The g-Drazin inverses of anti-triangular block operator matrices
Abstract
An element a in a Banach algebra A has g-Drazin inverse if there exists b∈ A such that ab=ba, b=bab and a-a2b ∈ Aqnil. In this paper we find new explicit representations of the g-Drazin inverse of the block operator matrix ( arraycc E&I F&0 array ). We thereby solve a wider kind of singular differential equations posed by Campbell [S.L. Campbell, The Drazin inverse and systems of second order linear differential equations, Linear \& Multilinear Algebra, 14(1983), 195--198].
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