Existence and regularity estimates for quasilinear equations with measure data: the case 1<p≤ 3n-22n-1

Abstract

We obtain existence and global regularity estimates for gradients of solutions to quasilinear elliptic equations with measure data whose prototypes are of the form - div (|∇ u|p-2 ∇ u)= δ\, |∇ u|q +μ in a bounded main ⊂n potentially with non-smooth boundary. Here either δ=0 or δ=1, μ is a finite signed Radon measure in , and q is of linear or super-linear growth, i.e., q≥ 1. Our main concern is to extend earlier results to the strongly singular case 1<p≤ 3n-22n-1. In particular, in the case δ=1 which corresponds to a Riccati type equation, we settle the question of solvability that has been raised for some time in the literature.