On existence of global solutions of the one-dimensional cubic NLS for initial data in the modulation space Mp,q(R)
Abstract:
We prove global existence for the one-dimensional cubic non-linear Schrödinger equation in modulation spaces Mp,p' for p sufficiently close to 2. In contrast to known results, [9] and [14], our result requires no smallness condition on initial data. The proof adapts a splitting method inspired by work of Vargas-Vega, Hyakuna-Tsutsumi and Grünrock to the modulation space setting and exploits polynomial growth of the free Schödinger group on modulation spaces.
| Zugehörige Institution(en) am KIT | Institut für Analysis (IANA) Sonderforschungsbereich 1173 (SFB 1173) |
| Publikationstyp | Forschungsbericht/Preprint |
| Publikationsjahr | 2016 |
| Sprache | Englisch |
| Identifikator | ISSN: 2365-662X urn:nbn:de:swb:90-595199 KITopen-ID: 1000059519 |
| Verlag | Karlsruher Institut für Technologie (KIT) |
| Umfang | 13 S. |
| Serie | CRC 1173 ; 2016/21 |
| Schlagwörter | nonlinear Schrödinger equation, global solutions, modulation spaces, infinite mass solutions |