Positive normalized solutions to nonlinear elliptic systems in 4 with critical Sobolev exponent

Abstract

In this paper, we consider the existence and asymptotic behavior on mass of the positive solutions to the following system: equationeqA0.1 cases - u+λ1u=μ1u3+α1|u|p-2u+β v2u&in~4,\\ - v+λ2v=μ2v3+α2|v|p-2v+β u2v&in~4,\\ cases equation under the mass constraint ∫4u2=a12∫4v2=a22, where a1,a2 are prescribed, μ1,μ2,β>0; α1,α2∈ , p\!∈\! (2,4) and λ1,λ2\!∈\! appear as Lagrange multipliers. Firstly, we establish a non-existence result for the repulsive interaction case, i.e., αi<0(i=1,2). Then turning to the case of αi>0 (i=1,2), if 2<p<3, we show that the problem admits a ground state and an excited state, which are characterized respectively by a local minimizer and a mountain-pass critical point of the corresponding energy functional. Moreover, we give a precise asymptotic behavior of these two solutions as (a1,a2) (0,0) and a1 a2. This seems to be the first contribution regarding the multiplicity as well as the synchronized mass collapse behavior of the normalized solutions to Schr\"odinger systems with Sobolev critical exponent. When 3≤ p<4, we prove an existence as well as non-existence (p=3) results of the ground states, which are characterized by constrained mountain-pass critical points of the corresponding energy functional. Furthermore, precise asymptotic behaviors of the ground states are obtained when the masses of whose two components vanish and cluster to a upper bound (or infinity), respectively.