Wolff's inequality for intrinsic nonlinear potentials and quasilinear elliptic equations

Abstract

We prove an analogue of Wolff's inequality for the so-called intrinsic nonlinear potentials associated with the quasilinear elliptic equation \[ -p u = σ uq in \;\; Rn, \] in the sub-natural growth case 0<q< p-1, where pu = div( |∇ u|p-2 ∇ u ) is the p-Laplacian, and σ is a nonnegative measurable function (or measure) on Rn. As an application, we give a necessary and sufficient condition for the existence of a positive solution u ∈ Lr(Rn) (0<r<∞) to this problem, which was open even in the case p=2. Our version of Wolff's inequality for intrinsic nonlinear potentials relies on a new characterization of discrete Littlewood-Paley spaces fp, q(σ) defined in terms of characteristic functions of dyadic cubes in Rn.