Affiliation:
1. Department of Accounting, Law and Finance Grenoble Ecole de Management Grenoble France
2. Department of Economics and Political Science Vrije Universiteit Brussel Brussels Belgium
3. Department of Statistical Sciences University of Toronto Toronto Canada
Abstract
AbstractThe robustness of risk measures to changes in underlying loss distributions (distributional uncertainty) is of crucial importance in making well‐informed decisions. In this paper, we quantify, for the class of distortion risk measures with an absolutely continuous distortion function, its robustness to distributional uncertainty by deriving its largest (smallest) value when the underlying loss distribution has a known mean and variance and, furthermore, lies within a ball—specified through the Wasserstein distance—around a reference distribution. We employ the technique of isotonic projections to provide for these distortion risk measures a complete characterization of sharp bounds on their value, and we obtain quasi‐explicit bounds in the case of Value‐at‐Risk and Range‐Value‐at‐Risk. We extend our results to account for uncertainty in the first two moments and provide applications to portfolio optimization and to model risk assessment.
Funder
Natural Sciences and Engineering Research Council of Canada
Fonds Wetenschappelijk Onderzoek
Subject
Applied Mathematics,Economics and Econometrics,Social Sciences (miscellaneous),Finance,Accounting
Cited by
9 articles.
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