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dc.creatorCordero, Elena
dc.creatorZucco, Davide
dc.date2010-10-01
dc.identifierhttps://revistas.ufro.cl/ojs/index.php/cubo/article/view/1401
dc.identifier10.4067/S0719-06462010000300014
dc.descriptionThe objective of this paper is to report on recent progress on Strichartz estimates for the Schrödinger equation and to present the state-of-the-art. These estimates have been obtained in Lebesgue spaces, Sobolev spaces and, recently, in Wiener amalgam and modulation spaces. We present and compare the different technicalities. Then, we illustrate applications to well-posedness.en-US
dc.formatapplication/pdf
dc.languageeng
dc.publisherUniversidad de La Frontera. Temuco, Chile.en-US
dc.relationhttps://revistas.ufro.cl/ojs/index.php/cubo/article/view/1401/1255
dc.sourceCUBO, A Mathematical Journal; Vol. 12 No. 3 (2010): CUBO, A Mathematical Journal; 213–239en-US
dc.sourceCUBO, A Mathematical Journal; Vol. 12 Núm. 3 (2010): CUBO, A Mathematical Journal; 213–239es-ES
dc.source0719-0646
dc.source0716-7776
dc.subjectDispersive estimatesen-US
dc.subjectStrichartz estimatesen-US
dc.subjectWiener amalgam spacesen-US
dc.subjectModulation spacesen-US
dc.subjectSchrödinger equationen-US
dc.titleStrichartz estimates for the Schrödinger equationen-US
dc.typeinfo:eu-repo/semantics/article
dc.typeinfo:eu-repo/semantics/publishedVersion


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