On the Grothendieck duality for the space of holomorphic Sobolev functions

Abstract

We describe the strong dual space ( Os (D))* for the space Os (D) = Hs (D) O (D) of holomorphic functions from the Sobolev space Hs(D), s ∈ Z, over a bounded simply connected plane domain D with infinitely differential boundary ∂ D. We identify the dual space with the space of holomorhic functions on Cn D that belong to H1-s (G D) for any bounded domain G, containing the compact D, and vanish at the infinity. As a corollary, we obtain a description of the strong dual space ( OF (D))* for the space OF (D) of holomorphic functions of finite order of growth in D (here, OF (D) is endowed with the inductive limit topology with respect to the family of spaces Os (D), s ∈ Z). In this way we extend the classical Grothendieck-K\"othe-Sebasti\~ao e Silva duality for the space of holomorphic functions.

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