Hypergraphs with Polynomial Representation: Introducing $r$-splits

Hypergraphs with Polynomial Representation: Introducing $r$-splits

Inspired by the split decomposition of graphs and rank-width, we introduce the notion of $r$-splits. We focus on the family of $r$-splits of a graph of order $n$, and we prove that it forms a hypergraph with several properties. We prove that such hypergraphs can be represented using only $\mathcal O...

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Veröffentlicht in:Discrete mathematics and theoretical computer science 2023-01, Vol.25:3 special issue... (Special issues), p.1-20
Hauptverfasser: Pitois, François, Haddad, Mohammed, Seba, Hamida, Togni, Olivier
Format: Artikel
Sprache:eng
Schlagworte:
Computer Science
computer science - discrete mathematics
Graph theory
mathematics - combinatorics
Orthogonality
Polynomials
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Beschreibung
Zusammenfassung:Inspired by the split decomposition of graphs and rank-width, we introduce the notion of $r$-splits. We focus on the family of $r$-splits of a graph of order $n$, and we prove that it forms a hypergraph with several properties. We prove that such hypergraphs can be represented using only $\mathcal O(n^{r+1})$ of its hyperedges, despite its potentially exponential number of hyperedges. We also prove that there exist hypergraphs that need at least $\Omega(n^r)$ hyperedges to be represented, using a generalization of set orthogonality.
ISSN:1365-8050
1462-7264
1365-8050
DOI:10.46298/dmtcs.10751