Positive and sign-changing solutions for the nonlinear Schr\"odinger systems with synchronization and separation
Abstract
In this paper, we consider the following nonlinear Schr\"odinger system: - u+P(x)u=μ1 u3+β uv2, x ∈ R3,\\ - v+Q(x)v=μ2 v3+β u2v, x ∈ R3, where P(x),Q(x) are positive radial potentials,~μ1,\,μ2>0, β ∈ R is a coupling constant. We constructed a new type of solutions which are different from the ones obtained in PW. This new family of solutions to system have a more complex concentration structure and are centered at the points lying on the top and the bottom circles of a cylinder with height h. Moreover, we examine the effect of nonlinear coupling on the solution structure. In the repulsive case, we construct an unbounded sequence of non-radial positive vector solutions of segregated type. In the attractive case, we construct an unbounded sequence of non-radial positive vector solutions of synchronized type. Moreover, we prove that there exist infinitely many sign-changing solutions whose energy can be arbitrarily large.
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