International Journal of Mathematics and Mathematical Sciences
Volume 14 (1991), Issue 3, Pages 611-614
doi:10.1155/S0161171291000832

A note on best approximation and invertibility of operators on uniformly convex Banach spaces

Abstract

It is shown that if X is a uniformly convex Banach space and S a bounded linear operator on X for which ‖I−S‖=1, then S is invertible if and only if ‖I−12S‖<1. From this it follows that if S is invertible on X then either (i) dist(I,[S])<1, or (ii) 0 is the unique best approximation to I from [S], a natural (partial) converse to the well-known sufficient condition for invertibility that dist(I,[S])<1.