Occurrence graphs of patterns in permutations

Occurrence graphs of patterns in permutations

We define the \emph{occurrence graph} \(G_p(\pi\)) of a pattern \(p\) in a permutation \(\pi\) as the graph with the occurrences of \(p\) in \(\pi\) as vertices and edges between the vertices if the occurrences differ by exactly one element. We then study properties of these graphs. The main theorem...

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Veröffentlicht in:arXiv.org 2016-07
Hauptverfasser: Bjarni Jens Kristinsson, Ulfarsson, Henning
Format: Artikel
Sprache:eng
Schlagworte:
Apexes
Graph theory
Graphs
Mathematics - Combinatorics
Permutations
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Zusammenfassung:We define the \emph{occurrence graph} \(G_p(\pi\)) of a pattern \(p\) in a permutation \(\pi\) as the graph with the occurrences of \(p\) in \(\pi\) as vertices and edges between the vertices if the occurrences differ by exactly one element. We then study properties of these graphs. The main theorem in this paper is that every \emph{hereditary property} of graphs gives rise to a \emph{permutation class}.
ISSN:2331-8422
DOI:10.48550/arxiv.1607.03018