A constrained minimization problem related to two coupled pseudo-relativistic Hartree equations

Abstract

We are concerned with the following constrained minimization problem: e(a1,a2,β) := ∈f\Ea1,a2,β(u1,u2): \|u1\|L2(R3) = \|u2\|L2(R3) = 1\, where Ea1,a2,β is the energy functional associated to two coupled pseudo-relativistic Hartree equations involving three parameters a1, a2, β and two trapping potentials V1(x) and V2(x). In this paper, we obtain the existence of minimizers of e(a1,a2,β) for possible a1, a2 and β under suitable conditions on the potentials, which generalizes the results of the papers [16,17,18] in different senses.