Zinn, Jesse (2013): Modelling Biased Judgement with Weighted Updating.
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Abstract
The weighted updating model is a generalization of Bayesian updating that allows for biased beliefs by weighting the constituent functions of Bayes' rule with real exponents. In this paper I show that transforming a distribution by exponential weighting and normalization systematically affects the information entropy of the resulting distribution. Specifically, if the weight is greater then one then the resulting distribution has less information entropy than the original distribution (and vice versa). This result provides a useful interpretation of the model, since, for example a likelihood function with greater entropy translates to the associated data being treated with less information content. The result also justifies using the model as it has been used in the literature, i.e. to model biases in which individuals treat observations as being either more or less informative than they should.
| Item Type: | MPRA Paper |
|---|---|
| Original Title: | Modelling Biased Judgement with Weighted Updating |
| Language: | English |
| Keywords: | Bayesian Updating, Cognative Biases, Learning, Uncertainty, Information Entropy |
| Subjects: | C - Mathematical and Quantitative Methods > C0 - General > C02 - Mathematical Methods D - Microeconomics > D0 - General > D03 - Behavioral Microeconomics: Underlying Principles |
| Item ID: | 61403 |
| Depositing User: | Jesse Zinn |
| Date Deposited: | 17 Jan 2015 06:06 |
| Last Modified: | 26 Sep 2019 12:00 |
| References: | Benjamin, D. J., M. Rabin, and C. Raymond (2013): “A Model of Non-Belief in the Law of Large Numbers,” Oxford University Department of Economics Discussion Paper No. 672. Grether, D. M. (1980): “Bayes Rule as a Descriptive Model: The Representativeness Heuristic,” Quarterly Journal of Economics, 95(3), 537–557. Grether, D. M. (1992): “Testing Bayes’ Rule and the Representativeness Heuristic: Some Experimental Evidence,” Journal of Economic Behavior & Organization, 17(1), 31–57. Hirshleifer, D. (2001): “Investor Psychology and Asset Pricing,” Journal of Finance, 56(4), 1533–1597. Ibrahim, J. G., and M.-H. Chen (2000): “Power Prior Distributions for Regression Models,” Statistical Science, 15(1), 46–60. Palfrey, T. R., and S. W. Wang (2012): “Speculative Overpricing in Asset Markets with Information Flows,” Econometrica, 80(5), 1937–1976. Quiggin, J. (1988): “Increasing Risk: Another Definition,” paper presented at 4th Conference on Foundations of Utility Research, Budapest. Rabin, M., and J. L. Schrag (1999): “First Impressions Matter: A Model of Confirmatory Bias,” The Quarterly Journal of Economics, 114(1), 37–82. Sethna, J. P. (2006): Statistical Mechanics: Entropy, Order Parameters, and Complexity. Oxford University Press. Shannon, C. E. (1948): “A Mathematical Theory of Communication,” The Bell System Technical Journal, 27(3), 379–423 and 623–656. Tribus, M. (1961): Thermostatics and Thermodynamics: An Introduction to Energy, Information and States of Matter, With Engineering Applications. Van Nostrand, Princeton, NJ. Van Benthem, J., J. Gerbrandy, and B. Kooi (2009): “Dynamic Update with Probabilities,” Studia Logica, 93(1), 67–96. Zinn, J. A. (2014): “Expanding the Weighted Updating Model,” Available at SSRN. |
| URI: | https://mpra.ub.uni-muenchen.de/id/eprint/61403 |
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Modelling Biased Judgement with Weighted Updating. (deposited 01 Oct 2013 12:26)
- Modelling Biased Judgement with Weighted Updating. (deposited 17 Jan 2015 06:06) [Currently Displayed]
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