Raffael Hagger
Published 2022-01-25Version 1
We give a characterization of compact and Fredholm operators on polyanalytic Fock spaces in terms of limit operators. As an application we obtain a generalization of the Bauer-Isralowitz theorem using a matrix valued Berezin type transform. We then apply this theorem to Toeplitz and Hankel operators to obtain necessary and sufficient conditions for compactness. As it turns out, whether or not a Toeplitz or Hankel operator is compact does not depend on the polyanalytic order. For Hankel operators this even holds on the true polyanalytic Fock spaces.
Quantum harmonic analysis for polyanalytic Fock spaces
On the Determinant of a Certain Wiener-Hopf + Hankel Operator
Integrable operators and the squares of Hankel operators
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