Rota's Basis Conjecture holds asymptotically

Abstract

Rota's Basis Conjecture is a well known problem from matroid theory, that states that for any collection of n bases in a rank n matroid, it is possible to decompose all the elements into n disjoint rainbow bases. Here an asymptotic version of this is proved. We show that it is possible to find n-o(n) disjoint rainbow independent sets of size n-o(n).