Characterizing Sobolev Homeomorphic Extensions via Internal Distances

Abstract

We give a full characterization of embeddings of the unit circle that admit a Sobolev homeomorphic extension to the unit disk. As a direct corollary, we establish that for quasiconvex target domains Y, any homeomorphism ∂ D ∂ Y that admits a continuous W1,p-extension to the unit disk D also admits a W1,p-homeomorphic extension. These Sobolev variants of the classical Jordan-Sch\"onflies theorem are essential for ensuring the well-posedness of variational problems arising in Nonlinear Elasticity and Geometric Function Theory.

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