Weak limit of homeomorphisms in W1,n-1: invertibility and lower semicontinuity of energy

Abstract

Let , '⊂Rn be bounded domains and let fm' be a sequence of homeomorphisms with positive Jacobians Jfm >0 a.e. and prescribed Dirichlet boundary data. Let all fm satisfy the Lusin (N) condition and m ∫(|Dfm|n-1+A(|cof Dfm|)+φ(Jf))<∞, where A and are positive convex functions. Let f be a weak limit of fm in W1,n-1. Provided certain growth behaviour of A and , we show that f satisfies the (INV) condition of Conti and De Lellis, the Lusin (N) condition, and polyconvex energies are lower semicontinuous.

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