Search

Your search keyword '"Striker, Jessica"' showing total 103 results
Start Over Author "Striker, Jessica"
103 results on '"Striker, Jessica"'

1. Key-avoidance for alternating sign matrices

Author

Bouvel, Mathilde, Smith, Rebecca, and Striker, Jessica

Subjects
Mathematics - Combinatorics, 05A05, 05A19
Abstract

We initiate a systematic study of key-avoidance on alternating sign matrices (ASMs) defined via pattern-avoidance on an associated permutation called the \emph{key} of an ASM. We enumerate alternating sign matrices whose key avoids a given set of permutation patterns in several instances. We show that ASMs whose key avoids $231$ are permutations, thus any known enumeration for a set of permutation patterns including $231$ extends to ASMs. We furthermore enumerate by the Catalan numbers ASMs whose key avoids both $312$ and $321$. We also show ASMs whose key avoids $312$ are in bijection with the gapless monotone triangles of [Ayyer, Cori, Gouyou-Beauchamps 2011]. Thus key-avoidance generalizes the notion of $312$-avoidance studied there. Finally, we enumerate ASMs with a given key avoiding $312$ and $321$ using a connection to Schubert polynomials, thereby deriving an interesting Catalan identity., Comment: 23 pages

Published
2024

2. Toric Promotion with Reflections and Refractions

Author

Adams, Ashleigh, Defant, Colin, and Striker, Jessica

Subjects
Mathematics - Combinatorics, Mathematics - Dynamical Systems, 05A05, 05E18, 37E99
Abstract

Inspired by recent work on refraction billiards in dynamics, we introduce a notion of refraction for combinatorial billiards. This allows us to define a generalization of toric promotion that we call toric promotion with reflections and refractions, which is a dynamical system defined via a graph $G$ whose edges are partitioned into a set of reflection edges and a set of refraction edges. This system is a discretization of a billiards system in which a beam of light can pass through, reflect off of, or refract through each toric hyperplane in a toric arrangement. Vastly generalizing the main theorem known about toric promotion, we give a simple formula for the orbit structure of toric promotion with reflections and refractions when $G$ is a forest. We also completely describe the orbit sizes when $G$ is a cycle with an even number of refraction edges; this result is new even for ordinary toric promotion (i.e., when there are no refraction edges). When $G$ is a cycle of even size with no reflection edges, we obtain an interesting instance of the cyclic sieving phenomenon., Comment: 21 pages, 7 figures

Published
2024

3. On nu Faces of Partial Alternating Sign Matrix Polytopes

Author

Heuer, Dylan, Solhjem, Sara, and Striker, Jessica

Subjects
Mathematics - Combinatorics, 05A05, 52B05
Abstract

We define and study the $(\nu / \lambda)$-partial alternating sign matrix polytope, motivated by connections to the Chan-Robbins-Yuen polytope and the $\nu$-Tamari lattice. We determine the inequality description and show this polytope is a face of the partial alternating sign matrix polytope of [Heuer, Striker 2022]. We show that the $(\nu / \lambda)$-partial ASM polytope is an order polytope and a flow polytope., Comment: 14 pages, 8 figures

Published
2024

4. Cyclic sieving on permutations -- an analysis of maps and statistics in the FindStat database

Author

Adams, Ashleigh, Elder, Jennifer, Lafrenière, Nadia, McNicholas, Erin, Striker, Jessica, and Welch, Amanda

Subjects
Mathematics - Combinatorics, 05A05, 05E18
Abstract

We perform a systematic study of permutation statistics and bijective maps on permutations using SageMath to search the FindStat combinatorial statistics database to identify apparent instances of the cyclic sieving phenomenon (CSP). Cyclic sieving occurs on a set of objects, a statistic, and a map of order $n$ when the evaluation of the statistic generating function at the $d$th power of the primitive $n$th root of unity equals the number of fixed points under the $d$th power of the map. Of the apparent instances found in our experiment, we prove 34 new instances of the CSP, and conjecture three more. Furthermore, we prove the equidistribution of some statistics and show that some maps have the same orbit structure, thus cyclic sieving holds for more even more pairs of a map and a statistic. The maps which exhibit the CSP include reverse/complement, rotation, Lehmer code rotation, toric promotion, and conjugation by the long cycle, as well as a map constructed by Corteel to swap the number of nestings and crossings, the invert Laguerre heap map, and a map of Alexandersson and Kebede designed to preserve right-to-left minima. Our results show that, contrary to common expectations, actions that exhibit homomesy are not necessarily the best candidates for the CSP, and vice versa., Comment: 32 pages, 4 figures

Published
2024

5. Web bases in degree two from hourglass plabic graphs

Author

Gaetz, Christian, Pechenik, Oliver, Pfannerer, Stephan, Striker, Jessica, and Swanson, Joshua P.

