On smoothness and uniqueness of multi-solitons of the non-linear Schrödinger equations

• Published in: Communications in partial differential equations Vol. 46; no. 12; pp. 2325 - 2385
• Main Authors: Côte, Raphaël, Friederich, Xavier
• Format: Journal Article
• Language: English
• Published: Philadelphia Taylor & Francis 02.12.2021; Taylor & Francis Ltd
• Subjects: 35B40 (primary); Analysis of PDEs; Mathematical analysis; Mathematics; Multi-solitons; non-linear Schrödinger equations; Nonlinearity; Schrodinger equation; Smoothness; Solitary waves; Uniqueness; non-linear Schrödinger equations; smoothness; multi-solitons; uniqueness
• ISSN: 0360-5302; 1532-4133
• DOI: 10.1080/03605302.2021.1941107

In this paper, we study some properties of multi-solitons for the non-linear Schrödinger equations in with general non-linearities. Multi-solitons have already been constructed in in papers by Merle (1990), Martel and Merle (2006), and Côte, Martel and Merle (2011). We show here that multi-solitons are smooth, depending on the regularity of the non-linearity. We obtain also a result of uniqueness in some class, either when the ground states are all stable, or in the mass-critical case.