Boundary Characterizations of Little Bloch and VMOA Functions on the Half-Plane

Abstract

We extend Pommerenke's characterizations of boundary curves of conformal mappings in terms of the little Bloch and VMOA conditions from the unit disk D to the upper half-plane H. Let G HΩ be a conformal mapping onto an unbounded quasidisk Ω with G(∞)=∞, and let g RΓ=∂Ω be its boundary extension. In the non-compact setting, the Euclidean smallness on the boundary curve is not necessarily comparable to the smallness of the parameter on R. To overcome this difficulty, we use relative versions of the asymptotic conformality and the asymptotic smoothness with respect to the parametrization g. We prove that G'∈ B0(H) is equivalent to the asymptotic conformality of Γ relative to g, and also to the asymptotic symmetry of the embedding g. We further prove that G'∈ VMOA(H) is equivalent to the asymptotic smoothness of Γ relative to g, and also to the asymptotic smoothness of g. These results provide half-plane analogues of Pommerenke's theorems and clarify the role of the parametrization in the unbounded case.

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