The polytope of all matroids in ranks 2 and 3
Abstract
We give explicit recursive constructions for the polytope of all matroids r,n in ranks 2 and 3 for all ground set sizes. This polytope was introduced in recent work by Ferroni and Fink as a tool for checking positivity conjectures for valuative invariants. We supplement our theoretical construction by an implementation, which allows for the computation of 2,n for n≤ 33 and 3,n for n≤ 10. Further, we compute Schubert expansions for all isomorphism classes of matroids of rank 2 up to n = 80, and for rank 3 up to n = 11.
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