Normalized solutions to fractional mass supercritical NLS systems with Sobolev critical nonlinearities

Abstract

In this paper, we investigate the following fractional Sobolev critical nonlinear Schr\"odinger (NLS) coupled systems: equation* \arraylll (-)s u=μ1 u+|u|2*s-2u+η1|u|p-2u+γα|u|α-2u|v|β ~ in~ RN,\\ (-)s v=μ2 v+|v|2*s-2v+η2|v|q-2v+γβ|u|α|v|β-2v ~~in~ RN,\\ \|u\|2L2=m12 ~and~ \|v\|2L2=m22, array. equation* where (-)s is the fractional Laplacian, N=3,4, s∈(0,1), μ1, μ2∈R are unknown constants, which will appear as Lagrange multipliers, 2*s is the fractional Sobolev critical index, η1, η2, γ, m1, m2>0, α>1, β>1, p, q, α+β∈(2+4s/N,2*s]. Firstly, if p, q, α+β<2*s, we obtain the existence of positive normalized solution when γ is big enough. Secondly, if p=q=α+β=2*s, we show that nonexistence of positive normalized solution. The main ideas and methods of this paper are scaling transformation, classification discussion and concentration-compactness principle.