Asymptotic behavior of solutions for some nonlinear partial differential equations on unbounded domains

We study the asymptotic behavior of positive solutions u of -Delta(p)u(x) - V(x)u(x)(p-1), p > 1; x is an element of Omega, and related partial differential inequalities, as well as conditions for existence of such solutions. Here, Omega contains the exterior of a ball in R N 1 < p < N, Delta(p) is the p-Laplacian, and V is a nonnegative function. Our methods include generalized Riccati transformations, comparison theorems, and the uncertainty principle.