Least energy positive soultions for d-coupled Schr\"odinger systems with critical exponent in dimension three

Abstract

In the present paper, we consider the coupled Schr\"odinger systems with critical exponent: equation* cases - ui+λiui=Σj=1d βij|uj|3|ui|ui ~ in ,\\ ui ∈ H01() , i= 1,2,...,d. cases equation* Here, ⊂ R3 is a smooth bounded domain, d ≥ 2, βii>0 for every i, and βij=βji for i ≠ j. We study a Br\'ezis-Nirenberg type problem: -λ1()<λ1,·s,λd<-λ*(), where λ1() is the first eigenvalue of - with Dirichlet boundary conditions and λ*()∈ (0, λ1()). We acquire the existence of least energy positive solutions to this system for weakly cooperative case (βij>0 small) and for purely competitive case (βij≤ 0) by variational arguments. The proof is performed by mathematical induction on the number of equations, and requires more refined energy estimates for this system. Besides, we present a new nonexistence result, revealing some different phenomena comparing with the higher-dimensional case N≥ 5. It seems that this is the first paper to give a rather complete picture for the existence of least energy positive solutions to critical Schr\"odinger system in dimension three.