A promotion operator on rigged configurations

Qiang Wang

doi:10.46298/dmtcs.2702

Promotion Operator on Rigged Configurations of Type $A$

The Electronic Journal of Combinatorics ◽

10.37236/296 ◽

2010 ◽

Vol 17 (1) ◽

Cited By ~ 7

Author(s):

Anne Schilling ◽

Qiang Wang

Keyword(s):

Tensor Products ◽

Type A ◽

Rigged Configurations ◽

Promotion Operator

In an earlier paper of the first author, the analogue of the promotion operator on crystals of type $A$ under a generalization of the bijection of Kerov, Kirillov and Reshetikhin between crystals (or Littlewood–Richardson tableaux) and rigged configurations was proposed. In this paper, we give a proof of this conjecture. This shows in particular that the bijection between tensor products of type $A_n^{(1)}$ crystals and (unrestricted) rigged configurations is an affine crystal isomorphism.

Stable rigged configurations and Littlewood―Richardson tableaux

Discrete Mathematics & Theoretical Computer Science ◽

10.46298/dmtcs.2948 ◽

2011 ◽

Vol DMTCS Proceedings vol. AO,... (Proceedings) ◽

Author(s):

Masato Okado ◽

Reiho Sakamoto

Keyword(s):

Dynkin Diagram ◽

Type A ◽

Affine Algebra ◽

Large Rank ◽

Rigged Configurations ◽

International Audience

International audience For an affine algebra of nonexceptional type in the large rank we show the fermionic formula depends only on the attachment of the node 0 of the Dynkin diagram to the rest, and the fermionic formula of not type $A$ can be expressed as a sum of that of type $A$ with Littlewood–Richardson coefficients. Combining this result with theorems of Kirillov–Schilling–Shimozono and Lecouvey–Okado–Shimozono, we settle the $X=M$ conjecture under the large rank hypothesis. Pour une algèbre affine de type non-exceptionnel de grand rang nous prouvons que la formule fermionique dépend seulement du voisinage du nœud 0 dans le diagramme de Dynkin, et également que la formule fermionique en type autre que $A$ peut être exprimée comme combinaison de celles de type $A$ avec des coefficients de Littlewood–Richardson. Combinant ce résultat avec des théorèmes de Kirillov–Schilling–Shimozono et de Lecouvey–Okado–Shimozono, nous résolvons la conjecture $X=M$ lorsque le rang est grand.

Multi-cluster complexes

Discrete Mathematics & Theoretical Computer Science ◽

10.46298/dmtcs.3014 ◽

2012 ◽

Vol DMTCS Proceedings vol. AR,... (Proceedings) ◽

Author(s):

Cesar Ceballos ◽

Jean-Philippe Labbé ◽

Christian Stump

Keyword(s):

Coxeter Groups ◽

Type A ◽

Simplicial Complexes ◽

Cluster Complex ◽

Geometric Properties ◽

Cluster Complexes ◽

Combinatorial Description ◽

Compatibility Relation ◽

Positive Roots ◽

International Audience

International audience We present a family of simplicial complexes called \emphmulti-cluster complexes. These complexes generalize the concept of cluster complexes, and extend the notion of multi-associahedra of types ${A}$ and ${B}$ to general finite Coxeter groups. We study combinatorial and geometric properties of these objects and, in particular, provide a simple combinatorial description of the compatibility relation among the set of almost positive roots in the cluster complex. Nous présentons une famille de complexes simpliciaux appelés \emphcomplexes des multi-amas. Ces complexes généralisent le concept de complexes des amas et étendent la notion de multi-associaèdre de type ${A}$ et ${B}$ aux groupes de Coxeter finis. Nous étudions des propriétés combinatoires et géométriques de ces objets et, en particulier nous fournissons une description combinatoire simple de la relation de compatibilité sur l'ensemble des racines presque positives du complexe des amas.

Matrix-Ball Construction of affine Robinson-Schensted correspondence

Discrete Mathematics & Theoretical Computer Science ◽

10.46298/dmtcs.6396 ◽

2020 ◽

Vol DMTCS Proceedings, 28th... ◽

Author(s):

Michael Chmutov ◽

Pavlo Pylyavskyy ◽

Elena Yudovina

Keyword(s):

Symmetric Group ◽

Weyl Group ◽

Type A ◽

Group Symmetry ◽

Dominant Weight ◽

Dominance Condition ◽

The Matrix ◽

International Audience ◽

Affine Type

International audience In his study of Kazhdan-Lusztig cells in affine type A, Shi has introduced an affine analog of Robinson- Schensted correspondence. We generalize the Matrix-Ball Construction of Viennot and Fulton to give a more combi- natorial realization of Shi's algorithm. As a biproduct, we also give a way to realize the affine correspondence via the usual Robinson-Schensted bumping algorithm. Next, inspired by Honeywill, we extend the algorithm to a bijection between extended affine symmetric group and triples (P, Q, ρ) where P and Q are tabloids and ρ is a dominant weight. The weights ρ get a natural interpretation in terms of the Affine Matrix-Ball Construction. Finally, we prove that fibers of the inverse map possess a Weyl group symmetry, explaining the dominance condition on weights.

