Abstract
The main concern of this article is the perturbation problem for outer inverses of linear bounded operators in Banach spaces. We consider the following perturbed problem. Let T∈B(X,Y) with an outer inverse T{2}∈B(Y,X) and δT∈B(X,Y) with ‖δTT{2}‖<1. What condition on the small perturbation δT can guarantee that the simplest possible expression B=T{2}(I+δTT{2})−1 is a generalized inverse, Moore–Penrose inverse, group inverse, or Drazin inverse of T+δT? In this article, we give a complete solution to this problem. Since the generalized inverse, Moore–Penrose inverse, group inverse, and Drazin inverse are outer inverses, our results extend and improve many previous results in this area.
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