Model and Predictive Uncertainty: A Foundation for Smooth Ambiguity Preferences
成果类型:
Article
署名作者:
Denti, Tommaso; Pomatto, Luciano
署名单位:
Cornell University; California Institute of Technology
刊物名称:
ECONOMETRICA
ISSN/ISSBN:
0012-9682
DOI:
10.3982/ECTA18009
发表日期:
2022
页码:
551-584
关键词:
expected utility
risk-aversion
PARADOX
摘要:
Smooth ambiguity preferences (Klibanoff, Marinacci, and Mukerji (2005)) describe a decision maker who evaluates each act f according to the twofold expectation V(f)=integral P phi(integral omega u(f)dp)d mu(p) defined by a utility function u, an ambiguity index phi, and a belief mu over a set P of probabilities. We provide an axiomatic foundation for the representation, taking as a primitive a preference over Anscombe-Aumann acts. We study a special case where P is a subjective statistical model that is point identified, that is, the decision maker believes that the true law p is an element of P can be recovered empirically. Our main axiom is a joint weakening of Savage's sure-thing principle and Anscombe-Aumann's mixture independence. In addition, we show that the parameters of the representation can be uniquely recovered from preferences, thereby making operational the separation between ambiguity attitude and perception, a hallmark feature of the smooth ambiguity representation.
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