Injectivity almost everywhere for weak limits of Sobolev homeomorphisms
Abstract
Let ⊂Rn be an open set and let f∈ W1,p(,Rn) be a weak (sequential) limit of Sobolev homeomorphisms. Then f is injective almost everywhere for p>n-1 both in the image and in the domain. For p≤ n-1 we construct a strong limit of homeomorphisms such that the preimage of a point is a continuum for every point in a set of positive measure in the image and a topological image of a point is a continuum for every point in a set of positive measure in the domain.
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