Multiple positive normalized solutions for nonlinear Schr\"odinger systems

Abstract

We consider the existence of multiple positive solutions to the nonlinear Schr\"odinger systems sets on H1(RN) × H1(RN), \[ \ aligned - u1 &= λ1 u1 + μ1 |u1|p1 -2u1 + β r1 |u1|r1-2 u1|u2|r2, - u2 &= λ2 u2 + μ2 |u2|p2 -2u2 + β r2 |u1|r1 |u2|r2 -2 u2, aligned . \] under the constraint \[ ∫RN|u1|2 \, dx = a1, ∫RN|u2|2 \, dx = a2. \] Here a1, a2 >0 are prescribed, μ1, μ2, β>0, and the frequencies λ1, λ2 are unknown and will appear as Lagrange multipliers. Two cases are studied, the first when N ≥ 1, 2 < p1, p2 < 2 + 4N, r1, r2 > 1, 2 + 4N < r1 + r2 < 2*, the second when N ≥ 1, 2+ 4N < p1, p2 < 2*, r1, r2 > 1, r1 + r2 < 2 + 4N. In both cases, assuming that β >0 is sufficiently small, we prove the existence of two positive solutions. The first one is a local minimizer for which we establish the compactness of the minimizing sequences and also discuss the orbital stability of the associated standing waves. The second solution is obtained through a constrained mountain pass and a constrained linking respectively.