AbstractMotivated by a question in commutative algebra and inspired by the work of Sturmfels, we introduce the class of base-sortable matroids and show that it is closed under several matroid operations. All matroids of rank 2 are base-sortable and we give a characterization of base-sortability by excluded minors in the case of graphic matroids and rank 3 matroids. Transversal matroids with certain presentations are also base-sortable. For a base-sortable matroid M, the basis monomial ring RMis shown to be Koszul, by proving that the toric ideal of this ring has a quadratic Gröbner basis. Extending the concept of combinatorial pure subrings considered by Herzog, Hibi and Ohsugi we define the matroid operations deletion, contraction and dual...