Multiple sign-changing and semi-nodal normalized solutions for a Gross-Pitaevskii type system on bounded domain: the L2-supercritical case

Abstract

In this paper we investigate the existence of multiple sign-changing and semi-nodal normalized solutions for an m-coupled elliptic system of the Gross-Pitaevskii type: equation \ aligned &- uj + λj uj = Σk=1 mβkj uk2 uj, uj ∈ H01(), &∫ uj2dx = cj, j = 1,2,·s,m. aligned . equation Here, ⊂ RN (N = 3,4) is a bounded domain. The constants βkj ≠ 0 and cj > 0 are prescribed constants, while λ1, ·s, λm are unknown and appear as Lagrange multipliers. This is the first result in the literature on the existence and multiplicity of sign-changing and semi-nodal normalized solutions of couple Schr\"odinger system in all regimes of βkj. The main tool which we use is a new skill of vector linking and this article attempts for the first time to use linking method to search for solutions of a coupled system. Particularly, to obtain semi-nodal normalized solutions, we introduce partial vector linking which is new up to our knowledge. Moreover, by investigating the limit process as c=(c1,…,cm) 0 we obtain some bifurcation results. Note that when N=4, the system is of Sobolev critical.