A new div-curl result. Applications to the homogenization of elliptic systems and to the weak continuity of the Jacobian

Abstract

In this paper a new div-curl result is established in an open set of RN, N≥ 2, for the product of two sequences of vector-valued functions which are bounded respectively in Lp()N and Lq()N, with 1/p+1/q=1+1/(N-1), and whose respectively divergence and curl are compact in suitable spaces. We also assume that the product converges weakly in W-1,1(). The key ingredient of the proof is a compactness result for bounded sequences in W1,q(), based on the imbedding of W1,q(S\N-1) into Lp'(S\N-1) (S\N-1 the unit sphere of RN) through a suitable selection of annuli on which the gradients are not too high, in the spirit of De Giorgi and Manfredi. The div-curl result is applied to the homogenization of equi-coercive systems whose coefficients are equi-bounded in L() for some N-1 2 if N2, or in L1() if N=2. It also allows us to prove a weak continuity result for the Jacobian for bounded sequences in W1,N-1() satisfying an alternative assumption to the L∞-strong estimate of Brezis and Nguyen. Two examples show the sharpness of the results.