Subjects
Mathematics - Combinatorics, Mathematics - Quantum Algebra, Mathematics - Representation Theory
Abstract

Webs give a diagrammatic calculus for spaces of $U_q(\mathfrak{sl}_r)$-tensor invariants, but intrinsic characterizations of web bases are only known in certain cases. Recently, we introduced hourglass plabic graphs to give the first such $U_q(\mathfrak{sl}_4)$-web bases. Separately, Fraser introduced a web basis for Pl\"{u}cker degree two representations of arbitrary $U_q(\mathfrak{sl}_r)$. Here, we show that Fraser's basis agrees with that predicted by the hourglass plabic graph framework and give an intrinsic characterization of the resulting webs. A further compelling feature with many applications is that our bases exhibit rotation-invariance. Together with the results of our earlier paper, this implies that hourglass plabic graphs give a uniform description of all known rotation-invariant $U_q(\mathfrak{sl}_r)$-web bases. Moreover, this provides a single combinatorial model simultaneously generalizing the Tamari lattice, the alternating sign matrix lattice, and the lattice of plane partitions. As a part of our argument, we develop properties of square faces in arbitrary hourglass plabic graphs, a key step in our program towards general $U_q(\mathfrak{sl}_r)$-web bases., Comment: 24 pages

Published
2024

6. Totally symmetric self-complementary plane partition matrices and related polytopes

Author

Holmlund, Vincent and Striker, Jessica

Subjects
Mathematics - Combinatorics, 05A05, 52B05
Abstract

Plane partitions in the totally symmetric self-complementary symmetry class (TSSCPP) are known to be equinumerous with n x n alternating sign matrices, but no explicit bijection is known. In this paper, we give a bijection from these plane partitions to {0,1,-1}-matrices we call magog matrices, some of which are alternating sign matrices. We explore enumerative properties of these matrices related to natural statistics such as inversion number and number of negative ones. We then investigate the polytope defined as their convex hull. We show that all the magog matrices are extreme and give a partial inequality description. Finally, we define another TSSCPP polytope as the convex hull of TSSCPP boolean triangles and determine its dimension, inequalities, vertices, and facets., Comment: 26 pages, 3 figures

Published
2023

7. Promotion permutations for tableaux

Author

Gaetz, Christian, Pechenik, Oliver, Pfannerer, Stephan, Striker, Jessica, and Swanson, Joshua P.

Subjects
Tableaux, promotion, jeu de taquin, Bender-Knuth involutions, growth diagrams, crystals
Abstract

We introduce fluctuating tableaux, which subsume many classes of tableaux that have been previously studied, including (generalized) oscillating, vacillating, rational, alternating, standard, and transpose semistandard tableaux. Our main contribution is the introduction of promotion permutations and promotion matrices, which are new even for standard tableaux. We provide characterizations in terms of Bender-Knuth involutions, jeu de taquin, and crystals. We prove key properties in the rectangular case about the behavior of promotion permutations under promotion and evacuation. We also give a full development of the basic combinatorics and representation theory of fluctuating tableaux.Our motivation comes from our companion paper, where we use these results in the development of a new rotation-invariant \(\operatorname{SL}_4\)-web basis. Basis elements are given by certain planar graphs and are constructed so that important algebraic operations can be performed diagrammatically. These planar graphs are indexed by fluctuating tableaux, tableau promotion corresponds to graph rotation, and promotion permutations correspond to key graphical information.Mathematics Subject Classifications: 05E10, 05E18Keywords: Tableaux, promotion, jeu de taquin, Bender-Knuth involutions, growth diagrams, crystals

Published
2024

8. Web invariants for flamingo Specht modules

Author

Fraser, Chris, Patrias, Rebecca, Pechenik, Oliver, and Striker, Jessica

Subjects
Mathematics - Combinatorics, Mathematics - Representation Theory, 05A18, 05E10, 20C30
Abstract

Webs yield an especially important realization of certain Specht modules, irreducible representations of symmetric groups, as they provide a pictorial basis with a convenient diagrammatic calculus. In recent work, the last three authors associated polynomials to noncrossing partitions without singleton blocks, so that the corresponding polynomials form a web basis of the pennant Specht module $S^{(d,d,1^{n-2d})}$. These polynomials were interpreted as global sections of a line bundle on a 2-step partial flag variety. Here, we both simplify and extend this construction. On the one hand, we show that these polynomials can alternatively be situated in the homogeneous coordinate ring of a Grassmannian, instead of a 2-step partial flag variety, and can be realized as tensor invariants of classical (but highly nonplanar) tensor diagrams. On the other hand, we extend these ideas from the pennant Specht module $S^{(d,d,1^{n-2d})}$ to more general flamingo Specht modules $S^{(d^r,1^{n-rd})}$. In the hook case $r=1$, we obtain a spanning set that can be restricted to a basis in various ways. In the case $r>2$, we obtain a basis of a well-behaved subspace of $S^{(d^r,1^{n-rd})}$, but not of the entire module., Comment: 32 pages, 7 figures

