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1. Ehrhart theory of paving and panhandle matroids

   https://doi.org/10.1515/advgeom-2023-0020  

   Hanely, Derek; Martin, Jeremy L.; McGinnis, Daniel; Miyata, Dane; Nasr, George D.; Vindas-Meléndez, Andrés R.; Yin, Mei (October 2023, Advances in Geometry)

   Abstract We show that the base polytopeP_Mof any paving matroidMcan be systematically obtained from a hypersimplex by slicing off certain subpolytopes, namely base polytopes of lattice path matroids corresponding to panhandle-shaped Ferrers diagrams. We calculate the Ehrhart polynomials of these matroids and consequently write down the Ehrhart polynomial ofP_M, starting with Katzman’s formula for the Ehrhart polynomial of a hypersimplex. The method builds on and generalizes Ferroni’s work on sparse paving matroids. Combinatorially, our construction corresponds to constructing a uniform matroid from a paving matroid by iterating the operation ofstressed-hyperplane relaxationintroduced by Ferroni, Nasr and Vecchi, which generalizes the standard matroid-theoretic notion of circuit-hyperplane relaxation. We present evidence that panhandle matroids are Ehrhart positive and describe a conjectured combinatorial formula involving chain forests and Eulerian numbers from which Ehrhart positivity of panhandle matroids will follow. As an application of the main result, we calculate the Ehrhart polynomials of matroids associated with Steiner systems and finite projective planes, and show that they depend only on their design-theoretic parameters: for example, while projective planes of the same order need not have isomorphic matroids, their base polytopes must be Ehrhart equivalent. 

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2. Intersection Theory of Matroids: Variations on a Theme

   https://doi.org/10.1017/9781009490559.002  

   Ardila–Mantilla, Federico (June 2024, Cambridge University Press)

   Chow rings of toric varieties, which originate in intersection theory, feature a rich combinatorial structure of independent interest. We survey four different ways of computing in these rings, due to Billera, Brion, Fulton–Sturmfels, and Allermann–Rau. We illustrate the beauty and power of these methods by giving four proofs of Huh and Huh–Katz’s formula μ_k(M) = deg_M(α^{r−k}β^k) for the coefficients of the reduced characteristic polynomial of a matroid M as the mixed intersection numbers of the hyperplane and reciprocal hyperplane classes α and β in the Chow ring of M. Each of these proofs sheds light on a different aspect of matroid combinatorics, and provides a framework for further developments in the intersection theory of matroids. Our presentation is combinatorial, and does not assume previous knowledge of toric varieties, Chow rings, or intersection theory. This survey was prepared for the Clay Lecture to be delivered at the 2024 British Combinatorics Conference. 

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3. Intersection Theory of Polymatroids

   https://doi.org/10.1093/imrn/rnad213  

   Eur, Christopher; Larson, Matt (September 2023, International Mathematics Research Notices)

   Abstract Polymatroids are combinatorial abstractions of subspace arrangements in the same way that matroids are combinatorial abstractions of hyperplane arrangements. By introducing augmented Chow rings of polymatroids, modeled after augmented wonderful varieties of subspace arrangements, we generalize several algebro-geometric techniques developed in recent years to study matroids. We show that intersection numbers in the augmented Chow ring of a polymatroid are determined by a matching property known as the Hall–Rado condition, which is new even in the case of matroids. 

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4. Faster exact and approximation algorithms for packing and covering matroids via push-relabel

   https://doi.org/10.1137/1.9781611977912.82  

   Quanrud, Kent (January 2024, Proceedings of the 2024 ACM-SIAM Symposium on Discrete Algorithms, SODA 2024, Alexandria, VA, USA, January 7-10, 2024)

   Woodruff, David P. (Ed.)

   Matroids are a fundamental object of study in combinatorial optimization. Three closely related and important problems involving matroids are maximizing the size of the union of $$k$$ independent sets (that is, \emph{$$k$$-fold matroid union}), computing $$k$$ disjoint bases (a.k.a.\ \emph{matroid base packing}), and covering the elements by $$k$$ bases (a.k.a.\ \emph{matroid base covering}). These problems generalize naturally to integral and real-valued capacities on the elements. This work develops faster exact and/or approximation problems for these and some other closely related problems such as optimal reinforcement and matroid membership. We obtain improved running times both for general matroids in the independence oracle model and for the graphic matroid. The main thrust of our improvements comes from developing a faster and unifying \emph{push-relabel} algorithm for the integer-capacitated versions of these problems, building on previous work by [FM12]. We then build on this algorithm in two directions. First we develop a faster augmenting path subroutine for $$k$$-fold matroid union that, when appended to an approximation version of the push-relabel algorithm, gives a faster exact algorithm for some parameters of $$k$$. In particular we obtain a subquadratic-query running time in the uncapacitated setting for the three basic problems listed above. We also obtain faster approximation algorithms for these problems with real-valued capacities by reducing to small integral capacities via randomized rounding. To this end, we develop a new randomized rounding technique for base covering problems in matroids that may also be of independent interest. 

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5. Purity and Separation for Oriented Matroids

   https://doi.org/10.1090/memo/1439  

   Galashin, Pavel; Postnikov, Alexander (September 2023, Memoirs of the American Mathematical Society)

   Leclerc and Zelevinsky, motivated by the study of quasi-commuting quantum flag minors, introduced the notions of strongly separated and weakly separated collections. These notions are closely related to the theory of cluster algebras, to the combinatorics of the double Bruhat cells, and to the totally positive Grassmannian. A key feature, called the purity phenomenon, is that every maximal by inclusion strongly (resp., weakly) separated collection of subsets in $[n]$ has the same cardinality. In this paper, we extend these notions and define $$\mathcal{M}$$-separated collections for any oriented matroid $$\mathcal{M}$$. We show that maximal by size $$\mathcal{M}$$-separated collections are in bijection with fine zonotopal tilings (if $$\mathcal{M}$$ is a realizable oriented matroid), or with one-element liftings of $$\mathcal{M}$$ in general position (for an arbitrary oriented matroid). We introduce the class of pure oriented matroids for which the purity phenomenon holds: an oriented matroid $$\mathcal{M}$$ is pure if $$\mathcal{M}$$-separated collections form a pure simplicial complex, i.e., any maximal by inclusion $$\mathcal{M}$$-separated collection is also maximal by size. We pay closer attention to several special classes of oriented matroids: oriented matroids of rank $$3$$, graphical oriented matroids, and uniform oriented matroids. We classify pure oriented matroids in these cases. An oriented matroid of rank $$3$$ is pure if and only if it is a positroid (up to reorienting and relabeling its ground set). A graphical oriented matroid is pure if and only if its underlying graph is an outerplanar graph, that is, a subgraph of a triangulation of an $$n$$-gon. We give a simple conjectural characterization of pure oriented matroids by forbidden minors and prove it for the above classes of matroids (rank $$3$$, graphical, uniform). 

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