Roman Domination in Convex Bipartite Graphs

Abstract

In the Roman domination problem, an undirected simple graph G(V,E) is given. The objective of Roman domination problem is to find a function f:V→ \0,1,2\ such that for any vertex v∈ V with f(v)=0 must be adjacent to at least one vertex u∈ V with f(u)=2 and Σu∈ V f(u), called Roman domination number, is minimized. It is already proven that the Roman domination problem (RDP) is NP-complete for general graphs and it remains NP-complete for bipartite graphs. In this paper, we propose a dynamic programming based polynomial time algorithm for RDP in convex bipartite graph.