Partially concentrating standing waves for weakly coupled Schr\"odinger systems

Abstract

We study the existence of standing waves for the following weakly coupled system of two Schr\"odinger equations in RN, N=2,3, \[ cases i ∂t1=-22m1 1+ V1(x)1-μ1|1|21-β|2|21 & \\ i ∂t2=-22m2 2+ V2(x)2-μ2|2|22-β|1|22,& cases \] where V1 and V2 are radial potentials bounded from below. We address the case m1 20, m2 constant, and prove the existence of a standing wave solution with both nontrivial components satisfying a prescribed asymptotic profile. In particular, the second component of such solution exhibits a concentrating behavior, while the first one keeps a quantum nature.

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