Natanael Alpay
Published 2020-09-23Version 1
The Fock space can be characterized (up to a positive multiplicative factor) as the only Hilbert space of entire functions in which the adjoint of derivation is multiplication by the complex variable. Similarly (and still up to a positive multiplicative factor) the Hardy space is the only space of functions analytic in the open unit disk for which the adjoint of the backward shift operator is the multiplication operator. In the present paper we characterize the Hardy space in term of the adjoint of the differentiation operator. We use reproducing kernel methods, which seem to also give a new characterization of the Fock space.
Multipliers of Hilbert Spaces of Analytic Functions on the Complex Half-Plane
A characterization of inner product spaces
Cesàro operators on the space of analytic functions with logarithmic growth
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