Solutions concentrating around the saddle points of the potential for Schr\"odinger equations with critical exponential growth

Abstract

In this paper, we deal with the following nonlinear Schr\"odinger equation -ε2 u+V(x)u=f(u),\ u∈ H1( R2), where f(t) has critical growth of Trudinger-Moser type. By using the variational techniques, we construct a positive solution uε concentrating around the saddle points of the potential V(x) as ε→ 0. Our results complete the analysis made in MR2900480 and MR3426106, where the Schr\"odinger equation was studied in RN, N≥ 3 for sub-critical and critical case respectively in the sense of Sobolev embedding. Moreover, we relax the monotonicity condition on the nonlinear term f(t)/t together with a compactness assumption on the potential V(x), imposed in MR3503193.