Averaging 2-Rainbow Domination and Roman Domination

Abstract

For a graph G, let γr2(G) and γR(G) denote the 2-rainbow domination number and the Roman domination number, respectively. Fujita and Furuya (Difference between 2-rainbow domination and Roman domination in graphs, Discrete Applied Mathematics 161 (2013) 806-812) proved γr2(G)+γR(G)≤ 64n(G) for a connected graph G of order n(G) at least 3. Furthermore, they conjectured γr2(G)+γR(G)≤ 43n(G) for a connected graph G of minimum degree at least 2 that is distinct from C5. We characterize all extremal graphs for their inequality and prove their conjecture.