Hostname: page-component-8448b6f56d-c4f8m Total loading time: 0 Render date: 2024-04-23T17:11:47.075Z Has data issue: false hasContentIssue false
  • English
  • Français

Putting on the Garber Style? Better Not

Published online by Cambridge University Press:  01 January 2022

Colin Howson
Get access Rights & Permissions [Opens in a new window]

Abstract

This article argues that not only are there serious internal difficulties with both Garber’s and later ‘Garber-style’ solutions of the old-evidence problem, including a recent proposal of Hartmann and Fitelson, but Garber-style approaches in general cannot solve the problem. It also follows the earlier lead of Rosenkrantz in pointing out that, despite the appearance to the contrary which inspired Garber’s nonclassical development of the Bayesian theory, there is a straightforward, classically Bayesian, solution.

Type
Research Article
Information
Philosophy of Science , Volume 84 , Issue 4 , October 2017 , pp. 659 - 676
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 would like to thank two anonymous reviewers for their very helpful advice.

References

Corfield, David 2001. “Bayesianism in Mathematics.” In Foundations of Bayesianism, ed. Corfield, D. and Williamson, J., 175203. Dordrecht: Kluwer.CrossRefGoogle Scholar
Cox, Richard T. 1946. “Probability, Frequency and Reasonable Expectation.” American Journal of Physics 14:113.CrossRefGoogle Scholar
Cox, Richard T. 1976. Of Inference and Inquiry: An Essay in Inductive Logic. Baltimore: Johns Hopkins University Press.Google Scholar
de Finetti, Bruno. 1974. Theory of Probability. Vol. 1. Wiley.CrossRefGoogle Scholar
Dirac, Paul A. M. 1978. “The Excellence of Einstein’s Theory of Gravitation.” Paper presented at the Symposium on the Impact of Modern Scientific Ideas on Society, Munich, September 18–20. http://unesdoc.unesco.org/images/0003/000311/031102eb.pdf.Google Scholar
Dirac, Paul A. M. 1984. “The Requirements of Fundamental Physical Theory.” European Journal of Physics 5:6567.CrossRefGoogle Scholar
Earman, John. 1992. Bayes or Bust? A Critical Examination of Bayesian Confirmation Theory. Cambridge, MA: MIT Press.Google Scholar
Earman, John 2000. Hume’s Abject Failure: The Argument against Miracles. Oxford: Oxford University Press.CrossRefGoogle Scholar
Eells, Ellery. 1990. “Bayesian Problems of Old Evidence.” In Minnesota Studies in the Philosophy of Science, ed. Savage, C. Wade, 224–45. Minneapolis: University of Minnesota Press.Google Scholar
Eells, Ellery, and Fitelson, Branden. 2001. “Symmetries and Asymmetries in Evidential Support.” Philosophical Studies 107:129–42.Google Scholar
Einstein, Albert. 1915. “Erklärung der Perihelbewegung des Merkur aus der allgemeinen Relativitätstheorie” [Explanation of the perihelion motion of Mercury from general relativity theory]. In Sitzungsberichte der Königlich Preussische Akademie der Wissenschaften, 831–39. Berlin: Königlich Preussische Akademie der Wissenschaften.Google Scholar
Einstein, Albert 1916/1916. “The Foundation of the General Theory of Relativity.” In The Principle of Relativity: A Collection of Original Memoirs on the Special and General Theory of Relativity, ed. Lorentz, H. A., Einstein, Albert, Minkowski, Hermann, and Weyl, Hermann, 109–64. New York: Dover.CrossRefGoogle Scholar
Garber, Daniel. 1983. “Old Evidence and Logical Omniscience in Bayesian Confirmation Theory.” In Minnesota Studies in the Philosophy of Science, ed. Earman, J., 99131. Minneapolis: University of Minnesota Press.Google Scholar
Glymour, Clark. 1980. Theory and Evidence. Princeton, NJ: Princeton University Press.Google Scholar
Good, Irving J. 1983. Good Thinking. Minneapolis: University of Minnesota Press.Google Scholar
Goodman, Nelson. 1946. Fact, Fiction and Forecast. Indianapolis: Bobbs-Merrill.Google Scholar
Halpern, Joseph Y. 1996. “A Counterexample to Theorems of Cox and Fine.” In Proceedings of the AAAI Conference, 1313–19. Menlo Park, CA: AAAI.Google Scholar
Hartmann, Stephan, and Fitelson, Branden. 2015. “A New Garber-Style Solution to the Problem of Old Evidence.” Philosophy of Science 82 (4): 712–17.CrossRefGoogle Scholar
Hawthorne, James. 2005. “Degree-of-Belief and Degree-of-Support: Why Bayesians Need Both Notions.” Mind 114:277–30.CrossRefGoogle Scholar
Howson, Colin. 2000. Hume’s Problem. Oxford: Clarendon.CrossRefGoogle Scholar
Howson, Colin 2016. “Repelling a Prussian Charge with the Solution to a Paradox of Dubins.” Synthese. doi:10.1007/s11229-016-1205-y.CrossRefGoogle Scholar
Howson, Colin, and Urbach, Peter. 2006. Scientific Reasoning: The Bayesian Approach. 3rd ed. Chicago: Open Court.Google Scholar
Jaynes, Edwin T. 1973. “The Well-Posed Problem.” Foundations of Physics 3:477–93.CrossRefGoogle Scholar
Jaynes, Edwin T. 2003. Probability Theory: The Logic of Science. Cambridge: Cambridge University Press.CrossRefGoogle Scholar
Jeffreys, Harold. 1961. Theory of Probability. 3rd ed. Oxford: Oxford University Press.Google Scholar
Ramsey, Frank P. 1926/1926. “Truth and Probability.” In The Foundations of Mathematics, ed. Braithwaite, Robert B., 156–98. London: Kegan Paul, Trench, Trubner.CrossRefGoogle Scholar
Romeijn, Jan-Willem, and Wenmackers, Sylvia. 2016. “A New Theory about Old Evidence: A Framework for Open-Minded Bayesianism.” Synthese 193:1225–50.Google Scholar
Rosenkrantz, Roger D. 1983. “Why Glymour Is a Bayesian.” In Minnesota Studies in the Philosophy of Science, ed. Earman, J., 6997. Minneapolis: University of Minnesota Press.Google Scholar
Salmon, Wesley. 1990. “Tom Kuhn Meets Tom Bayes.” In Scientific Theories, ed. Savage, C. Wade, 175204. Minneapolis: University of Minnesota Press.Google Scholar
Savage, L. J. 1954. The Foundations of Statistics. London: Wiley.Google Scholar
Snow, Paul. 2001. “The Disappearance of Equation Fifteen, a Richard Cox Mystery.” In Proceedings of the Fourteenth International Florida Artificial Intelligence Research Society Conference, ed. Russell, Ingrid and Kolen, John. Menlo Park, CA: AAAI.Google Scholar
Terenin, Alexander, and Draper, David. 2015. “Rigorizing and Extending the Cox-Jaynes Derivation of Probability: Implications for Statistical Practice.” ResearchGate.net.Google Scholar