To give a surprise exam, use game theory

Synthese 115 (3):355-373 (1998)
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Abstract

This paper proposes a game-theoretic solution of the surprise examination problem. It is argued that the game of “matching pennies” provides a useful model for the interaction of a teacher who wants her exam to be surprising and students who want to avoid being surprised. A distinction is drawn between prudential and evidential versions of the problem. In both, the teacher should not assign a probability of zero to giving the exam on the last day. This representation of the problem provides a diagnosis of where the backwards induction argument, which “proves” that no surprise exam is possible, is mistaken.

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2004

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10.1023/a:1005012607804

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Elliott Sober
University of Wisconsin, Madison

Citations of this work

How to expect a surprising exam.Brian Kim & Anubav Vasudevan - 2017 - Synthese 194 (8):3101-3133.
Game Theory in Philosophy.Boudewijn de Bruin - 2005 - Topoi 24 (2):197-208.

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References found in this work

The Dynamics of Rational Deliberation.Brian Skyrms - 1990 - Harvard University Press.
Probabilistic Causality.Ellery Eells - 1991 - Cambridge, England: Cambridge University Press.
Probability and the Logic of Rational Belief.Peter Krauss - 1961 - Journal of Symbolic Logic 35 (1):127.
Blindspots.Michael Levin - 1991 - Noûs 25 (3):389-392.

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