Uniqueness of entire solutions to quasilinear equations of p-Laplace type

Abstract

We prove the uniqueness property for a class of entire solutions to the equation equation* \ arrayll - div\, A(x,∇ u) = σ, u≥ 0 in Rn, \\ |x|→ ∞\, u = 0, array . equation* where σ is a nonnegative locally finite measure in Rn, absolutely continuous with respect to the p-capacity, and div\, A(x,∇ u) is the A-Laplace operator, under standard growth and monotonicity assumptions of order p (1<p<∞) on A(x, ) (x, ∈ Rn); the model case A(x, )= | |p-2 corresponds to the p-Laplace operator p on Rn. Our main results establish uniqueness of solutions to a similar problem, equation* \ arrayll - div\, A(x,∇ u) = σ uq +μ, u≥ 0 in Rn, \\ |x|→ ∞\, u = 0, array . equation* in the sub-natural growth case 0<q<p-1, where μ, σ are nonnegative locally finite measures in Rn, absolutely continuous with respect to the p-capacity, and A(x, ) satisfies an additional homogeneity condition, which holds in particular for the p-Laplace operator.