Title of article
Extremes of conditioned elliptical random vectors
Author/Authors
Enkelejd Hashorva، نويسنده , , Enkelejd، نويسنده ,
Issue Information
دوفصلنامه با شماره پیاپی سال 2007
Pages
9
From page
1583
To page
1591
Abstract
Let { X n , n ⩾ 1 } be iid elliptical random vectors in R d , d ≥ 2 and let I , J be two non-empty disjoint index sets. Denote by X n , I , X n , J the subvectors of X n with indices in I , J , respectively. For any a ∈ R d such that a J is in the support of X 1 , J the conditional random sample X n , I | X n , J = a J , n ≥ 1 consists of elliptically distributed random vectors. In this paper we investigate the relation between the asymptotic behaviour of the multivariate extremes of the conditional sample and the unconditional one. We show that the asymptotic behaviour of the multivariate extremes of both samples is the same, provided that the associated random radius of X 1 has distribution function in the max-domain of attraction of a univariate extreme value distribution.
Keywords
Elliptical random vectors , Conditional distribution , Multivariate extremes , Max-domain of attraction , weak convergence , Tail asymptotics
Journal title
Journal of Multivariate Analysis
Serial Year
2007
Journal title
Journal of Multivariate Analysis
Record number
1558754
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