A priori H\"older estimates for equations degenerating on nodal sets

Abstract

We prove a priori H\"older bounds for continuous solutions to degenerate equations with variable coefficients of type div(u2 A∇ w)=0 \ ⊂ Rn, with div(A∇ u)=0, where A is a Lipschitz continuous, uniformly elliptic matrix (possibly u has non-trivial singular nodal set). Such estimates are uniform with respect to u in a class of normalized solutions that have a bounded Almgren frequency. As a consequence, a boundary Harnack principle holds for the quotient of two solutions vanishing on a common set. This analysis relies on a detailed study of the associated weighted Sobolev spaces, including integrability of the weight, capacitary properties of the nodal set, and uniform Sobolev inequalities yielding local boundedness of solutions.