Your search keyword '"Musiker, Gregg"' showing total 39 results

1. Minimal Matchings for dP3 Cluster Variables

Author

Chiang, Judy Hsin-Hui, Musiker, Gregg, and Nguyen, Son

Subjects

Mathematics - Combinatorics, 05C70, 06A07, 13F60

Abstract

In previous work [LM17], Tri Lai and the second author studied a family of subgraphs of the dP3 brane tiling, called Aztec castles, whose dimer partition functions provide combinatorial formulas for cluster variables resulting from mutations of the quiver associated with the del Pezzo surface dP3. In our paper, we investigate a variant of the dP3 quiver by considering a second alphabet of variables that breaks the symmetries of the relevant recurrences. This deformation is motivated by the theory of cluster algebras with principal coefficients introduced by Fomin and Zelevinsky. Our main result gives an explicit formula extending previously known generating functions for dP3 cluster variables by using Aztec castles and constructing their associated minimal matchings., Comment: 26 pages, 53 figures

Published

2024

2. Dimer face polynomials in knot theory and cluster algebras

Author

Mészáros, Karola, Musiker, Gregg, Sherman-Bennett, Melissa, and Vidinas, Alexander

Subjects

Mathematics - Combinatorics, Mathematics - Geometric Topology

Abstract

The set of perfect matchings of a connected bipartite plane graph $G$ has the structure of a distributive lattice, as shown by Propp, where the partial order is induced by the height of a matching. In this article, our focus is the dimer face polynomial of $G$, which is the height generating function of all perfect matchings of $G$. We connect the dimer face polynomial on the one hand to knot theory, and on the other to cluster algebras. We show that certain dimer face polynomials are multivariate generalizations of Alexander polynomials of links, highlighting another combinatorial view of the Alexander polynomial. We also show that an arbitrary dimer face polynomial is an $F$-polynomial in the cluster algebra whose initial quiver is dual to the graph $G$. As a result, we recover a recent representation theoretic result of Bazier-Matte and Schiffler that connects $F$-polynomials and Alexander polynomials, albeit from a very different, dimer-based perspective. As another application of our results, we also show that all nonvanishing Pl\"ucker coordinates on open positroid varieties are cluster monomials.

Published

2024

3. Higher Dimer Covers on Snake Graphs

Author

Musiker, Gregg, Ovenhouse, Nicholas, Schiffler, Ralf, and Zhang, Sylvester W.

Subjects

Mathematics - Combinatorics, Mathematics - Number Theory, 11A55 05A15 05F99

Abstract

Snake graphs are a class of planar graphs that are important in the theory of cluster algebras. Indeed, the Laurent expansions of the cluster variables in cluster algebras from surfaces are given as weight generating functions for 1-dimer covers (or perfect matchings) of snake graphs. Moreover, the enumeration of 1-dimer covers of snake graphs provides a combinatorial interpretation of continued fractions. In particular, the number of 1-dimer covers of the snake graph $\mathscr{G}[a_1,\dots,a_n]$ is the numerator of the continued fraction $[a_1,\dots,a_n]$. This number is equal to the top left entry of the matrix product $\left(\begin{smallmatrix} a_1&1\\1&0 \end{smallmatrix}\right) \cdots \left(\begin{smallmatrix} a_n&1\\1&0 \end{smallmatrix}\right)$. In this paper, we give enumerative results on $m$-dimer covers of snake graphs. We show that the number of $m$-dimer covers of the snake graph $\mathscr{G}[a_1,\ldots,a_n]$ is the top left entry of a product of analogous $(m+1)$-by-$(m+1)$ matrices. We discuss how our enumerative results are related to other known combinatorial formulas, and we suggest a generalization of continued fractions based on our methods. These generalized continued fractions provide some interesting open questions and a possibly novel approach towards Hermite's problem for cubic irrationals., Comment: 31 pages, comments are welcome

Published

2023

4. Twists of Gr(3,n) Cluster Variables as Double and Triple Dimer Partition Functions

Author

Elkin, Moriah, Musiker, Gregg, and Wright, Kayla

Subjects

Mathematics - Combinatorics, Mathematics - Representation Theory

Abstract

We give a combinatorial interpretation for certain cluster variables in Grassmannian cluster algebras in terms of double and triple dimer configurations. More specifically, we examine several Gr(3,n) cluster variables that may be written as degree two or degree three polynomials in terms of Pl\"ucker coordinates, and give generating functions for their images under the twist map - a cluster algebra automorphism introduced in work of Berenstein-Fomin-Zelevinsky. The generating functions range over certain double or triple dimer configurations on an associated plabic graph, which we describe using particular non-crossing matchings or webs (as defined by Kuperberg), respectively. These connections shed light on a recent conjecture of Cheung et al., extend the concept of web duality introduced in a paper of Fraser-Lam-Le, and more broadly make headway on understanding Grassmannian cluster algebras for Gr(3,n)., Comment: To appear in Algebraic Combinatorics. 48 pages, 37 figures

