Positive Least Energy Solutions and Phase Separation for Coupled Schrodinger Equations with Critical Exponent: Higher Dimensional Case

Abstract

We study the following nonlinear Schr\"odinger system which is related to Bose-Einstein condensate: displaymath cases- u +1 u = μ1 u2-1+β u22-1v22, x∈ , - v +2 v =μ2 v2-1+β v22-1 u22, x∈ , u 0, v 0 \,\,in , u=v=0 \,\,on ∂.casesdisplaymath Here ⊂ N is a smooth bounded domain, 2:=2NN-2 is the Sobolev critical exponent, -1()<1,2<0, μ1,μ2>0 and β≠ 0, where λ1() is the first eigenvalue of - with the Dirichlet boundary condition. When =0, this is just the well-known Brezis-Nirenberg problem. The special case N=4 was studied by the authors in (Arch. Ration. Mech. Anal. 205: 515-551, 2012). In this paper we consider the higher dimensional case N 5. It is interesting that we can prove the existence of a positive least energy solution (u, v) for any β≠ 0 (which can not hold in the special case N=4). We also study the limit behavior of (u, v) as β -∞ and phase separation is expected. In particular, u-v will converge to sign-changing solutions of the Brezis-Nirenberg problem, provided N 6. In case 1=2, the classification of the least energy solutions is also studied. It turns out that some quite different phenomena appear comparing to the special case N=4.