In this article,some new rigorous perturbation bounds for the SR decomposition un-der normwise or componentwise perturbations for a given matrix are derived.Also,the explicit expressions for the mixed and componentwis...In this article,some new rigorous perturbation bounds for the SR decomposition un-der normwise or componentwise perturbations for a given matrix are derived.Also,the explicit expressions for the mixed and componentwise condition numbers are presented by utilizing the block matrix-vector equation approach.Hypothetical and trial results demonstrate that these new bounds are constantly more tightly than the comparing ones in the literature.展开更多
In this article, the expression for the Drazin inverse of a modified matrix is considered and some interesting results are established. This contributes to certain recent results obtained by Y.Wei [9].
In this paper we present some new absolute and relative perturbation bounds for the eigenvalue for arbitrary matrices, which improves some recent results. The eigenvalue inclusion region is also discussed.
This work is concerned with the nonlinear matrix equation Xs + A*F(X)A = Q with s ≥ 1. Several sufficient and necessary conditions for the existence and uniqueness of the Hermitian positive semidefinite solution ...This work is concerned with the nonlinear matrix equation Xs + A*F(X)A = Q with s ≥ 1. Several sufficient and necessary conditions for the existence and uniqueness of the Hermitian positive semidefinite solution are derived, and perturbation bounds are presented.展开更多
基金supported by the National Natural Science Foundation of China(Grant No.11771265).
文摘In this article,some new rigorous perturbation bounds for the SR decomposition un-der normwise or componentwise perturbations for a given matrix are derived.Also,the explicit expressions for the mixed and componentwise condition numbers are presented by utilizing the block matrix-vector equation approach.Hypothetical and trial results demonstrate that these new bounds are constantly more tightly than the comparing ones in the literature.
基金Supported by Grant No. 174007 of the Ministry of Science,Technology and Development,Republic of Serbia
文摘In this article, the expression for the Drazin inverse of a modified matrix is considered and some interesting results are established. This contributes to certain recent results obtained by Y.Wei [9].
文摘In this paper we present some new absolute and relative perturbation bounds for the eigenvalue for arbitrary matrices, which improves some recent results. The eigenvalue inclusion region is also discussed.
基金The authors are very much indebted to the referees for their constructive and valuable comments and suggestions which greatly improved the original manuscript of this paper. This work of the first author is supported by Scholarship Award for Excellent Doctoral Student granted by East China Normal University (No.XRZZ2012021). This work of the second author is supported by the National Natural Science Foundation of China (No. 11071079), Natural Science Foundation of Anhui Province (No. 10040606Q47) and Natural Science Foundation of Zhejiang Province (No. Y6110043). This work of the fourth author is supported by the National Natural Science Foundation of China (No. 10901056), Science and Technology Commission of Shanghai Municipality (No. 11QA1402200).
文摘This work is concerned with the nonlinear matrix equation Xs + A*F(X)A = Q with s ≥ 1. Several sufficient and necessary conditions for the existence and uniqueness of the Hermitian positive semidefinite solution are derived, and perturbation bounds are presented.
