Jump to content

Formal epistemology

From Wikipedia, the free encyclopedia

Formal epistemology uses formal methods from decision theory, logic, probability theory and computability theory to model and reason about issues of epistemological interest. Work in this area spans several academic fields, including philosophy, computer science, economics, and statistics. The focus of formal epistemology has tended to differ somewhat from that of traditional epistemology, with topics like uncertainty, induction, and belief revision garnering more attention than the analysis of knowledge, skepticism, and issues with justification. Formal Epistemology extenuates into Formal Language Theory.

History

[edit]

Though formally oriented epistemologists have been laboring since the emergence of formal logic and probability theory (if not earlier), only recently have they been organized under a common disciplinary title. This gain in popularity may be attributed to the organization of yearly Formal Epistemology Workshops by Branden Fitelson and Sahotra Sarkar, starting in 2004, and the PHILOG-conferences starting in 2002 (The Network for Philosophical Logic and Its Applications) organized by Vincent F. Hendricks. Carnegie Mellon University's Philosophy Department hosts an annual summer school in logic and formal epistemology. In 2010, the department founded the Center for Formal Epistemology.

Bayesian epistemology

[edit]

Bayesian epistemology is an important theory in the field of formal epistemology. It has its roots in Thomas Bayes' work in the field of probability theory. It is based on the idea that beliefs are held gradually and that the strengths of the beliefs can be described as subjective probabilities. As such, they are subject to the laws of probability theory, which act as the norms of rationality. These norms can be divided into static constraints, governing the rationality of beliefs at any moment, and dynamic constraints, governing how rational agents should change their beliefs upon receiving new evidence. The most characteristic Bayesian expression of these principles is found in the form of Dutch books, which illustrate irrationality in agents through a series of bets that lead to a loss for the agent no matter which of the probabilistic events occurs. Bayesians have applied these fundamental principles to various epistemological topics but Bayesianism does not cover all topics of traditional epistemology. The problem of confirmation in the philosophy of science, for example, can be approached through the Bayesian principle of conditionalization by holding that a piece of evidence confirms a theory if it raises the likelihood that this theory is true. Various proposals have been made to define the concept of coherence in terms of probability, usually in the sense that two propositions cohere if the probability of their conjunction is higher than if they were neutrally related to each other. The Bayesian approach has also been fruitful in the field of social epistemology, for example, concerning the problem of testimony or the problem of group belief. Bayesianism still faces various theoretical objections that have not been fully solved.[1][2][3][4]

Topics

[edit]

Some of the topics that come under the heading of formal epistemology include:

List of contemporary formal epistemologists

[edit]

See also

[edit]

References

[edit]
  1. ^ Talbott, William (2016). "Bayesian Epistemology". The Stanford Encyclopedia of Philosophy. Metaphysics Research Lab, Stanford University. Retrieved 6 March 2021.
  2. ^ Olsson, Erik J. (2018). "Bayesian Epistemology". Introduction to Formal Philosophy. Springer. pp. 431–442.
  3. ^ Hartmann, Stephan; Sprenger, Jan (2010). "Bayesian Epistemology". The Routledge Companion to Epistemology. London: Routledge. pp. 609–620.
  4. ^ Hájek, Alan; Lin, Hanti (2017). "A Tale of Two Epistemologies?". Res Philosophica. 94 (2): 207–232. doi:10.11612/resphil.1540. S2CID 160029122.

Bibliography

[edit]
  • Arlo-Costa, H, van Benthem, J. and Hendricks, V. F. (eds.) (2012). A Formal Epistemology Reader. Cambridge: Cambridge University Press.
  • Bovens, L. and Hartmann, S. (2003). Bayesian Epistemology. Oxford: Oxford University Press.
  • Brown, B. (2017). Thoughts and Ways of Thinking: Source Theory and Its Applications. London: Ubiquity Press. [1].
  • Hendricks, V. F. (2001). The Convergence of Scientific Knowledge: A View from The Limit. Dordrect: Kluwer Academic Publishers.
  • Hendricks, V. F. (2006). Mainstream and Formal Epistemology. New York: Cambridge University Press.
  • Hendricks, V. F. (ed.) (2006). Special issue on “8 Bridges Between Mainstream and Formal Epistemology”, Philosophical Studies.
  • Hendricks, V. F. (ed.) (2006). Special issue on “Ways of Worlds I-II”, Studia Logica.
  • Hendricks, V.F. and Pritchard, D. (eds.) (2006). New Waves in Epistemology. Aldershot: Ashgate.
  • Hendricks, V. F. and Symons, J. (eds.) (2005). Formal Philosophy. New York: Automatic Press / VIP. [2]
  • Hendricks, V. F. and Symons, J. (eds.) (2006). Masses of Formal Philosophy. New York: Automatic Press / VIP. [3]
  • Hendricks, V. F. and Hansen, P.G. (eds.) (2007). Game Theory: 5 Questions. New York: Automatic Press / VIP. [4]
  • Hendricks, V.F. and Symons, J. (2006). Epistemic Logic. The Stanford Encyclopedia of Philosophy, Stanford. CA: USA.
  • Wolpert, D.H., (1996) The lack of a priori distinctions between learning algorithms, Neural Computation, pp. 1341–1390.
  • Wolpert, D.H., (1996) The existence of a priori distinctions between learning algorithms, Neural Computation, pp. 1391–1420.
  • Wolpert, D.H., (2001) Computational capabilities of physical systems. Physical Review E, 65(016128).
  • Zhu, H.Y. and R. Rohwer, (1996) No free lunch for cross-validation, pp. 1421– 1426.
[edit]