4.7 Article

It Is Surely Better, Do It More? Implications for Preferences Under Ambiguity

Journal

MANAGEMENT SCIENCE
Volume 67, Issue 12, Pages 7619-7636

Publisher

INFORMS
DOI: 10.1287/mnsc.2020.3890

Keywords

ambiguity; uncertainty; decision analysis theory; utility-preference theory; ambiguity aversion

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This study examines preference conditions in choice under uncertainty and explores the relationship between monotonicity in optimal mixtures and ambiguity-sensitive behavior. It reveals an incompatibility between monotonicity in optimal mixtures and ambiguity aversion for certain classes of preferences exhibiting ambiguity-sensitive behavior. The research also shows that smooth ambiguity preferences can satisfy both properties as long as they are not too ambiguity averse.
Consider a canonical problem in choice under uncertainty: choosing from a convex feasible set consisting of all (Anscombe-Aumann) mixtures of two acts f and g, {alpha f + (1 - alpha)g : alpha is an element of [0, 1]}. We propose a preference condition, monotonicity in optimal mixtures, which says that surely improving the act f (in the sense of weak dominance) makes the optimal weight(s) on f weakly higher. We use a stylized model of a sales agent reacting to incentives to illustrate the tight connection between monotonicity in optimal mixtures and a monotone comparative static of interest in applications. We then explore more generally the relation between this condition and preferences exhibiting ambiguity-sensitive behavior as in the classic Ellsberg paradoxes. We find that monotonicity in optimal mixtures and ambiguity aversion (even only local to an event) are incompatible for a large and popular class of ambiguity-sensitive preferences (the c-linearly biseparable class. This implies, for example, that maxmin expected utility preferences are consistent with monotonicity in optimal mixtures if and only if they are subjective expected utility preferences. This incompatibility is not between monotonicity in optimal mixtures and ambiguity aversion per se. For example, we show that smooth ambiguity preferences can satisfy both properties as long as they are not too ambiguity averse. Our most general result, applying to an extremely broad universe of preferences, shows a sense in which monotonicity in optimal mixtures places upper bounds on the intensity of ambiguity-averse behavior.

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