Explicit generating series for connection coefficients

Discrete Mathematics & Theoretical Computer Science ◽

10.46298/dmtcs.3025 ◽

2012 ◽

Vol DMTCS Proceedings vol. AR,... (Proceedings) ◽

Author(s):

Ekaterina A. Vassilieva

Keyword(s):

Symmetric Functions ◽

Double Coset ◽

Type A ◽

Explicit Computation ◽

Zonal Polynomials ◽

Connection Coefficients ◽

Generating Series ◽

International Audience ◽

Commutative Subalgebras ◽

Orientable Surfaces

International audience This paper is devoted to the explicit computation of generating series for the connection coefficients of two commutative subalgebras of the group algebra of the symmetric group, the class algebra and the double coset algebra. As shown by Hanlon, Stanley and Stembridge (1992), these series gives the spectral distribution of some random matrices that are of interest to statisticians. Morales and Vassilieva (2009, 2011) found explicit formulas for these generating series in terms of monomial symmetric functions by introducing a bijection between partitioned hypermaps on (locally) orientable surfaces and some decorated forests and trees. Thanks to purely algebraic means, we recover the formula for the class algebra and provide a new simpler formula for the double coset algebra. As a salient ingredient, we compute an explicit formulation for zonal polynomials indexed by partitions of type $[a,b,1^{n-a-b}]$. Cet article est dédié au calcul explicite des séries génératrices des constantes de structure de deux sous-algèbres commutatives de l'algèbre de groupe du groupe symétrique, l'algèbre de classes et l'algèbre de double classe latérale. Tel que montrè par Hanlon, Stanley and Stembridge (1992), ces séries déterminent la distribution spectrale de certaines matrices aléatoires importantes en statistique. Morales et Vassilieva (2009, 2011) ont trouvè des formules explicites pour ces séries génératrices en termes des monômes symétriques en introduisant une bijection entre les hypercartes partitionnées sur des surfaces (localement) orientables et certains arbres et forêts décorées. Grâce à des moyens purement algébriques, nous retrouvons la formule pour l'algèbre de classe et déterminons une nouvelle formule plus simple pour l'algèbre de double classe latérale. En tant que point saillant de notre démonstration nous calculons une formulation explicite pour les polynômes zonaux indexés par des partitions de type $[a,b,1^{n-a-b}]$.

Affine type A geometric crystal structure on the Grassmannian

Discrete Mathematics & Theoretical Computer Science ◽

10.46298/dmtcs.6393 ◽

2020 ◽

Vol DMTCS Proceedings, 28th... ◽

Author(s):

Gabriel Frieden

Keyword(s):

Crystal Structure ◽

Type A ◽

Young Tableaux ◽

Rectangular Shape ◽

International Audience ◽

Affine Type

International audience We construct a type A(1) n−1 affine geometric crystal structure on the Grassmannian Gr(k, n). The tropicalization of this structure recovers the combinatorics of crystal operators on semistandard Young tableaux of rectangular shape (with n − k rows), including the affine crystal operator e 0. In particular, the promotion operation on these tableaux essentially corresponds to cyclically shifting the Plu ̈cker coordinates of the Grassmannian.

Fan realizations of type $A$ subword complexes and multi-associahedra of rank 3

Discrete Mathematics & Theoretical Computer Science ◽

10.46298/dmtcs.2512 ◽

2015 ◽

Vol DMTCS Proceedings, 27th... (Proceedings) ◽

Author(s):

Nantel Bergeron ◽

Cesar Ceballos ◽

Jean-Philippe Labbé

Keyword(s):

Coxeter Groups ◽

Type A ◽

Nous Obtenons ◽

Open Case ◽

International Audience ◽

Paper Work ◽

Subword Complex

International audience We present complete simplicial fan realizations of any spherical subword complex of type $A_n$ for $n\leq 3$. This provides complete simplicial fan realizations of simplicial multi-associahedra $\Delta_{2k+4,k}$, whose facets are in correspondence with $k$-triangulations of a convex $(2k+4)$-gon. This solves the first open case of the problem of finding fan realizations where polytopality is not known. The techniques presented in this paper work for all finite Coxeter groups and we hope that they will be useful to construct fans realizing subword complexes in general. In particular, we present fan realizations of two previously unknown cases of subword complexes of type $A_4$, namely the multi-associahedra $\Delta_{9,2}$ and $\Delta_{11,3}$. Nous construisons des éventails simpliciaux complets ayant la combinatoire des complexes de sous-mots de type $A_n$ pour $n\leq 3$. Par conséquent, nous obtenons des constructions d’éventails des multi-associaèdres $\Delta_{2k+4,k}$, dont les facettes correspondent aux $k$-triangulations d’un $(2k+4)$-gone. Cette construction confirme l’existence d’éventails ayant la combinatoire du multi-associaèdres pour une famille dont la polytopalité n’est pas confirmée. Les techniques utilisées fonctionnent pour tous les groupes de Coxeter et nous espérons qu’elles seront utiles afin de construire des éventails réalisant les complexes de sous-mots en général. En particulier, nous présentons des éventails pour deux complexes de sous-mots de type $A_4$ dont l’existence était inconnue: les multi-associaèdres $\Delta_{9,2}$ et $\Delta_{11,3}$.

