Birkhoff-James orthogonality and smoothness of bounded linear operators

Abstract

We present a sufficient condition for smoothness of bounded linear operators on Banach spaces for the first time. Let T, A ∈ B(X, Y), where X is a real Banach space and Y is a real normed linear space. We find sufficient condition for T B A Tx B Ax for some x ∈ SX with \|Tx\| = \|T\|, and use it to show that T is a smooth point in B(X, Y) if T attains its norm at unique (upto muliplication by scalar) vector x ∈ SX, Tx is a smooth point of Y and supy ∈ C \|Ty\| < \|T\| for all closed subsets C of SX with d( x,C) > 0. For operators on a Hilbert space H we show that T B A Tx B Ax for some x ∈ SH with \|Tx\| = \|T\| if and only if the norm attaining set MT = \ x ∈ SH : \|Tx\| = \|T\| \ = SH0 for some finite dimensional subspace H0 and \|T\|Ho < \|T\|. We also characterize smoothness of compact operators on normed spaces and bounded linear operators on Hilbert spaces.