On the existence of vector solutions to nonlinear Schr\"odinger equations with weak three-wave interaction

Abstract

We study a nonlinear Schr\"odinger system with three-wave interaction: equation* \aligned & - u1 = f1(u1) + α u2u3 in N, & - u2 = f2(u2) + α u3u1 in N, & - u3 = f3(u3) + α u1u2 in N, & u=(u1,u2,u3)∈ (H rad1(N))3, aligned. equation* where 3≤ N≤ 5, α∈ and each nonlinearity fi() satisfies the Berestycki-Lions conditions. Let Si denote the set of all least energy solutions of the scalar equation - u = fi(u) in H rad1(N). A solution of the systems is called vector if all its components are nontrivial. We establish the existence of two distinct families of vector solutions \uα\ with different asymptotic behaviors as α 0. One family satisfies dist(uα,S1× S2× S3) 0, while another satisfies dist(uα,S1× S2× \0\) 0. By contrast, we prove that no family of vector solutions satisfies dist(uα,S1× \0\× \0\) 0. Together, these results give a complete description of the asymptotic structure of vector solutions when the three-wave interaction is weak.