Analytic structure in spaces of Lipschitz functions
Abstract
Let U ⊂eq C be bounded and open. For 0 < α < 1, Aα(U) is the set of functions in the little Lipschitz class with exponent α that are analytic in a neighborhood of U. We consider three conditions, motivated by the properties of bounded point derivations, that show how the functions in Aα(U) can have additional analytic structure than would otherwise be expected. We prove an implication between conditions (c) and (b) and show that there is no implication between conditions (a) and (c).
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