Published

2023

5. Mixed Dimer Configuration Model in Type $D$ Cluster Algebras II: Beyond the Acyclic Case

Author

Farrell, Libby, Musiker, Gregg, and Wright, Kayla

Subjects

Mathematics - Combinatorics, Mathematics - Representation Theory

Abstract

This is a sequel to the second and third author's Mixed Dimer Configuration Model in Type $D$ Cluster Algebras where we extend our model to work for quivers that contain oriented cycles. Namely, we extend a combinatorial model for $F$-polynomials for type $D_n$ using dimer and double dimer configurations. In particular, we give a graph theoretic recipe that describes which monomials appear in such $F$-polynomials, as well as a graph theoretic way to determine the coefficients of each of these monomials. To prove this formula, we provide an explicit bijection between mixed dimer configurations and dimension vectors of submodules of an indecomposable Jacobian algebra module., Comment: 51 pages, 32 figures

Published

2022

6. Matrix Formulae for Decorated Super Teichm\'uller Spaces

Author

Musiker, Gregg, Ovenhouse, Nicholas, and Zhang, Sylvester W.

Subjects

Mathematics - Combinatorics, Mathematical Physics, Mathematics - Geometric Topology

Abstract

For an arc on a bordered surface with marked points, we associate a holonomy matrix using a product of elements of the supergroup $\mathrm{OSp}(1|2)$, which defines a flat $\mathrm{OSp}(1|2)$-connection on the surface. We show that our matrix formulas of an arc yields its super $\lambda$-length in Penner-Zeitlin's decorated super Teichm\"uller space. This generalizes the matrix formulas of Fock-Goncharov and Musiker-Williams. We also prove that our matrix formulas agree with the combinatorial formulas given in the authors' previous works. As an application, we use our matrix formula in the case of an annulus to obtain new results on super Fibonacci numbers., Comment: 38 pages, 19 figures

Published

2022

7. Labeled Chip-firing on Binary Trees with $2^n-1$ Chips

Author

Musiker, Gregg and Nguyen, Son

Subjects

Mathematics - Combinatorics

Abstract

We study labeled chip-firing on binary trees and some of its modifications. We prove a sorting property of terminal configurations of the process. We also analyze the endgame moves poset and prove that this poset is a modular lattice., Comment: Updated version to appear in Annals of Combinatorics

Published

2022

8. Two Formulas for $F$-Polynomials

Author

Lin, Feiyang, Musiker, Gregg, and Nakanishi, Tomoki

Subjects

Mathematics - Combinatorics, 05E16

Abstract

We discuss a product formula for $F$-polynomials in cluster algebras, and provide two proofs. One proof is inductive and uses only the mutation rule for $F$-polynomials. The other is based on the Fock-Goncharov decomposition of mutations. We conclude by expanding this product formula as a sum and illustrate applications. This expansion provides an explicit combinatorial computation of $F$-polynomials in a given seed that depends only on the $\mathbf{c}$-vectors and $\mathbf{g}$-vectors along a finite sequence of mutations from the initial seed to the given seed.

Published

2021

9. Cluster scattering diagrams and theta functions for reciprocal generalized cluster algebras

Author

Cheung, Man-Wai Mandy, Kelley, Elizabeth, and Musiker, Gregg

Subjects

Mathematics - Combinatorics, Mathematics - Commutative Algebra, Mathematics - Algebraic Geometry, Mathematics - Quantum Algebra, Mathematics - Representation Theory, 13F60

Abstract

We give a construction of generalized cluster varieties and generalized cluster scattering diagrams for reciprocal generalized cluster algebras, the latter of which were defined by Chekhov and Shapiro. These constructions are analogous to the structures given for ordinary cluster algebras in the work of Gross, Hacking, Keel, and Kontsevich. As a consequence of these constructions, we are also able to construct theta functions for generalized cluster algebras, again in the reciprocal case, and demonstrate a number of their structural properties., Comment: Updated to reflect reviewers' comments and to use the preferred journal formatting

Published

2021

10. Double Dimer Covers on Snake Graphs from Super Cluster Expansions

Author

Musiker, Gregg, Ovenhouse, Nicholas, and Zhang, Sylvester W.

