p-Strong Roman Domination in Graphs

Abstract

Domination in graphs is a widely studied field, where many different definitions have been introduced in the last years to respond to different network requirements. This paper presents a new dominating parameter based on the well-known strong Roman domination model. Given a positive integer p, we call a p-strong Roman domination function (p-StRDF) in a graph G to a function f:V(G)→ \0,1,2, … , +pp \ having the property that if f(v)=0, then there is a vertex u∈ N(v) such that f(u) 1+ |B0 N(u)|p , where B0 is the set of vertices with label 0. The p-strong Roman domination number γStRp(G) is the minimum weight (sum of labels) of a p-StRDF on G. We study the NP-completeness of the p-StRD-problem, we also provide general and tight upper and lower bounds depending on several classical invariants of the graph and, finally, we determine the exact values for some families of graphs.