Published
2023

9. Toggling, rowmotion, and homomesy on interval-closed sets

Author

Elder, Jennifer, Lafrenière, Nadia, McNicholas, Erin, Striker, Jessica, and Welch, Amanda

Subjects
Mathematics - Combinatorics, 05E18, 06A07
Abstract

Interval-closed sets of a poset are a natural superset of order ideals. We initiate the study of interval-closed sets of finite posets from enumerative and dynamical perspectives. In particular, we use the generalized toggle group to define rowmotion on interval-closed sets as a product of these toggles. Our main theorem is an intricate global characterization of rowmotion on interval-closed sets, which we show is equivalent to the toggling definition. We also study specific posets; we enumerate interval-closed sets of ordinal sums of antichains, completely describe their rowmotion orbits, and prove a homomesy result involving the signed cardinality statistic. Finally, we study interval-closed sets of product of chains posets, proving further results about enumeration and homomesy., Comment: 30 pages, 25 figures, 2 tables

Published
2023

10. Promotion permutations for tableaux

Author

Gaetz, Christian, Pechenik, Oliver, Pfannerer, Stephan, Striker, Jessica, and Swanson, Joshua P.

Subjects
Mathematics - Combinatorics, Mathematics - Representation Theory, 05E10, 05E18
Abstract

In our companion paper, we develop a new $SL_4$-web basis. Basis elements are given by certain planar graphs and are constructed so that important algebraic operations can be performed diagrammatically. A guiding principle behind our construction is that the long cycle $(12\ldots n) \in \mathfrak{S}_n$ should act by rotation of webs. Moreover, the bijection between webs and tableaux should intertwine rotation with the promotion action on tableaux. In this paper, we develop necessary notions of promotion permutations and promotion matrices, which are new even for standard tableaux. To support inductive arguments in the companion paper, we must however work in the more general setting of fluctuating tableaux, which we introduce and which subsumes many classes of tableaux that have been previously studied, including (generalized) oscillating, vacillating, rational, alternating, and (semi)standard tableaux. Therefore, we also give here a full development of the basic combinatorics and representation theory of fluctuating tableaux., Comment: 43 pages, 8 figures. v3: minor edits, to appear in Combinatorial Theory

Published
2023
Full Text
View/download PDF

11. Rotation-invariant web bases from hourglass plabic graphs

Author

Gaetz, Christian, Pechenik, Oliver, Pfannerer, Stephan, Striker, Jessica, and Swanson, Joshua P.

Subjects
Mathematics - Combinatorics, Mathematics - Quantum Algebra, Mathematics - Representation Theory, 05E10, 17B37, 13A50, 18M15
Abstract

Webs give a diagrammatic calculus for spaces of tensor invariants. We introduce hourglass plabic graphs as a new avatar of webs, and use these to give the first rotation-invariant $U_q(\mathfrak{sl}_4)$-web basis, a long-sought object. The characterization of our basis webs relies on the combinatorics of these new plabic graphs and associated configurations of a symmetrized six-vertex model. We give growth rules, based on a novel crystal-theoretic technique, for generating our basis webs from tableaux and we use skein relations to give an algorithm for expressing arbitrary webs in the basis. We also discuss how previously known rotation-invariant web bases can be unified in our framework of hourglass plabic graphs., Comment: 66 pages, 40 figures. v3: added extension to semistandard case

Published
2023

12. A pipe dream perspective on totally symmetric self-complementary plane partitions

Author

Huang, Daoji and Striker, Jessica

Subjects
Mathematics - Combinatorics, 05A19
Abstract

We characterize totally symmetric self-complementary plane partitions (TSSCPP) as bounded compatible sequences satisfying a Yamanouchi-like condition. As such, they are in bijection with certain pipe dreams. Using this characterization and the recent bijection of [Gao-Huang] between reduced pipe dreams and reduced bumpless pipe dreams, we give a bijection between alternating sign matrices and TSSCPP in the reduced, 1432-avoiding case. We also give a different bijection in the 1432- and 2143-avoiding case that preserves natural poset structures on the associated pipe dreams and bumpless pipe dreams., Comment: 18 pages, 9 figures

