An abstract approach to approximations in spaces of pseudocontinuable functions

Abstract

We give an abstract approach to approximations with a wide range of regularity classes X in spaces of pseudocontinuable functions Kp, where is an inner function and p>0. More precisely, we demonstrate a general principle, attributed to A. B. Aleksandrov, which asserts that if a certain linear manifold X is dense in the space of pseudocontinuable functions Kp0, for some p0>0, then X is in fact dense in Kp, for all p>0. %This allows for generalizations of the recent result on density by functions with smooth boundary extensions. Moreover, for a rich class of Banach spaces of analytic functions X, we describe the precise mechanism that determines when X is dense in a certain space of pseudocontinuable functions. As a consequence, we obtain an extension of Aleksandrov's density theorem to the class of analytic functions with uniformly convergent Taylor series.

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