On nested and 2-nested graphs: two subclasses of graphs between threshold and split graphs
Abstract
A -matrix has the Consecutive Ones Property (C1P) for the rows if there is a permutation of its columns such that the ones in each row appear consecutively. We say a -matrix is nested if it has the consecutive ones property for the rows (C1P) and every two rows are either disjoint or nested. We say a -matrix is 2-nested if it has the C1P and admits a partition of its rows into two sets such that the submatrix induced by each of these sets is nested. We say a split graph with split partition is nested (resp.\ 2-nested) if the matrix which indicates the adjacency between vertices in and is nested (resp.\ 2-nested). In this work, we characterize nested and 2-nested matrices by minimal forbidden submatrices. This characterization leads to a minimal forbidden induced subgraph characterization for these classes of graphs, which are a superclass of threshold graphs and a subclass of split and circle graphs.
Keywords
Cite
@article{arxiv.1906.11970,
title = {On nested and 2-nested graphs: two subclasses of graphs between threshold and split graphs},
author = {Nina Pardal and Guillermo A. Durán and Luciano N. Grippo and Martín D. Safe},
journal= {arXiv preprint arXiv:1906.11970},
year = {2020}
}
Comments
6 pages. Presented in the LatinAmerican Workshop on Cliques in Graphs 2018. Sent to publish in the special issue devoted to this conference of Mathematica Contempor\^anea