Stochastic dominance is a crucial tool for the analysis of choice under risk. It is typically analyzed as a property of two gambles that are taken in isolation. We study how additional independent sources of risk (e.g., uninsurable labor risk, house price risk) can affect the ordering of gambles. We show that, perhaps surprisingly, background risk can be strong enough to render lotteries that are ranked by their expectation ranked in terms of first-order stochastic dominance. We extend our results to second-order stochastic dominance and show how they lead to a novel and elementary axiomatization of mean-variance preferences
This paper surveys the use of stochastic dominance to decision making under uncertainty. The first p...
The principle that rational agents should maximize expected utility or choiceworthiness is intuitive...
This paper develops rules for ordering uncertain price prospects. For consumers with identical ordin...
Second-order stochastic dominance answers the question “Under what conditions will all risk-averse a...
Decision theorists widely accept a stochastic dominance principle: roughly, if a risky prospect A is...
Stochastic dominance permits a partial ordering of alternatives (probability distributions on conseq...
AbstractThe use of stochastic dominance has become common in finance and economics. As a theoretical...
Stochastic dominance permits a partial ordering of alternatives (probability distributions on conseq...
Stochastic dominance is a partial order on risky assets (“gamblesâ€) that is based on the uniform ...
This paper determines the conditions under which stochastic orderings of random variables, e.g., sto...
In this paper we �first develop a theory of almost stochastic dominance for risk-seeking investors t...
In order to rank investments under uncertainty, the most widely used method is mean variance analysi...
We develop a continuum of stochastic dominance rules, covering preferences from first- to second-ord...
The concept of stochastic dominance is defined, and its relation to welfare, poverty, and income ine...
This paper first extends some well-known univariate stochastic dominance results to multivariate sto...
This paper surveys the use of stochastic dominance to decision making under uncertainty. The first p...
The principle that rational agents should maximize expected utility or choiceworthiness is intuitive...
This paper develops rules for ordering uncertain price prospects. For consumers with identical ordin...
Second-order stochastic dominance answers the question “Under what conditions will all risk-averse a...
Decision theorists widely accept a stochastic dominance principle: roughly, if a risky prospect A is...
Stochastic dominance permits a partial ordering of alternatives (probability distributions on conseq...
AbstractThe use of stochastic dominance has become common in finance and economics. As a theoretical...
Stochastic dominance permits a partial ordering of alternatives (probability distributions on conseq...
Stochastic dominance is a partial order on risky assets (“gamblesâ€) that is based on the uniform ...
This paper determines the conditions under which stochastic orderings of random variables, e.g., sto...
In this paper we �first develop a theory of almost stochastic dominance for risk-seeking investors t...
In order to rank investments under uncertainty, the most widely used method is mean variance analysi...
We develop a continuum of stochastic dominance rules, covering preferences from first- to second-ord...
The concept of stochastic dominance is defined, and its relation to welfare, poverty, and income ine...
This paper first extends some well-known univariate stochastic dominance results to multivariate sto...
This paper surveys the use of stochastic dominance to decision making under uncertainty. The first p...
The principle that rational agents should maximize expected utility or choiceworthiness is intuitive...
This paper develops rules for ordering uncertain price prospects. For consumers with identical ordin...