Holder continuity of weak solutions of p-Laplacian PDE's with VMO coefficients

Abstract

We consider solutions u∈ W1,p(;RN) of the p-Laplacian PDE equation ∇·(a(x)|Du|p-2Du)=0, equation for x∈⊂eqRn, where is open and bounded. More generally, we consider solutions of the elliptic system equation ∇·(a(x)g'(a(x)|Du|)Du|Du|)=0, x∈ equation as well as minimizers of the functional equation ∫g(a(x)|Du|)\ dx. equation In each case, the coefficient map a\ : \ →R is only assumed to be of class VMO() L∞(), which means that it may be discontinuous. Without assuming that x a(x) has any weak differentiability, we show that u∈Cloc0,α() for each 0<α<1. The preceding results are, in fact, a corollary of a much more general result, which applies to the functional equation ∫f(x,u,Du)\ dx equation in case f is only asymptotically convex.