On k-coalition in graphs: bounds and exact values

Abstract

Given a graph G=(V(G),E(G)), a set S⊂eq V(G) is called a k-dominating set if every vertex in V(G) S has at least k neighbors in S. Two disjoint sets A,B⊂ V(G) form a k-coalition in G if neither set is a k-dominating set in G but their union A B is a k-dominating set. A partition of V(G) is a k-coalition partition if each set in is either a k-dominating set of cardinality k or forms a k-coalition with another set in . The k-coalition number Ck(G) equals the maximum cardinality of a k-coalition partition of G. In this work, we give general upper and lower bounds on this parameter. In particular, we show that if G has minimum degree δ 2 and maximum degree 4 δ/2 , then C2(G) ≤ (-2 δ/2 +1)( δ/2 +1) + δ/2 +1, and this bound is sharp. If T is a tree of order~n 2, then we prove the upper bound C2(T) ≤ n2+1 and we characterize the extremal trees achieving equality in this bound. We determine the exact value of Ck(G) for any cubic graph G and k≥2. Finally, we give the exact value of Ck for any complete bipartite graph, which completes a partial result and resolves an issue from an earlier paper.