English

Bounds on zero forcing using (upper) total domination and minimum degree

Combinatorics 2023-10-12 v1

Abstract

While a number of bounds are known on the zero forcing number Z(G)Z(G) of a graph GG expressed in terms of the order of a graph and maximum or minimum degree, we present two bounds that are related to the (upper) total domination number γt(G)\gamma_t(G) (resp. Γt(G)\Gamma_t(G)) of GG. We prove that Z(G)+γt(G)n(G)Z(G)+\gamma_t(G)\le n(G) and Z(G)+Γt(G)2n(G)Z(G)+\frac{\Gamma_t(G)}{2}\le n(G) holds for any graph GG with no isolated vertices of order n(G)n(G). Both bounds are sharp as demonstrated by several infinite families of graphs. In particular, we show that every graph HH is an induced subgraph of a graph GG with Z(G)+Γt(G)2=n(G)Z(G)+\frac{\Gamma_t(G)}{2}=n(G). Furthermore, we prove a characterization of graphs with power domination equal to 11, from which we derive a characterization of the extremal graphs attaining the trivial lower bound Z(G)δ(G)Z(G)\ge \delta(G). The class of graphs that appears in the corresponding characterizations is obtained by extending an idea from [D.D.~Row, A technique for computing the zero forcing number of a graph with a cut-vertex, Linear Alg.\ Appl.\ 436 (2012) 4423--4432], where the graphs with zero forcing number equal to 22 were characterized.

Keywords

Cite

@article{arxiv.2310.07432,
  title  = {Bounds on zero forcing using (upper) total domination and minimum degree},
  author = {Boštjan Brešar and María Gracia Cornet and Tanja Dravec and Michael Henning},
  journal= {arXiv preprint arXiv:2310.07432},
  year   = {2023}
}

Comments

18 pages, 1 figure

R2 v1 2026-06-28T12:47:17.972Z