Published
2023
Full Text
View/download PDF

13. Homomesies on permutations -- an analysis of maps and statistics in the FindStat database

Author

Elder, Jennifer, Lafrenière, Nadia, McNicholas, Erin, Striker, Jessica, and Welch, Amanda

Subjects
Mathematics - Combinatorics
Abstract

In this paper, we perform a systematic study of permutation statistics and bijective maps on permutations in which we identify and prove 122 instances of the homomesy phenomenon. Homomesy occurs when the average value of a statistic is the same on each orbit of a given map. The maps we investigate include the Lehmer code rotation, the reverse, the complement, the Foata bijection, and the Kreweras complement. The statistics studied relate to familiar notions such as inversions, descents, and permutation patterns, and also more obscure constructs. Beside the many new homomesy results, we discuss our research method, in which we used SageMath to search the FindStat combinatorial statistics database to identify potential homomesies.

Published
2022
Full Text
View/download PDF

14. $P$-strict promotion and $Q$-partition rowmotion: the graded case

Author

Bernstein, Joseph, Striker, Jessica, and Vorland, Corey

Subjects
Mathematics - Combinatorics, 05E18
Abstract

Promotion and rowmotion are intriguing actions in dynamical algebraic combinatorics which have inspired much work in recent years. In this paper, we study $P$-strict labelings of a finite, graded poset $P$ of rank $n$ and labels at most $q$, which generalize semistandard Young tableaux with $n$ rows and entries at most $q$, under promotion. These $P$-strict labelings are in equivariant bijection with $Q$-partitions under rowmotion, where $Q$ equals the product of $P$ and a chain of $q-n-1$ elements. We study the case where $P$ equals the product of chains in detail, yielding new homomesy and order results in the realm of tableaux and beyond. Furthermore, we apply the bijection to the cases in which $P$ is a minuscule poset and when $P$ is the three element $V$ poset. Finally, we give resonance results for promotion on $P$-strict labelings and rowmotion on $Q$-partitions., Comment: 24 pages, 7 figures

Published
2022
Full Text
View/download PDF

15. Curious cyclic sieving on increasing tableaux

Author

Gaetz, Christian, Pechenik, Oliver, Striker, Jessica, and Swanson, Joshua P.

Subjects
Mathematics - Combinatorics, 05E18, 05A15
Abstract

We prove a cyclic sieving result for the set of $3 \times k$ packed increasing tableaux with maximum entry $m :=3+k$ under K-promotion. The "curiosity" is that the sieving polynomial arises from the $q$-hook formula for standard tableaux of "toothbrush shape" $(2^3, 1^{k-2})$ with $m+1$ boxes, whereas K-promotion here only has order $m$., Comment: 9 pages, 4 figures

Published
2021
Full Text
View/download PDF

16. A web basis of invariant polynomials from noncrossing partitions

Author

Patrias, Rebecca, Pechenik, Oliver, and Striker, Jessica

Subjects
Mathematics - Combinatorics, Mathematics - Representation Theory, 05E10, 20C30, 05A18
Abstract

The irreducible representations of symmetric groups can be realized as certain graded pieces of invariant rings, equivalently as global sections of line bundles on partial flag varieties. There are various ways to choose useful bases of such Specht modules $S^\lambda$. Particularly powerful are web bases, which make important connections with cluster algebras and quantum link invariants. Unfortunately, web bases are only known in very special cases -- essentially, only the cases $\lambda=(d,d)$ and $\lambda=(d,d,d)$. Building on work of B. Rhoades (2017), we construct an apparent web basis of invariant polynomials for the $2$-parameter family of Specht modules with $\lambda$ of the form $(d,d,1^\ell)$. The planar diagrams that appear are noncrossing set partitions, and we thereby obtain geometric interpretations of earlier enumerative results in combinatorial dynamics., Comment: 28 pages, 7 figures

Published
2021
Full Text
View/download PDF

17. $P$-strict promotion and $B$-bounded rowmotion, with applications to tableaux of many flavors

Author

Bernstein, Joseph, Striker, Jessica, and Vorland, Corey

Subjects
Mathematics - Combinatorics, 05A19, 05E18
Abstract

We define P-strict labelings for a finite poset P as a generalization of semistandard Young tableaux and show that promotion on these objects is in equivariant bijection with a toggle action on B-bounded Q-partitions of an associated poset Q. In many nice cases, this toggle action is conjugate to rowmotion. We apply this result to flagged tableaux, Gelfand-Tsetlin patterns, and symplectic tableaux, obtaining new cyclic sieving and homomesy conjectures. We also show P-strict promotion can be equivalently defined using Bender-Knuth and jeu de taquin perspectives., Comment: 39 pages, 14 figures

