Strong cliques and equistability of EPT graphs

Strong cliques and equistability of EPT graphs

In this paper, we characterize the equistable graphs within the class of EPT graphs, the edge-intersection graphs of paths in a tree. This result generalizes a previously known characterization of equistable line graphs. Our approach is based on the combinatorial features of triangle graphs and gene...

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Veröffentlicht in:Discrete Applied Mathematics 2016-04, Vol.203, p.13-25
Hauptverfasser: Alcón, Liliana, Gutierrez, Marisa, Kovács, István, Milanič, Martin, Rizzi, Romeo
Format: Artikel
Sprache:eng
Schlagworte:
Combinatorial analysis
EPT graph
Equistable graph
General partition graph
Graph theory
Graphs
Hardness
Mathematical analysis
Polynomials
Strong clique
Trees
Triangle condition
Triangle graph
Triangles
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Beschreibung
Zusammenfassung:In this paper, we characterize the equistable graphs within the class of EPT graphs, the edge-intersection graphs of paths in a tree. This result generalizes a previously known characterization of equistable line graphs. Our approach is based on the combinatorial features of triangle graphs and general partition graphs. We also show that, in EPT graphs, testing whether a given clique is strong is co-NP-complete. We obtain this hardness result by first showing hardness of the problem of determining whether a given graph has a maximal matching disjoint from a given edge cut. As a positive result, we prove that the problem of testing whether a given clique is strong is polynomial in the class of local EPT graphs, which are defined as the edge intersection graphs of paths in a star and are known to coincide with the line graphs of multigraphs.
ISSN:0166-218X
1872-6771
DOI:10.1016/j.dam.2015.09.016