Stochastic dominance is a partial order on risky assets (“gamblesâ€) that is based on the uniform preference, of all decision-makers (in an appropriate class), for one gamble over another. We modify this, first, by taking into account the status quo (given by the current wealth) and the possibility of rejecting gambles, and second, by comparing rejections that are substantive (that is, uniform over wealth levels or over utilities). This yields two new stochastic orders: wealth-uniform dominance and utility-uniform dominance. Unlike stochastic dominance, these two orders are complete: any two gambles can be compared. Moreover, they are equivalent to the orders induced by, respectively, the Aumann-Serrano (2008) index of riskiness and the F...
In this paper, we deal and evaluate the comparison problem among different financial markets using r...
Stochastic dominance is a crucial tool for the analysis of choice under risk. It is typically analyz...
Marginal Conditional Stochastic Dominance (MCSD) developed by Shalit and Yitzhaki (1994) gives the c...
It is said that risky asset h acceptance dominates risky asset k if any decision maker who rejects t...
Stochastic dominance permits a partial ordering of alternatives (probability distributions on conseq...
Actuarial risks and financial asset returns are typically heavy tailed. In this paper, we introduce ...
Five descriptive models of risky decision making are tested in this article, including four quantita...
Second-order stochastic dominance answers the question “Under what conditions will all risk-averse a...
Stochastic dominance permits a partial ordering of alternatives (probability distributions on conseq...
Traditional stochastic dominance rules are so strict and qualitative conditions that generally a sto...
There are commonly accepted and objective decision rules, which are consistent with rationality, for...
textabstractIn the trade-off between risk and reward, modelling risk has always been a major problem...
URL des Documents de travail : http://ces.univ-paris1.fr/cesdp/cesdp2016.htmlDocuments de travail du...
We develop a continuum of stochastic dominance rules, covering preferences from first- to second-ord...
Fishburn and Vickson (Stochastic dominance: an approach to decision-making under risk, Lexington Boo...
In this paper, we deal and evaluate the comparison problem among different financial markets using r...
Stochastic dominance is a crucial tool for the analysis of choice under risk. It is typically analyz...
Marginal Conditional Stochastic Dominance (MCSD) developed by Shalit and Yitzhaki (1994) gives the c...
It is said that risky asset h acceptance dominates risky asset k if any decision maker who rejects t...
Stochastic dominance permits a partial ordering of alternatives (probability distributions on conseq...
Actuarial risks and financial asset returns are typically heavy tailed. In this paper, we introduce ...
Five descriptive models of risky decision making are tested in this article, including four quantita...
Second-order stochastic dominance answers the question “Under what conditions will all risk-averse a...
Stochastic dominance permits a partial ordering of alternatives (probability distributions on conseq...
Traditional stochastic dominance rules are so strict and qualitative conditions that generally a sto...
There are commonly accepted and objective decision rules, which are consistent with rationality, for...
textabstractIn the trade-off between risk and reward, modelling risk has always been a major problem...
URL des Documents de travail : http://ces.univ-paris1.fr/cesdp/cesdp2016.htmlDocuments de travail du...
We develop a continuum of stochastic dominance rules, covering preferences from first- to second-ord...
Fishburn and Vickson (Stochastic dominance: an approach to decision-making under risk, Lexington Boo...
In this paper, we deal and evaluate the comparison problem among different financial markets using r...
Stochastic dominance is a crucial tool for the analysis of choice under risk. It is typically analyz...
Marginal Conditional Stochastic Dominance (MCSD) developed by Shalit and Yitzhaki (1994) gives the c...