Advanced search
1 file | 382.68 KB Add to list

Exchangeable choice functions

Arthur Van Camp (UGent) and Gert De Cooman (UGent)
Author
Organization
Abstract
We investigate how to model exchangeability with choice functions. Exchangeability is a structural assessment on a sequence of uncertain variables. We show how such assessments constitute a special kind of indifference assessment, and how this idea leads to a counterpart of de Finetti’s Representation Theorem, both in a finite and a countable context.
Keywords
Exchangeability, Choice functions, Indifference, Sets of desirable gambles, Representation, Coherence

Downloads

  • exchangeability-ijar-revision-2.pdf
    • full text
    • |
    • open access
    • |
    • PDF
    • |
    • 382.68 KB

Citation

Please use this url to cite or link to this publication:

MLA
Van Camp, Arthur, and Gert De Cooman. “Exchangeable Choice Functions.” INTERNATIONAL JOURNAL OF APPROXIMATE REASONING, vol. 100, Elsevier BV, 2018, pp. 85–104.
APA
Van Camp, A., & De Cooman, G. (2018). Exchangeable choice functions. INTERNATIONAL JOURNAL OF APPROXIMATE REASONING, 100, 85–104.
Chicago author-date
Van Camp, Arthur, and Gert De Cooman. 2018. “Exchangeable Choice Functions.” INTERNATIONAL JOURNAL OF APPROXIMATE REASONING 100: 85–104.
Chicago author-date (all authors)
Van Camp, Arthur, and Gert De Cooman. 2018. “Exchangeable Choice Functions.” INTERNATIONAL JOURNAL OF APPROXIMATE REASONING 100: 85–104.
Vancouver
1.
Van Camp A, De Cooman G. Exchangeable choice functions. INTERNATIONAL JOURNAL OF APPROXIMATE REASONING. 2018;100:85–104.
IEEE
[1]
A. Van Camp and G. De Cooman, “Exchangeable choice functions,” INTERNATIONAL JOURNAL OF APPROXIMATE REASONING, vol. 100, pp. 85–104, 2018.
@article{8570416,
  abstract     = {We investigate how to model exchangeability with choice functions. Exchangeability is a structural assessment on a sequence of uncertain variables. We show how such assessments constitute a special kind of indifference assessment, and how this idea leads to a counterpart of de Finetti’s Representation Theorem, both in a finite and a countable context.},
  author       = {Van Camp, Arthur and De Cooman, Gert},
  issn         = {0888-613X},
  journal      = {INTERNATIONAL JOURNAL OF APPROXIMATE REASONING},
  keywords     = {Exchangeability,Choice functions,Indifference,Sets of desirable gambles,Representation,Coherence},
  language     = {eng},
  location     = {Lugano, SWITZERLAND},
  pages        = {85--104},
  publisher    = {Elsevier BV},
  title        = {Exchangeable choice functions},
  url          = {http://dx.doi.org/10.1016/j.ijar.2018.05.006},
  volume       = {100},
  year         = {2018},
}

Altmetric
View in Altmetric
Web of Science
Times cited: