Convex geometries are closure spaces which satisfy anti-exchange property, and they are known as dual of antimatroids. We consider functions defined on the sets of the extreme points of a convex geometry. Faigle-Kern (1996) presented a greedy algorithm to linear programming problems for shellings of posets, and Krüger (2000) introduced b-submodular functions and proved that Faigle-Kern's algorithm works for shellings of posets if and only if the given set function is b-submodular. We extend their results to all classes of convex geometries, that is, we prove that the same algorithm works for all convex geometries if and only if the given set function on the extreme sets is submodular in our sense
We study the problem of maximizing a monotone non-decreasing function {Mathematical expression} subj...
Convex geometries form a subclass of closure systems with unique criticals, or UC-systems. We show t...
The present note reveals the role of the concept of greedy system of linear inequalities played in c...
Convex geometries are closure spaces which satisfy anti-exchange property, and they are known as du...
AbstractConvex geometries are closure spaces which satisfy anti-exchange property, and they are know...
AbstractWe consider a class of lattice polyhedra introduced by Hoffman and Schwartz. The polyhedra a...
A closure space (J,−) is called a convex geometry (see, for example, [1]), if it satisfies the anti-...
The aim of this paper is to characterize morphological convex geometries (resp., antimatroids). We d...
Abstract. A closure system with the anti-exchange axiom is called a convex geometry. One geometry is...
Generalizing the idea of the Lovász extension of a set function and the discrete Choquet integral, w...
A greedy algorithm solves a dual pair of linear programs where the primal variables are associated t...
This paper deals with polymatroids, generalized and bisubmodular polytopes that are expressed by a s...
Convex geometries (Edelman and Jamison, 1985) are finite combinatorial structures dual to union-clos...
Abstract. The aim of this paper is to characterize morphological convex geometries (resp., antimatro...
AbstractWe consider a system of linear inequalities and its associated polyhedron for which we can m...
We study the problem of maximizing a monotone non-decreasing function {Mathematical expression} subj...
Convex geometries form a subclass of closure systems with unique criticals, or UC-systems. We show t...
The present note reveals the role of the concept of greedy system of linear inequalities played in c...
Convex geometries are closure spaces which satisfy anti-exchange property, and they are known as du...
AbstractConvex geometries are closure spaces which satisfy anti-exchange property, and they are know...
AbstractWe consider a class of lattice polyhedra introduced by Hoffman and Schwartz. The polyhedra a...
A closure space (J,−) is called a convex geometry (see, for example, [1]), if it satisfies the anti-...
The aim of this paper is to characterize morphological convex geometries (resp., antimatroids). We d...
Abstract. A closure system with the anti-exchange axiom is called a convex geometry. One geometry is...
Generalizing the idea of the Lovász extension of a set function and the discrete Choquet integral, w...
A greedy algorithm solves a dual pair of linear programs where the primal variables are associated t...
This paper deals with polymatroids, generalized and bisubmodular polytopes that are expressed by a s...
Convex geometries (Edelman and Jamison, 1985) are finite combinatorial structures dual to union-clos...
Abstract. The aim of this paper is to characterize morphological convex geometries (resp., antimatro...
AbstractWe consider a system of linear inequalities and its associated polyhedron for which we can m...
We study the problem of maximizing a monotone non-decreasing function {Mathematical expression} subj...
Convex geometries form a subclass of closure systems with unique criticals, or UC-systems. We show t...
The present note reveals the role of the concept of greedy system of linear inequalities played in c...