Weak limits of Sobolev homeomorphisms are one to one
Abstract
We prove that the key property in models of Nonlinear Elasticity which corresponds to the non-interpenetration of matter, i.e. injectivity a.e., can be achieved in the class of weak limits of homeomorphisms under very minimal assumptions. Let ⊂eq Rn be a domain and let p>n2 for n≥ 4 or p≥ 1 for n=2,3. Assume that fk∈ W1,p is a sequence of homeomorphisms such that fk f weakly in W1,p and assume that Jf>0 a.e. Then we show that f is injective a.e.
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