Why Oscillation Counts: Diophantine Approximation, Geometry, and the Fourier Transform

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dc.bibliographicCitation.journalTitleSnapshots of Modern Mathematics from Oberwolfach
dc.bibliographicCitation.volume2025-09
dc.contributor.authorSrivastava, Rajula
dc.date.accessioned2026-03-05T08:55:55Z
dc.date.available2026-03-05T08:55:55Z
dc.date.issued2025
dc.description.abstractIs it possible to approximate arbitrary points in space by vectors with rational coordinates, with which we, and computers, feel much more comfortable? If yes, can we approximate those points arbitrarily close? In this snapshot, we explore how the geometric configuration of these points influences the answers to these questions. Further, we delve into the closely related problem of counting rational vectors near surfaces. The unlikely tool which helps us in this endeavour is Fourier analysis – the study of waves and oscillations!eng
dc.description.versionpublishedVersioneng
dc.identifier.urihttps://oa.tib.eu/renate/handle/123456789/31994
dc.identifier.urihttps://doi.org/10.34657/31063
dc.language.isoeng
dc.publisherOberwolfach : Mathematisches Forschungsinstitut Oberwolfach gGmbH
dc.relation.doihttps://doi.org/10.14760/SNAP-2025-009-EN
dc.relation.essn2626-1995
dc.rights.licenseAttribution-ShareAlike 4.0 Internationaleng
dc.rights.urihttp://creativecommons.org/licenses/by-sa/4.0/eng
dc.subject.ddc510
dc.subject.otherAlgebra and Number Theoryeng
dc.subject.otherAnalysiseng
dc.titleWhy Oscillation Counts: Diophantine Approximation, Geometry, and the Fourier Transformeng
dc.typeReporteng
tib.accessRightsopenAccess
wgl.contributorMFO
wgl.subjectMathematik
wgl.typeReport / Forschungsbericht / Arbeitspapier

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Snapshots of Modern Mathematics from Oberwolfach