An improved algorithm for recognizing matroids

Abstract

Let M 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. Locked subsets characterize nontrivial facets of the bases polytope. In this paper, we give a new axiom system for matroids based on locked subsets. We deduce an algorithm for recognizing matroids improving the running time complexity of the best known till today. This algorithm induces a polynomial time algorithm for recognizing uniform matroids. This latter problem is intractable if we use an independence oracle.