Poisson point processes: large deviation inequalities for the convex distance

DC ElementWertSprache
dc.contributor.authorReitzner, Matthias
dc.date.accessioned2021-12-23T16:01:52Z-
dc.date.available2021-12-23T16:01:52Z-
dc.date.issued2013
dc.identifier.issn1083589X
dc.identifier.urihttps://osnascholar.ub.uni-osnabrueck.de/handle/unios/5217-
dc.description.abstractAn analogue of Talagrand's convex distance for binomial and Poisson point processes is defined. A corresponding large deviation inequality is proved.
dc.description.sponsorshipERC Advanced Research Grant [267165]; This work was partially supported by ERC Advanced Research Grant no 267165 (DISCONV). The author thanks Imre Barany and the Renyi Institute of Mathematics, Hungarian Academy of Sciences, for the kind invitation and a fruitful meeting in Budapest, where this work got started.
dc.language.isoen
dc.publisherUNIV WASHINGTON, DEPT MATHEMATICS
dc.relation.ispartofELECTRONIC COMMUNICATIONS IN PROBABILITY
dc.subjectconvex distance
dc.subjectlarge deviation inequality
dc.subjectLOGARITHMIC SOBOLEV INEQUALITIES
dc.subjectMathematics
dc.subjectPoisson point process
dc.subjectStatistics & Probability
dc.titlePoisson point processes: large deviation inequalities for the convex distance
dc.typejournal article
dc.identifier.doi10.1214/ECP.v18-2851
dc.identifier.isiISI:000331465300001
dc.description.volume18
dc.description.startpage1
dc.description.endpage7
dc.publisher.placeBOX 354350, SEATTLE, WASHINGTON 98195-4350 USA
dcterms.isPartOf.abbreviationElectron. Commun. Probab.
dcterms.oaStatusGreen Submitted, gold
crisitem.author.deptFB 06 - Mathematik/Informatik-
crisitem.author.deptidfb06-
crisitem.author.parentorgUniversität Osnabrück-
crisitem.author.netidReMa759-
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