relation: https://publications.ut-capitole.fr/id/eprint/35021/ title: On a nonlinear Schrödinger equation with a localizing effect creator: Bégout, Pascal creator: Diaz, Jesus Ildefonso subject: G- MATHEMATIQUES description: 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 $\mathrm{Re}(a)+\mathrm{Im}(a)>0$ 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. publisher: Elsevier date: 2006 type: Article type: NonPeerReviewed format: text language: fr identifier: https://publications.ut-capitole.fr/id/eprint/35021/1/Begout_35021.pdf identifier: Bégout, Pascal and Diaz, Jesus Ildefonso (2006) On a nonlinear Schrödinger equation with a localizing effect. Comptes rendus. Mathematique, 342 (7). pp. 459-463. language: en language: fr