On a set of norm attaining operators and the strong Birkhoff-James orthogonality

Abstract

Continuing the study of recent results on the Birkhoff-James orthogonality and the norm attainment of operators, we introduce a property namely the adjusted Bhatia-Semrl property for operators which is weaker than the Bhatia-Semrl property. The set of operators with the adjusted Bhatia-Semrl property is contained in the set of norm attaining ones as it was in the case of the Bhatia-Semrl property. It is known that the set of operators with the Bhatia-Semrl property is norm-dense if the domain space X of the operators has the Radon-Nikod\'ym property like finite dimensional spaces, but it is not norm-dense for some classical spaces such as c0, L1[0,1] and C[0,1]. In contrast with the Bhatia-Semrl property, we show that the set of operators with the adjusted Bhatia-Semrl property is norm-dense when the domain space is c0 or L1[0,1]. Moreover, we show that the set of functionals having the adjusted Bhatia-Semrl property on C[0,1] is not norm-dense but such a set is weak-*-dense in C(K)* for any compact Hausdorff K.