Evenly convex credal sets

Fabio Gagliardi Cozman

Evenly convex credal sets

Fabio Gagliardi Cozman

Resultado de la investigación: Contribución a una conferencia › Artículo de conferencia

Resumen

Copyright © PMLR 2017. All rights reserved. An evenly convex credal set is a set of probability measures that is evenly convex; that is, a set that is an intersection of open halfspaces. An evenly convex credal set can for instance encode preference judgments through strict and non-strict inequalities such as ℙ (A) > 1/2 and ℙ (A) ≤ 2/3. This paper presents an axiomatization of evenly convex sets from preferences, where we introduce a new (and very weak) Archimedean condition.

Idioma original	Inglés estadounidense
Páginas	109-120
Número de páginas	12
Estado	Publicada - 1 ene 2019
Publicado de forma externa	Sí
Evento	Proceedings of the 10th International Symposium on Imprecise Probability: Theories and Applications, ISIPTA 2017 - Duración: 1 ene 2019 → …

Conferencia

Conferencia	Proceedings of the 10th International Symposium on Imprecise Probability: Theories and Applications, ISIPTA 2017
Período	1/01/19 → …

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title = "Evenly convex credal sets",

abstract = "Copyright {\textcopyright} PMLR 2017. All rights reserved. An evenly convex credal set is a set of probability measures that is evenly convex; that is, a set that is an intersection of open halfspaces. An evenly convex credal set can for instance encode preference judgments through strict and non-strict inequalities such as ℙ (A) > 1/2 and ℙ (A) ≤ 2/3. This paper presents an axiomatization of evenly convex sets from preferences, where we introduce a new (and very weak) Archimedean condition.",

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AB - Copyright © PMLR 2017. All rights reserved. An evenly convex credal set is a set of probability measures that is evenly convex; that is, a set that is an intersection of open halfspaces. An evenly convex credal set can for instance encode preference judgments through strict and non-strict inequalities such as ℙ (A) > 1/2 and ℙ (A) ≤ 2/3. This paper presents an axiomatization of evenly convex sets from preferences, where we introduce a new (and very weak) Archimedean condition.

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Evenly convex credal sets

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