AbstractA convex geometry is a combinatorial abstract model introduced by Edelman and Jamison which captures a combinatorial essence of “convexity” shared by some objects including finite point sets, partially ordered sets, trees, rooted graphs. In this paper, we introduce a generalized convex shelling, and show that every convex geometry can be represented as a generalized convex shelling. This is “the representation theorem for convex geometries” analogous to “the representation theorem for oriented matroids” by Folkman and Lawrence. An important feature is that our representation theorem is affine-geometric while that for oriented matroids is topological. Thus our representation theorem indicates the intrinsic simplicity of convex geomet...
We investigate the class of the edge-shelling convex geometries of trees. The edge-shelling convex g...
AbstractLet S be a finite set with m elements in a real linear space and let JS be a set of m interv...
Abstract. The aim of this paper is to characterize morphological convex geometries (resp., antimatro...
AbstractA convex geometry is a combinatorial abstract model introduced by Edelman and Jamison which ...
Convex geometries (Edelman and Jamison, 1985) are finite combinatorial structures dual to union-clos...
Poset geometries are characterized as convex geometries verifying a given property. These geometries...
In this article, we study two open problems posed by Edelman & Reiner about topology of certain...
A closure space (J,−) is called a convex geometry (see, for example, [1]), if it satisfies the anti-...
AbstractWe generalize to oriented matroids classical notions of Convexity Theory: faces of convex po...
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...
AbstractThe Edelman–Jamison problem is to characterize those abstract convex geometries that are rep...
Convex geometries are closure spaces which satisfy anti-exchange property, and they are known as du...
AbstractWe introduce the notion of a convex geometry extending the notion of a finite closure system...
AbstractConvex geometries are closure spaces which satisfy anti-exchange property, and they are know...
We investigate the class of the edge-shelling convex geometries of trees. The edge-shelling convex g...
AbstractLet S be a finite set with m elements in a real linear space and let JS be a set of m interv...
Abstract. The aim of this paper is to characterize morphological convex geometries (resp., antimatro...
AbstractA convex geometry is a combinatorial abstract model introduced by Edelman and Jamison which ...
Convex geometries (Edelman and Jamison, 1985) are finite combinatorial structures dual to union-clos...
Poset geometries are characterized as convex geometries verifying a given property. These geometries...
In this article, we study two open problems posed by Edelman & Reiner about topology of certain...
A closure space (J,−) is called a convex geometry (see, for example, [1]), if it satisfies the anti-...
AbstractWe generalize to oriented matroids classical notions of Convexity Theory: faces of convex po...
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...
AbstractThe Edelman–Jamison problem is to characterize those abstract convex geometries that are rep...
Convex geometries are closure spaces which satisfy anti-exchange property, and they are known as du...
AbstractWe introduce the notion of a convex geometry extending the notion of a finite closure system...
AbstractConvex geometries are closure spaces which satisfy anti-exchange property, and they are know...
We investigate the class of the edge-shelling convex geometries of trees. The edge-shelling convex g...
AbstractLet S be a finite set with m elements in a real linear space and let JS be a set of m interv...
Abstract. The aim of this paper is to characterize morphological convex geometries (resp., antimatro...