Quasilinear and Hessian Lane-Emden type systems with measure data

Abstract

We study nonlinear systems of the form -\pu=vq\1+μ,\;-\pv=uq\2+η and F\k[-u]=vs\1+μ,\;F\k[-v]=us\2+η in a bounded domain or in RN where μ and η are nonnegative Radon measures, \p and F\k are respectively the p-Laplacian and the k-Hessian operators and q\1, q\2, s\1 and s\2 positive numbers. We give necessary and sufficient conditions for existence expressed in terms of Riesz or Bessel capacities.