TY - JOUR
T1 - The Rayleigh-Ritz method, refinement and Arnoldi process for periodic matrix pairs
AU - Chu, Eric King Wah
AU - Fan, Hung Yuan
AU - Jia, Zhongxiao
AU - Li, Tiexiang
AU - Lin, Wen Wei
N1 - Funding Information:
Third author’s work was supported by the National Basic Research Program of China 2011CB302400 and the National Science Foundation of China (Nos. 11071140 and 10771116 ). First, second and fourth author’s work were partially supported by the National Centre of Theoretical Sciences , of ROC in Taiwan.
PY - 2011/2/15
Y1 - 2011/2/15
N2 - We extend the Rayleigh-Ritz method to the eigen-problem of periodic matrix pairs. Assuming that the deviations of the desired periodic eigenvectors from the corresponding periodic subspaces tend to zero, we show that there exist periodic Ritz values that converge to the desired periodic eigenvalues unconditionally, yet the periodic Ritz vectors may fail to converge. To overcome this potential problem, we minimize residuals formed with periodic Ritz values to produce the refined periodic Ritz vectors, which converge under the same assumption. These results generalize the corresponding well-known ones for Rayleigh-Ritz approximations and their refinement for non-periodic eigen-problems. In addition, we consider a periodic Arnoldi process which is particularly efficient when coupled with the Rayleigh-Ritz method with refinement. The numerical results illustrate that the refinement procedure produces excellent approximations to the original periodic eigenvectors.
AB - We extend the Rayleigh-Ritz method to the eigen-problem of periodic matrix pairs. Assuming that the deviations of the desired periodic eigenvectors from the corresponding periodic subspaces tend to zero, we show that there exist periodic Ritz values that converge to the desired periodic eigenvalues unconditionally, yet the periodic Ritz vectors may fail to converge. To overcome this potential problem, we minimize residuals formed with periodic Ritz values to produce the refined periodic Ritz vectors, which converge under the same assumption. These results generalize the corresponding well-known ones for Rayleigh-Ritz approximations and their refinement for non-periodic eigen-problems. In addition, we consider a periodic Arnoldi process which is particularly efficient when coupled with the Rayleigh-Ritz method with refinement. The numerical results illustrate that the refinement procedure produces excellent approximations to the original periodic eigenvectors.
KW - Arnoldi process
KW - Periodic eigenvalues
KW - Periodic matrix pairs
KW - Rayleigh-Ritz method
KW - Refinement
KW - Ritz values
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U2 - 10.1016/j.cam.2010.11.014
DO - 10.1016/j.cam.2010.11.014
M3 - Article
AN - SCOPUS:79251596552
SN - 0377-0427
VL - 235
SP - 2626
EP - 2639
JO - Journal of Computational and Applied Mathematics
JF - Journal of Computational and Applied Mathematics
IS - 8
ER -