The div-curl lemma for sequences whose divergence and curl are compact in W-1,1

Abstract

It is shown that uk · vk converges weakly to u· v if uk u weakly in Lp and vk v weakly in Lq with p, q∈ (1,∞), 1/p+1/q=1, under the additional assumptions that the sequences uk and vk are compact in the dual space of W1,∞0 and that uk· vk is equi-integrable. The main point is that we only require equi-integrability of the scalar product uk· vk and not of the individual sequences.