 11 | Source: | MATHEMATICS | Abstract: | We derive a double-optimal iterative algorithm (DOIA) in an m-degree matrix pencil Krylov subspace to solve a rectangular linear matrix equation. Expressing the iterative solution in a matrix pencil and using two optimization techniques, we determine the expansion coefficients explicitly, by inverting an mxm positive definite matrix. The DOIA is a fast, convergent, iterative algorithm. Some properties and the estimation of residual error of the DOIA are given to prove the absolute convergence. Numerical tests demonstrate the usefulness of the double-optimal solution (DOS) and DOIA in solving square or nonsquare linear matrix equations and in inverting nonsingular square matrices. To speed up the convergence, a restarted technique with frequency m is proposed, namely, DOIA(m); it outperforms the DOIA. The pseudoinverse of a rectangular matrix can be sought using the DOIA and DOIA(m). The Moore-Penrose iterative algorithm (MPIA) and MPIA(m) based on the polynomial-type matrix pencil and the optimized hyperpower iterative algorithm OHPIA(m) are developed. They are efficient and accurate iterative methods for finding the pseudoinverse, especially the MPIA(m) and OHPIA(m). |
URI: | http://scholars.ntou.edu.tw/handle/123456789/25346 | DOI: | 10.3390/math12111761 |
Appears in Collections: | 海洋中心 |
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