Fully sign-changing Nehari constraint vs sign-changing solutions of a competitive Schr\"odinger system

Abstract

We study a competitive nonlinear Schr\"odinger system in RN whose nonlinear potential is localized in small regions that shrink to isolated points. Within a variational framework based on a fully sign-changing Nehari constraint and Krasnosel'skii genus, we construct, for all >0, a sequence of sign-changing solutions with increasing and unbounded energies, and after suitable translations they converge to a sequence of sign-changing solutions of the associated limiting system as 0 in H1-norm. Moreover, these sign-changing solutions concentrate around the prescribed attraction points both in H1-norm and Lq-norm for q∈ [1,∞].