AbstractIf the collection of all real-valued functions defined on a finite partially ordered set S of n elements is identified in the natural way with Rn, it is obvious that the subset of functions that are isotone or order preserving with respect to the given partial order constitutes a closed, convex, polyhedral cone K in Rn. The dual cone K* of K is the set of all linear functionals that are nonpositive of K. This article identifies the important geometric properties of K, and characterizes a nonredundant set of defining equations and inequalities for K* in terms of a special class of partitions of S into upper and lower sets. These defining constraints immediately imply a set of extreme rays spanning K and K*. One of the characterizatio...
AbstractDuality relationships in finding a best approximation from a nonconvex cone in a normed line...
Abstract. This paper establishes a relation between F-based cones and solid cones in a separated loc...
In this paper we study a class of convex sets which are called closed pseudo-cones and study a new d...
AbstractIf the collection of all real-valued functions defined on a finite partially ordered set S o...
AbstractThis survey deals with the aspects of archimedian partially ordered finite-dimensional real ...
There the combinative cones and polyhedrons are studied. The series of problems of polyhedral combin...
Polyhedral cones can be represented by sets of linear inequalities that express inter-variable relat...
In the paper, we describe various applications of closedness and duality theorems from previous work...
AbstractA set function f:2S→R, is said to be polyhedrally tight (pt) (dually polyhedrally tight (dpt...
AbstractLet C be a convex set in Rn. For each y ϵ C, the cone of C at y, denoted by cone(y, C), is t...
AbstractSuppose K1 and K2 are proper polyhedral cones in vector spaces E1 and E2 respectively. Then ...
AbstractLet K be a closed, pointed, full cone in a finite dimensional real vector space. We associat...
A partial semimetric on a set X is a function $(x, y) \mapsto p(x, y) \in \RR_{\geq 0}$ satisfying $...
© 2016 by the Tusi Mathematical Research Group. Let n and k be nonnegative integers such that 1 ≤ k ...
AbstractIf K and L are mutually dual pointed convex cones in Rn with the metric projections onto the...
AbstractDuality relationships in finding a best approximation from a nonconvex cone in a normed line...
Abstract. This paper establishes a relation between F-based cones and solid cones in a separated loc...
In this paper we study a class of convex sets which are called closed pseudo-cones and study a new d...
AbstractIf the collection of all real-valued functions defined on a finite partially ordered set S o...
AbstractThis survey deals with the aspects of archimedian partially ordered finite-dimensional real ...
There the combinative cones and polyhedrons are studied. The series of problems of polyhedral combin...
Polyhedral cones can be represented by sets of linear inequalities that express inter-variable relat...
In the paper, we describe various applications of closedness and duality theorems from previous work...
AbstractA set function f:2S→R, is said to be polyhedrally tight (pt) (dually polyhedrally tight (dpt...
AbstractLet C be a convex set in Rn. For each y ϵ C, the cone of C at y, denoted by cone(y, C), is t...
AbstractSuppose K1 and K2 are proper polyhedral cones in vector spaces E1 and E2 respectively. Then ...
AbstractLet K be a closed, pointed, full cone in a finite dimensional real vector space. We associat...
A partial semimetric on a set X is a function $(x, y) \mapsto p(x, y) \in \RR_{\geq 0}$ satisfying $...
© 2016 by the Tusi Mathematical Research Group. Let n and k be nonnegative integers such that 1 ≤ k ...
AbstractIf K and L are mutually dual pointed convex cones in Rn with the metric projections onto the...
AbstractDuality relationships in finding a best approximation from a nonconvex cone in a normed line...
Abstract. This paper establishes a relation between F-based cones and solid cones in a separated loc...
In this paper we study a class of convex sets which are called closed pseudo-cones and study a new d...