Ws,ns-maps with positive distributional Jacobians
Abstract
We extend the well-known result that any f ∈ W1,n(,Rn), ⊂ Rn with strictly positive Jacobian is actually continuous: it is also true for fractional Sobolev spaces Ws,ns() for any s ≥ nn+1, where the sign condition on the Jacobian is understood in a distributional sense. Along the way we also obtain extensions to fractional Sobolev spaces Ws,ns of the degree estimates known for W1,n-maps with positive or non-negative Jacobian, such as the sense-preserving property.
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