Segregated Solutions to Critical Elliptic Systems in High Dimensions (N ≥ 5)

Abstract

We study the existence of multiple segregated solutions to the critical coupled Schr\"odinger system \[ cases - u1 = K1(| y|) | u1|2*-2u1+β | u2|2*2| u1|2*2-2u1, & y∈ RN,\\ - u2 = K2(| y|) | u2|2*-2u2+β | u1|2*2| u2|2*2-2u2, & y∈ RN,\\ u1,u2≥0, u1,u2∈ C0( RN) D1,2( RN), cases \] with N ≥ 5, 2* = 2NN-2, radial potentials K1, K2 > 0,and repulsive coupling β < 0.Under the assumption that K1 and K2 attain local maxima at distinct radii r0 0 with precise asymptotic expansions near these points, we prove the existence of infinitely many non-radial segregated solutions (u1,k, u2,k) for all sufficiently large integers k. These solutions exhibit multiple bumps concentrating on two separate circles of radius r0 and 0 respectively. Moreover, each component develops a "dead core'' near the concentration points of the other. The proof overcomes the sublinear and non-smooth nature of the coupling term (2*/2 -1 < 1) by constructing a tailored complete metric space and combining a finite-dimensional reduction with a novel tail minimization argument.

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