Reduced Decompositions with One Repetition and Permutation Pattern Avoidance

2011 ◽  
Vol 29 (2) ◽  
pp. 173-185
Author(s):  
Daniel Daly
Keyword(s):  
Pattern Avoidance ◽  
Reduced Decompositions ◽  
Permutation Pattern

scholarly journals Permutation Pattern Avoidance and the Catalan Triangle

2013 ◽  
Vol 25 (1) ◽  
pp. 50-60 ◽  
Author(s):  
Derek Desantis ◽  
Rebecca Field ◽  
Wesley Hough ◽  
Brant Jones ◽  
Rebecca Meissen ◽  
...  
Keyword(s):  
Pattern Avoidance ◽  
Permutation Pattern

scholarly journals Generating Trees and Pattern Avoidance in Alternating Permutations

10.37236/1173 ◽  
2012 ◽  
Vol 19 (1) ◽  
Author(s):  
Joel Brewster Lewis
Keyword(s):  
Pattern Avoidance ◽  
Young Tableaux ◽  
Alternating Permutations ◽  
Open Questions ◽  
Permutation Pattern ◽  
Generating Trees ◽  
Generating Tree ◽  
Standard Young Tableaux ◽  
Tree Approach

We extend earlier work of the same author to enumerate alternating permutations avoiding the permutation pattern $2143$.  We use a generating tree approach to construct a recursive bijection between the set $A_{2n}(2143)$ of alternating permutations of length $2n$ avoiding $2143$ and the set of standard Young tableaux of shape $\langle n, n, n\rangle$, and between the set $A_{2n + 1}(2143)$ of alternating permutations of length $2n + 1$ avoiding $2143$ and the set of shifted standard Young tableaux of shape $\langle n + 2, n + 1, n\rangle$.  We also give a number of conjectures and open questions on pattern avoidance in alternating permutations and generalizations thereof.

scholarly journals Pattern-Avoidance in Binary Fillings of Grid Shapes (short version)

2008 ◽  
Vol DMTCS Proceedings vol. AJ,... (Proceedings) ◽  
Author(s):  
Alexey Spiridonov
Keyword(s):  
Young Diagram ◽  
Bipartite Graphs ◽  
Pattern Avoidance ◽  
Short Version ◽  
Square Grid ◽  
Acyclic Orientations ◽  
Permutation Pattern ◽  
Nous Montrons ◽  
International Audience ◽  
Wilf Equivalence

International audience A $\textit{grid shape}$ is a set of boxes chosen from a square grid; any Young diagram is an example. This paper considers a notion of pattern-avoidance for $0-1$ fillings of grid shapes, which generalizes permutation pattern-avoidance. A filling avoids some patterns if none of its sub-shapes equal any of the patterns. We focus on patterns that are $\textit{pairs}$ of $2 \times 2$ fillings. For some shapes, fillings that avoid specific $2 \times 2$ pairs are in bijection with totally nonnegative Grassmann cells, or with acyclic orientations of bipartite graphs. We prove a number of results analogous to Wilf-equivalence for these objects ―- that is, we show that for certain classes of shapes, some pattern-avoiding fillings are equinumerous with others. Une $\textit{forme de grille}$ est un ensemble de cases choisies dans une grille carrée; un diagramme de Young en est un exemple. Cet article considère une notion de motif exclu pour un remplissage d'une forme de grille par des $0$ et des $1$, qui généralise la notion correspondante pour les permutations. Un remplissage évite certains motifs si aucune de ses sous-formes n'est égale à un motif. Nous nous concentrons sur les motifs qui sont des $\textit{paires de remplissages}$ de taille $2 \times 2$. Pour certaines formes, les remplissages évitant certaines paires de taille $2 \times 2$ sont en bijection avec les cellules de Grassmann totalement positives, ou bien avec les orientations acycliques de graphes bipartis. Nous démontrons plusieurs résultats analogues à l'équivalence de Wilf pour ces objets ―- c'est-à-dire, nous montrons que, pour certaines classes de formes, des remplissages évitant un motif donné sont en nombre égal à d'autres remplissages.

scholarly journals The undirected repetition threshold and undirected pattern avoidance

2021 ◽  
Vol 866 ◽  
pp. 56-69
Author(s):  
James D. Currie ◽  
Lucas Mol
Keyword(s):  
Pattern Avoidance

scholarly journals On Packing Densities of Permutations

10.37236/1622 ◽  
2002 ◽  
Vol 9 (1) ◽  
Author(s):  
M. H. Albert ◽  
M. D. Atkinson ◽  
C. C. Handley ◽  
D. A. Holton ◽  
W. Stromquist
Keyword(s):  
Lower Bounds ◽  
Maximum Density ◽  
Upper And Lower Bounds ◽  
Maximal Density ◽  
Permutation Pattern ◽  
Packing Densities

The density of a permutation pattern $\pi$ in a permutation $\sigma$ is the proportion of subsequences of $\sigma$ of length $|\pi|$ that are isomorphic to $\pi$. The maximal value of the density is found for several patterns $\pi$, and asymptotic upper and lower bounds for the maximal density are found in several other cases. The results are generalised to sets of patterns and the maximum density is found for all sets of length $3$ patterns.

scholarly journals Resolving Two Conjectures on Staircase Encodings and Boundary Grids of $132$ and $123$-avoiding permutations

10.37236/8171 ◽  
2019 ◽  
Vol 26 (3) ◽  
Author(s):  
Shyam Sivasathya Narayanan
Keyword(s):  
Pattern Avoidance

This paper analyzes relations between pattern avoidance of certain permutations and graphs on staircase grids and boundary grids, and proves two conjectures posed by Bean, Tannock, and Ulfarsson (2015). More specifically, this paper enumerates a certain family of staircase encodings and proves that the downcore graph, a certain graph established on the boundary grid, is pure if and only if the permutation corresponding to the boundary grid avoids the classical patterns 123 and 2143.  

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