New results on the 1-isolation number of graphs without short cycles

Abstract

Let G be a graph. A subset D ⊂eq V(G) is called a 1-isolating set of G if (G-N[D]) ≤ 1, that is, G-N[D] consists of isolated edges and isolated vertices only. The 1-isolation number of G, denoted by 1(G), is the cardinality of a smallest 1-isolating set of G. In this paper, we prove that if G \P3,C3,C7,C11\ is a connected graph of order n without 6-cycles, or without induced 5- and 6-cycles, then 1(G) ≤ n4. Both bounds are sharp.