Smooth extensions of Sobolev boundary data in corkscrew domains with uniformly rectifiable boundaries
Abstract
Given a corkscrew domain with uniformly rectifiable boundary, we construct a surjective trace map onto the Lp Hajlasz-Sobolev space on the boundary from the space of functions on the domain with Lp norm involving the non-tangential maximal function of the gradient and the conical square function of the Hessian. This fundametally uses the Dorronsoro theorem for UR sets proven in a companion paper.
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