Numerical radius orthogonality in C*-algebras
Abstract
In this paper we characterize the Birkhoff--James orthogonality with respect to the numerical radius norm v(·) in C*-algebras. More precisely, for two elements a, b in a C*-algebra A, we show that aBv b if and only if for each θ ∈ [0, 2π), there exists a state _θ on A such that |_θ(a)| = v(a) and Re(eiθ_θ(a)_θ(b))≥ 0. Moreover, we compute the numerical radius derivatives in A. In addition, we characterize when the numerical radius norm of the sum of two (or three) elements in A equals the sum of their numerical radius norms.
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