Convexity of the Berezin range of finite rank operators

Abstract

For a bounded linear operator T acting on a reproducing kernel Hilbert space H(Ω) over a nonempty set Ω, the Berezin range of T is defined by \[ Ber(T)=\ Tkλ,kλH : λ∈ Ω\ \] and the Berezin radius is given by \[ ber(T)=\ |γ| : γ∈ Ber(T) \, \] where kλ denotes the normalized reproducing kernel at λ∈ Ω. In this paper, we study the convexity of the Berezin range of finite rank operators on the Hardy space and the Bergman space over the unit disc D. We present applications of some scalar inequalities to get some operator inequalities. A characterization of closure of the numerical range of reproducing kernel Hilbert space operator in terms of convex hull of its Berezin range is also discussed.