The Facets of the Bases Polytope of a Matroid and Two Consequences

Abstract

Let M to be a matroid defined on a finite set E and L⊂ E. L is locked in M if M|L and M*|(E L) are 2-connected, and min\r(L), r*(E L)\ ≥ 2. In this paper, we prove that the nontrivial facets of the bases polytope of M are described by the locked subsets. We deduce that finding the maximum--weight basis of M is a polynomial time problem for matroids with a polynomial number of locked subsets. This class of matroids is closed under 2-sums and contains the class of uniform matroids, the V\'amos matroid and all the excluded minors of 2-sums of uniform matroids. We deduce also a matroid oracle for testing uniformity of matroids after one call of this oracle.