Differentiability almost everywhere of weak limits of bi-Sobolev homeomorphisms
Abstract
This paper investigates the differentiability of weak limits of bi-Sobolev homeomorphisms. Given p>n-1, consider a sequence of homeomorphisms fk with positive Jacobians Jfk >0 almost everywhere and k(\|fk\|W1,n-1 + \|fk-1\|W1,p) <∞. We prove that if f and h are weak limits of fk and fk-1, respectively, with positive Jacobians Jf>0 and Jh>0 a.e., then h(f(x))=x and f(h(y))=y both hold a.e.\ and f and h are differentiable almost everywhere.
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