Existence and symmetry of positive ground states for a doubly critical Schrodinger system

Abstract

We study the following doubly critical Schr\"odinger system - u -1|x|2u=u2-1+ u-1v, x∈ , - v -2|x|2v=v2-1 + uv-1, x∈ , u, v∈ D1, 2(), u, v>0 in 0, where N 3, 1, 2∈ (0, (N-2)24), 2=2NN-2 and >1, >1 satisfying +=2. This problem is related to coupled nonlinear Schr\"odinger equations with critical exponent for Bose-Einstein condensate. For different ranges of N, , and >0, we obtain positive ground state solutions via some quite different methods, which are all radially symmetric. It turns out that the least energy level depends heavily on the relations among , and 2. Besides, for sufficiently small >0, positive solutions are also obtained via a variational perturbation approach. Note that the Palais-Smale condition can not hold for any positive energy level, which makes the study via variational methods rather complicated.