On the connected coalition number

Abstract

For a graph G=(V,E), a pair of vertex disjoint sets A1 and A2 form a connected coalition of G, if A1 A2 is a connected dominating set, but neither A1 nor A2 is a connected dominating set. A connected coalition partition of G is a partition of V(G) such that each set in either consists of only a singe vertex with the degree |V(G)|-1, or forms a connected coalition of G with another set in . The connected coalition number of G, denoted by CC(G), is the largest possible size of a connected coalition partition of G. In this paper, we characterize graphs that satisfy CC(G)=2. Moreover, we obtain the connected coalition number for unicycle graphs and for the corona product and join of two graphs. Finally, we give a lower bound on the connected coalition number of the Cartesian product and the lexicographic product of two graphs.