Solutions in Lebesgue spaces to nonlinear elliptic equations with sub-natural growth terms

Abstract

We study the existence problem for positive solutions u ∈ Lr(Rn), 0<r<∞, to 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 with 1<p<∞, and σ is a nonnegative measurable function (or measure) on Rn. Our techniques rely on a study of general integral equations involving nonlinear potentials and related weighted norm inequalities. They are applicable to more general quasilinear elliptic operators such as the A-Laplacian div A(x,∇ u), and the fractional Laplacian (-)α on Rn, as well as linear uniformly elliptic operators with bounded measurable coefficients div(A ∇ u) on an arbitrary domain ⊂eq Rn with a positive Green function.