The compactness of minimizing sequences for a nonlinear Schr\"odinger system with potentials

Abstract

In this paper, we consider the following minimizing problem with two constraints: \[ ∈f \ E(u) | u=(u1,u2), \ \| u1 \|L22 = α1, \ \| u2 \|L22 = α2 \, \] where α1,α2 > 0 and E(u) is defined by \[ E(u) := ∫RN \12 Σi=12 ( |∇ u1|2 + Vi (x) |ui|2 ) - Σi=12 μi2pi+2 |ui|2pi+2 - βp3+1 |u1|p3+1 |u2|p3+1 \ d x. \] Here N ≥ 1, μ1,μ2,β > 0 and Vi(x) (i=1,2) are given functions. For Vi(x), we consider two cases: (i) both of V1 and V2 are bounded, (ii) one of V1 and V2 is bounded. Under some assumptions on Vi and pj, we discuss the compactness of any minimizing sequence.