Subjects

Mathematics - Combinatorics, 13F60, 17A70, 05C70, 30F60

Abstract

In a recent paper, the authors gave combinatorial formulas for the Laurent expansions of super $\lambda$-lengths in a marked disk, generalizing Schiffler's $T$-path formula. In the present paper, we give an alternate combinatorial expression for these super $\lambda$-lengths in terms of double dimer covers on snake graphs. This generalizes the dimer formulas of Musiker, Schiffler, and Williams., Comment: Minor edits

Published

2021

11. An Expansion Formula for Decorated Super-Teichm\'uller Spaces

Author

Musiker, Gregg, Ovenhouse, Nicholas, and Zhang, Sylvester W.

Subjects

Mathematics - Combinatorics

Abstract

Motivated by the definition of super-Teichm\"uller spaces, and Penner-Zeitlin's recent extension of this definition to decorated super-Teichm\"uller space, as examples of super Riemann surfaces, we use the super Ptolemy relations to obtain formulas for super $\lambda$-lengths associated to arcs in a bordered surface. In the special case of a disk, we are able to give combinatorial expansion formulas for the super $\lambda$-lengths associated to diagonals of a polygon in the spirit of Ralf Schiffler's $T$-path formulas for type $A$ cluster algebras. We further connect our formulas to the super-friezes of Morier-Genoud, Ovsienko, and Tabachnikov, and obtain partial progress towards defining super cluster algebras of type $A_n$. In particular, following Penner-Zeitlin, we are able to get formulas (up to signs) for the $\mu$-invariants associated to triangles in a triangulated polygon, and explain how these provide a step towards understanding odd variables of a super cluster algebra.

Published

2021

12. Mixed Dimer Configuration Model in Type D Cluster Algebras

Author

Musiker, Gregg and Wright, Kayla

Subjects

Mathematics - Combinatorics, 13F60, 82B20, 06A07

Abstract

We give a combinatorial model for F-polynomials and g-vectors for type D cluster algebras where the associated quiver is acyclic. Our model utilizes a combination of dimer configurations and double dimer configurations which we refer to as mixed dimer configurations. In particular, we give a graph theoretic recipe that describes which monomials appear in such F-polynomials, as well as a graph theoretic way to determine the coefficients of each of these monomials. In addition, we give a weighting on our mixed dimer configuration model that gives the associated g-vector. To prove this formula, we use a combinatorial formula due to Thao Tran and provide explicit bijections between her combinatorial model and our own., Comment: 49 pages, 46 figures, updated to address properties of the poset as well as draw a direct connection to representation theory

Published

2020

13. Quiver Mutations, Seiberg Duality and Machine Learning

Author

Bao, Jiakang, Franco, Sebastián, He, Yang-Hui, Hirst, Edward, Musiker, Gregg, and Xiao, Yan

Subjects

High Energy Physics - Theory, Mathematics - Algebraic Geometry, Mathematics - Combinatorics, Statistics - Machine Learning, 13F60, 81T13, 81T30

Abstract

We initiate the study of applications of machine learning to Seiberg duality, focusing on the case of quiver gauge theories, a problem also of interest in mathematics in the context of cluster algebras. Within the general theme of Seiberg duality, we define and explore a variety of interesting questions, broadly divided into the binary determination of whether a pair of theories picked from a series of duality classes are dual to each other, as well as the multi-class determination of the duality class to which a given theory belongs. We study how the performance of machine learning depends on several variables, including number of classes and mutation type (finite or infinite). In addition, we evaluate the relative advantages of Naive Bayes classifiers versus Convolutional Neural Networks. Finally, we also investigate how the results are affected by the inclusion of additional data, such as ranks of gauge/flavor groups and certain variables motivated by the existence of underlying Diophantine equations. In all questions considered, high accuracy and confidence can be achieved., Comment: 57 pages

Published

2020

14. Dungeons and Dragons: Combinatorics for the $dP_3$ Quiver

Author

Lai, Tri and Musiker, Gregg

Subjects

Mathematics - Combinatorics, 13F60, 05C30, 05C70

Abstract

In this paper, we utilize the machinery of cluster algebras, quiver mutations, and brane tilings to study a variety of historical enumerative combinatorics questions all under one roof. Previous work [Zha, LMNT14], which arose during the second author's monitorship of undergraduates, and more recently of both authors [LM17], analyzed the cluster algebra associated to the cone over $\mathbf{dP_3}$, the del Pezzo surface of degree $6$ ($\mathbb{CP}^2$ blown up at three points). By investigating sequences of toric mutations, those occurring only at vertices with two incoming and two outgoing arrows, in this cluster algebra, we obtained a family of cluster variables that could be parameterized by $\mathbb{Z}^3$ and whose Laurent expansions had elegant combinatorial interpretations in terms of dimer partition functions (in most cases). While the earlier work [Zha, LMNT14, LM17] focused exclusively on one possible initial seed for this cluster algebra, there are in total four relevant initial seeds (up to graph isomorphism). In the current work, we explore the combinatorics of the Laurent expansions from these other initial seeds and how this allows us to relate enumerations of perfect matchings on Dungeons to Dragons., Comment: Version 3: Final version submitted to the journal (53 pages and many figures). Accepted for publication in Annals of Combinatorics

