On Greedy Bases Packing in Matroids

Abstract

Let S be a finite set and M =  (S, B) be a matroid where B is the set of its bases. We say that a basis B is greedy in M or the pair (M, B) is greedy if, for every sum of bases vector w, the coefficient:$\text{λ(B, w)}\text{=}\text{max}\text{{λ}\text{≥}\text{0 : w}\text{−}\text{λBisagainasumofbasesvector },}$ where B and its characteristic vector will not be distinguished, is integer. We define a notion of minors for (M, B) pairs and we give a characterization of greedy pairs by excluded minors. This characterization gives a large class of matroids for which an integer Carathéodory’s theorem is true.