Hostname: page-component-586b7cd67f-gb8f7 Total loading time: 0 Render date: 2024-11-25T06:03:58.972Z Has data issue: false hasContentIssue false
  • English
  • Français

Bayesian Measures of Confirmation from Scoring Rules

Published online by Cambridge University Press:  01 January 2022

Steven J. van Enk
Get access Rights & Permissions [Opens in a new window]

Abstract

I show how scoring rules, interpreted as measuring the inaccuracy of a set of degrees of belief, may be exploited to construct confirmation measures as used in Bayesian confirmation theory. I construct two confirmation measures from two particular standard scoring rules. One of these measures is genuinely new, the second is trivially ordinally equivalent to the difference measure. These two measures are tested against three well-known measures of confirmation in a simple but illuminating case that contains in a natural way the problem of irrelevant conjunction. The genuinely new measure emerges, arguably, as the best.

Type
Research Article
Information
Philosophy of Science , Volume 81 , Issue 1 , January 2014 , pp. 101 - 113
Copyright
Copyright © The Philosophy of Science Association

Access options

Get access to the full version of this content by using one of the access options below. (Log in options will check for institutional or personal access. Content may require purchase if you do not have access.)

Footnotes

I thank the anonymous referees for their very useful comments.

References

Bickel, J. Eric. 2007. “Some Comparisons among Quadratic, Spherical, and Logarithmic Scoring Rules.” Decision Analysis 4 (2): 4965.CrossRefGoogle Scholar
Carnap, Rudolf. 1962. Logical Foundations of Probability. Chicago: University of Chicago Press.Google Scholar
de Finetti, Bruno. 1990. Theory of Probability: A Critical Introductory Treatment. Vols. 1 and 2. Trans. Antonio Machi and Adrian Smith. Reprint. London: Wiley.Google Scholar
Eells, Ellery, and Fitelson, Branden. 2002. “Symmetries and Asymmetries in Evidential Support.” Philosophical Studies 107 (2): 129–42.CrossRefGoogle Scholar
Fitelson, Branden. 1999. “The Plurality of Bayesian Measures of Confirmation and the Problem of Measure Sensitivity.” Philosophy of Science 66:S362S378.CrossRefGoogle Scholar
Fitelson, Branden 2001. “Studies in Bayesian Confirmation Theory.” PhD diss., University of Wisconsin.Google Scholar
Gneiting, Tilmann, and Raftery, Adrian E.. 2007. “Strictly Proper Scoring Rules, Prediction, and Estimation.” Journal of the American Statistical Association 102 (477): 359–78.CrossRefGoogle Scholar
Good, Irving John. 1952. “Rational Decisions.” Journal of the Royal Statistical Society. Series B (Methodological) 14:107–14.Google Scholar
Good, Irving John 1983. Good Thinking: The Foundations of Probability and Its Applications. Minneapolis: University of Minnesota Press.Google Scholar
Hawthorne, James, and Fitelson, Branden. 2004. “Discussion: Re-solving Irrelevant Conjunction with Probabilistic Independence.” Philosophy of Science 71 (4): 505–14.CrossRefGoogle Scholar
Joyce, James M. 1998. “A Nonpragmatic Vindication of Probabilism.” Philosophy of Science 65:575603.CrossRefGoogle Scholar
Keynes, John Maynard. 2004. A Treatise on Probability. Mineola, NY: Courier Dover.Google Scholar
Leitgeb, Hannes, and Pettigrew, Richard. 2010. “An Objective Justification of Bayesianism I: Measuring Inaccuracy.” Philosophy of Science 77 (2): 201–35.Google Scholar
Levinstein, Benjamin Anders. 2012. “Leitgeb and Pettigrew on Accuracy and Updating.” Philosophy of Science 79 (3): 413–24.CrossRefGoogle Scholar
Milne, Peter. 1996. “log[P(h/eb)/P(h/b)] Is the One True Measure of Confirmation.” Philosophy of Science 63 (1): 2126.CrossRefGoogle Scholar
Schervish, Mark J., Kadane, Joseph B., and Seidenfeld, Teddy. 2003. “Measures of Incoherence: How Not to Gamble If You Must.” In Bayesian Statistics 7: Proceedings of the 7th Valencia Conference on Bayesian Statistics, ed. Bernardo, J. M. et al. Oxford: Oxford University Press.Google Scholar
Winkler, Robert L. 1969. “Scoring Rules and the Evaluation of Probability Assessors.” Journal of the American Statistical Association 64 (327): 1073–78.CrossRefGoogle Scholar