Fock-Sobolev spaces and their Carleson measures
Abstract
We consider the Fock-Sobolev space Fp,m consisting of entire functions f such that f(m), the m-th order derivative of f, is in the Fock space Fp. We show that an entire function f is in Fp,m if and only if the function zmf(z) is in Fp. We also characterize the Carleson measures for the spaces Fp,m, establish the boundedness of the weighted Fock projection on appropriate Lp spaces, identify the Banach dual of Fp,m, and compute the complex interpolation space between two Fp,m spaces.
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