On a nonlinear Schrödinger equation with a localizing effect

Bégout, Pascal and Diaz, Jesus Ildefonso (2006) On a nonlinear Schrödinger equation with a localizing effect. Comptes Rendus Mathématique. Académie des Sciences, vol. 342 (n° 7). pp. 459-463.

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Official URL: http://tse-fr.eu/pub/10536

Abstract

We consider the nonlinear Schrödinger equation associated to a singular potential of the form
$a|u|^{-(1-m)}u+bu,$ for some $m\in(0,1),$ on a possible unbounded domain. We use some suitable energy methods to prove that if $\Re(a)+\Im(a)>0$ and if the initial and right hand side data have compact support then any possible solution must also have a compact support for any $t>0.$ This property contrasts with the behavior of solutions associated to regular potentials $(m\ge1).$ Related results are proved also for the associated stationary problem and for self-similar solution on the whole space and potential $a|u|^{-(1-m)}u.$ The existence of solutions is obtained by some compactness methods under additional conditions.

Item Type: Article
Language: English
Date: 1 April 2006
Refereed: Yes
Subjects: B- ECONOMIE ET FINANCE
G- MATHEMATIQUES
Divisions: Institut de mathématiques de Toulouse, TSE-R (Toulouse)
Site: UT1
Date Deposited: 18 Jan 2012 05:58
Last Modified: 12 Mar 2018 11:26
OAI ID: oai:tse-fr.eu:10536
URI: http://publications.ut-capitole.fr/id/eprint/3062

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