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Université d'Orléans |  |
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Université d'Orléans | |
| HAL: hal-00698540, version 1 |
| arXiv: 1206.0835 |
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| Schrodinger Equation on homogeneous trees |
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| Alaa Jamal Eddine 1 |
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| (2012-05-16) |
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| Let T be a homogeneous tree and L the Laplace operator on T. We consider the semilinear Schrodinger equation associated to L with a power-like nonlinearity F of degree d. We first obtain dispersive estimates and Strichartz estimates with no admissibility conditions. We next deduce global well-posedness for small L2 data with no gauge invariance assumption on the nonlinearity F. On the other hand if F is gauge invariant, L2 conservation leads to global well-posedness for arbitrary L2 data. Notice that, in contrast with the Euclidean case, these global well-posedness results hold with no restriction on d > 1. We finally prove scattering for small L2 data, with no gauge invariance assumption. |
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| 1: | Mathématiques - Analyse, Probabilités, Modélisation - Orléans (MAPMO) |
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Université d'Orléans – CNRS : UMR7349 |
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| Subject | : | Mathematics/Group Theory Mathematics/Analysis of PDEs |
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| homogeneous tree – nonlinear Schrodinger equation – dispersive estimate – Strichartz estimate – scattering. |
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| hal-00698540, version 1 | |
| http://hal.archives-ouvertes.fr/hal-00698540 | |
| oai:hal.archives-ouvertes.fr:hal-00698540 | |
| From: Alaa Jamal Eddine | |
| Submitted on: Wednesday, 16 May 2012 17:01:18 | |
| Updated on: Tuesday, 5 June 2012 09:56:24 | |
