Average gradient localisation for degenerate elliptic equations in the plane

Abstract

We consider Lipschitz solutions to the possibly highly degenerate elliptic equation div G(∇ u)=0 in B1⊂R2 , for any continuous strictly monotone vector field G R2 R2. We show that u is either C1 at 0, or any blowup limit v(x)= u(δ x)-u(0)δ along a sequence δ 0 satisfies ∇ v∈ D S a.e . Here, D and S can be roughly interpreted as the sets where ellipticity degenerates from below and above, that is, the symmetric parts of ∇ G and (∇ G)-1 have a zero eigenvalue. This is a strong indication in favor of the expected continuity of H(∇ u) for any continuous H vanishing on D S. In contrast with previous results in the same spirit, we do not make any assumption on the structure of G besides its continuity and strict monotony.