1. Clique-perfectness and balancedness of some graph classes.
- Author
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Bonomo, Flavia, Durán, Guillermo, Safe, Martín D., and Wagler, Annegret K.
- Subjects
GRAPH theory ,POLYNOMIAL time algorithms ,SET theory ,SUBGRAPHS ,MATHEMATICAL analysis - Abstract
A graph is clique-perfect if the maximum size of a clique-independent set (a set of pairwise disjoint maximal cliques) and the minimum size of a clique-transversal set (a set of vertices meeting every maximal clique) coincide for each induced subgraph. A graph is balanced if its clique-matrix contains no square submatrix of odd size with exactly two ones per row and column. In this work, we give linear-time recognition algorithms and minimal forbidden induced subgraph characterizations of clique-perfectness and balancedness ofP4-tidy graphs and a linear-time algorithm for computing a maximum clique-independent set and a minimum clique-transversal set for anyP4-tidy graph. We also give a minimal forbidden induced subgraph characterization and a linear-time recognition algorithm for balancedness of paw-free graphs. Finally, we show that clique-perfectness of diamond-free graphs can be decided in polynomial time by showing that a diamond-free graph is clique-perfect if and only if it is balanced. [ABSTRACT FROM PUBLISHER]
- Published
- 2014
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