We develop a continuum of stochastic dominance rules, covering preferences from first- to second-order stochastic dominance. The motivation for such a continuum is that while decision makers have a preference for \u201cmore is better,\u201d they are mostly risk averse but cannot assert that they would dislike any risk. For example, situations with targets, aspiration levels, and local convexities in induced utility functions in sequential decision problems may lead to preferences for some risks. We relate our continuum of stochastic dominance rules to utility classes, the corresponding integral conditions, and probability transfers and discuss the usefulness of these interpretations. Several examples involving, e.g., finite-crossing cumulat...
We provide new characterizations of the preference for additive and multiplicative risk apportionmen...
URL des Documents de travail : http://ces.univ-paris1.fr/cesdp/cesdp2016.htmlDocuments de travail du...
This paper presents a new model of probabilistic binary choice under risk. In this model, a decision...
We develop a continuum of stochastic dominance rules, covering preferences from first- to second-ord...
Stochastic dominance permits a partial ordering of alternatives (probability distributions on conseq...
Stochastic dominance permits a partial ordering of alternatives (probability distributions on conseq...
We characterize the consistency of a large class of nonexpected utility preferences (including mean-...
This paper first extends some well-known univariate stochastic dominance results to multivariate sto...
International audienceA class of stochastic orders is defined on the set of bivariate distribution f...
We study a generalized family of stochastic orders, semiparametrized by a distortion function H, nam...
The mathematical concept of stochastic dominance was introduced to describe preference of one random...
This paper first extends some well-known univariate stochastic dominance results to multiv...
We develop a theory of decision making and General Equilibrium for contingent markets when incomplet...
In this paper, we develop the concept of almost stochastic dominance for higher order pref...
Fishburn and Vickson (1978) showed that, when applied to random alternatives with an equal mean, 3rd...
We provide new characterizations of the preference for additive and multiplicative risk apportionmen...
URL des Documents de travail : http://ces.univ-paris1.fr/cesdp/cesdp2016.htmlDocuments de travail du...
This paper presents a new model of probabilistic binary choice under risk. In this model, a decision...
We develop a continuum of stochastic dominance rules, covering preferences from first- to second-ord...
Stochastic dominance permits a partial ordering of alternatives (probability distributions on conseq...
Stochastic dominance permits a partial ordering of alternatives (probability distributions on conseq...
We characterize the consistency of a large class of nonexpected utility preferences (including mean-...
This paper first extends some well-known univariate stochastic dominance results to multivariate sto...
International audienceA class of stochastic orders is defined on the set of bivariate distribution f...
We study a generalized family of stochastic orders, semiparametrized by a distortion function H, nam...
The mathematical concept of stochastic dominance was introduced to describe preference of one random...
This paper first extends some well-known univariate stochastic dominance results to multiv...
We develop a theory of decision making and General Equilibrium for contingent markets when incomplet...
In this paper, we develop the concept of almost stochastic dominance for higher order pref...
Fishburn and Vickson (1978) showed that, when applied to random alternatives with an equal mean, 3rd...
We provide new characterizations of the preference for additive and multiplicative risk apportionmen...
URL des Documents de travail : http://ces.univ-paris1.fr/cesdp/cesdp2016.htmlDocuments de travail du...
This paper presents a new model of probabilistic binary choice under risk. In this model, a decision...