Published
2020
Full Text
View/download PDF

18. Partial permutation and alternating sign matrix polytopes

Author

Heuer, Dylan and Striker, Jessica

Subjects
Mathematics - Combinatorics, 05A05, 52B05
Abstract

We define and study a new family of polytopes which are formed as convex hulls of partial alternating sign matrices. We determine the inequality descriptions, number of facets, and face lattices of these polytopes. We also study partial permutohedra that we show arise naturally as projections of these polytopes. We enumerate facets and also characterize the face lattices of partial permutohedra in terms of chains in the Boolean lattice. Finally, we have a result and a conjecture on the volume of partial permutohedra when one parameter is fixed to be two., Comment: 22 pages, 7 figures

Published
2020

20. $P$-strict promotion and $B$-bounded rowmotion, with applications to tableaux of many flavors

Author

Bernstein, Joseph, Striker, Jessica, and Vorland, Corey

Abstract

We define $P$-strict labelings for a finite poset $P$ as a generalization of semistandard Young tableaux and show that promotion on these objects is in equivariant bijection with a toggle action on $B$-bounded $Q$-partitions of an associated poset $Q$. In many nice cases, this toggle action is conjugate to rowmotion. We apply this result to flagged tableaux, Gelfand--Tsetlin patterns, and symplectic tableaux, obtaining new cyclic sieving and homomesy conjectures. We also show $P$-strict promotion can be equivalently defined using Bender--Knuth and jeu de taquin perspectives.Mathematics Subject Classifications: 05A19, 05E18

Published
2021

21. Sign matrix polytopes from Young tableaux

Author

Solhjem, Sara and Striker, Jessica

Subjects
Mathematics - Combinatorics, 05A05, 52B05
Abstract

Motivated by the study of polytopes formed as the convex hull of permutation matrices and alternating sign matrices, we define several new families of polytopes as convex hulls of sign matrices, which are certain {0,1,-1}-matrices in bijection with semistandard Young tableaux. We investigate various properties of these polytopes, including their inequality descriptions, vertices, facets, and face lattices, as well as connections to alternating sign matrix polytopes and transportation polytopes., Comment: 33 pages, 18 figures, edits for clarity

Published
2018

23. Rowmotion and Increasing Labeling Promotion

Author

Dilks, Kevin, Striker, Jessica, and Vorland, Corey

Subjects
Mathematics - Combinatorics
Abstract

In 2012, N. Williams and the second author showed that on order ideals of ranked partially ordered sets (posets), rowmotion is conjugate to (and thus has the same orbit structure as) a different toggle group action, which in special cases is equivalent to promotion on linear extensions of posets constructed from two chains. In 2015, O. Pechenik and the first and second authors extended these results to show that increasing tableaux under K-promotion naturally corresponds to order ideals in a product of three chains under a toggle group action conjugate to rowmotion they called hyperplane promotion. In this paper, we generalize these results to the setting of arbitrary increasing labelings of any finite poset with given restrictions on the labels. We define a generalization of K-promotion in this setting and show it corresponds to a toggle group action we call toggle-promotion on order ideals of an associated poset. When the restrictions on labels are particularly nice (for example, specifying a global bound on all labels used), we show that toggle-promotion is conjugate to rowmotion. Additionally, we show that any poset that can be nicely embedded into a Cartesian product has a natural toggle-promotion action conjuate to rowmotion., Comment: 29 pages, 14 figures

Published
2017
Full Text
View/download PDF

24. A Catalan Subset of Descending Plane Partitions

Author

Keller, Colton and Striker, Jessica

Subjects
Mathematics - Combinatorics, 05A15
Abstract

Descending plane partitions, alternating sign matrices, and totally symmetric self-complementary plane partitions are equinumerous combinatorial sets for which no explicit bijection is known. In this paper, we isolate a subset of descending plane partitions counted by the Catalan numbers. The proof follows by constructing a generating tree on these descending plane partitions that has the same structure as the generating tree for 231-avoiding permutations. We hope this result will provide insight on the search for a bijection with alternating sign matrices and/or totally symmetric self-complementary plane partitions, since these also contain Catalan subsets., Comment: 11 pages, 13 figures

Published
2017

25. Chained permutations and alternating sign matrices - inspired by three-person chess

Author

Heuer, Dylan, Morrow, Chelsey, Noteboom, Ben, Solhjem, Sara, Striker, Jessica, and Vorland, Corey

