Global Lorentz and Lorentz-Morrey estimates below the natural exponent for quasilinear equations

Abstract

Lorentz and Lorentz-Morrey estimates are obtained for gradients of very weak solutions to quasilinear equations of the form div\,A(x, ∇ u)=div\, | f|p-2 f, where div\,A(x, ∇ u) is modelled after the p-Laplacian, p>1. The estimates are global over bounded domains that satisfy a mild exterior uniform thickness condition that involves the p-capacity. The vector field datum f is allowed to have low degrees of integrability and thus solutions may not have finite Lp energy. A higher integrability result at the boundary of the ground domain is also obtained for infinite energy solutions to the associated homogeneous equations.