Two-scale density of almost smooth functions in sphere-valued Sobolev spaces: A high-contrast extension of the Bethuel-Zheng theory
Abstract
In this paper we prove a strong two-scale approximation result for sphere-valued maps in L2(;W1,20(Q0;S2)), where ⊂ R3 is an open domain and Q0⊂ Q an open subset of the unit cube Q=(0,1)3. The proof relies on a generalization of the seminal argument by F. Bethuel and X.M. Zheng to the two-scale setting. We then present an application to a variational problem in high-contrast micromagnetics.
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