Please use this identifier to cite or link to this item: https://repository.iimb.ac.in/handle/2074/11198
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dc.contributor.authorDing, Jian
dc.contributor.authorRoy, Rishideep
dc.contributor.authorZeitouni, Ofer
dc.date.accessioned2020-03-31T13:08:11Z-
dc.date.available2020-03-31T13:08:11Z-
dc.date.issued2017
dc.identifier.issn0091-1798
dc.identifier.urihttps://repository.iimb.ac.in/handle/2074/11198-
dc.description.abstractWe show that the centered maximum of a sequence of logarithmically correlated Gaussian fields in any dimension converges in distribution, under the assumption that the covariances of the fields converge in a suitable sense. We identify the limit as a randomly shifted Gumbel distribution, and characterize the random shift as the limit in distribution of a sequence of random variables, reminiscent of the derivative martingale in the theory of branching random walk and Gaussian chaos. We also discuss applications of the main convergence theorem and discuss examples that show that for logarithmically correlated fields; some additional structural assumptions of the type we make are needed for convergence of the centered maximum.
dc.publisherInstitute of Mathematical Statistics
dc.subjectExtremes Values
dc.subjectGaussian Processes
dc.subjectLog-Correlated Fields
dc.titleConvergence of the centered maximum of log-correlated gaussian fields
dc.typeJournal Article
dc.identifier.doi10.1214/16-AOP1152
dc.pages3886-3928p.
dc.vol.noVol.45-
dc.issue.noIss.6-
dc.journal.nameAnnals of Probability
Appears in Collections:2010-2019
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