Author: "Berget, Andrew" / Topic: combinatorics (math.co) - Searchworks@Jio Institute Digital Library Search Results

Author: Berget, Andrew, Eur, Christopher, Spink, Hunter, and Tseng, Dennis
Subjects: Mathematics - Algebraic Geometry, Mathematics::Combinatorics, Mathematics::Algebraic Geometry, Mathematics::K-Theory and Homology, General Mathematics, FOS: Mathematics, 52B40, 14T90, 14C15, 14C17, Mathematics - Combinatorics, Combinatorics (math.CO), Algebraic Geometry (math.AG)
Abstract: We introduce certain torus-equivariant classes on permutohedral varieties which we call "tautological classes of matroids" as a new geometric framework for studying matroids. Using this framework, we unify and extend many recent developments in matroid theory arising from its interaction with algebraic geometry. We achieve this by establishing a Chow-theoretic description and a log-concavity property for a 4-variable transformation of the Tutte polynomial, and by establishing an exceptional Hirzebruch-Riemann-Roch-type formula for permutohedral varieties that translates between K-theory and Chow theory., Comment: 71 pages; comments welcome. v4: minor edits. To appear in Invent. Math
Published: 2023

Author: Berget, Andrew, Spink, Hunter, and Tseng, Dennis
Subjects: Mathematics - Algebraic Geometry, Mathematics::Combinatorics, Mathematics::Algebraic Geometry, FOS: Mathematics, Mathematics - Combinatorics, Combinatorics (math.CO), Algebraic Geometry (math.AG)
Abstract: For any matroid $M$, we compute the Tutte polynomial $T_M(x,y)$ using the mixed intersection numbers of certain classes in the combinatorial Chow ring $A^\bullet(M)$ arising from hypersimplices. Using the mixed Hodge-Riemann relations, we deduce a strengthening of the log-concavity of the $h$-vector of a matroid complex, improving on an old conjecture of Dawson., 37 pages. To appear DMJ
Published: 2020

Author: Berget, Andrew and Fink, Alex
Subjects: Mathematics - Algebraic Geometry, FOS: Mathematics, Mathematics - Combinatorics, Combinatorics (math.CO), Algebraic Geometry (math.AG)
Abstract: The group $G = GL_r(k) \times (k^\times)^n$ acts on $\mathbf{A}^{r \times n}$, the space of $r$-by-$n$ matrices: $GL_r(k)$ acts by row operations and $(k^\times)^n$ scales columns. A matrix orbit closure is the Zariski closure of a point orbit for this action. We prove that the class of such an orbit closure in $G$ equivariant $K$-theory of $\mathbf{A}^{r \times n}$ is determined by the matroid of a generic point. We present two formulas for this class. The key to the proof is to show that matrix orbit closures have rational singularities., 27pp. Expanded introduction. New section with positivity conjectures for all matroids. Comments welcome!
Published: 2019

Author: Berget, Andrew
Subjects: FOS: Mathematics, Mathematics - Combinatorics, Combinatorics (math.CO)
Abstract: The group $G(m,1,n)$ consists of $n$-by-$n$ monomial matrices whose entries are $m$th roots of unity. It is generated by $n$ complex reflections acting on $\mathbf{C}^n$. The reflecting hyperplanes give rise to a (hyperplane) arrangement $\mathcal{G} \subset \mathbf{C}^n$. The internal zonotopal algebra of an arrangement is a finite dimensional algebra first studied by Holtz and Ron. Its dimension is the number of bases of the associated matroid with zero internal activity. In this paper we study the structure of the internal zonotopal algebra of the Gale dual of the reflection arrangement of $G(m,1,n)$, as a representation of this group. Our main result is a formula for the top degree component as an induced character from the cyclic group generated by a Coxeter element. We also provide results on representation stability, a connection to the Whitehouse representation in type~A, and an analog of decreasing trees in type~B., Comment: 21 pages, 1 figure. Corrected statement of the theorem and proof
Published: 2016
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Author: Berget, Andrew, Bruns, Winfried, and Conca, Aldo
Subjects: Mathematics::Commutative Algebra, FOS: Mathematics, Mathematics - Combinatorics, Combinatorics (math.CO), Mathematics - Commutative Algebra, Commutative Algebra (math.AC)
Abstract: We investigate products J of ideals of "row initial" minors in the polynomial ring K[X] defined by a generic m-by-n matrix. Such ideals are shown to be generated by a certain set of standard bitableaux that we call superstandard. These bitableaux form a Gr\"obner basis of J, and J has a linear minimal free resolution. These results are used to derive a new generating set for the Grothendieck group of finitely generated (T_m x GL_n(K))-equivariant modules over K[X]. We employ the Knuth--Robinson--Schensted correspondence and a toric deformation of the multi-Rees algebra that parameterizes the ideals J., Comment: 16 pages
Published: 2013
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Author: Berget, Andrew
Subjects: Physical Sciences and Mathematics, FOS: Mathematics, Mathematics - Combinatorics, Combinatorics (math.CO), math.CO
Abstract: In this note we give a transparent proof of a result of da Cruz and Dias da Silva on the equality of symmetrized decomposable tensors. This will be done by explaining that their result follows from the fact that the coordinate ring of a flag variety is a unique factorization domain., Comment: 5 pages
Published: 2010
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Author: Berget, Andrew
Subjects: Mathematics::Combinatorics, FOS: Mathematics, Physical Sciences and Mathematics, Mathematics - Combinatorics, Combinatorics (math.CO), math.CO, Mathematics::Algebraic Topology
Abstract: The Whitney module of a matroid is a natural analogue of the tensor algebra of the exterior algebra of a vector space that takes into account the dependencies of a matroid. In this paper we indicate the role that tableaux can play in describing the Whitney module. We will use our results to describe a basis of the Whitney module of a certain class of matroids known as freedom matroids (also known as Schubert, or shifted matroids). The doubly multilinear submodule of the Whitney module is a representation of the symmetric group. We will describe a formula for the multiplicity of hook shapes in this representation in terms of no broken circuit sets.
Published: 2009

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