Extreme Behavior of Multivariate Phase-Type Distributions

Asimit, Alexandru Vali; Jones, Bruce L.

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Extreme Behavior of Multivariate Phase-Type Distributions

Insurance: Mathematics and Economics, Vol. 41, No. 2, 2007

20 Pages Posted: 10 Sep 2013 Last revised: 3 Oct 2013

See all articles by Alexandru Vali Asimit

Alexandru Vali Asimit

City University London - The Business School

Bruce L. Jones

University of Western Ontario - Department of Statistical and Actuarial Sciences

Date Written: February 16, 2006

Abstract

This paper investigates the limiting distributions of the component-wise maxima and minima of suitably normalized iid multivariate phase-type random vectors. In the case of maxima, a large parametric class of multivariate extreme value (MEV) distributions is obtained. The flexibility of this new class is exemplified in the bi-variate setup. For minima, it is shown that the dependence structure of the Marshall-Olkin class arises in the limit.

Keywords: component-wise maxima (minima), copula, Marshall-Olkin exponential distribution, multivariate extreme value distribution, Pickands’ representation

JEL Classification: C10, C60

Suggested Citation: Suggested Citation

Asimit, Alexandru Vali and Jones, Bruce L., Extreme Behavior of Multivariate Phase-Type Distributions (February 16, 2006). Insurance: Mathematics and Economics, Vol. 41, No. 2, 2007, Available at SSRN: https://ssrn.com/abstract=2323550