Publication:
Comparison meaningful operators and ordinal invariant preferences

Consultable a partir de

2017-07-17

Date

2015

Authors

Candeal, Juan Carlos

Director

Publisher

Elsevier
Acceso abierto / Sarbide irekia
Artículo / Artikulua
Versión aceptada / Onetsi den bertsioa

Project identifier

MINECO//ECO2012-34828/ES/recolecta
ES/6PN/MTM2012-37894
MINECO//TIN2013-40765-P/ES/recolecta

Abstract

The existence of a continuous and order-preserving real-valued function, for the class of continuous and ordinal invariant total preorders, defined on the Banach space of all bounded real-valued functions, which are in turn defined on a given set Ω, is characterized. Whenever the total preorder is nontrivial, the type of representation obtained leads to a functional equation that is closely related to the concept of comparison meaningfulness, and is studied in detail in this setting. In particular, when restricted to the space of bounded and measurable real-valued functions, with respect to some algebra of subsets of Ω, we prove that, if the total preorder is also weakly Paretian, then it can be represented as a Choquet integral with respect to a {0,1}-valued capacity. Some interdisciplinary applications to measurement theory and social choice are also considered.

Keywords

Comparison meaningfulness, Ordinal invariant preferences, Ordinal covariant operators, Measurement theory, Social choice theory

Department

Matemáticas / Matematika

Faculty/School

Degree

Doctorate program

Editor version

Funding entities

This work has been partially supported by the research projects ECO2012-34828, MTM2012-37894-C02-02 and TIN2013-40765-P (Spain).

© 2015 Elsevier Inc. The manuscript version is made available under the CC BY-NC-ND 4.0 license

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