textabstractA representation theorem for binary relations on n is derived. It is interpreted in the context of decision making under uncertainty. There we consider the existence of a subjective expected utility model to represent a preference relation of a person on the set of bets for money on a finite state space. The theorem shows that, for this model to exist, it is not only necessary (as has often been observed), but it also is sufficient, that the appreciation for money of the person has a cardinal character, independent of the state of nature. This condition of cardinal appreciation is simple and thus easily testable in experiments. Also it may be of help in relating the neo-classical economic interpretation of cardinal utility to t...
A representation theorem proven by G. Debreu in 1960, although somehow neglected by the literature, ...
International audienceThis paper studies decision-making in the face of two stochastically independe...
We study preferences over lotteries which do not necessarily satisfy completeness. We provide a char...
A representation theorem for binary relations on (Re)n is derived. It is interpreted in the context ...
A representation theorem for binary relations on IF? ” is derived. It is interpreted in the context ...
Classical foundations of expected utility were provided by Ramsey, de Finetti, von Neumann & Morgens...
This paper proposes the weaker axioms which admit a cardinal utility representa- tion under ambiguit...
Peter P. Wakker has forcefully shown the importance for decision theory of a condition that he calle...
This paper advances an interpretation of Von Neumann-Morgenstern's expected utility model for prefer...
We study the problem of obtaining an expected utility representation for a potentially incomplete pr...
We deal with a Savage-like decision problem under uncertainty where, for every state of the world, t...
Many violations of the Independence axiom of Expected Utility can be traced to subjects' attraction ...
We study the aggregation of preferences when intensities are taken into account: the aggregation of ...
« Cardinal utility » and risky choice The aim of this paper is to study the links between the noti...
The classical von Neumann-Morgenstern's notion of lottery is generalized by replacing a probability ...
A representation theorem proven by G. Debreu in 1960, although somehow neglected by the literature, ...
International audienceThis paper studies decision-making in the face of two stochastically independe...
We study preferences over lotteries which do not necessarily satisfy completeness. We provide a char...
A representation theorem for binary relations on (Re)n is derived. It is interpreted in the context ...
A representation theorem for binary relations on IF? ” is derived. It is interpreted in the context ...
Classical foundations of expected utility were provided by Ramsey, de Finetti, von Neumann & Morgens...
This paper proposes the weaker axioms which admit a cardinal utility representa- tion under ambiguit...
Peter P. Wakker has forcefully shown the importance for decision theory of a condition that he calle...
This paper advances an interpretation of Von Neumann-Morgenstern's expected utility model for prefer...
We study the problem of obtaining an expected utility representation for a potentially incomplete pr...
We deal with a Savage-like decision problem under uncertainty where, for every state of the world, t...
Many violations of the Independence axiom of Expected Utility can be traced to subjects' attraction ...
We study the aggregation of preferences when intensities are taken into account: the aggregation of ...
« Cardinal utility » and risky choice The aim of this paper is to study the links between the noti...
The classical von Neumann-Morgenstern's notion of lottery is generalized by replacing a probability ...
A representation theorem proven by G. Debreu in 1960, although somehow neglected by the literature, ...
International audienceThis paper studies decision-making in the face of two stochastically independe...
We study preferences over lotteries which do not necessarily satisfy completeness. We provide a char...