English

Total Forcing and Zero Forcing in Claw-Free Cubic Graphs

Combinatorics 2017-08-18 v1

Abstract

A dynamic coloring of the vertices of a graph GG starts with an initial subset SS of colored vertices, with all remaining vertices being non-colored. At each discrete time interval, a colored vertex with exactly one non-colored neighbor forces this non-colored neighbor to be colored. The initial set SS is called a forcing set (zero forcing set) of GG if, by iteratively applying the forcing process, every vertex in GG becomes colored. If the initial set SS has the added property that it induces a subgraph of GG without isolated vertices, then SS is called a total forcing set in GG. The total forcing number of GG, denoted Ft(G)F_t(G), is the minimum cardinality of a total forcing set in GG. We prove that if GG is a connected cubic graph of order~nn that has a spanning 22-factor consisting of triangles, then Ft(G)12nF_t(G) \le \frac{1}{2}n. More generally, we prove that if GG is a connected, claw-free, cubic graph of order~n6n \ge 6, then Ft(G)12nF_t(G) \le \frac{1}{2}n, where a claw-free graph is a graph that does not contain K1,3K_{1,3} as an induced subgraph. The graphs achieving equality in these bounds are characterized.

Keywords

Cite

@article{arxiv.1708.05041,
  title  = {Total Forcing and Zero Forcing in Claw-Free Cubic Graphs},
  author = {Randy Davila and Michael Henning},
  journal= {arXiv preprint arXiv:1708.05041},
  year   = {2017}
}
R2 v1 2026-06-22T21:16:32.810Z