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February 2012 Risk measuring under model uncertainty
Jocelyne Bion-Nadal, Magali Kervarec
Ann. Appl. Probab. 22(1): 213-238 (February 2012). DOI: 10.1214/11-AAP766

Abstract

The framework of this paper is that of risk measuring under uncertainty which is when no reference probability measure is given. To every regular convex risk measure on $\mathcal{C}_{b}(\Omega)$, we associate a unique equivalence class of probability measures on Borel sets, characterizing the riskless nonpositive elements of $\mathcal{C}_{b}(\Omega)$. We prove that the convex risk measure has a dual representation with a countable set of probability measures absolutely continuous with respect to a certain probability measure in this class. To get these results we study the topological properties of the dual of the Banach space L1(c) associated to a capacity c.

As application, we obtain that every G-expectation $\mathbb{E}$ has a representation with a countable set of probability measures absolutely continuous with respect to a probability measure P such that P(|f|) = 0 if and only iff $\mathbb{E}(|f|)=0$. We also apply our results to the case of uncertain volatility.

Citation

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Jocelyne Bion-Nadal. Magali Kervarec. "Risk measuring under model uncertainty." Ann. Appl. Probab. 22 (1) 213 - 238, February 2012. https://doi.org/10.1214/11-AAP766

Information

Published: February 2012
First available in Project Euclid: 7 February 2012

zbMATH: 1242.46006
MathSciNet: MR2932546
Digital Object Identifier: 10.1214/11-AAP766

Subjects:
Primary: 46A20 , 91B30
Secondary: 46E05

Keywords: capacity , duality theory , risk measure , uncertainty

Rights: Copyright © 2012 Institute of Mathematical Statistics

Vol.22 • No. 1 • February 2012
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