Graph Enumeration Problems

International audience We study two enumeration problems for $\textit{up-down alternating trees}$, i.e., rooted labelled trees $T$, where the labels $ v_1, v_2, v_3, \ldots$ on every path starting at the root of $T$ satisfy $v_1 < v_2 > v_3 < v_4 > \cdots$. First we consider various tree families of interest in combinatorics (such as unordered, ordered, $d$-ary and Motzkin trees) and study the number $T_n$ of different up-down alternating labelled trees of size $n$. We obtain for all tree families considered an implicit characterization of the exponential generating function $T(z)$ leading to asymptotic results of the coefficients $T_n$ for various tree families. Second we consider the particular family of up-down alternating labelled ordered trees and study the influence of such an alternating labelling to the average shape of the trees by analyzing the parameters $\textit{label of the root node}$, $\textit{degree of the root node}$ and $\textit{depth of a random node}$ in a random tree of size $n$. This leads to exact enumeration results and limiting distribution results. Nous étudions deux problèmes de dénombrement d'$\textit{arbres alternés haut-bas}$ : par définition, ce sont des arbres munis d'une racine et tels que, pour tout chemin partant de la racine, les valeurs $v_1,v_2,v_3,\ldots$ associées aux nœuds du chemin satisfont la chaîne d'inégalités $v_1 < v_2 > v_3 < v_4 > \cdots$. D'une part, nous considérons diverses familles d'arbres intéressantes du point de vue de l'analyse combinatoire (comme les arbres de Motzkin, les arbres non ordonnés, ordonnés et $d$-aires) et nous étudions pour chaque famille le nombre total $T_n$ d'arbres alternés haut-bas de taille $n$. Nous obtenons pour toutes les familles d'arbres considérées une caractérisation implicite de la fonction génératrice exponentielle $T(z)$. Cette caractérisation nous renseigne sur le comportement asymptotique des coefficients $T_n$ de plusieurs familles d'arbres. D'autre part, nous examinons le cas particulier de la famille des arbres ordonnés : nous étudions l'influence de l'étiquetage alterné haut-bas sur l'allure générale de ces arbres en analysant trois paramètres dans un arbre aléatoire (valeur de la racine, degré de la racine et profondeur d'un nœud aléatoire). Nous obtenons alors des résultats en terme de distribution limite, mais aussi de dénombrement exact.

Download Full-text

Counting and Enumeration Problems with Bounded Treewidth

Logic for Programming, Artificial Intelligence, and Reasoning - Lecture Notes in Computer Science ◽

10.1007/978-3-642-17511-4_22 ◽

2010 ◽

pp. 387-404 ◽

Cited By ~ 5

Author(s):

Reinhard Pichler ◽

Stefan Rümmele ◽

Stefan Woltran

Keyword(s):

Bounded Treewidth ◽

Enumeration Problems

Download Full-text

Enumerations for Compositions and Complete Homogeneous Symmetric Polynomial

Journal of Mathematics Research ◽

10.5539/jmr.v7n2p1 ◽

2015 ◽

Vol 7 (2) ◽

pp. 1

Author(s):

Soumendra Bera

Keyword(s):

Positive Integer ◽

Symmetric Polynomial ◽

Enumeration Problems ◽

Homogeneous Symmetric Polynomial

We count the number of occurrences of t as the summands (i) in the compositions of a positive integer n into r parts; and (ii) in all compositions of n; and subsequently obtain other results involving compositions. The initial counting further helps to solve the enumeration problems for complete homogeneous symmetric polynomial.

Download Full-text

Polytopes with an Axis Of Symmetry

Canadian Journal of Mathematics ◽

10.4153/cjm-1970-035-5 ◽

1970 ◽

Vol 22 (2) ◽

pp. 265-287 ◽

Cited By ~ 6

Author(s):

P. McMullen ◽

G. C. Shephard

Keyword(s):

Symmetry Group ◽

Linear Subspace ◽

Convex Polytopes ◽

Convex Polytope ◽

Simple Manner ◽

Gale Transform ◽

Enumeration Problems ◽

Axis Of Symmetry ◽

Axes Of Symmetry ◽

Gale Diagrams

During the last few years, Branko Grünbaum, Micha Perles, and others have made extensive use of Gale transforms and Gale diagrams in investigating the properties of convex polytopes. Up to the present, this technique has been applied almost entirely in connection with combinatorial and enumeration problems. In this paper we begin by showing that Gale transforms are also useful in investigating properties of an essentially metrical nature, namely the symmetries of a convex polytope. Our main result here (Theorem (10)) is that, in a manner that will be made precise later, the symmetry group of a polytope can be represented faithfully by the symmetry group of a Gale transform of its vertices. If a d-polytope P ⊂ Ed has an axis of symmetry A (that is, A is a linear subspace of Ed such that the reflection in A is a symmetry of P), then it is called axi-symmetric. Using Gale transforms we are able to determine, in a simple manner, the possible numbers and dimensions of axes of symmetry of axi-symmetric polytopes.

Download Full-text