Representations for the Drazin inverses of the sum of two matrices and some block matrices

Bu, Changjiang; Feng, Chengcheng; Bai, Shuyan

doi:10.1016/j.amc.2012.03.102

Cited by 24 publications

(21 citation statements)

References 22 publications

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“…Applying Lemma 2.1, the group inverse of P + Q = U ∆ Q 2 Q 3 Q 4 U −1 exists if and only if G = ∆ 2 + Q 2 S π Q 3 is [4] On the group inverse for the sum of matrices invertible. Applying Lemma 2.1, the group inverse of P + Q = U ∆ Q 2 Q 3 Q 4 U −1 exists if and only if G = ∆ 2 + Q 2 S π Q 3 is [4] On the group inverse for the sum of matrices invertible.…”

Section: Resultsmentioning

confidence: 99%

On the Group Inverse for the Sum of Matrices

Zhou

Liang

et al. 2013

J. Aust. Math. Soc.

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Let K m×n denote the set of all m × n matrices over a skew field K. In this paper, we give a necessary and sufficient condition for the existence of the group inverse of P + Q and its representation under the condition PQ = 0, where P, Q ∈ K n×n . In addition, in view of the natural characters of block matrices, we give the existence and representation for the group inverse of P + Q and P + Q + R under some conditions, where P, Q, R ∈ K n×n . 2010 Mathematics subject classification: primary 15A09.

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Section: Resultsmentioning

confidence: 99%

On the Group Inverse for the Sum of Matrices

Zhou

Liang

et al. 2013

J. Aust. Math. Soc.

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“…(i) P 2 Q = 0, Q 2 = 0 (see [6]); (ii) P 2 Q = 0, Q 2 P = 0 (see [7]); (iii) QP 2 = 0, Q 2 = 0 (see [6]); (iv) PQ 2 = 0, QP 2 = 0 (see [7]).…”

Section: Introductionmentioning

confidence: 99%

“…In some papers the expression of M D is given under conditions which concern the generalized Schur complement of matrix M defined by S = D − CA D B. Here we list some of them: (i) CA π = 0, A π B = 0, and S = 0 (see [9]); (ii) CA π B = 0, AA π B = 0, and S = 0 (see [3]); (iii) CA π B = 0, CAA π = 0, and S = 0 (see [3]); (iv) ABCA π = 0, BCA π is nipotent, and S = 0 (see [6]); (v) A π BCA = 0, A π BC is nipotent, and S = 0 (see [6]); (vi) ABCA π = 0, A π ABC = 0, and S = 0 (see [7]); (vii) ABCA π = 0, CBCA π = 0, and S = 0 (see [7]); (viii) ABCA π A = 0, ABCA π B = 0, and S = 0 (see [11]); (ix) AA π BCA = 0, CA π BCA = 0, and S = 0 (see [11]). In this paper, we derive a new representation for M D under the conditions A π ABC = 0, A 2 BCA π A = 0, A 2 BCA π B = 0 and S = 0.…”

Section: Introductionmentioning

confidence: 99%

Some additive results for the Drazin inverse and its application

Yang¹,

Liu²,

Chen

2017

Filomat

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“…For two commutative Drazin invertible elements a, b ∈ R,Zhuang, Chen et al [16] proved that a + b is Drazin invertible if and only if 1 + a D b is Drazin invertible.Moreover, the representation of (a + b) D was obtained. More results on Drazin inverse can be found in [1][2][3][4][5][6]8,[11][12][13][14][15][16].…”

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Additive and Product Properties of Drazin Inverses of Elements in a Ring

Zhu

Chen

2016

Bull. Malays. Math. Sci. Soc.

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We study the Drazin inverses of the sum and product of two elements in a ring. For Drazin invertible elements a and b such that a 2 b = aba and b 2 a = bab, it is shown that ab is Drazin invertible and that a + b is Drazin invertible if and only if 1 + a D b is Drazin invertible. Moreover, the formulae of (ab) D and (a + b) D are presented. Thus, a generalization of the main result of Zhuang, Chen et al. (Linear Multilinear Algebra 60 (2012) 903-910) is given. 1 The problem of Drazin inverse of the sum of two Drazin invertible elements was first considered by Drazin in his celebrated paper [7]. It was proved that (a + b) D = a D + b D under the condition that ab = ba = 0 in associative rings. It is well known that the product ab of two commutative Drazin invertible elements a, b is Drazin invertible and (ab) D = a D b D = b D a D in a ring. In 2011, Wei and Deng [12] considered the relations between the Drazin inverses of A + B and 1 + A D B for two commutative complex matrices A and B. For two commutative Drazin invertible elements a, b ∈ R,Zhuang, Chen et al. [16] proved that a + b is Drazin invertible if and only if 1 + a D b is Drazin invertible.Moreover, the representation of (a + b) D was obtained. More results on Drazin inverse can be found in [1][2][3][4][5][6]8,[11][12][13][14][15][16].

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Representations for the Drazin inverses of the sum of two matrices and some block matrices

Cited by 24 publications

References 22 publications

On the Group Inverse for the Sum of Matrices

On the Group Inverse for the Sum of Matrices

Some additive results for the Drazin inverse and its application

Additive and Product Properties of Drazin Inverses of Elements in a Ring

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