On the convexity of the Berezin range of composition operators and related questions

Abstract

The Berezin range of a bounded operator T acting on a reproducing kernel Hilbert space H is the set B(T) := \ Tkx,kx H : x ∈ X\, where kx is the normalized reproducing kernel for H at x ∈ X. In general, the Berezin range of an operator is not convex. Primarily, we focus on characterizing the convexity of the Berezin range for a class of composition operators acting on the Fock space on C and the Dirichlet space of the unit disc D. We prove an analogue of the elliptic range theorem for the unitarily equivalent Berezin range of an operator on a two-dimensional reproducing kernel Hilbert space and characterize the convexity of the unitarily equivalent Berezin range for a bounded operator T on a reproducing kernel Hilbert space H.