Finite energy solutions to inhomogeneous nonlinear elliptic equations with sub-natural growth terms

Abstract

We obtain necessary and sufficient conditions for the existence of a positive finite energy solution to the inhomogeneous quasilinear elliptic equation \[ -p u = σ uq + μ on \;\; Rn \] in the sub-natural growth case 0<q<p-1, where p (1<p<∞) is the p-Laplacian, and σ, μ are positive Borel measures on Rn. Uniqueness of such a solution is established as well. Similar inhomogeneous problems in the sublinear case 0<q<1 are treated for the fractional Laplace operator (-)α in place of -p, on Rn for 0<α<n2, and on an arbitrary domain ⊂ Rn with positive Green's function in the classical case α = 1.