Normalized solutions to Schr\"odinger systems with potentials

Abstract

In this paper, we study the normalized solutions of the Schr\"odinger system with trapping potentials equationeq:diricichlet cases - u1+V1(x)u1-λ1 u1=μ1 u13+β u1u22+ u2~in~ R3,\\ - u2+V2(x)u2-λ2 u2=μ2 u23+β u12u2+ u1~in~ R3, u1∈ H1(R3), u2∈ H1(R3), cases equation under the constraint equation ∫R3 u12=a12,~∫R3 u22=a22, equation where μ1,μ2,a1,a2,β>0, ∈R, V1(x) and V2(x) are trapping potentials, and λ1,λ2 are lagrangian multipliers, this is a typical L2-supercritical case in R3. We obtain the existence of solutions to this system by minimax theory on the manifold for =0 and ≠ 0 respectively.