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In this paper we present a CAT generation algorithm for Dyck paths with a fixed length n. It is the formalization of a method for the exhaustive generation of this kind of paths which can be described by means of two equivalent strategies.…

Combinatorics · Mathematics 2007-05-23 Antonio Bernini , Irene Fanti , Elisabetta Grazzini

A family of plane oriented continuous paths depending on a fixed real positive number $R$ is considered. For any point $x$ on the path, the previous points lie out of any circle of radius $R$ having at $x$ interior normal in a suitable…

Dynamical Systems · Mathematics 2020-04-13 Nico Lombardi , Marco Longinetti , Paolo Manselli , Adriana Venturi

A 3-dimensional Catalan word is a word on three letters so that the subword on any two letters is a Dyck path. For a given Dyck path $D$, a recently defined statistic counts the number of Catalan words with the property that any subword on…

Combinatorics · Mathematics 2022-05-20 Kassie Archer , Christina Gravies

A dispersed Dyck path (DDP) of length n is a lattice path on $N\times N$ from (0,0) to (n,0) in which the following steps are allowed: "up" (x, y) $\to$ (x+1, y+1); "down" (x, y) $\to$ (x+1, y-1); and "right" (x,0) $\to$ (x+1,0). An ascent…

Combinatorics · Mathematics 2016-03-07 Kairi Kangro , Mozhgan Pourmoradnasseri , Dirk Oliver Theis

On an $r\times (n-r)$ lattice rectangle, we first consider walks that begin at the SW corner, proceed with unit steps in either of the directions E or N, and terminate at the NE corner of the rectangle. For each integer $k$ we ask for…

Combinatorics · Mathematics 2016-09-06 Ira Gessel , Wayne Goddard , Walter Shur , Herbert S. Wilf , Lily Yen

Path pairs are a modification of parallelogram polyominoes that provide yet another combinatorial interpretation of the Catalan numbers. More generally, the number of path pairs of length $n$ and distance $\delta$ corresponds to the…

Combinatorics · Mathematics 2020-07-09 Paul Drube

A lattice path in $\mathbb{Z}^d$ is a sequence $\nu_1,\nu_2,\ldots,\nu_k\in\mathbb{Z}^d$ such that the steps $\nu_i-\nu_{i-1}$ lie in a subset $\mathbf{S}$ of $\mathbb{Z}^d$ for all $i=2,\ldots,k$. Let $T_{m,n}$ be the $m\times n$ table in…

There is a strikingly simple classical formula for the number of lattice paths avoiding the line x = ky when k is a positive integer. We show that the natural generalization of this simple formula continues to hold when the line x = ky is…

Combinatorics · Mathematics 2008-05-07 Robin J. Chapman , Timothy Y. Chow , Amit Khetan , David Petrie Moulton , Robert J. Waters

We continue the enumeration of plane lattice paths avoiding the negative quadrant initiated by the first author in [Bousquet-M{\'e}lou, 2016]. We solve in detail a new case, the king walks, where all 8 nearest neighbour steps are allowed.…

Combinatorics · Mathematics 2025-04-11 Mireille Bousquet-Melou , Michael Wallner

We study the enumeration of different classes of grand knight's paths in the plane. In particular, we focus on the subsets of zigzag knight's paths that are subject to constraints. These constraints include ending at $y$-coordinate 0,…

Combinatorics · Mathematics 2024-10-28 Jean-Luc Baril , Nathanaël Hassler , Sergey Kirgizov , José L. Ramírez

For fixed non-negative integers $k$, $t$, and $n$, with $t < k$, a $k_t$-Dyck path of length $(k+1)n$ is a lattice path that starts at $(0, 0)$, ends at $((k+1)n, 0)$, stays weakly above the line $y = -t$, and consists of steps from the…

Combinatorics · Mathematics 2023-07-25 Clemens Heuberger , Sarah J. Selkirk , Stephan Wagner

A {\em k-generalized Dyck path} of length $n$ is a lattice path from $(0,0)$ to $(n,0)$ in the plane integer lattice $\mathbb{Z}\times\mathbb{Z}$ consisting of horizontal-steps $(k, 0)$ for a given integer $k\geq 0$, up-steps $(1,1)$, and…

Combinatorics · Mathematics 2008-05-12 Toufik Mansour , Yidong Sun

We introduce an inductively defined sequence of directed graphs and prove that the number of edges added at step $k$ is equal to the $k$th Catalan number. Furthermore, we establish an isomorphism between the set of edges adjoined at step…

Combinatorics · Mathematics 2020-02-21 Gerardo Alvarez , Julia E. Bergner , Ruben Lopez

Trying to enumerate all of the walks in a 2D lattice is a fun combinatorial problem and there are numerous applications, from polymers to sports. Computers provide a wonderful tool for analyzing these walks; we provide a Maple package for…

Combinatorics · Mathematics 2018-04-18 Bryan Ek

Consider a randomly-oriented two dimensional Manhattan lattice where each horizontal line and each vertical line is assigned, once and for all, a random direction by flipping independent and identically distributed coins. A deterministic…

Probability · Mathematics 2019-04-30 Andrea Collevecchio , Kais Hamza , Laurent Tournier

The rook graph is a graph whose edges represent all the possible legal moves of the rook chess piece on a chessboard. The problem we consider is the following. Given any set $M$ containing pairs of cells such that each cell of the $m_1…

Combinatorics · Mathematics 2025-07-08 Marién Abreu , John Baptist Gauci , Jean Paul Zerafa

We provide new interpretations for a subset of Raney numbers, involving threshold sequences and Motzkin-like paths with long up and down steps. Given three integers n, k, l such that n >= 1, k >= 2 and 0 <= l <= k-2, a (k,l)-threshold…

Combinatorics · Mathematics 2021-09-14 Irena Rusu

Lattice paths in the quarter plane have led to a large and varied set of results in recent years. One major project has been the classification of step sets according to the properties of the corresponding generating functions, and this has…

Combinatorics · Mathematics 2021-12-15 Nicholas R. Beaton , Aleksander L. Owczarek , Ruijie Xu

We derive a series of results on random walks on a d-dimensional hypercubic lattice (lattice paths). We introduce the notions of terse and simple paths corresponding to the path having no backtracking parts (spikes). These paths label…

High Energy Physics - Lattice · Physics 2008-11-26 A. Gonzalez-Arroyo

Motzkin paths consist of up-steps, down-steps, level-steps, and never go below the $x$-axis. They return to the $x$-axis at the end. The concept of skew Dyck path \cite{Deutsch-italy} is transferred to skew Motzkin paths, namely, a left…

Combinatorics · Mathematics 2022-04-08 Helmut Prodinger