Fixed points of the Berezin transform on Fock-type spaces
Abstract
We study the fixed points of the Berezin transform on the Fock-type spaces Fm2 with the weight e-|z|m, m > 0. It is known that the Berezin transform is well-defined on the polynomials in z and z. In this paper we focus on the polynomial fixed points and we show that these polynomials must be harmonic, except possibly for countably many m ∈ (0, ∞). We also show that, in some particular cases, the fixed point polynomials are harmonic for all m.
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