Unimodality and Young's lattice

International audience We define a $K$ -theoretic analogue of Fomin’s dual graded graphs, which we call dual filtered graphs. The key formula in the definition is $DU - UD = D + I$. Our major examples are $K$ -theoretic analogues of Young’s lattice, the binary tree, and the graph determined by the Poirier-Reutenauer Hopf algebra. Most of our examples arise via two constructions, which we call the Pieri construction and the Möbius construction. The Pieri construction is closely related to the construction of dual graded graphs from a graded Hopf algebra, as described in Bergeron-Lam-Li, Nzeutchap, and Lam-Shimozono. The Möbius construction is more mysterious but also potentially more important, as it corresponds to natural insertion algorithms. Nous définissons un analogue $K$ -théorique aux graphes gradués en dualité de Fomin que nous appelons les graphes filtrés en dualité. La formule importante pour la définition est $DU - UD = D + I$. Nos principaux exemples sont un analogue $K$ -théorique aux graphe de Young, l’arbre binaire, et un graphe déterminé par l’algèbre de Hopf de Poirier-Reutenauer. La plupart de nos exemples surviennent de deux constructions que nous appelons la construction de Pieri et la construction de Möbius. La construction de Pieri est étroitement liée à la construction des graphes gradués en dualité d’une algèbre graduée de Hopf à la Bergeron-Lam-Li, Nzeutchap, et Lam-Shimozono. La construction de Möbius est plus mystérieuse, mais aussi peut-être plus importante car cette construction correspond aux algorithmes d’insertion naturelles.

Signature Verification Using Young's Lattice Grid Modeling

Journal of Engineering Science and Technology Review ◽

10.25103/jestr.096.28 ◽

2016 ◽

Vol 9 (6) ◽

pp. 185-188

Author(s):

A. Hadjipanteli ◽

◽

E. N. Zois ◽

A. Nassiopoulos ◽

◽

...

Keyword(s):

Signature Verification ◽

Complexity in Young's Lattice

Annals of Pure and Applied Logic ◽

10.1016/j.apal.2021.103075 ◽

2021 ◽

pp. 103075

Author(s):

Alexander Wires

Keyword(s):

An Order on Circular Permutations

10.37236/9982 ◽

2021 ◽

Vol 28 (3) ◽

Author(s):

Antoine Abram ◽

Nathan Chapelier-Laget ◽

Christophe Reutenauer

Keyword(s):

Symmetric Group ◽

Weak Order ◽

Rank Function ◽

Weyl Groups ◽

Eulerian Numbers ◽

Affine Weyl Groups ◽

Special Formula ◽

Circular Permutations ◽

Semidistributive Lattice ◽

Motivated by the study of affine Weyl groups, a ranked poset structure is defined on the set of circular permutations in $S_n$ (that is, $n$-cycles). It is isomorphic to the poset of so-called admitted vectors, and to an interval in the affine symmetric group $\tilde S_n$ with the weak order. The poset is a semidistributive lattice, and the rank function, whose range is cubic in $n$, is computed by some special formula involving inversions. We prove also some links with Eulerian numbers, triangulations of an $n$-gon, and Young's lattice.

Symmetries of the k-bounded partition lattice

Discrete Mathematics & Theoretical Computer Science ◽

10.46298/dmtcs.3023 ◽

2012 ◽

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

Author(s):

Chris Berg ◽

Mike Zabrocki

Keyword(s):

Partition Lattice ◽

International Audience ◽

International audience We generalize the symmetry on Young's lattice, found by Suter, to a symmetry on the $k$-bounded partition lattice of Lapointe, Lascoux and Morse. Nous généralisons la symétrie sur le treillis de Young, découvert par Suter, à une symétrie sur le treillis des partages bornés par $k$ et étudié par Lapointe, Lascoux and Morse.

The Smith normal form of a matrix associated with Young’s lattice

Proceedings of the American Mathematical Society ◽

10.1090/proc/12642 ◽

2015 ◽

Vol 143 (11) ◽

pp. 4695-4703 ◽

Cited By ~ 2

Author(s):

Tommy Wuxing Cai ◽

Richard P. Stanley

Keyword(s):

Normal Form ◽

Smith Normal Form ◽

Order Ideals in Weak Subposets of Young’s Lattice and Associated Unimodality Conjectures

Annals of Combinatorics ◽

10.1007/s00026-004-0215-5 ◽

2004 ◽

Vol 8 (2) ◽

pp. 197-219 ◽

Cited By ~ 3

Author(s):

L. Lapointe ◽

J. Morse

Keyword(s):

Order Ideals ◽

The $m$-Colored Composition Poset

10.37236/941 ◽

2007 ◽

Vol 14 (1) ◽

Author(s):

Brian Drake ◽

T. Kyle Petersen

Keyword(s):

Partial Order ◽

Symmetric Functions ◽

Young’S Lattice ◽

Colored Permutations

We define a partial order on colored compositions with many properties analogous to Young's lattice. We show that saturated chains correspond to colored permutations, and that covering relations correspond to a Pieri-type rule for colored quasi-symmetric functions. We also show that the poset is CL-shellable. In the case of a single color, we recover the subword order on binary words.

Rook Placements and Jordan Forms of Upper-Triangular Nilpotent Matrices

10.37236/6888 ◽

2018 ◽

Vol 25 (1) ◽

Author(s):

Martha Yip

Keyword(s):

Finite Field ◽

Weighted Sum ◽

Young Tableaux ◽

Canonical Forms ◽

Combinatorial Formula ◽

Rook Placements ◽

Nilpotent Matrices ◽

Jordan Forms ◽

Standard Young Tableaux ◽

The set of $n$ by $n$ upper-triangular nilpotent matrices with entries in a finite field $\mathbb{F}_q$ has Jordan canonical forms indexed by partitions $\lambda \vdash n$. We present a combinatorial formula for computing the number $F_\lambda(q)$ of matrices of Jordan type $\lambda$ as a weighted sum over standard Young tableaux. We construct a bijection between paths in a modified version of Young's lattice and non-attacking rook placements, which leads to a refinement of the formula for $F_\lambda(q)$.

Affine Partitions and Affine Grassmannians

10.37236/84 ◽

2009 ◽

Vol 16 (2) ◽

Cited By ~ 4

Author(s):

Sara C. Billey ◽

Stephen A. Mitchell

Keyword(s):

Weyl Group ◽

Schubert Varieties ◽

Computer Assisted ◽

Partition Identities ◽

Combinatorial Objects ◽

Affine Grassmannians ◽

Affine Weyl Group ◽

Colored Partitions ◽

Young’S Lattice ◽

Group Modulo

We give a bijection between certain colored partitions and the elements in the quotient of an affine Weyl group modulo its Weyl group. By Bott's formula these colored partitions give rise to some partition identities. In certain types, these identities have previously appeared in the work of Bousquet-Melou-Eriksson, Eriksson-Eriksson and Reiner. In other types the identities appear to be new. For type $A_{n}$, the affine colored partitions form another family of combinatorial objects in bijection with $(n+1)$-core partitions and $n$-bounded partitions. Our main application is to characterize the rationally smooth Schubert varieties in the affine Grassmannians in terms of affine partitions and a generalization of Young's lattice which refines weak order and is a subposet of Bruhat order. Several of the proofs are computer assisted.