A Liouville-type theorem for the coupled Schr\"odinger systems and the uniqueness of the sign-changing radial solutions

Abstract

In this paper, we study the sign-changing radial solutions of the following coupled Schr\"odinger system equation \ arraylr -uj+λj uj=μj uj3+Σi≠ jβij ui2 uj \,\,\,\,\,\,\,\, in B1 , uj∈ H0,r1(B1) for j=1,·s,N. array . equation Here, λj,\,μj>0 and βij=βji are constants for i,j=1,·s,N and i≠ j. B1 denotes the unit ball in the Euclidean space R3 centred at the origin. For any P1,·s,PN∈N, we prove the uniqueness of the radial solution (u1,·s,uj) with uj changes its sign exactly Pj times for any j=1,·s,N in the following case: λj≥1 and |βij| are small for i,j=1,·s,N and i≠ j. New Liouville-type theorems and boundedness results are established for this purpose.