Please use this identifier to cite or link to this item: https://ir.iimcal.ac.in:8443/jspui/handle/123456789/1330
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dc.contributor.authorMukerjee, Rahul
dc.contributor.authorOng, Siewhui
dc.date.accessioned2021-08-26T06:05:25Z-
dc.date.available2021-08-26T06:05:25Z-
dc.date.issued2015
dc.identifier.urihttps://www.scopus.com/inward/record.uri?eid=2-s2.0-84925091776&doi=10.1016%2fj.jmva.2015.02.010&partnerID=40&md5=2d76c070990980df1f4abab07d8e5d9d
dc.identifier.urihttps://ir.iimcal.ac.in:8443/jspui/handle/123456789/1330-
dc.descriptionMukerjee, Rahul, Indian Institute of Management Calcutta, Joka, Diamond Harbour Road, Kolkata, 700 104, India; Ong, Siewhui, Institute of Mathematical Sciences, University of Malaya, Kuala Lumpur, 50603, Malaysia
dc.descriptionISSN/ISBN - 0047259X
dc.descriptionpp.1-6
dc.descriptionDOI - 10.1016/j.jmva.2015.02.010
dc.description.abstractLet X~Nv(0,?) be a normal vector in v(?1) dimensions, where ? is diagonal. With reference to the truncated distribution of X on the interior of a v-dimensional Euclidean ball, we completely prove a variance inequality and a covariance inequality that were recently discussed by Palombi and Toti (2013). These inequalities ensure the convergence of an algorithm for the reconstruction of ? only on the basis of the covariance matrix of X truncated to the Euclidean ball. The concept of monotone likelihood ratio is useful in our proofs. Moreover, we also prove and utilize the fact that the cumulative distribution function of any positive linear combination of independent chi-square variates is log-concave, even though the same may not be true for the corresponding density function. � 2015 Elsevier Inc.
dc.publisherSCOPUS
dc.publisherJournal of Multivariate Analysis
dc.publisherAcademic Press Inc.
dc.relation.ispartofseries139
dc.subjectChi-square distribution
dc.subjectCovariance matrix reconstruction
dc.subjectPositive linear combination
dc.subjectStochastic ordering
dc.titleVariance and covariance inequalities for truncated joint normal distribution via monotone likelihood ratio and log-concavity
dc.typeArticle
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