The generalized Gelfand–Graev characters of GLn(Fq)

Discrete Mathematics & Theoretical Computer Science ◽

10.46298/dmtcs.6406 ◽

2020 ◽

Vol DMTCS Proceedings, 28th... ◽

Author(s):

Scott Andrews ◽

Nathaniel Thiem

Keyword(s):

Finite Groups ◽

Type A ◽

General Linear ◽

Linear Groups ◽

General Linear Groups ◽

Representations Of Finite Groups ◽

International Audience ◽

Unipotent Representations ◽

Groups Of Lie Type

International audience Introduced by Kawanaka in order to find the unipotent representations of finite groups of Lie type, gener- alized Gelfand–Graev characters have remained somewhat mysterious. Even in the case of the finite general linear groups, the combinatorics of their decompositions has not been worked out. This paper re-interprets Kawanaka's def- inition in type A in a way that gives far more flexibility in computations. We use these alternate constructions to show how to obtain generalized Gelfand–Graev representations directly from the maximal unipotent subgroups. We also explicitly decompose the corresponding generalized Gelfand–Graev characters in terms of unipotent representations, thereby recovering the Kostka–Foulkes polynomials as multiplicities.

Hyperplane Arrangements and Diagonal Harmonics

Discrete Mathematics & Theoretical Computer Science ◽

10.46298/dmtcs.2889 ◽

2011 ◽

Vol DMTCS Proceedings vol. AO,... (Proceedings) ◽

Author(s):

Drew Armstrong

Keyword(s):

Symmetric Functions ◽

Hilbert Series ◽

Hyperplane Arrangement ◽

Type A ◽

Hyperplane Arrangements ◽

Combinatorial Interpretation ◽

Nabla Operator ◽

Affine Weyl Group ◽

Diagonal Harmonics ◽

International Audience

International audience In 2003, Haglund's bounce statistic gave the first combinatorial interpretation of the q,t-Catalan numbers and the Hilbert series of diagonal harmonics. In this paper we propose a new combinatorial interpretation in terms of the affine Weyl group of type A. In particular, we define two statistics on affine permutations; one in terms of the Shi hyperplane arrangement, and one in terms of a new arrangement — which we call the Ish arrangement. We prove that our statistics are equivalent to the area' and bounce statistics of Haglund and Loehr. In this setting, we observe that bounce is naturally expressed as a statistic on the root lattice. We extend our statistics in two directions: to "extended'' Shi arrangements and to the bounded chambers of these arrangements. This leads to a (conjectural) combinatorial interpretation for all integral powers of the Bergeron-Garsia nabla operator applied to elementary symmetric functions. En 2003, la statistique bounce de Haglund a donné la première interprétation combinatoire de la somme des nombres q,t-Catalan et de la série de Hilbert des harmoniques diagonaux. Dans cet article nous proposons une nouvelle interprétation combinatoire à partir du groupe de Weyl affine de type A. En particulier, nous définissons deux statistiques sur les permutations affines; l'une à partir de l'arrangement d'hyperplans Shi, et l'autre à partir d'un nouvel arrangement — que nous appelons l'arrangement Ish. Nous prouvons que nos statistiques sont équivalentes aux statistiques area' et bounce de Haglund et Loehr. Dans ce contexte, nous observons que bounce s'exprime naturellement comme une statistique sur le réseau des racines. Nous prolongeons nos statistiques dans deux directions: arrangements Shi "étendus'', et chambres bornées associées. Cela conduit à une interprétation (conjecturale) combinatoire pour toutes les puissances entières de l'opérateur nabla de Bergeron-Garsia appliqué aux fonctions symétriques élémentaires.

Bijections between noncrossing and nonnesting partitions for classical reflection groups

Discrete Mathematics & Theoretical Computer Science ◽

10.46298/dmtcs.2737 ◽

2009 ◽

Vol DMTCS Proceedings vol. AK,... (Proceedings) ◽

Author(s):

Alex Fink ◽

Benjamin Iriarte Giraldo

Keyword(s):

Type A ◽

Reflection Group ◽

Catalan Numbers ◽

Reflection Groups ◽

Generalized Catalan Numbers ◽

Elementary Methods ◽

International Audience ◽

Type Sets

International audience We present $\textit{type preserving}$ bijections between noncrossing and nonnesting partitions for all classical reflection groups, answering a question of Athanasiadis and Reiner. The bijections for the abstract Coxeter types $B$, $C$ and $D$ are new in the literature. To find them we define, for every type, sets of statistics that are in bijection with noncrossing and nonnesting partitions, and this correspondence is established by means of elementary methods in all cases. The statistics can be then seen to be counted by the generalized Catalan numbers Cat$(W)$ when $W$ is a classical reflection group. In particular, the statistics of type $A$ appear as a new explicit example of objects that are counted by the classical Catalan numbers.