Characterizations of operator Birkhoff-James orthogonality

Abstract

In this paper, we obtain some characterizations of the (strong) Birkhoff--James orthogonality for elements of Hilbert C*-modules and certain elements of B(H). Moreover, we obtain a kind of Pythagorean relation for bounded linear operators. In addition, for T∈ B(H) we prove that if the norm attaining set MT is a unit sphere of some finite dimensional subspace H0 of H and \|T\|H0 < \|T\|, then for every S∈B(H), T is the strong Birkhoff--James orthogonal to S if and only if there exists a unit vector ∈ H0 such that \|T\| = |T| and S*T = 0. Finally, we introduce a new type of approximate orthogonality and investigate this notion in the setting of inner product C*-modules.