Carl C. Cowen, Christopher Felder
Published 2021-09-24Version 1
This paper discusses the convexity of the range of the Berezin transform. For a bounded operator $T$ acting on a reproducing kernel Hilbert space $H$ (on a set $X$), this is the set $B(T) : = \{ < Tk_x, k_x >_H : x \in X \}$, where $k_x$ is the normalized reproducing kernel for $H$ at $x \in X$. Primarily, we focus on characterizing convexity of this range for a class of composition operators acting on the Hardy space of the unit disk.
Journal: Linear Algebra and its Applications Volume 647, 15 August 2022, Pages 47-63
Composition operators and convexity of their Berezin range
Essentially Normal Composition Operators on $H^2$
Range of Berezin Transform
![QR code for arXiv:2109.12095 [math.FA]](http://oss.arxitics.com/images/favicon.svg)