Approximation and continuity of Moore–Penrose inverses of orthogonal row block matrices

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摘要

A well-known result on the Moore–Penrose inverse of row block matrix asserts that [A,B]†=A†B† if and only if A∗B=0, where (·)† and (·)∗ denote the Moore–Penrose inverse and the conjugate transpose of a matrix, respectively. In this paper, we show some norm inequalities for the difference [A,B]†-A†B†, and then use the norm inequalities to investigate approximation and continuity of [A,B]† as A∗B→0.

论文关键词:Block matrix,Moore–Penrose inverse,Norm inequalities,Orthogonal projector,Approximation,Continuity

论文评审过程:Available online 25 October 2008.

论文官网地址:https://doi.org/10.1016/j.amc.2008.10.027