On the failure of the chain rule for the divergence of Sobolev vector fields

Abstract

We construct a large class of incompressible vector fields with Sobolev regularity, in dimension d ≥ 3, for which the chain rule problem has a negative answer. In particular, for any renormalization map β (satisfying suitable assumptions) and any (distributional) renormalization defect T of the form T = div\, h, where h is an L1 vector field, we can construct an incompressible Sobolev vector field u ∈ W1, p and a density ∈ Lp for which div\, ( u) =0 but div\, (β() u) = T, provided 1/p + 1/ p ≥ 1 + 1/(d-1)