Normalized ground states for semilinear elliptic systems with critical and subcritical nonlinearities

Abstract

In the present paper, we study the normalized solutions with least energy to the following system: cases - u+λ1u=μ1 |u|p-2u+β r1|u|r1-2|v|r2u &in\; RN,\\ - v+λ2v=μ2 |v|q-2v+β r2|u|r1|v|r2-2v&in\; RN,\\ ∫ RNu2=a12and\;∫ RNv2=a22, cases where p,q,r1+r2 can be Sobolev critical. To this purpose, we study the geometry of the Pohozaev manifold and the associated minimizition problem. Under some assumption on a1,a2 and β, we obtain the existence of the positive normalized ground state solution to the above system. We have solved some unsolved open problems in this area.