Some bounds on the size of Maximum G-free sets in graph

Abstract

For given graph H, the independence number α(H) of H, is the size of the maximum independent set of V(H). Finding the maximum independent set in a graph is a NP-hard problem. Another version of the independence number is defined as the size of the maximum induced forest of H, and called the forest number of H, and denoted by f(H). Finding f(H) is also a NP-hard problem. Suppose that H=(V(H),E(H)) be a graph, and be a family of graphs, a graph H has a -free k-coloring if there exists a decomposition of V(H) into sets Vi, i-1,2,…,k, so that G H[Vi] for each i, and G∈. S⊂eq V(H) is G-free, where the subgraph of H induced by S, be G-free, i.e. it contains no copy of G. Finding a maximum subset of H, so that H[S] be a G-free graph is a very hard problem as well. In this paper, we study the generalized version of the independence number of a graph. Also giving some bounds about the size of the maximum G-free subset of graphs is another purpose of this article.