Published

2018

15. Paths to Understanding Birational Rowmotion on Products of Two Chains

Author

Musiker, Gregg and Roby, Tom

Subjects

Mathematics - Combinatorics, 05A19, 05C21

Abstract

Birational rowmotion is an action on the space of assignments of rational functions to the elements of a finite partially-ordered set (poset). It is lifted from the well-studied rowmotion map on order ideals (equivariantly on antichains) of a poset $P$, which when iterated on special posets, has unexpectedly nice properties in terms of periodicity, cyclic sieving, and homomesy (statistics whose averages over each orbit are constant) [AST11, BW74, CF95, Pan09, PR13, RuSh12,RuWa15+,SW12, ThWi17, Yil17. In this context, rowmotion appears to be related to Auslander-Reiten translation on certain quivers, and birational rowmotion to $Y$-systems of type $A_m \times A_n$ described in Zamolodchikov periodicity. We give a formula in terms of families of non-intersecting lattice paths for iterated actions of the birational rowmotion map on a product of two chains. This allows us to give a much simpler direct proof of the key fact that the period of this map on a product of chains of lengths $r$ and $s$ is $r+s+2$ (first proved by D.~Grinberg and the second author), as well as the first proof of the birational analogue of homomesy along files for such posets., Comment: 31 pages, to appear in Algebraic Combinatorics

Published

2018

16. Higher Cluster Categories and QFT Dualities

Author

Franco, Sebastian and Musiker, Gregg

Subjects

High Energy Physics - Theory, Mathematics - Commutative Algebra, Mathematics - Algebraic Geometry, Mathematics - Combinatorics, Mathematics - Representation Theory, 13F60

Abstract

We present a unified mathematical framework that elegantly describes minimally SUSY gauge theories in even dimension, ranging from $6d$ to $0d$, and their dualities. This approach combines recent developments on graded quiver with potentials, higher Ginzburg algebras and higher cluster categories (also known as $m$-cluster categories). Quiver mutations studied in the context of mathematics precisely correspond to the order $(m+1)$ dualities of the gauge theories. Our work suggests that these equivalences of quiver gauge theories sit inside an infinite family of such generalized dualities, whose physical interpretation is yet to be understood., Comment: 61 pages, 30 figures

Published

2017

17. Counting Arithmetical Structures on Paths and Cycles

Author

Braun, Benjamin, Corrales, Hugo, Corry, Scott, Puente, Luis David García, Glass, Darren, Kaplan, Nathan, Martin, Jeremy L., Musiker, Gregg, and Valencia, Carlos E.

Subjects

Mathematics - Combinatorics, Mathematics - Number Theory

Abstract

Let $G$ be a finite, simple, connected graph. An arithmetical structure on $G$ is a pair of positive integer vectors $\mathbf{d},\mathbf{r}$ such that $(\mathrm{diag}(\mathbf{d})-A)\mathbf{r}=0$, where $A$ is the adjacency matrix of $G$. We investigate the combinatorics of arithmetical structures on path and cycle graphs, as well as the associated critical groups (the cokernels of the matrices $(\mathrm{diag}(\mathbf{d})-A)$). For paths, we prove that arithmetical structures are enumerated by the Catalan numbers, and we obtain refined enumeration results related to ballot sequences. For cycles, we prove that arithmetical structures are enumerated by the binomial coefficients $\binom{2n-1}{n-1}$, and we obtain refined enumeration results related to multisets. In addition, we determine the critical groups for all arithmetical structures on paths and cycles.

