A Rank-Dependent Theory for Decision under Risk and Ambiguity

Abstract

This paper axiomatizes, in a two-stage setup, a new theory for decision under risk and ambiguity. The axiomatized preference relation on the space V of random variables induces an ambiguity index c on the space of probabilities, a probability weighting function , generating the measure by transforming an objective probability measure, and a utility function φ, such that, for all v,u∈V, align* vu Q ∈ \EQ[∫φ(v)\,d]+c(Q)\ ≥ Q ∈ \EQ[∫φ(u)\,d]+c(Q)\. align* Our theory extends the rank-dependent utility model of Quiggin (1982) for decision under risk to risk and ambiguity, reduces to the variational preferences model when is the identity, and is dual to variational preferences when φ is affine in the same way as the theory of Yaari (1987) is dual to expected utility. As a special case, we obtain a preference axiomatization of a decision theory that is a rank-dependent generalization of the popular maxmin expected utility theory. We characterize ambiguity aversion in our theory.

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