Using $p$-row graphs to study $p$-competition graphs
Abstract
For a positive integer , the -competition graph of a digraph is a graph which has the same vertex set as and an edge between distinct vertices and if and only if and have at least common out-neighbors in . A graph is said to be a -competition graph if it is the -competition graph of a digraph. Given a graph , we call the set of positive integers such that is a -competition the competition-realizer of a graph . In this paper, we introduce the notion of -row graph of a matrix which generalizes the existing notion of row graph. We call the graph obtained from a graph by identifying each pair of adjacent vertices which share the same closed neighborhood the condensation of . Using the notions of -row graph and condensation of a graph, we study competition-realizers for various graphs to extend results given by Kim {\it et al.}~[-competition graphs, {\it Linear Algebra Appl.} {\bf 217} (1995) 167--178]. Especially, we find all the elements in the competition-realizer for each caterpillar.
Keywords
Cite
@article{arxiv.1905.10966,
title = {Using $p$-row graphs to study $p$-competition graphs},
author = {Soogang Eoh and Taehee Hong and Suh-Ryung Kim and Seung Chul Lee},
journal= {arXiv preprint arXiv:1905.10966},
year = {2019}
}