Published

2017

18. Cluster algebraic interpretation of infinite friezes

Author

Gunawan, Emily, Musiker, Gregg, and Vogel, Hannah

Subjects

Mathematics - Combinatorics, 13F60 (primary), 05C70, 05E15 (secondary)

Abstract

Originally studied by Conway and Coxeter, friezes appeared in various recreational mathematics publications in the 1970s. More recently, in 2015, Baur, Parsons, and Tschabold constructed periodic infinite friezes and related them to matching numbers in the once-punctured disk and annulus. In this paper, we study such infinite friezes with an eye towards cluster algebras of type D and affine A, respectively. By examining infinite friezes with Laurent polynomial entries, we discover new symmetries and formulas relating the entries of this frieze to one another. Lastly, we also present a correspondence between Broline, Crowe and Isaacs's classical matching tuples and combinatorial interpretations of elements of cluster algebras from surfaces., Comment: 38 pages, 47 figures

Published

2016

19. Beyond Aztec Castles: Toric Cascades in the $dP_3$ Quiver

Author

Lai, Tri and Musiker, Gregg

Subjects

Mathematics - Combinatorics, 13F60, 05C30, 05C70

Abstract

Given one of an infinite class of supersymmetric quiver gauge theories, string theorists can associate a corresponding toric variety (which is a Calabi-Yau 3-fold) as well as an associated combinatorial model known as a brane tiling. In combinatorial language, a brane tiling is a bipartite graph on a torus and its perfect matchings are of interest to both combinatorialists and physicists alike. A cluster algebra may also be associated to such quivers and in this paper we study the generators of this algebra, known as cluster variables, for the quiver associated to the cone over the del Pezzo surface $dP_3$. In particular, mutation sequences involving mutations exclusively at vertices with two in-coming arrows and two out-going arrows are referred to as toric cascades in the string theory literature. Such toric cascades give rise to interesting discrete integrable systems on the level of cluster variable dynamics. We provide an explicit algebraic formula for all cluster variables which are reachable by toric cascades as well as a combinatorial interpretation involving perfect matchings of subgraphs of the $dP_3$ brane tiling for these formulas in most cases., Comment: Typos on page 42 fixed, final version to appear in Comm. Math. Phys

Published

2015

20. The greedy basis equals the theta basis

Author

Cheung, Man Wai, Gross, Mark, Muller, Greg, Musiker, Gregg, Rupel, Dylan, Stella, Salvatore, and Williams, Harold

Subjects

Mathematics - Quantum Algebra, Mathematics - Algebraic Geometry, Mathematics - Combinatorics

Abstract

We prove the equality of two canonical bases of a rank 2 cluster algebra, the greedy basis of Lee-Li-Zelevinsky and the theta basis of Gross-Hacking-Keel-Kontsevich., Comment: 17 pages

Published

2015

21. T-Path Formula and Atomic Bases for Cluster Algebras of Type D

Author

Gunawan, Emily and Musiker, Gregg

Subjects

Mathematics - Combinatorics, Mathematics - Representation Theory, 13F60, 05A15

Abstract

We extend a T-path expansion formula for arcs on an unpunctured surface to the case of arcs on a once-punctured polygon and use this formula to give a combinatorial proof that cluster monomials form the atomic basis of a cluster algebra of type D.

Published

2014

22. On Maximal Green Sequences For Type A Quivers

Author

Garver, Alexander and Musiker, Gregg

Subjects

Mathematics - Combinatorics, Mathematics - Commutative Algebra, Mathematics - Representation Theory, 13F60 (Primary), 16G20 (Secondary), 05E10

Abstract

Given a framed quiver, i.e. one with a frozen vertex associated to each mutable vertex, there is a concept of green mutation, as introduced by Keller. Maximal sequences of such mutations, known as maximal green sequences, are important in representation theory and physics as they have numerous applications, including the computations of spectrums of BPS states, Donaldson-Thomas invariants, tilting of hearts in the derived category, and quantum dilogarithm identities. In this paper, we study such sequences and construct a maximal green sequence for every quiver mutation-equivalent to an orientation of a type A Dynkin diagram., Comment: 35 pages, major revisions, main definitions reformulated, new proofs of main results

Published

2014

23. Aztec Castles and the dP3 Quiver

Author

Leoni, Megan, Musiker, Gregg, Neel, Seth, and Turner, Paxton

Subjects

Mathematics - Combinatorics, 13F60, 05C30, 05C70

Abstract

Bipartite, periodic, planar graphs known as brane tilings can be associated to a large class of quivers. This paper will explore new algebraic properties of the well-studied del Pezzo 3 quiver and geometric properties of its corresponding brane tiling. In particular, a factorization formula for the cluster variables arising from a large class of mutation sequences (called $\tau-$mutation sequences) is proven; this factorization also gives a recursion on the cluster variables produced by such sequences. We can realize these sequences as walks in a triangular lattice using a correspondence between the generators of the affine symmetric group $\tilde{A_2}$ and the mutations which generate $\tau-$mutation sequences. Using this bijection, we obtain explicit formulae for the cluster that corresponds to a specific alcove in the lattice. With this lattice visualization in mind, we then express each cluster variable produced in a $\tau$-mutation sequence as the sum of weighted perfect matchings of a new family of subgraphs of the dP3 brane tiling, which we call Aztec castles. Our main result generalizes previous work on a certain mutation sequence on the dP3 quiver in [Zha12], and forms part of the emerging story in combinatorics and theoretical high energy physics relating cluster variables to subgraphs of the associated brane tiling., Comment: 35 pages, 22 figures. Final version. To appear in the Journal of Physics A: Mathematical and Theoretical special issue on cluster algebras

