The minmin coalition number in graphs

Abstract

A set S of vertices in a graph G is a dominating set if every vertex of V(G) S is adjacent to a vertex in S. A coalition in G consists of two disjoint sets of vertices X and Y of G, neither of which is a dominating set but whose union X Y is a dominating set of G. Such sets X and Y form a coalition in G. A coalition partition, abbreviated c-partition, in G is a partition X = \X1,…,Xk\ of the vertex set V(G) of G such that for all i ∈ [k], each set Xi ∈ X satisfies one of the following two conditions: (1) Xi is a dominating set of G with a single vertex, or (2) Xi forms a coalition with some other set Xj ∈ X. %The coalition number C(G) is the maximum cardinality of a c-partition of G. Let A = \A1,…,Ar\ and B= \B1,…, Bs\ be two partitions of V(G). Partition B is a refinement of partition A if every set Bi ∈ B is either equal to, or a proper subset of, some set Aj ∈ A. Further if A B, then B is a proper refinement of A. Partition A is a minimal c-partition if it is not a proper refinement of another c-partition. Haynes et al. [AKCE Int. J. Graphs Combin. 17 (2020), no. 2, 653--659] defined the minmin coalition number c(G) of G to equal the minimum order of a minimal c-partition of G. We show that 2 c(G) n, and we characterize graphs G of order n satisfying c(G) = n. A polynomial-time algorithm is given to determine if c(G)=2 for a given graph G. A necessary and sufficient condition for a graph G to satisfy c(G) 3 is given, and a characterization of graphs G with minimum degree~2 and c(G)= 4 is provided.