Upper bounds on the k-isolation number

Abstract

The isolation number of a graph G (also called the vertex-edge domination number of G), denoted by (G), is the size of a smallest subset D of the vertex set V(G) of G such that G-N[D] (the graph obtained by deleting the closed neighbourhood N[D] of D from G) has no edges. For k ≥ 1, the k-isolation number of G is the size of a smallest subset D of V(G) such that the maximum degree of G-N[D] is at most k-1. Thus, 1(G) = (G). Let n and be the number of vertices and the number of leaves of G, respectively. We show that if n ≥ 3 and G is connected, then k(G) ≤ n - 2. We also show that if G is a tree T, then (T) ≤ n + 4 and k(T) ≤ n + 2k+1 for k ≥ 2. These bounds together improve the inequality k(T) ≤ nk+2 of Caro and Hansberg except that their inequality is better if k ≥ 2 and k-1k+2n < < kk+2n. Each of the new bounds is attainable if it is an integer. For each of them, we characterize all the graphs that attain it.