Bounded point derivations on Campanato spaces
Abstract
Let X be a compact subset of the complex plane and x ∈ X. A necessary and sufficient condition is given in terms of Hausdorff contents for the existence of a bounded point derivation at x on the space of vanishing Campanato functions that are analytic in a neighborhood of X. This generalizes many known conditions for the existence of bounded point derivations on other function spaces.
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