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This paper explores the portfolio aggregation problem within the framework of set-valued risk measures, with a specific emphasis on maximal correlation risk measures, as introduced in this work. We propose a novel stochastic ordering concept for random vectors and establish consistency properties for maximal correlation risk measures in this setting. Furthermore, we demonstrate convex-type consistency for a specific subclass of law-invariant convex set-valued risk measures, highlighting both their theoretical foundations and practical significance.

Stochastic orderings for set-valued risk measures

Mastrogiacomo, Elisa;Tarsia, Marco
2026-01-01

Abstract

This paper explores the portfolio aggregation problem within the framework of set-valued risk measures, with a specific emphasis on maximal correlation risk measures, as introduced in this work. We propose a novel stochastic ordering concept for random vectors and establish consistency properties for maximal correlation risk measures in this setting. Furthermore, we demonstrate convex-type consistency for a specific subclass of law-invariant convex set-valued risk measures, highlighting both their theoretical foundations and practical significance.
2026
WOS:001666869600001
Law-invariant convex risk measure; Portfolio aggregator; Set-valued risk measure; Multivariate stochastic ordering; Set-valued upper expectation
Mastrogiacomo, Elisa; Tarsia, Marco
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11383/2206418
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