Add to ORKGThe Author considera a decision-making environment with an outcome space that is a convex and compact subset of a vector space belonging to a general class of such spaces. Given this outcome space,he defines general classes of (a) risk averse von Neumann-Morgenstern utility functions defined over the outcome space, (b) multi-valued mappings that yield the certainty equivalent outcomes corresponding to a lottery, (c) multi-valued mappings that yield the risk premia corresponding to a lottery, and (d) multi-valued mappings that yield the acceptance set of lotteries corresponding to an outcome. Their duality results establish that the usual mappings that generate (b), (c) and (d) from (a) are bijective.They apply these results to the problem o...
We propose a multivariate extension of Yaari's dual theory of choice under risk. We show that a deci...
We consider optimization problems involving convex risk functions. By employing techniques of convex...
We develop a duality theory for multiple objective linear programs which has several advantages in c...
We consider a decision-making environment with an outcome space that is a convex and compact subset ...
Duality mappings for the theory of risk aversion with vector outcomes Sudhir A. Shah
equivalence of various notions of comparative risk aversion of von Neumann-Morgenstern utilities in ...
Abstract Consider lotteries µ and λ with vector outcomes. Let 1 be the relation that declares µ to b...
Pratt (1964) and Yaari (1969) contain the classical results pertaining to the equivalence of various...
Extending the approach of Jouini et al. we define set–valued (convex) measures of risk and its accep...
This paper introduces a set of axioms that define convex risk measures. Duality theory provides the ...
This paper determines the precise connection between the curvature properties of an objective functi...
This paper determines the precise connection between the curvature properties of an objective functi...
We propose a multivariate extension of Yaari's dual theory of choice under risk. We show that a deci...
The risk of financial positions is measured by the minimum amount of capital to raise and invest in ...
The risk of financial positions is measured by the minimum amount of capital to raise and invest in ...
We propose a multivariate extension of Yaari's dual theory of choice under risk. We show that a deci...
We consider optimization problems involving convex risk functions. By employing techniques of convex...
We develop a duality theory for multiple objective linear programs which has several advantages in c...
We consider a decision-making environment with an outcome space that is a convex and compact subset ...
Duality mappings for the theory of risk aversion with vector outcomes Sudhir A. Shah
equivalence of various notions of comparative risk aversion of von Neumann-Morgenstern utilities in ...
Abstract Consider lotteries µ and λ with vector outcomes. Let 1 be the relation that declares µ to b...
Pratt (1964) and Yaari (1969) contain the classical results pertaining to the equivalence of various...
Extending the approach of Jouini et al. we define set–valued (convex) measures of risk and its accep...
This paper introduces a set of axioms that define convex risk measures. Duality theory provides the ...
This paper determines the precise connection between the curvature properties of an objective functi...
This paper determines the precise connection between the curvature properties of an objective functi...
We propose a multivariate extension of Yaari's dual theory of choice under risk. We show that a deci...
The risk of financial positions is measured by the minimum amount of capital to raise and invest in ...
The risk of financial positions is measured by the minimum amount of capital to raise and invest in ...
We propose a multivariate extension of Yaari's dual theory of choice under risk. We show that a deci...
We consider optimization problems involving convex risk functions. By employing techniques of convex...
We develop a duality theory for multiple objective linear programs which has several advantages in c...