Characterization of numerical radius parallelism in C*-algebras

Abstract

Let v(x) be the numerical radius of an element x in a C*-algebra A. First, we prove several numerical radius inequalities in A. Particularly, we present a refinement of the triangle inequality for the numerical radius in C*-algebras. In addition, we show that if x∈A, then v(x) = 12\|x\| if and only if \|x\| = \|Re(eiθx)\| + \|Im(eiθx)\| for all θ ∈ R. Among other things, we introduce a new type of parallelism in C*-algebras based on numerical radius. More precisely, we consider elements x and y of A which satisfy v(x + λ x) = v(x) + v(y) for some complex unit λ. We show that this relation can be characterized in terms of pure states acting on A.