Two Positive Normalized Solutions and Phase Separation for Coupled Schr\"odinger Equations on Bounded Domain with L2-Supercritical and Sobolev Critical or Subcritical Exponent

Abstract

In this paper we study the existence of positive normalized solutions of the following coupled Schr\"odinger system: align \ aligned & - u = λu u + μ1 u3 + β uv2, x ∈ , \\ & - v = λv v + μ2 v3 + β u2 v, x ∈ , \\ & u > 0, v > 0 in , u = v = 0 on ∂, aligned . align with the L2 constraint align ∫|u|2dx = c1, ∫|v|2dx = c2, align where μ1, μ2 > 0, β ≠ 0, c1, c2 > 0, and ⊂ RN (N = 3, 4) is smooth, bounded, and star-shaped. Note that the nonlinearities and the coupling terms are both L2-supercritical in dimensions 3 and 4, Sobolev subcritical in dimension 3, Sobolev critical in dimension 4. We show that this system has a positive normalized solution which is a local minimizer. We further show that the system has a second positive normalized solution, which is of M-P type when N = 3. This seems to be the first existence result of two positive normalized solutions for such a Schr\"odinger system, especially in the Sobolev critical case. We also study the limit behavior of the positive normalized solutions in the repulsive case β -∞, and phase separation is expected.

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