Solutions to a cubic Schr\"odinger system with mixed attractive and repulsive forces in a critical regime

Abstract

We study the existence of solutions to the cubic Schr\"odinger system - ui = Σj =1m βij uj2ui + λi ui\ in\ ,\ ui=0\ on\ ∂,\ i =1,…,m, when is a bounded domain in R4, λi are positive small numbers, βij are real numbers so that βii>0 and βij=βji, i≠ j. We assemble the components ui in groups so that all the interaction forces βij among components of the same group are attractive, i.e. βij>0, while forces among components of different groups are repulsive or weakly attractive, i.e. βij<β for some β small. We find solutions such that each component within a given group blows-up around the same point and the different groups blow-up around different points, as all the parameters λi's approach zero.