Quasilinear elliptic and parabolic Robin problems on Lipschitz domains

Abstract

We prove H\"older continuity up to the boundary for solutions of quasi-linear degenerate elliptic problems in divergence form, not necessarily of variational type, on Lipschitz domains with Neumann and Robin boundary conditions. This includes the p-Laplace operator for all p ∈ (1,∞), but also operators with unbounded coefficients. Based on the elliptic result we show that the corresponding parabolic problem is well-posed in the space C() provided that the coefficients satisfy a mild monotonicity condition. More precisely, we show that the realization of the elliptic operator in C() is m-accretive and densely defined. Thus it generates a non-linear strongly continuous contraction semigroup on C().