A priori regularity estimates for equations degenerating on nodal sets
Abstract
We prove a priori and a posteriori H\"older bounds and Schauder C1,α estimates for continuous solutions of degenerate elliptic equations with variable coefficients of the form div(|u|a A∇ w)=0 \ ⊂ R2, a∈ R, where the weight u is itself a solution to an elliptic equation of the type div(A ∇ u) = 0, with A a Lipschitz-continuous, uniformly elliptic matrix. The function u is allowed to have a nontrivial, possibly singular nodal set. The estimates are uniform with respect to u within a class of normalized solutions having bounded Almgren frequency. In the special case a = 2, our results apply to the ratio of two solutions to the same elliptic equation sharing a common zero set. Precisely, we prove higher-order boundary Harnack principles on nodal domains, via the derived Schauder estimates for the associated degenerate equations. The results are based upon a fine blow-up argument, a Liouville theorem, and quasiconformal maps.
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