Normalized solutions for Schr\"odinger system with subcritical Sobolev exponent and combined nonlinearities

Abstract

In this paper, we look for solutions to the following coupled Schr\"odinger system equation* cases - u+λ1u=α1|u|p-2u+μ1u3+ v2u & in \ \ RN, - v+λ2v=α2|v|p-2v+μ2v3+ u2v& in \ \ RN, cases equation* with the additional conditions ∫RNu2dx=b21 and ∫RNv2dx=b22. Here b1, b2>0 are prescribed, N≤3, μ1, μ2, α1,α2,>0, p∈ (2,4) and the frequencies λ1,λ2 are unknown and will appear as Lagrange multipliers. In the one dimension case, the energy functional is bounded from below on the product of L2-spheres, normalized ground states exist and are obtained as global minimizers. When N=2, the energy functional is not always bounded on the product of L2-spheres, we prove the existence of normalized ground states under suitable conditions on b1 and b2, which are obtained as global minimizers. When N=3, we show that under suitable conditions on b1 and b2, at least two normalized solutions exist, one is a ground state and the other is an excited state. We also shows the limit behavior of the normalized solutions as α1,α2→ 0. The first solution will disappear and the second solution will converge to the normalized solution of system (1.1) with α1=α2=0, which has been studied by T. Bartsch, L. Jeanjean and N. Soave (J. Math. Pures Appl. 2016). Furthermore, by refining the upper bound of the ground state energy, we provide a precise mass collapse behavior of the ground states. The results in this paper complement the main results established by X. Luo, X. Yang and W. Zou (arXiv:2107.08708), where the authors considered the case N=4.