Navigation auf zora.uzh.ch

Search ZORA

ZORA (Zurich Open Repository and Archive)

Surplus-invariant risk measures

Gao, Niushan; Munari, Cosimo (2020). Surplus-invariant risk measures. Mathematics of operations research, 45(4):1342-1370.

Abstract

This paper presents a systematic study of the notion of surplus invariance, which plays a natural and important role in the theory of risk measures and capital requirements. So far, this notion has been investigated in the setting of some special spaces of random variables. In this paper, we develop a theory of surplus invariance in its natural framework, namely, that of vector lattices. Besides providing a unifying perspective on the existing literature, we establish a variety of new results including dual representations and extensions of surplus-invariant risk measures and structural results for surplus-invariant acceptance sets. We illustrate the power of the lattice approach by specifying our results to model spaces with a dominating probability, including Orlicz spaces, as well as to robust model spaces without a dominating probability, where the standard topological techniques and exhaustion arguments cannot be applied.

Additional indexing

Item Type:Journal Article, refereed, original work
Communities & Collections:03 Faculty of Economics > Department of Finance
Dewey Decimal Classification:330 Economics
Scope:Discipline-based scholarship (basic research)
Language:English
Date:1 November 2020
Deposited On:15 Oct 2020 14:47
Last Modified:23 Jan 2025 02:42
Publisher:Institute for Operations Research and the Management Sciences (I N F O R M S)
ISSN:0364-765X
OA Status:Closed
Publisher DOI:https://doi.org/10.1287/moor.2019.1035
Other Identification Number:merlin-id:19872
Full text not available from this repository.

Metadata Export

Statistics

Citations

Dimensions.ai Metrics
7 citations in Web of Science®
8 citations in Scopus®
Google Scholar™

Altmetrics

Authors, Affiliations, Collaborations

Similar Publications