Extremal Domains for Self-Commutators in the Bergman Space

Matthew Fleeman, Dmitry Khavinson

Published 2013-11-07Version 1

In arXiv:1305.5193v1, the authors have shown that Putnam's inequality for the norm of self-commutators can be improved by a factor of $\frac{1}{2}$ for Toeplitz operators with analytic symbol $\varphi$ acting on the Bergman space $A^{2}(\Omega)$. This improved upper bound is sharp when $\varphi(\Omega)$ is a disk. In this paper we show that disks are the only domains for which the upper bound is attained.