Segregated solutions for nonlinear Schr\"odinger systems with sublinear coupling terms

Abstract

We establish the existence of infinitely many nonnegative, segregated solutions for the sublinearly coupled Schr\"odinger system equation* \aligned- u+K1(x)u&=μ up-1+ (σ1+1)β uσ1vσ2+1, &x∈RN&, - v+K2(x)v&= vp-1+(σ2+1)β uσ1+1vσ2, &x∈RN&,aligned. equation*where N ≥ 2, p ∈ (2,2*), 2* = 2N/(N-2) (2* = ∞ if N=2), Kj are radial potentials, μ, > 0, β ∈ R, and critically σj ∈ (0,1). The sublinear coupling exponents σj introduce fundamental challenges due to nonsmooth nonlinearities and singularities in standard reduction methods. To overcome this, we develop an enhanced Lyapunov-Schmidt reduction framework. By recasting the problem within a specially constructed metric space of local minimizers for an outer boundary value problem, we derive sharp a priori estimates enabling contraction mapping arguments. This approach circumvents the limitations of classical methods for sublinear couplings. We further uncover a novel "dead core" phenomenon: solutions (u, v) exhibit non-strict positivity with topological segregation. Specially, for N=2 and large integers , there exist radii 0 < R1 < R2 such that supp u ⊂ BR2(0), supp v ⊂ RN BR1(0), and u + v 0 uniformly in BR2(0) BR1(0) as ∞. Our methodology provides a versatile framework for handling nonsmooth nonlinearities in reduction techniques.

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