AbstractA set function is a function whose domain is the power set of a set, which is assumed to be finite in this paper. We treat a possibly nonadditive set function, i.e., a set function which does not satisfy necessarily additivity, ϕ(A)+ϕ(B)=ϕ(A∪B) forA∩B=∅, as an element of the linear space on the power set. Then some of the famous classes of set functions are polyhedral in that linear space, i.e., expressed by a finite number of linear inequalities. We specify the sets of the coefficients of the linear inequalities for some classes of set functions. Then we consider the following three problems: (a) the domain extension problem for nonadditive set functions, (b) the sandwich problem for nonadditive set functions, and (c) the represent...
Abstract. We show that every non-low c.e. set joins all ∆02 diagonally non-computable functions to ∅...
. Where N is a finite set of the cardinality n and P the family of all its subsets, we study real fu...
Many proofs of the fact that there exist Lebesgue nonmeasurable subsets of the real line are known. ...
AbstractA set function is a function whose domain is the power set of a set, which is assumed to be ...
In leading up to the proof, methods for constructing fields and finitely additive set functions are ...
Polyhedral cones can be represented by sets of linear inequalities that express inter-variable relat...
International audienceSet functions are widely used in many domains of Operations Research (cooperat...
AbstractWe consider the problems of realizing set functions as cut functions on graphs and hypergrap...
International audienceThe paper studies the vector space of set functions on a finite set X, which c...
We follow the rules: a, x, A, B denote sets and m, n denote natural numbers. The following propositi...
A definition of a special class of optimization problems with set functions is given. The existence ...
summary:In this note a class of convex polyhedral sets of functions is studied. A set of the conside...
AbstractAn existence theorem for a best approximation to a function in Lp, 1 ⩽ p ⩽ ∞, by functions f...
Three theorems for set functions, closely related to the AhlswedeDaykin 4-function theorem (4FT), ar...
International audienceWe give a comprehensive introduction to the algebra of set functions and its g...
Abstract. We show that every non-low c.e. set joins all ∆02 diagonally non-computable functions to ∅...
. Where N is a finite set of the cardinality n and P the family of all its subsets, we study real fu...
Many proofs of the fact that there exist Lebesgue nonmeasurable subsets of the real line are known. ...
AbstractA set function is a function whose domain is the power set of a set, which is assumed to be ...
In leading up to the proof, methods for constructing fields and finitely additive set functions are ...
Polyhedral cones can be represented by sets of linear inequalities that express inter-variable relat...
International audienceSet functions are widely used in many domains of Operations Research (cooperat...
AbstractWe consider the problems of realizing set functions as cut functions on graphs and hypergrap...
International audienceThe paper studies the vector space of set functions on a finite set X, which c...
We follow the rules: a, x, A, B denote sets and m, n denote natural numbers. The following propositi...
A definition of a special class of optimization problems with set functions is given. The existence ...
summary:In this note a class of convex polyhedral sets of functions is studied. A set of the conside...
AbstractAn existence theorem for a best approximation to a function in Lp, 1 ⩽ p ⩽ ∞, by functions f...
Three theorems for set functions, closely related to the AhlswedeDaykin 4-function theorem (4FT), ar...
International audienceWe give a comprehensive introduction to the algebra of set functions and its g...
Abstract. We show that every non-low c.e. set joins all ∆02 diagonally non-computable functions to ∅...
. Where N is a finite set of the cardinality n and P the family of all its subsets, we study real fu...
Many proofs of the fact that there exist Lebesgue nonmeasurable subsets of the real line are known. ...