Boundary regularity for elliptic systems under a natural growth condition

Abstract

We consider weak solutions u ∈ u0 + W1,20(,RN) L∞(,RN) of second order nonlinear elliptic systems of the type - div a (·, u, Du) = b(·,u,Du) in with an inhomogeneity satisfying a natural growth condition. In dimensions n ∈ \2,3,4\ we show that Hn-1-almost every boundary point is a regular point for Du, provided that the boundary data and the coefficients are sufficiently smooth.