Capital allocation rules and the no-undercut property

Gabriele Canna; Francesca Centrone; Emanuela Rosazza Gianin

doi:10.3390/math9020175

Capital allocation rules and the no-undercut property

Gabriele Canna
, Francesca Centrone
, Emanuela Rosazza Gianin

Department of Economics and Business Studies

Research output: Contribution to journal › Review article › peer-review

Abstract

This paper makes the point on a well known property of capital allocation rules, namely the one called no-undercut. Its desirability in capital allocation stems from some stability game theoretical features that are related to the notion of core, both for finite and infinite games. We review these aspects, by relating them to the properties of the risk measures that are involved in capital allocation problems. We also discuss some problems and possible extensions that arise when we deal with non-coherent risk measures.

Original language	English
Article number	175
Pages (from-to)	1-13
Number of pages	13
Journal	Mathematics
Volume	9
Issue number	2
DOIs	https://doi.org/10.3390/math9020175
Publication status	Published - 2 Jan 2021

Keywords

Capital allocation
Choquet integral
Cooperative games
Risk measures

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10.3390/math9020175

Cite this

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abstract = "This paper makes the point on a well known property of capital allocation rules, namely the one called no-undercut. Its desirability in capital allocation stems from some stability game theoretical features that are related to the notion of core, both for finite and infinite games. We review these aspects, by relating them to the properties of the risk measures that are involved in capital allocation problems. We also discuss some problems and possible extensions that arise when we deal with non-coherent risk measures.",

keywords = "Capital allocation, Choquet integral, Cooperative games, Risk measures",

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N2 - This paper makes the point on a well known property of capital allocation rules, namely the one called no-undercut. Its desirability in capital allocation stems from some stability game theoretical features that are related to the notion of core, both for finite and infinite games. We review these aspects, by relating them to the properties of the risk measures that are involved in capital allocation problems. We also discuss some problems and possible extensions that arise when we deal with non-coherent risk measures.

AB - This paper makes the point on a well known property of capital allocation rules, namely the one called no-undercut. Its desirability in capital allocation stems from some stability game theoretical features that are related to the notion of core, both for finite and infinite games. We review these aspects, by relating them to the properties of the risk measures that are involved in capital allocation problems. We also discuss some problems and possible extensions that arise when we deal with non-coherent risk measures.

KW - Capital allocation

KW - Choquet integral

KW - Cooperative games

KW - Risk measures

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DO - 10.3390/math9020175

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Capital allocation rules and the no-undercut property

Abstract

Keywords

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