W2,p-A~priori estimates for the neutral Poincar\'e problem

Abstract

A degenerate oblique derivative problem is studied for uniformly elliptic operators with low regular coefficients in the framework of Sobolev's classes W2,p() for arbitrary p>1. The boundary operator is prescribed in terms of a directional derivative with respect to the vector field that becomes tangential to ∂ at the points of some non-empty subset ⊂ ∂ and is directed outwards on ∂. Under quite general assumptions of the behaviour of , we derive a priori estimates for the W2,p()-strong solutions for any p∈(1,∞).