The paper deals with definition of supremal sets in a rather general framework where deterministic and random preference relations (preorders) and partial orders are defined by continuous multi-utility representations. It gives a short survey of the approach with some new results on maximal sets
Abstract: Multisets are collections of objects which may include several copies of the same object. ...
We prove a general identity which states that any element of a tuple (ordered set) can be obtained a...
We prove a general identity which states that any element of a tuple (ordered set) can be obtained a...
The paper deals with definition of supremal sets in a rather general framework where deterministic a...
The paper deals with de nition of supremal sets in a rather general frameworkwhere deterministic and...
In the first part of the paper, we study concepts of supremum and maximum as subsets of a topologica...
Partially ordered sets are investigated from the point of view of Bishop's constructive mathematics,...
We study various partially ordered spaces of probability measures and we determine which of them are...
Inspired by the theory of financial markets with transaction costs, we study a concept of essential ...
It is usually assumed that maximal elements are the best option for an agent. But there are situatio...
We characterize the possibility of determining all the maximal elements for a preorder on a topologi...
Inspired by the theory of nancial markets with transaction costs, we study a concept of essential su...
International audienceWe study various partially ordered spaces of probability measures and we deter...
We consider the problem of searching for a given element in a partially ordered set. More precisely,...
We consider the problem of extending a (complete) order over a set to its power set. The extension a...
Abstract: Multisets are collections of objects which may include several copies of the same object. ...
We prove a general identity which states that any element of a tuple (ordered set) can be obtained a...
We prove a general identity which states that any element of a tuple (ordered set) can be obtained a...
The paper deals with definition of supremal sets in a rather general framework where deterministic a...
The paper deals with de nition of supremal sets in a rather general frameworkwhere deterministic and...
In the first part of the paper, we study concepts of supremum and maximum as subsets of a topologica...
Partially ordered sets are investigated from the point of view of Bishop's constructive mathematics,...
We study various partially ordered spaces of probability measures and we determine which of them are...
Inspired by the theory of financial markets with transaction costs, we study a concept of essential ...
It is usually assumed that maximal elements are the best option for an agent. But there are situatio...
We characterize the possibility of determining all the maximal elements for a preorder on a topologi...
Inspired by the theory of nancial markets with transaction costs, we study a concept of essential su...
International audienceWe study various partially ordered spaces of probability measures and we deter...
We consider the problem of searching for a given element in a partially ordered set. More precisely,...
We consider the problem of extending a (complete) order over a set to its power set. The extension a...
Abstract: Multisets are collections of objects which may include several copies of the same object. ...
We prove a general identity which states that any element of a tuple (ordered set) can be obtained a...
We prove a general identity which states that any element of a tuple (ordered set) can be obtained a...