A note on the Drazin inverses with Banachiewicz–Schur forms

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摘要

Let H be a Hilbert space, M the closed subspace of H with orthocomplement M⊥. According to the orthogonal decomposition H=M⊕M⊥, every operator M∈B(H) can be written in a block-form M=ABCD. In this note, we give necessary and sufficient conditions for a partitioned operator matrix M to have the Drazin inverse with Banachiewicz–Schur form. In addition, this paper investigates the relations among the Drazin inverse, the Moore–Penrose inverse and the group inverse when they can be expressed in the Banachiewicz–Schur forms.

论文关键词:Banachiewicz–Schur form,Generalized inverse,Generalized Schur complement,Drazin inverse,Moore–Penrose inverse,EP-operator

论文评审过程:Available online 11 March 2009.

论文官网地址:https://doi.org/10.1016/j.amc.2009.03.008