Twosetsofnewcharacterizationsfornormaland EP matrices
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[1] Yongge Tian,et al. Rank equalities and inequalities for Kronecker products of matrices with applications , 2004, Appl. Math. Comput..
[2] M. Pearl,et al. On EPr and normal Epr matrices , 1966 .
[3] Yongge Tian,et al. Rank equalities related to outer inverses of matrices and applications , 2001 .
[4] C. D. Meyer,et al. Generalized inverses of linear transformations , 1979 .
[5] Yongge Tian,et al. More on maximal and minimal ranks of Schur complements with applications , 2004, Appl. Math. Comput..
[6] Richard H. Bartels,et al. Algorithm 432 [C2]: Solution of the matrix equation AX + XB = C [F4] , 1972, Commun. ACM.
[7] A. Meenakshi,et al. On k-EP matrices , 1998 .
[8] T. Markham,et al. A Generalization of the Schur Complement by Means of the Moore–Penrose Inverse , 1974 .
[9] R. Hartwig,et al. Matrices for which A∗ and A† commute , 1983 .
[10] Yongge Tian,et al. Rank equalities for idempotent and involutary matrices , 2001 .
[11] G. Styan,et al. Equalities and Inequalities for Ranks of Matrices , 1974 .
[12] K. S. Banerjee. Generalized Inverse of Matrices and Its Applications , 1973 .
[13] C. D. Meyer,et al. EP Operators and Generalized Inverses , 1975, Canadian Mathematical Bulletin.
[14] Partial isometries, contractions and EP matrices , 1983 .
[15] R. Hartwig,et al. ON PRODUCTS OF EP MATRICES , 1997 .
[16] George P. H. Styan,et al. A new rank formula for idempotent matrices with applications , 2002 .
[17] M. Pearl. On normal and $EP_r$ matrices. , 1959 .
[18] Yong Tian. How to characterize commutativity equalities for Drazin inverses of matrices , 2003 .
[19] Yongge Tian,et al. Rank Equalities for Block Matrices and Their Moore-Penrose Inverses , 2004 .
[20] Yongge Tian,et al. Using rank formulas to characterize equalities for Moore-Penrose inverses of matrix products , 2004, Appl. Math. Comput..
[21] C. S. Ballantine. Products of EP matrices , 1975 .
[22] L. Elsner,et al. Normal matrices: an update , 1998 .
[23] Sanjo Zlobec,et al. An Explicit Form of the Moore–Penrose Inverse of an Arbitrary Complex Matrix , 1970 .
[24] Some remarks on EPγ matrices, and generalized inverses , 1970 .
[25] Yongge Tian,et al. The Maximal and Minimal Ranks of Some Expressions of Generalized Inverses of Matrices , 2002 .
[26] Yongge Tian,et al. When does rank(ABC) = rank(AB) + rank(BC) - rank(B) hold? , 2002 .
[27] Yongge Tian. Upper and lower bounds for ranks of matrix expressions using generalized inverses , 2002 .
[28] Yongge Tian,et al. On mixed-type reverse-order laws for the Moore-Penrose inverse of a matrix product , 2004, Int. J. Math. Math. Sci..