Positive least energy solutions for k-coupled Schr\"odinger system with critical exponent: the higher dimension and cooperative case

Abstract

In this paper, we study the following k-coupled nonlinear Schr\"odinger system with Sobolev critical exponent: equation* \ aligned - ui & +λiui =μi ui2*-1+Σj=1,j ik βij ui2*2-1uj2*2 in\;, ui&>0 in\; and ui=0 on\;∂, i=1,2,·s, k. aligned . equation* Here ⊂ RN is a smooth bounded domain, 2*=2NN-2 is the Sobolev critical exponent, -λ1()<λi<0, μi>0 and βij=βji 0, where λ1() is the first eigenvalue of - with the Dirichlet boundary condition. We characterize the positive least energy solution of the k-coupled system for the purely cooperative case βij>0, in higher dimension N 5. Since the k-coupled case is much more delicated, we shall introduce the idea of induction. We point out that the key idea is to give a more accurate upper bound of the least energy. It's interesting to see that the least energy of the k-coupled system decreases as k grows. Moreover, we establish the existence of positive least energy solution of the limit system in RN, as well as classification results.