Subjects
Mathematics - Combinatorics, Mathematical Physics
Abstract

We define and enumerate two new two-parameter permutation families, namely, placements of a maximum number of non-attacking rooks on $k$ chained-together $n\times n$ chessboards, in either a circular or linear configuration. The linear case with $k=1$ corresponds to standard permutations of $n$, and the circular case with $n=4$ and $k=6$ corresponds to a three-person chessboard. We give bijections of these rook placements to matrix form, one-line notation, and matchings on certain graphs. Finally, we define chained linear and circular alternating sign matrices, enumerate them for certain values of $n$ and $k$, and give bijections to analogues of monotone triangles, square ice configurations, and fully-packed loop configurations., Comment: 29 pages, 22 figures, third formula of Theorem 2.10 corrected from published version

Published
2016
Full Text
View/download PDF

26. Rowmotion and generalized toggle groups

Author

Striker, Jessica

Subjects
Mathematics - Combinatorics, 05E18, 06A75
Abstract

We generalize the notion of the toggle group, as defined in [P. Cameron-D. Fon-der-Flaass '95] and further explored in [J. Striker-N. Williams '12], from the set of order ideals of a poset to any family of subsets of a finite set. We prove structure theorems for certain finite generalized toggle groups, similar to the theorem of Cameron and Fon-der-Flaass in the case of order ideals. We apply these theorems and find other results on generalized toggle groups in the following settings: chains, antichains, and interval-closed sets of a poset; independent sets, vertex covers, acyclic subgraphs, and spanning subgraphs of a graph; matroids and convex geometries. We generalize rowmotion, an action studied on order ideals in [P. Cameron-D. Fon-der-Flaass '95] and [J. Striker-N. Williams '12], to a map we call cover-closure on closed sets of a closure operator. We show that cover-closure is bijective if and only if the set of closed sets is isomorphic to the set of order ideals of a poset, which implies rowmotion is the only bijective cover-closure map., Comment: 26 pages, 5 figures, final journal version

Published
2016
Full Text
View/download PDF

27. Resonance in orbits of plane partitions and increasing tableaux

Author

Dilks, Kevin, Pechenik, Oliver, and Striker, Jessica

Subjects
Mathematics - Combinatorics
Abstract

We introduce a new concept of resonance on discrete dynamical systems. This concept formalizes the observation that, in various combinatorially-natural cyclic group actions, orbit cardinalities are all multiples of divisors of a fundamental frequency. Our main result is an equivariant bijection between plane partitions in a box (or order ideals in the product of three chains) under rowmotion and increasing tableaux under $K$-promotion. Both of these actions were observed to have orbit sizes that were small multiples of divisors of an expected orbit size, and we show this is an instance of resonance, as $K$-promotion cyclically rotates the set of labels appearing in the increasing tableaux. We extract a number of corollaries from this equivariant bijection, including a strengthening of a theorem of [P. Cameron--D. Fon-der-Flaass '95] and several new results on the order of $K$-promotion. Along the way, we adapt the proof of the conjugacy of promotion and rowmotion from [J. Striker--N. Williams '12] to give a generalization in the setting of $n$-dimensional lattice projections. Finally we discuss known and conjectured examples of resonance relating to alternating sign matrices and fully-packed loop configurations., Comment: 31 pages, 12 figures

Published
2015
Full Text
View/download PDF

28. On flow polytopes, order polytopes, and certain faces of the alternating sign matrix polytope

Author

Mészáros, Karola, Morales, Alejandro H., and Striker, Jessica

Subjects
Mathematics - Combinatorics
Abstract

In this paper we study an alternating sign matrix analogue of the Chan-Robbins-Yuen polytope, which we call the ASM-CRY polytope. We show that this polytope has Catalan many vertices and its volume is equal to the number of standard Young tableaux of staircase shape; we also determine its Ehrhart polynomial. We achieve the previous by proving that the members of a family of faces of the alternating sign matrix polytope which includes ASM-CRY are both order and flow polytopes. Inspired by the above results, we relate three established triangulations of order and flow polytopes, namely Stanley's triangulation of order polytopes, the Postnikov-Stanley triangulation of flow polytopes and the Danilov-Karzanov-Koshevoy triangulation of flow polytopes. We show that when a graph $G$ is a planar graph, in which case the flow polytope $F_G$ is also an order polytope, Stanley's triangulation of this order polytope is one of the Danilov-Karzanov-Koshevoy triangulations of $F_G$. Moreover, for a general graph $G$ we show that the set of Danilov-Karzanov-Koshevoy triangulations of $F_G$ is a subset of the set of Postnikov-Stanley triangulations of $F_G$. We also describe explicit bijections between the combinatorial objects labeling the simplices in the above triangulations., Comment: 29 pages, 17 figures, major revision including the addition of Section 4 and a significant expansion of Sections 6 and 7

