1 |
G. Chen, Y. Xue, The expression of generalized inverse of the perturbed operators under type I perturbation in Hilbert spaces, Linear Algebra Appl., 285(1998), 1-6.
DOI
ScienceOn
|
2 |
Y. Chen, X. Hu, Q. Xu, The Moore-Penrose inverse of A - , J. Shanghai Normal Univer., 38(2009), 15-19.
|
3 |
C. Deng, On the invertibility of the operator A - XB, Numb. Linear Algebra Appl., 16(2009), 817-831.
DOI
ScienceOn
|
4 |
C. Deng, A generalization of the Sherman-Morrison-Woodbury formula, Appl. Math. Lett., 24(2011), 1561-1564.
DOI
ScienceOn
|
5 |
C. Deng, On Moore-Penrose inverse of a kind of operators, Proceedings of the Ninth International Conference on Matrix Theory and Its Applications in China, (2010), 88-91.
|
6 |
C. Deng, Y. Wei, Some New Results of the Sherman-Morrison-Woodbury Formula, Proceeding of The Sixth Iternational Conference of Matrices and Operators, 2(2011), 220-223.
|
7 |
F. Du, Y. Xue, The expression of the Moore-Penrose inverse of A - , J. East China Normal Univ. (Nat. Sci.), 5(2010), 33-37.
|
8 |
H. V. Hsnderson, Searl S. R., On deriving the inverse of a sum of matrices, Siam Review, 23(1)(1981), 53-60.
DOI
ScienceOn
|
9 |
W. W. Hager, Updating the inverse of a matrix, Siam Review, 31(1989), 221-239.
DOI
ScienceOn
|
10 |
Shani Jose, K. C. Sivakumar, Moore-Penrose Inverse of Perturbed Operators on Hilbert Spaces, Combinatorial Matrix Theory and Generalized Inverses of Matrices, (2013), 119-131.
|
11 |
S. Kurt, A. Riedel, A Shermen-Morrison-Woodbury identity for rank augmenting matrices with application to centering, Siam J. Math. Anal., 12(1)(1991), 80-95.
|
12 |
T. Steerneman, F. P. Kleij, Properties of the matrix A - , Linear Algebra Appl., 410(2005), 70-86.
DOI
ScienceOn
|
13 |
Y. Xue, Stable Perturbations of Operators and Related Topics, World Scientific, (2012).
|