Injectivity in second-gradient Nonlinear Elasticity
Abstract
We study injectivity for models of Nonlinear Elasticity that involve the second gradient. We assume that ⊂Rn is a domain, f∈ W2,q(,Rn) satisfies |Jf|-a∈ L1 and that f equals a given homeomorphism on ∂ . Under suitable conditions on q and a we show that f must be a homeomorphism. As a main new tool we find an optimal condition for a and q that imply that Hn-1(\Jf=0\)=0 and hence Jf cannot change sign. We further specify in dependence of q and a the maximal Hausdorff dimension d of the critical set \Jf=0\. The sharpness of our conditions for d is demonstrated by constructing respective counterexamples.
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