Published
2015

29. Permutation totally symmetric self-complementary plane partitions

Author

Striker, Jessica

Subjects
Mathematics - Combinatorics, 05A05, 06A07
Abstract

Alternating sign matrices and totally symmetric self-complementary plane partitions are equinumerous sets of objects for which no explicit bijection is known. In this paper, we identify a subset of totally symmetric self-complementary plane partitions corresponding to permutations by giving a statistic-preserving bijection to permutation matrices, which are a subset of alternating sign matrices. We use this bijection to define a new partial order on permutations, and prove this new poset contains both the Tamari lattice and the Catalan distributive lattice as subposets. We also study a new partial order on totally symmetric self-complementary plane partitions arising from this perspective and show that this is a distributive lattice related to Bruhat order when restricted to permutations., Comment: 25 pages, 21 figures, minor edits

Published
2015

30. The toggle group, homomesy, and the Razumov-Stroganov correspondence

Author

Striker, Jessica

Subjects
Mathematics - Combinatorics, Condensed Matter - Statistical Mechanics, Mathematical Physics
Abstract

The Razumov-Stroganov correspondence, an important link between statistical physics and combinatorics proved in 2011 by L. Cantini and A. Sportiello, relates the ground state eigenvector of the O(1) dense loop model on a semi-infinite cylinder to a refined enumeration of fully-packed loops, which are in bijection with alternating sign matrices. This paper reformulates a key component of this proof in terms of posets, the toggle group, and homomesy, and proves two new homomesy results on general posets which we hope will have broader implications., Comment: 14 pages, 10 figures, final version

Published
2015

32. A unifying poset perspective on alternating sign matrices, plane partitions, Catalan objects, tournaments, and tableaux

Author

Striker, Jessica

Subjects
Mathematics - Combinatorics
Abstract

Alternating sign matrices (ASMs) are square matrices with entries 0, 1, or -1 whose rows and columns sum to 1 and whose nonzero entries alternate in sign. We present a unifying perspective on ASMs and other combinatorial objects by studying a certain tetrahedral poset and its subposets. We prove the order ideals of these subposets are in bijection with a variety of interesting combinatorial objects, including ASMs, totally symmetric self-complementary plane partitions (TSSCPPs), staircase shaped semistandard Young tableaux, Catalan objects, tournaments, and totally symmetric plane partitions. We prove product formulas counting these order ideals and give the rank generating function of some of the corresponding lattices of order ideals. We also prove an expansion of the tournament generating function as a sum over TSSCPPs. This result is analogous to a result of Robbins and Rumsey expanding the tournament generating function as a sum over alternating sign matrices., Comment: 24 pages, 23 figures, full published version of arXiv:0905.4495

Published
2014

33. FindStat - the combinatorial statistics database

Author

Berg, Chris, Pons, Viviane, Scrimshaw, Travis, Striker, Jessica, and Stump, Christian

Subjects
Mathematics - Combinatorics, Computer Science - Databases
Abstract

The FindStat project at www.FindStat.org provides an online platform for mathematicians, particularly for combinatorialists, to gather information about combinatorial statistics and their relations. This outline provides an overview over the project., Comment: 2 pages, project description

Published
2014

36. Promotion and Rowmotion

Author

Striker, Jessica and Williams, Nathan

Subjects
Mathematics - Combinatorics
Abstract

We present an equivariant bijection between two actions--promotion and rowmotion--on order ideals in certain posets. This bijection simultaneously generalizes a result of R. Stanley concerning promotion on the linear extensions of two disjoint chains and recent work of D. Armstrong, C. Stump, and H. Thomas on root posets and noncrossing partitions. We apply this bijection to several classes of posets, obtaining equivariant bijections to various known objects under rotation. We extend the same idea to give an equivariant bijection between alternating sign matrices under rowmotion and under B. Wieland's gyration. Finally, we define two actions with related orders on alternating sign matrices and totally symmetric self-complementary plane partitions., Comment: 25 pages, 22 figures; final version

Published
2011

37. A direct bijection between descending plane partitions with no special parts and permutation matrices

Author

Striker, Jessica

Subjects
Mathematics - Combinatorics, 05A05, 05A19
Abstract

We present a direct bijection between descending plane partitions with no special parts and permutation matrices. This bijection has the desirable property that the number of parts of the descending plane partition corresponds to the inversion number of the permutation. Additionally, the number of maximum parts in the descending plane partition corresponds to the position of the one in the last column of the permutation matrix. We also discuss the possible extension of this approach to finding a bijection between descending plane partitions and alternating sign matrices., Comment: 8 pages, 4 figures. Final version

