We study various partially ordered spaces of probability measures and we determine which of them are lattices. This has important consequences for optimization problems with stochastic dominance constraints. In particular we show that the space of probability measures on $\mathbb{R}$ is a lattice under most of the known partial orders, whereas the space of probability measures on $\mathbb{R}^d$ typically is not. Nevertheless, some subsets of this space, defined by imposing strong conditions on the dependence structure of the measures, are lattices
The aim of this paper is to generalize a result of [4] about stochastic dominance under the assumpti...
The paper deals with de nition of supremal sets in a rather general frameworkwhere deterministic and...
We provide a comprehensive analysis of the two-parameter Beta distributions seen from the perspectiv...
We study various partially ordered spaces of probability measures and we determine which of them are...
International audienceWe study various partially ordered spaces of probability measures and we deter...
Nendel M. A note on stochastic dominance, uniform integrability and lattice properties. Bulletin of ...
AbstractA notion of association of probability measures on partially ordered (Polish) spaces is intr...
We prove that the lattice properties of operators defined by random measures hold under general cond...
In this work we introduce some category-theoretical concepts and techniques to study probability dis...
Strassen’s classical martingale coupling theorem states that two random vectors are ordered in the c...
The general notion of a stochastic ordering is that one probability distribution is smaller than a s...
In a probability space, the partition fiber relative to a probability vector v is the set of all ord...
The paper deals with definition of supremal sets in a rather general framework where deterministic a...
We consider a discrete-time ergodic Markov chain on a partially ordered state space and study the st...
In this short note, we prove that the stochastic order of Radon probability measures on any ordered ...
The aim of this paper is to generalize a result of [4] about stochastic dominance under the assumpti...
The paper deals with de nition of supremal sets in a rather general frameworkwhere deterministic and...
We provide a comprehensive analysis of the two-parameter Beta distributions seen from the perspectiv...
We study various partially ordered spaces of probability measures and we determine which of them are...
International audienceWe study various partially ordered spaces of probability measures and we deter...
Nendel M. A note on stochastic dominance, uniform integrability and lattice properties. Bulletin of ...
AbstractA notion of association of probability measures on partially ordered (Polish) spaces is intr...
We prove that the lattice properties of operators defined by random measures hold under general cond...
In this work we introduce some category-theoretical concepts and techniques to study probability dis...
Strassen’s classical martingale coupling theorem states that two random vectors are ordered in the c...
The general notion of a stochastic ordering is that one probability distribution is smaller than a s...
In a probability space, the partition fiber relative to a probability vector v is the set of all ord...
The paper deals with definition of supremal sets in a rather general framework where deterministic a...
We consider a discrete-time ergodic Markov chain on a partially ordered state space and study the st...
In this short note, we prove that the stochastic order of Radon probability measures on any ordered ...
The aim of this paper is to generalize a result of [4] about stochastic dominance under the assumpti...
The paper deals with de nition of supremal sets in a rather general frameworkwhere deterministic and...
We provide a comprehensive analysis of the two-parameter Beta distributions seen from the perspectiv...