Continuity for Sobolev mappings with null Lagrangian bounds

Abstract

We prove the continuity of Sobolev functions ∈ W1,nloc(), ⊂ Rn, that satisfy \[ ∇ (x)n K(x)( ∇ (x), (x) + A(x)), \] where ∈ Llocn/(n-1)(, Rn) is weakly divergence-free, and K ∈ Lploc (), A ∈ Lqloc () are non-negative with p-1+q-1<1. The result is applicable to a broad class of differential inequalities of null Lagrangian type. As our principal application, we obtain a sharp continuity theorem for f ∈ W1,nloc (, Rn) satisfying the distortion inequality with defect Df(x)n K(x) Df(x) + (x); this result is new even in the planar case, and closes a significant gap between existing methods and known counterexamples. The proof relies on an overlooked Sobolev-type inequality formulated in terms of measures of superlevel sets.