Let $A^2$ be the Bergman space on the unit disk. A bounded operator $S$ on $A^2$ is called radial if $Sz^n = \lambda_n z^n$ for all $n\ge 0$, where $\lambda_n$ is a bounded sequence of complex numbers. We characterize the eigenvalues of radial operators that can be approximated by Toeplitz operators with bounded symbols.
Quasi-Radial and Radial Toeplitz Operators on the Unit Ball and Representation Theory
Note on Bounds for Eigenvalues using Traces
Separately Radial and Radial Toeplitz Operators on the Projective Space and Representation Theory
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