Existence of multi-solitary waves with logarithmic relative distances for the NLS equation

Abstract

We construct in this paper global (for t ≥ 0) and bounded solutions u(t) for the nonlinear Schr\"odinger equation \[i ∂t u + u + |u|p-1 u = 0, t ∈ R, x ∈ Rd\] in mass sub-critical cases (1 < p < 1 + 4d) and mass super-critical (1 + 4d < p < d+2d-2) such that u(t) decomposes asymptotically into two solitary waves with logarithmic distance \[ \|u(t) - ei γ (t) Σk=12 Q(· - xk(t))\|H1 0 \] and \[|x1(t) - x2(t)| 2 t, ast + ∞.\] The logarithmic distance is related to strong interactions between solitary waves. In the integrable case (d=1 and p=3) the existence of such solutions has been shown in [14].