Roman \2\-domination on Graphs with "few" 4-paths

Abstract

Given a graph G with vertex set V, f : V → \0, 1, 2\ is a Roman \2\-dominating function (or italian dominating function) of G if for every vertex v∈ V with f(v) =0, either there exists a vertex u adjacent to v with f(u) = 2, or two distinct vertices x,\; y both adjacent to v with f(x)=f(y)=1. The decision problem associated with Roman \2\-domination is NP-complete even for bipartite graphs (Chellali et al., 2016). In this work we initiate the study of Roman \2\-domination on graph classes with a limited number of 4-paths. We base our study on a modular decomposition analysis. In particular, we study Roman \2\-domination under some operations in graphs such as join, union, complementation, addition of pendant vertices and addition of twin vertices. We then obtain the Roman \2\-domination number of spiders, well-labelled spiders and certain prime split graphs that are crucial in the modular decomposition of partner-limited graphs. In all, we provide linear-time algorithms to compute the Roman \2\-domination number of cographs, P4-sparse graphs, P4-tidy graphs and partner-limited graphs. Finally, we derive the NP-completeness of Roman \2\-domination on P4-laden graphs.