Published

2013

24. Involutions on standard Young tableaux and divisors on metric graphs

Author

Agrawal, Rohit, Musiker, Gregg, Sotirov, Vladimir, and Wei, Fan

Subjects

Mathematics - Combinatorics, Mathematics - Algebraic Geometry, 05C57, 06A07, 14N10, 14T05

Abstract

We elaborate upon a bijection discovered by Cools, Draisma, Payne, and Robeva between the set of rectangular standard Young tableaux and the set of equivalence classes of chip configurations on certain metric graphs under the relation of linear equivalence. We present an explicit formula for computing the $v_0$-reduced divisors (representatives of the equivalence classes) associated to given tableaux, and use this formula to prove (i) evacuation of tableaux corresponds (under the bijection) to reflecting the metric graph, and (ii) conjugation of the tableaux corresponds to taking the Riemann-Roch dual of the divisor., Comment: 21 pages, 8 figures

Published

2012

25. Bases for cluster algebras from surfaces

Author

Musiker, Gregg, Schiffler, Ralf, and Williams, Lauren

Subjects

Mathematics - Representation Theory, Mathematics - Combinatorics, 13F60, 05C70, 05E15

Abstract

We construct two bases for each cluster algebra coming from a triangulated surface without punctures. We work in the context of a coefficient system coming from a full-rank exchange matrix, for example, principal coefficients., Comment: 53 pages; v2 references updated

Published

2011

26. Matrix formulae and skein relations for cluster algebras from surfaces

Author

Musiker, Gregg and Williams, Lauren

Subjects

Mathematics - Combinatorics, Mathematics - Geometric Topology, Mathematics - Rings and Algebras, 05C70, 05E15, 13F60

Abstract

This paper concerns cluster algebras with principal coefficients A(S,M) associated to bordered surfaces (S,M), and is a companion to a concurrent work of the authors with Schiffler [MSW2]. Given any (generalized) arc or loop in the surface -- with or without self-intersections -- we associate an element of (the fraction field of) A(S,M), using products of elements of PSL_2(R). We give a direct proof that our matrix formulas for arcs and loops agree with the combinatorial formulas for arcs and loops in terms of matchings, which were given in [MSW, MSW2]. Finally, we use our matrix formulas to prove skein relations for the cluster algebra elements associated to arcs and loops. Our matrix formulas and skein relations generalize prior work of Fock and Goncharov [FG1, FG2, FG3], who worked in the coefficient-free case. The results of this paper will be used in [MSW2] in order to show that certain collections of arcs and loops comprise a vector-space basis for A(S,M)., Comment: 35 pages, lots of pictures

Published

2011

27. A compendium on the cluster algebra and quiver package in sage

Author

Musiker, Gregg and Stump, Christian

Subjects

Mathematics - Combinatorics, Mathematics - Representation Theory

Abstract

This is the compendium of the cluster algebra and quiver package for sage. The purpose of this package is to provide a platform to work with cluster algebras in graduate courses and to further develop the theory by working on examples, by gathering data, and by exhibiting and testing conjectures. In this compendium, we include the relevant theory to introduce the reader to cluster algebras assuming no prior background; this exposition has been written to be accessible to an interested undergraduate. Throughout this compendium, we include examples that the user can run in the sage notebook or command line, and then close with a detailed description of the data structures and methods in this package., Comment: 62 pages

Published

2011

28. The cyclotomic polynomial topologically

Author

Musiker, Gregg and Reiner, Victor

Subjects

Mathematics - Combinatorics, Mathematics - Number Theory, Primary 05B35, Secondary 11R18, 55U10

Abstract

We interpret the coefficients of the cyclotomic polynomial in terms of simplicial homology., Comment: 18 pages. Revision fixing misstated version of Theorem 21, as pointed out by Giacomo Condro

Published

2010

29. Linear Systems on Tropical Curves

Author

Haase, Christian, Musiker, Gregg, and Yu, Josephine

Subjects

Mathematics - Algebraic Geometry, Mathematics - Combinatorics, 14T05 (Primary), 14H99, 14C20, 05C57 (Secondary)

