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5 - Observer theory, Bayes theory, and psychophysics
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- By B.M. Bennett, University of California at Irvine, D.D. Hoffman, University of California at Irvine, C. Prakash, California State University, S.N. Richman, University of California at Irvine
- Edited by David C. Knill, University of Pennsylvania, Whitman Richards, Massachusetts Institute of Technology
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- Book:
- Perception as Bayesian Inference
- Published online:
- 05 March 2012
- Print publication:
- 13 September 1996, pp 163-212
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- Chapter
- Export citation
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Summary
Introduction
The search is on for a general theory of perception. As the papers in this volume indicate, many perceptual researchers now seek a conceptual framework and a general formalism to help them solve specific problems.
One candidate framework is “observer theory” (Bennett, Hoffman, & Prakash, 1989a). This paper discusses observer theory, gives a sympathetic analysis of its candidacy, describes its relationship to standard Bayesian analysis, and uses it to develop a new account of the relationship between computational theories and psychophysical data. Observer theory provides powerful tools for the perceptual theorist, psychophysicist, and philosopher. For the theorist it provides (1) a clean distinction between competence and performance, (2) clear goals and techniques for solving specific problems, and (3) a canonical format for presenting and analyzing proposed solutions. For the psychophysicist it provides techniques for assessing the psychological plausibility of theoretical solutions in the light of psychophysical data. And for the philosopher it provides conceptual tools for investigating the relationship of sensory experience to the material world.
Observer theory relates to Bayesian approaches as follows. In Bayesian approaches to vision one is given an image (or small collection of images), and a central goal is to compute the probability of various scene interpretations for that image (or small collection of images). That is, a central goal is to compute a conditional probability measure, called the “posterior distribution”, which can be written p(Scene | Image) or, more briefly, p(S | I).