From norm derivatives to orthogonalities in Hilbert C*-modules

Abstract

Let (X, ·, ·) be a Hilbert C*-module over a C*-algebra A and let S(A) be the set of states on A. In this paper, we first compute the norm derivative for elements x and y of X as follows align* _+(x, y) = \Re\,( x, y): \, ∈ S(A), ( x, x) = \|x\|2\. align* We then apply it to characterize different concepts of orthogonality in X. In particular, we present a simpler proof of the classical characterization of Birkhoff--James orthogonality in Hilbert C*-modules. Moreover, some generalized Daugavet equation in the C*-algebra B(H) of all bounded linear operators acting on a Hilbert space H is solved.