Abstract

A tropical curve \Gamma is a metric graph with possibly unbounded edges, and tropical rational functions are continuous piecewise linear functions with integer slopes. We define the complete linear system |D| of a divisor D on a tropical curve \Gamma analogously to the classical counterpart. We investigate the structure of |D| as a cell complex and show that linear systems are quotients of tropical modules, finitely generated by vertices of the cell complex. Using a finite set of generators, |D| defines a map from \Gamma to a tropical projective space, and the image can be extended to a tropical curve of degree equal to \deg(D). The tropical convex hull of the image realizes the linear system |D| as a polyhedral complex. We show that curves for which the canonical divisor is not very ample are hyperelliptic. We also show that the Picard group of a \Q-tropical curve is a direct limit of critical groups of finite graphs converging to the curve., Comment: 28 pages, 17 figures

Published

2009

30. Positivity for cluster algebras from surfaces

Author

Musiker, Gregg, Schiffler, Ralf, and Williams, Lauren

Subjects

Mathematics - Combinatorics, Mathematics - Representation Theory, 16S99, 05C70, 05E15

Abstract

We give combinatorial formulas for the Laurent expansion of any cluster variable in any cluster algebra coming from a triangulated surface (with or without punctures), with respect to an arbitrary seed. Moreover, we work in the generality of principal coefficients. An immediate corollary of our formulas is a proof of the positivity conjecture of Fomin and Zelevinsky for cluster algebras from surfaces, in geometric type., Comment: 67 pages, 45 figures, comments welcome

Published

2009

31. Cluster expansion formulas and perfect matchings

Author

Musiker, Gregg and Schiffler, Ralf

Subjects

Mathematics - Representation Theory, Mathematics - Combinatorics, 16S99, 05E99, 05C70

Abstract

We study cluster algebras with principal coefficient systems that are associated to unpunctured surfaces. We give a direct formula for the Laurent polynomial expansion of cluster variables in these cluster algebras in terms of perfect matchings of a certain graph $G_{T,\gamma}$ that is constructed from the surface by recursive glueing of elementary pieces that we call tiles. We also give a second formula for these Laurent polynomial expansions in terms of subgraphs of the graph $G_{T,\gamma}$., Comment: 19 pages, 8 figures

Published

2008

32. Invariants, Kronecker Products, and Combinatorics of Some Remarkable Diophantine Systems (Extended Version)

Author

Garsia, Adriano, Musiker, Gregg, Wallach, Nolan, and Xin, Guoce

Subjects

Mathematics - Combinatorics, Mathematics - Representation Theory, 05A15, 05E05, 34C14, 11D45

Abstract

This work lies across three areas (in the title) of investigation that are by themselves of independent interest. A problem that arose in quantum computing led us to a link that tied these areas together. This link consists of a single formal power series with a multifaced interpretation. The deeper exploration of this link yielded results as well as methods for solving some numerical problems in each of these separate areas., Comment: 33 pages, 5 figures

Published

2008

33. A graph theoretic expansion formula for cluster algebras of classical type

Author

Musiker, Gregg

Subjects

Mathematics - Combinatorics, Mathematics - Representation Theory, 05E15, 16S99

Abstract

In this paper we give a graph theoretic combinatorial interpretation for the cluster variables that arise in most cluster algebras of finite type. In particular, we provide a family of graphs such that a weighted enumeration of their perfect matchings encodes the numerator of the associated Laurent polynomial while decompositions of the graphs correspond to the denominator. This complements recent work by Schiffler and Carroll-Price for a cluster expansion formula for the A_n case while providing a novel interpretation for the B_n, C_n, and D_n cases., Comment: 32 pages, 14 figures

Published

2007

34. Combinatorial Aspects of Elliptic Curves II: Relationship between Elliptic Curves and Chip-Firing Games on Graphs

Author

Musiker, Gregg

Subjects

Mathematics - Combinatorics, Mathematics - Number Theory, 11G07, 05C25

Abstract

Let q be a power of a prime and E be an elliptic curve defined over F_q. In "Combinatorial aspects of elliptic curves" [17], the present author examined a sequence of polynomials which express the N_k's, the number of points on E over the field extensions F_{q^k}, in terms of the parameters q and N_1 = #E(F_q). These polynomials have integral coefficients which alternate in sign, and a combinatorial interpretation in terms of spanning trees of wheel graphs. In this sequel, we explore further ramifications of this connection. In particular, we highlight a relationship between elliptic curves and chip-firing games on graphs by comparing the groups structures of both. As a coda, we construct a cyclic rational language whose zeta function is dual to that of an elliptic curve., Comment: 24 pages, 2 figures, part of author's Ph.D. Thesis, presented at FPSAC 2007

