AbstractWe consider a class of lattice polyhedra introduced by Hoffman and Schwartz. The polyhedra are defined in terms of a kind of submodular function defined on the set of antichains of a poset. Recently, Krüger (Discrete Appl. Math. 99 (2000) 125–148) showed the validity of a greedy algorithm for this class of lattice polyhedra, which had been proved by Faigle and Kern to be valid for a less general class of polyhedra. In this paper, we investigate submodular functions in Krüger's sense and associated polyhedra. We show that the Lovász extension of a submodular function in Krüger's sense is convex, and vice versa. Furthermore, we show a polynomial-time algorithm to test whether or not a vector is an extreme point of the associated polyh...
A general ordertheoretic linear programming model for the study of matroid-type greedy algorithms is...
AbstractIt has widely been recognized that submodular set functions and base polyhedra associated wi...
2.1 Equivalent definitions of submodularity........... 152 2.2 Associated polyhedra....................
AbstractWe consider a class of lattice polyhedra introduced by Hoffman and Schwartz. The polyhedra a...
Convex geometries are closure spaces which satisfy anti-exchange property, and they are known as dua...
AbstractConvex geometries are closure spaces which satisfy anti-exchange property, and they are know...
Set-functions appear in many areas of computer science and applied mathematics, such as machine lear...
Submodular functions are the functions that frequently appear in connection with many combi-natorial...
In this paper we investigate k-submodular functions. This natural family of discrete functions inclu...
Set-functions appear in many areas of computer science and applied mathematics, such as machine lear...
AbstractA pseudolattice L is a poset with lattice-type binary operations. Given a submodular functio...
A greedy algorithm solves a dual pair of linear programs where the primal variables are associated t...
This paper sheds a new light on submodular function minimization and maximization from the viewpoint...
Abstract. Submodular functions are discrete functions that model laws of diminishing returns and enj...
A general ordertheoretic linear programming model for the study of matroid-type greedy algorithms is...
A general ordertheoretic linear programming model for the study of matroid-type greedy algorithms is...
AbstractIt has widely been recognized that submodular set functions and base polyhedra associated wi...
2.1 Equivalent definitions of submodularity........... 152 2.2 Associated polyhedra....................
AbstractWe consider a class of lattice polyhedra introduced by Hoffman and Schwartz. The polyhedra a...
Convex geometries are closure spaces which satisfy anti-exchange property, and they are known as dua...
AbstractConvex geometries are closure spaces which satisfy anti-exchange property, and they are know...
Set-functions appear in many areas of computer science and applied mathematics, such as machine lear...
Submodular functions are the functions that frequently appear in connection with many combi-natorial...
In this paper we investigate k-submodular functions. This natural family of discrete functions inclu...
Set-functions appear in many areas of computer science and applied mathematics, such as machine lear...
AbstractA pseudolattice L is a poset with lattice-type binary operations. Given a submodular functio...
A greedy algorithm solves a dual pair of linear programs where the primal variables are associated t...
This paper sheds a new light on submodular function minimization and maximization from the viewpoint...
Abstract. Submodular functions are discrete functions that model laws of diminishing returns and enj...
A general ordertheoretic linear programming model for the study of matroid-type greedy algorithms is...
A general ordertheoretic linear programming model for the study of matroid-type greedy algorithms is...
AbstractIt has widely been recognized that submodular set functions and base polyhedra associated wi...
2.1 Equivalent definitions of submodularity........... 152 2.2 Associated polyhedra....................