A dichotomy result for a modified Schr\"odinger equations on unbounded domains

Abstract

This article aims to investigate the existence of bounded positive solutions of problem \[ (P) \ arrayll - div (a(x,u,∇ u)) + At(x,u,∇ u) = g(x,u) &in ,\\ u\ = \ 0 & on ∂, array.\] with At(x,t,) = ∂ A∂ t(x,t,), a(x,t,) = ∇ A(x,t,) for a given A(x,t,) which grows as ||p + |t|p , p > 1, where ⊂eq RN, N 2, is an open connected domain with Lipschitz boundary and infinite Lebesgue measure, eventually = RN, which generalizes the modified Schr\"odinger equation \[ - div ((A*1(x) + A*2(x)|u|s) ∇ u) + s2 A*2(x)\ |u|s - 2 u\ |∇ u|2 + u\ =\ |u|μ-2u in R3. \] Under suitable assumptions on A(x,t,) and g(x,t), problem (P) has a variational structure. Then, even in lack of radial symmetry hypotheses, one bounded positive solution of (P) can be found by passing to the limit on a sequence (uk)k of bounded solutions on bounded domains. Furthermore, if stronger hypotheses are satisfied, either such a solution is nontrivial or a constant λ > 0 and a sequence of points (yk)k ⊂ RN exist such that \[ |yk| +∞ and ∫B1(yk) |uk|p dx λ for all k 1. \]