Published
2010

38. The poset perspective on alternating sign matrices

Author

Striker, Jessica

Subjects
Mathematics - Combinatorics, 06A07, 05A05, 05E10
Abstract

Alternating sign matrices (ASMs) are square matrices with entries 0, 1, or -1 whose rows and columns sum to 1 and whose nonzero entries alternate in sign. We put ASMs into a larger context by studying the order ideals of subposets of a certain poset, proving that they are in bijection with a variety of interesting combinatorial objects, including ASMs, totally symmetric self--complementary plane partitions (TSSCPPs), Catalan objects, tournaments, semistandard Young tableaux, and totally symmetric plane partitions. We use this perspective to prove an expansion of the tournament generating function as a sum over TSSCPPs which is analogous to a known formula involving ASMs., Comment: 10 pages, to appear in DMTCS as part of the conference proceedings for FPSAC 2009

Published
2009

39. Homomesies on permutations: An analysis of maps and statistics in the FindStat database.

Author

Elder, Jennifer, Lafrenière, Nadia, McNicholas, Erin, Striker, Jessica, and Welch, Amanda

Subjects
NUMERIC databases, PERMUTATIONS, ORBITS (Astronomy), BIJECTIONS, IMAGE encryption
Abstract

In this paper, we perform a systematic study of permutation statistics and bijective maps on permutations in which we identify and prove 122 instances of the homomesy phenomenon. Homomesy occurs when the average value of a statistic is the same on each orbit of a given map. The maps we investigate include the Lehmer code rotation, the reverse, the complement, the Foata bijection, and the Kreweras complement. The statistics studied relate to familiar notions such as inversions, descents, and permutation patterns, and also more obscure constructs. Besides the many new homomesy results, we discuss our research method, in which we used SageMath to search the FindStat combinatorial statistics database to identify potential homomesies. [ABSTRACT FROM AUTHOR]

Published
2024
Full Text
View/download PDF

40. The alternating sign matrix polytope

Author

Striker, Jessica

Subjects
Mathematics - Combinatorics, 05C50, 52B05
Abstract

We define the alternating sign matrix polytope as the convex hull of nxn alternating sign matrices and prove its equivalent description in terms of inequalities. This is analogous to the well known result of Birkhoff and von Neumann that the convex hull of the permutation matrices equals the set of all nonnegative doubly stochastic matrices. We count the facets and vertices of the alternating sign matrix polytope and describe its projection to the permutohedron as well as give a complete characterization of its face lattice in terms of modified square ice configurations. Furthermore we prove that the dimension of any face can be easily determined from this characterization., Comment: 15 pages, 5 figures; references added, proofs clarified

Published
2007

45. Homomesies on permutations: An analysis of maps and statistics in the FindStat database

Author

Elder, Jennifer, Lafrenière, Nadia, McNicholas, Erin, Striker, Jessica, and Welch, Amanda

Subjects
Mathematics::Combinatorics, FOS: Mathematics, Mathematics - Combinatorics, Combinatorics (math.CO)
Abstract

In this paper, we perform a systematic study of permutation statistics and bijective maps on permutations in which we identify and prove 122 instances of the homomesy phenomenon. Homomesy occurs when the average value of a statistic is the same on each orbit of a given map. The maps we investigate include the Lehmer code rotation, the reverse, the complement, the Foata bijection, and the Kreweras complement. The statistics studied relate to familiar notions such as inversions, descents, and permutation patterns, and also more obscure constructs. Beside the many new homomesy results, we discuss our research method, in which we used SageMath to search the FindStat combinatorial statistics database to identify potential homomesies.

Published
2023

49. (P\)-strict promotion and \(B\)-bounded rowmotion, with applications to tableaux of many flavors

Author

Bernstein, Joseph, Bernstein, Joseph, Striker, Jessica, Vorland, Corey, Bernstein, Joseph, Bernstein, Joseph, Striker, Jessica, and Vorland, Corey

Abstract

We define \(P\)-strict labelings for a finite poset \(P\) as a generalization of semistandard Young tableaux and show that promotion on these objects is in equivariant bijection with a toggle action on \(B\)-bounded \(Q\)-partitions of an associated poset \(Q\). In many nice cases, this toggle action is conjugate to rowmotion. We apply this result to flagged tableaux, Gelfand--Tsetlin patterns, and symplectic tableaux, obtaining new cyclic sieving and homomesy conjectures. We also show \(P\)-strict promotion can be equivalently defined using Bender--Knuth and jeu de taquin perspectives.Mathematics Subject Classifications: 05A19, 05E18

Published
2021

Catalog

Books, media, physical & digital resources
See catalog results