Liouville type theorems and regularity of solutions to degenerate or singular problems part I: even solutions

Abstract

We consider a class of equations in divergence form with a singular/degenerate weight -div(|y|a A(x,y)∇ u)=|y|a f(x,y)\; or \ div(|y|aF(x,y))\;. Under suitable regularity assumptions for the matrix A and f (resp. F) we prove H\"older continuity of solutions which are even in y∈R, and possibly of their derivatives up to order two or more (Schauder estimates). In addition, we show stability of the C0,α and C1,α a priori bounds for approximating problems in the form -div((2+y2)a/2 A(x,y)∇ u)=(2+y2)a/2 f(x,y)\; or \ div((2+y2)a/2F(x,y)) as 0. Finally, we derive C0,α and C1,α bounds for inhomogenous Neumann boundary problems as well. Our method is based upon blow-up and appropriate Liouville type theorems.