Abstract
A set D of vertices in a graph G is an independent dominating set of G if D is an independent set and every vertex not in D is adjacent to a vertex in D. The independent domination number of G, denoted by i(G), is the minimum cardinality among all independent dominating sets of G. In this paper we show that if T is a nontrivial tree, then i(T) ≥ n(T)+γ(T)−l(T)+2/4, where n(T), γ(T) and l(T) represent the order, the domination number and the number of leaves of T, respectively. In addition, we characterize the trees achieving this new lower bound.
Subject
Management Science and Operations Research,Computer Science Applications,Theoretical Computer Science