New characterizations for Fock spaces
Abstract
We show that the maximal Fock space F∞α on Cn is a Lipschitz space, that is, there exists a distance dα on Cn such that an entire function f on Cn belongs to F∞α if and only if |f(z)-f(w)| Cdα(z,w) for some constant C and all z,w∈ Cn. This can be considered the Fock space version of the following classical result in complex analysis: a holomorphic function f on the unit ball Bn in Cn belongs to the Bloch space if and only if there exists a positive constant C such that |f(z)-f(w)| Cβ(z,w) for all z,w∈ Bn, where β(z,w) is the distance on Bn in the Bergman metric. We also present a new approach to Hardy-Littlewood type characterizations for Fpα.
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