Dynamically Consistent Preferences with Quadratic Beliefs
Date
1997
Authors
Eichberger, Jurgen
Grant, Simon
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Publisher
Kluwer Academic Publishers
Abstract
This article characterizes a family of preference relations over uncertain prospects that (a) are dynamically consistent in the Machina sense and, moreover, for which the updated preferences are also members of this family and (b) can simultaneously accommodate Ellsberg- and Allais-type paradoxes.
Replacing the "mixture independence" axiom by "mixture symmetry", proposed by Chew, Epstein, and Segal (1991) for decision making under objective risk, and requiring that for some partition of the state space the agent perceives ambiguity and so prefers a randomization over outcomes across that partition (proper uncertainty aversion), preferences can be represented by a (proper) quadratic functional. This representation may be further refined to allow a separation between the quantification of beliefs and risk preferences that is closed under dynamically consistent updating.
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Keywords
dynamic consistency, quadratic utility, quadratic beliefs
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Source
Journal of Risk and Uncertainty
Type
Journal article
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Restricted until
2099-12-31
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