Lattices related to extensions of presentations of transversal matroids

Abstract

For a presentation A of a transversal matroid M, we study the set TA of single-element transversal extensions of M that have presentations that extend A; we order these extensions by the weak order. We show that TA is a distributive lattice, and that each finite distributive lattice is isomorphic to TA for some presentation A of some transversal matroid M. We show that TA TB, for any two presentations A and B of M, is a sublattice of both TA and TB. We prove sharp upper bounds on |TA| for presentations A of rank less than r(M) in the order on presentations; we also give a sharp upper bound on |TA TB|. The main tool we introduce to study TA is the lattice LA of closed sets of a certain closure operator on the lattice of subsets of \1,2,…,r(M)\.