Existence of normalized ground state solution to a mixed Schr\"odinger system in a plane
Abstract
In this paper, we establish the existence of positive ground state solutions for a class of mixed Schr\"odinger systems with concave-convex nonlinearities in R2, subject to L2-norm constraints; that is, \[ \ aligned -∂xx u + (-)ys u + λ1 u &= μ1 up-1 + β r1 ur1-1 vr2, && -∂xx v + (-)ys v + λ2 v &= μ2 vq-1 + β r2 ur1 vr2-1, && aligned . \] subject to the L2-norm constraints: \[ ∫R2 u2 \,dxdy = a and ∫R2 v2 \,dxdy = b, \] where (x,y)∈ R2, u, v ≥ 0, s ∈ (1/2, 1 ), μ1, μ2, β > 0, r1, r2 > 1, the prescribed masses a, b > 0, and the parameters λ1, λ2 appear as Lagrange multipliers. Moreover, the exponents p, q, r1 + r2 satisfy: \[ 2(1+3s)1+s < p, q, r1 + r2 < 2s, \] where 2s = 2(1+s)1-s. To obtain our main existence results, we employ variational techniques such as the Mountain Pass Theorem, the Pohozaev manifold, Steiner rearrangement, and others, consolidating the works of Louis Jeanjean et al. jeanjean2024normalized.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.