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We study capital allocation rules satisfying suitable properties for convex and quasi-convex risk measures, by focusing in particular on a family of capital allocation rules based on the dual representation for risk measures and inspired by the Aumann–Shapley allocation principle. These rules extend some well known methods of capital allocation for coherent and convex risk measures to the case of non-Gateaux-differentiable risk measures. We also analyze the properties of the allocation principles here introduced and discuss their suitability in the quasi-convex context.

Centrone, F., Rosazza Gianin, E. (2018). Capital allocation à la Aumann–Shapley for non-differentiable risk measures. EUROPEAN JOURNAL OF OPERATIONAL RESEARCH, 267(2), 667-675 [10.1016/j.ejor.2017.11.051].

Capital allocation à la Aumann–Shapley for non-differentiable risk measures

Rosazza Gianin, E
2018

Abstract

We study capital allocation rules satisfying suitable properties for convex and quasi-convex risk measures, by focusing in particular on a family of capital allocation rules based on the dual representation for risk measures and inspired by the Aumann–Shapley allocation principle. These rules extend some well known methods of capital allocation for coherent and convex risk measures to the case of non-Gateaux-differentiable risk measures. We also analyze the properties of the allocation principles here introduced and discuss their suitability in the quasi-convex context.
Articolo in rivista - Articolo scientifico
Aumann–Shapley value; Capital allocation rules; Convex/quasi-convex risk measures; Gateaux differential; Risk management;
English
2018
267
2
667
675
reserved
Centrone, F., Rosazza Gianin, E. (2018). Capital allocation à la Aumann–Shapley for non-differentiable risk measures. EUROPEAN JOURNAL OF OPERATIONAL RESEARCH, 267(2), 667-675 [10.1016/j.ejor.2017.11.051].
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/10281/204990
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