H\"older conditions and τ-spikes for analytic Lipschitz functions

Abstract

Let U be an open subset of C with boundary point x0 and let Aα(U) be the space of functions analytic on U that belong to lipα(U), the "little Lipschitz class". We consider the condition S= Σn=1∞2(t+λ+1)nM*1+α(An U)< ∞, where t is a non-negative integer, 0<λ<1, M*1+α is the lower 1+α dimensional Hausdorff content, and An = \z: 2-n-1<|z-x0|<2-n\. This is similar to a necessary and sufficient condition for bounded point derivations on Aα(U) at x0. We show that S= ∞ implies that x0 is a (t+λ)-spike for Aα(U) and that if S<∞ and U satisfies a cone condition, then the t-th derivatives of functions in Aα(U) satisfy a H\"older condition at x0 for a non-tangential approach.