论文信息 - Particular formulae for the Moore-Penrose inverse of a columnwise partitioned matrix

Particular formulae for the Moore-Penrose inverse of a columnwise partitioned matrix

Abstract An essential part of Cegielski’s [Obtuse cones and Gram matrices with non-negative inverse, Linear Algebra Appl. 335 (2001) 167–181] considerations of some properties of Gram matrices with nonnegative inverses, which are pointed out to be crucial in constructing obtuse cones, consists in developing some particular formulae for the Moore–Penrose inverse of a columnwise partitioned matrix A = (A1 : A2) under the assumption that it is of full column rank. In the present paper, these results are generalized and extended. The generalization consists in weakening the assumption mentioned above to the requirement that the ranges of A1 and A2 are disjoint, while the extension consists in introducing the conditions referring to the class of all generalized inverses of A.

Oskar Maria Baksalary | J. K. Baksalary | O. Baksalary | Jerzy K. Baksalary | J. Baksalary

[1] R. Penrose. A Generalized inverse for matrices , 1955 .

[2] G. Styan,et al. Equalities and Inequalities for Ranks of Matrices , 1974 .

[3] K. S. Banerjee. Generalized Inverse of Matrices and Its Applications , 1973 .

[4] Adi Ben-Israel,et al. Generalized inverses: theory and applications , 1974 .

[5] A. Cegielski. Obtuse cones and Gram matrices with nonnegative inverse , 2001 .

[6] Jerzy K baxsalary. A study of the equivalence between a gauss-markoff model and its augmentation by nuisance parameters , 1984 .

[7] R. E. Cline. Representations for the Generalized Inverse of a Partitioned Matrix , 1964 .

[8] Adi Ben-Israel. The Moore of the Moore-Penrose inverse , 2002 .