Hessian orders and multinormal distributions

Several well known integral stochastic orders (like the convex order, the supermodular order, etc.) can be defined in terms of the Hessian matrix of a class of functions. Here we consider a generic Hessian order, i.e., an integral stochastic order defined through a convex cone H of Hessian matrices,...

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Veröffentlicht in:	Journal of multivariate analysis 2009-11, Vol.100 (10), p.2324-2330
Hauptverfasser:	Arlotto, Alessandro, Scarsini, Marco
Format:	Artikel
Sprache:	eng
Schlagworte:	Algebra Calculus Completely positive order Convex cones Distribution theory domain_shs.eco.eco Dual space Economics and Finance Exact sciences and technology Hessian orders Hessian orders Multivariate normal distribution Convex cones Dual space Completely positive order Humanities and Social Sciences Linear and multilinear algebra, matrix theory Mathematics Matrix Multivariate analysis Multivariate normal distribution Normal distribution Probability and statistics Probability theory and stochastic processes Sciences and techniques of general use Statistics Stochastic analysis Stochastic models Studies
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Beschreibung
Zusammenfassung:	Several well known integral stochastic orders (like the convex order, the supermodular order, etc.) can be defined in terms of the Hessian matrix of a class of functions. Here we consider a generic Hessian order, i.e., an integral stochastic order defined through a convex cone H of Hessian matrices, and we prove that if two random vectors are ordered by the Hessian order, then their means are equal and the difference of their covariance matrices belongs to the dual of H . Then we show that the same conditions are also sufficient for multinormal random vectors. We study several particular cases of this general result.
ISSN:	0047-259X 1095-7243
DOI:	10.1016/j.jmva.2009.03.009