Ordering of multivariate risk models with respect to extreme portfolio losses
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Georg Mainik
Abstract
The notion of asymptotic portfolio loss order is introduced to compare multivariate stochastic risk models with respect to extreme portfolio losses. In the framework of multivariate regular variation comparison criteria are derived in terms of spectral measures. This allows for analytical and numerical verification in applications. Worst and best case dependence structures with respect to the asymptotic portfolio loss order are determined. Comparison criteria in terms of further stochastic ordering notions are derived. The examples include elliptical distributions and multivariate regularly varying models with Gumbel, Archimedean, and Galambos copulas. Particular interest is paid to the inverse influence of dependence on the diversification of risks with infinite expectations.
© by Oldenbourg Wissenschaftsverlag, Zurich, Germany
Articles in the same Issue
- Conditional risk and acceptability mappings as Banach-lattice valued mappings
- PCA-kernel estimation
- Some multivariate risk indicators: Minimization by using a Kiefer–Wolfowitz approach to the mirror stochastic algorithm
- Ordering of multivariate risk models with respect to extreme portfolio losses
Articles in the same Issue
- Conditional risk and acceptability mappings as Banach-lattice valued mappings
- PCA-kernel estimation
- Some multivariate risk indicators: Minimization by using a Kiefer–Wolfowitz approach to the mirror stochastic algorithm
- Ordering of multivariate risk models with respect to extreme portfolio losses