Published

2007

35. Combinatorial Aspects of Elliptic Curves

Author

Musiker, Gregg

Subjects

Mathematics - Combinatorics, Mathematics - Number Theory

Abstract

Given an elliptic curve C, we study here $N_k = #C(F_{q^k})$, the number of points of C over the finite field F_{q^k}. This sequence of numbers, as k runs over positive integers, has numerous remarkable properties of a combinatorial flavor in addition to the usual number theoretical interpretations. In particular we prove that $N_k = - W_k(q, - N_1)$ where W_k(q,t) is a (q,t)-analogue of the number of spanning trees of the wheel graph. Additionally we develop a determinantal formula for N_k where the eigenvalues can be explicitly written in terms of q, N_1, and roots of unity. We also discuss here a new sequence of bivariate polynomials related to the factorization of N_k, which we refer to as elliptic cyclotomic polynomials because of their various properties., Comment: 29 pages, Section 2 presented at FPSAC 2006

Published

2007

36. A new characterization for the m-quasiinvariants of S_n and explicit basis for two row hook shapes

Author

Bandlow, Jason and Musiker, Gregg

Subjects

Mathematics - Combinatorics, 05E99

Abstract

In 2002, Feigin and Veselov defined the space of m-quasiinvariants for any Coxeter group, building on earlier work of Chalykh and Veselov. While many properties of those spaces were proven from this definition, an explicit computation of a basis was only done in certain cases. In particular, Feigin and Veselov computed bases for the m-quasiinvariants of dihedral groups, including S_3, and Felder and Veselov computed the non-symmetric m-quasiinvariants of lowest degree for general S_n. In this paper, we provide a new characterization of the m-quasiinvariants of S_n, and use this to provide a basis for the isotypic component indexed by the partition [n-1,1]. This builds on a previous paper in which we computed a basis for S_3 via combinatorial methods., Comment: 26 pages, uses youngtab.sty

Published

2007

37. Quasiinvariants of $S_3$

Author

Bandlow, Jason and Musiker, Gregg

Subjects

Mathematics - Combinatorics, Mathematics - Commutative Algebra, 05E10, 20C30

Abstract

Let $s_{ij}$ represent a tranposition in $S_n$. A polynomial $P$ in $\mathbb{Q}[X_n]$ is said to be $m$-quasiinvariant with respect to $S_n$ if $(x_i-x_j)^{2m+1}$ divides $(1-s_{ij})P$ for all $1 \leq i, j \leq n$. We call the ring $m$-quasiinvariants $QI_m[X_n]$. We describe a method for constructing a basis for the quotient $QI_m[X_3]/< e_1, e_2, e_3>$. This leads to the evaluation of certain binomial determinants that are interesting in their own right., Comment: 18 pages, 2 figures, presented at 2004 Joint Meetings of the AMS and MAA

Published

2006

38. Combinatorial interpretations for rank-two cluster algebras of affine type

Author

Musiker, Gregg and Propp, James

Subjects

Mathematics - Combinatorics, 05A99, 05C70

Abstract

Fomin and Zelevinsky show that a certain two-parameter family of rational recurrence relations, here called the (b,c) family, possesses the Laurentness property: for all b,c, each term of the (b,c) sequence can be expressed as a Laurent polynomial in the two initial terms. In the case where the positive integers b,c satisfy bc<4, the recurrence is related to the root systems of finite-dimensional rank 2 Lie algebras; when bc>4, the recurrence is related to Kac-Moody rank 2 Lie algebras of hyperbolic type. Here we investigate the borderline cases bc=4, corresponding to Kac-Moody Lie algebras of affine type. In these cases, we show that the Laurent polynomials arising from the recurence can be viewed as generating functions that enumerate the perfect matchings of certain graphs. By providing combinatorial interpretations of the individual coefficients of these Laurent polynomials, we establish their positivity., Comment: Misnumbering corrected

Published

2006

39. Labeled Chip-firing on Binary Trees

Author

Musiker, Gregg and Nguyen, Son

Subjects

Mathematics::Combinatorics, FOS: Mathematics, Mathematics - Combinatorics, Combinatorics (math.CO), MathematicsofComputing_DISCRETEMATHEMATICS

Abstract

We study labeled chip-firing on binary trees and some of its modifications. We prove a sorting property of terminal configurations of the process. We also analyze the endgame moves poset and prove that this poset is a modular lattice., Comment: 24 pages

Published

2022