Nonlinear equations with gradient natural growth and distributional data, with applications to a Schr\"odinger type equation

Abstract

We obtain necessary and sufficient conditions with sharp constants on the distribution σ for the existence of a globally finite energy solution to the quasilinear equation with a gradient source term of natural growth of the form -p u = |∇ u|p + σ in a bounded open set ⊂ Rn. Here p, p>1, is the standard p-Laplacian operator defined by p u= div\, (|∇ u|p-2∇ u). The class of solutions that we are interested in consists of functions u∈ W1,p0() such that eμ u∈ W1,p0() for some μ>0 and the inequality equation* ∫ ||p |∇ u|p dx ≤ A ∫ |∇ |p dx equation* holds for all ∈ Cc∞() with some constant A>0. This is a natural class of solutions at least when the distribution σ is nonnegative. The study of -p u = |∇ u|p + σ is applied to show the existence of globally finite energy solutions to the quasilinear equation of Schr\"odinger type -p v = σ\, vp-1, v≥ 0 in , and v=1 on ∂, via the exponential transformation u v=eup-1.