G-Drazin inverse and group inverse for the anti-triangular block-operator matrices

Abstract

We present the generalized Drazin inverse for certain anti-triangular operator matrices. Let E,F,EFπ∈ B(X)d. If EFEFπ=0 and F2EFπ=0, we prove that M=( arraycc E&I F&0 array ) has g-Drazin inverse and its explicit representation is established. Moreover, necessary and sufficient conditions are given for the existence of the group inverse of M under the condition FEFπ=0. The group inverse for the anti-triangular block-operator matrices with two identical subblocks is thereby investigated. These extend the results of Zhang and Mosi\'c (Filomat, 32(2018), 5907--5917) and Zou, Chen and Mosi\'c (Studia Scient. Math. Hungar., 54(2017), 489--508).