Higher order boundary Harnack principle via degenerate equations
Abstract
As a first result we prove higher order Schauder estimates for solutions to singular/degenerate elliptic equations of type: \[ -div(aA∇ w)=af+div(aF) in\; \] for exponents a>-1, where the weight vanishes in a non degenerate manner on a regular hypersurface which can be either a part of the boundary of or mostly contained in its interior. As an application, we extend such estimates to the ratio v/u of two solutions to a second order elliptic equation in divergence form when the zero set of v includes the zero set of u which is not singular in the domain (in this case =u, a=2 and w=v/u). We prove first Ck,α-regularity of the ratio from one side of the regular part of the nodal set of u in the spirit of the higher order boundary Harnack principle established by De Silva and Savin. Then, by a gluing Lemma, the estimates extend across the regular part of the nodal set. Finally, using conformal mapping in dimension n=2, we provide local gradient estimates for the ratio which hold also across the singular set.
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