Existence of minimal solutions to quasilinear elliptic equations with several sub-natural growth terms

Abstract

We study the existence of positive solutions to quasilinear elliptic equations of the type \[ -p u = σ uq + μ in \ Rn, \] in the sub-natural growth case 0 < q < p - 1, where pu = ∇ · ( |∇ u|p - 2 ∇ u ) is the p-Laplacian with 1 < p < n, and σ and μ are nonnegative Radon measures on Rn. We construct minimal generalized solutions under certain generalized energy conditions on σ and μ. To prove this, we give new estimates for interaction between measures. We also construct solutions to equations with several sub-natural growth terms using the same methods.