In binary choice between discrete outcome lotteries, an individual may prefer lottery L1 to lottery L2 when the probability that L1 delivers a better outcome than L2 is higher than the probability that L2 delivers a better outcome than L1. Such a preference can be rationalized by three standard axioms (solvability, convexity and symmetry) and one less standard axiom (a fanning-in). A preference for the most probable winner can be represented by a skew-symmetric bilinear utility function. Such a utility function has the structure of a regret theory when lottery outcomes are perceived as ordinal and the assumption of regret aversion is replaced with a preference for a win. The empirical evidence supporting the proposed system of axioms is dis...
Behavioral axioms about preference orderings among gambles and their joint receipt lead to numerical...
We provide a revealed preference characterization of expected utility maximization in binary lotteri...
This paper proposes a new decision theory of how individuals make random errors when they compute th...
This paper studies a model in which in period 1, a decision-maker chooses a set of lotteries and in ...
We provide a revealed preference characterization of expected utility maximization in binary lotteri...
I analyze observed choice between lotteries from an outcome-oriented point of view in the framework ...
Abstract: This paper discusses the problem of specifying probabilistic models for choices (strategi...
This paper presents an axiomatic model of probabilistic choice under risk. In this model, when it co...
Anscombe & Aumann (1963) improved the model developed by von Neumann & Morgenstern (1944) su...
We study a sufficiently general regret criterion for choosing between two probabilistic lotteries. F...
A preliminary version of this paper appeared as: "A comparison of axiomatic approaches to qualitativ...
In this work we consider preference relations that might not be total. Partial preferences may be he...
Abstract. This paper presents a new theory of decision under risk. Individual preferences over lotte...
How do people choose between lottery 1, which yields the prize $ x 1 with prob-ability p 1, and lott...
This paper proposes a utility theory for decision making under uncertainty that is described by poss...
Behavioral axioms about preference orderings among gambles and their joint receipt lead to numerical...
We provide a revealed preference characterization of expected utility maximization in binary lotteri...
This paper proposes a new decision theory of how individuals make random errors when they compute th...
This paper studies a model in which in period 1, a decision-maker chooses a set of lotteries and in ...
We provide a revealed preference characterization of expected utility maximization in binary lotteri...
I analyze observed choice between lotteries from an outcome-oriented point of view in the framework ...
Abstract: This paper discusses the problem of specifying probabilistic models for choices (strategi...
This paper presents an axiomatic model of probabilistic choice under risk. In this model, when it co...
Anscombe & Aumann (1963) improved the model developed by von Neumann & Morgenstern (1944) su...
We study a sufficiently general regret criterion for choosing between two probabilistic lotteries. F...
A preliminary version of this paper appeared as: "A comparison of axiomatic approaches to qualitativ...
In this work we consider preference relations that might not be total. Partial preferences may be he...
Abstract. This paper presents a new theory of decision under risk. Individual preferences over lotte...
How do people choose between lottery 1, which yields the prize $ x 1 with prob-ability p 1, and lott...
This paper proposes a utility theory for decision making under uncertainty that is described by poss...
Behavioral axioms about preference orderings among gambles and their joint receipt lead to numerical...
We provide a revealed preference characterization of expected utility maximization in binary lotteri...
This paper proposes a new decision theory of how individuals make random errors when they compute th...