Traces and embeddings of anisotropic function spaces
Abstract
In this paper we characterize the trace spaces of a class of weighted function spaces of intersection type with mixed regularities. To a large extent we can overcome the difficulty of mixed scales by employing a microscopic improvement in Sobolev and mixed derivative embeddings with fixed integrability. We apply the general results to prove maximal Lp-Lq-regularity for the linearized, fully inhomogeneous two-phase Stefan problem with Gibbs-Thomson correction.
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