Strichartz Estimates Without Loss on Manifolds with Hyperbolic Trapped Geodesics

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dc.contributor.authorBurq, Nicolas
dc.contributor.authorGuillarmou, Colin
dc.contributor.authorHassell, Andrew
dc.date.accessioned2015-12-10T22:23:58Z
dc.date.issued2010
dc.date.updated2016-02-24T08:26:32Z
dc.description.abstractIn [Do], Doi proved that the Lt2Hx1/2 local smoothing effect for Schrödinger equations on a Riemannian manifold does not hold if the geodesic flow has one trapped trajectory. We show in contrast that Strichartz estimates and L1 → L∞ dispersive estima
dc.identifier.issn1016-443X
dc.identifier.urihttp://hdl.handle.net/1885/53047
dc.publisherBirkhauser Verlag
dc.sourceGeometric and Functional Analysis
dc.subjectKeywords: hyperbolic trapped set; Schrödinger equation; Strichartz estimates
dc.titleStrichartz Estimates Without Loss on Manifolds with Hyperbolic Trapped Geodesics
dc.typeJournal article
local.bibliographicCitation.issue3
local.bibliographicCitation.lastpage656
local.bibliographicCitation.startpage627
local.contributor.affiliationBurq, Nicolas, Universite Paris-Sud
local.contributor.affiliationGuillarmou, Colin , Ecole Normale Superieure, Paris
local.contributor.affiliationHassell, Andrew, College of Physical and Mathematical Sciences, ANU
local.contributor.authoruidHassell, Andrew, u8903849
local.description.embargo2037-12-31
local.description.notesImported from ARIES
local.identifier.absfor010108 - Operator Algebras and Functional Analysis
local.identifier.ariespublicationf2965xPUB263
local.identifier.citationvolume20
local.identifier.doi10.1007/s00039-010-0076-5
local.identifier.scopusID2-s2.0-77956649223
local.identifier.thomsonID000281717800002
local.type.statusPublished Version

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