Rigidity and trace properties of divergence-measure vector fields

Abstract

We consider a -rigidity property for divergence-free vector fields in the Euclidean n-space, where (t) is a non-negative convex function vanishing only at t=0. We show that this property is always satisfied in dimension n=2, while in higher dimension it requires some further restriction on . In particular, we exhibit counterexamples to quadratic rigidity (i.e., when (t) = ct2) in dimension n 4. The validity of the quadratic rigidity, which we prove in dimension n=2, implies the existence of the trace of a divergence-measure vector field on a H1-rectifiable set S, as soon as its weak normal trace [· S] is maximal on S. As an application, we deduce that the graph of an extremal solution to the prescribed mean curvature equation in a weakly-regular domain becomes vertical near the boundary in a pointwise sense.