English

Target set selection problem for honeycomb networks

Discrete Mathematics 2012-03-06 v1

Abstract

Let GG be a graph with a threshold function θ:V(G)N\theta:V(G)\rightarrow \mathbb{N} such that 1θ(v)dG(v)1\leq \theta(v)\leq d_G(v) for every vertex vv of GG, where dG(v)d_G(v) is the degree of vv in GG. Suppose we are given a target set SV(G)S\subseteq V(G). The paper considers the following repetitive process on GG. At time step 0 the vertices of SS are colored black and the other vertices are colored white. After that, at each time step t>0t>0, the colors of white vertices (if any) are updated according to the following rule. All white vertices vv that have at least θ(v)\theta(v) black neighbors at the time step t1t-1 are colored black, and the colors of the other vertices do not change. The process runs until no more white vertices can update colors from white to black. The following optimization problem is called Target Set Selection: Finding a target set SS of smallest possible size such that all vertices in GG are black at the end of the process. Such an SS is called an {\em optimal target set} for GG under the threshold function θ\theta. We are interested in finding an optimal target set for the well-known class of honeycomb networks under an important threshold function called {\em strict majority threshold}, where θ(v)=(dG(v)+1)/2\theta(v)=\lceil (d_G(v)+1)/2\rceil for each vertex vv in GG. In a graph GG, a {\em feedback vertex set} is a subset SV(G)S\subseteq V(G) such that the subgraph induced by V(G)SV(G)\setminus S is cycle-free. In this paper we give exact value on the size of the optimal target set for various kinds of honeycomb networks under strict majority threshold, and as a by-product we also provide a minimum feedback vertex set for different kinds regular graphs in the class of honeycomb networks

Cite

@article{arxiv.1203.0666,
  title  = {Target set selection problem for honeycomb networks},
  author = {Chun-Ying Chiang and Liang-Hao Huang and Hong-Gwa Yeh},
  journal= {arXiv preprint arXiv:1203.0666},
  year   = {2012}
}
R2 v1 2026-06-21T20:28:35.548Z