English

Orientable total domination in graphs

Combinatorics 2023-11-29 v1

Abstract

Given a directed graph DD, a set SV(D)S \subseteq V(D) is a total dominating set of DD if each vertex in DD has an in-neighbor in SS. The total domination number of DD, denoted γt(D)\gamma_t(D), is the minimum cardinality among all total dominating sets of DD. Given an undirected graph GG, we study the maximum and minimum total domination numbers among all orientations of GG. That is, we study the upper (or lower) orientable domination number of GG, DOMt(G)\rm{DOM}_t(G) (or domt(G)\rm{dom}_t(G)), which is the largest (or smallest) total domination number over all orientations of GG. We characterize those graphs with DOMt(G)=domt(G)\rm{DOM}_t(G) =\rm{dom}_t(G) when the girth is at least 77 as well as those graphs with domt(G)=V(G)1\rm{dom}_t(G) = |V(G)|-1. We also consider how these parameters are effected by removing a vertex from GG, give exact values of DOMt(Km,n)\rm{DOM}_t(K_{m,n}) and domt(Km,n)\rm{dom}_t(K_{m,n}) and bound these parameters when GG is a grid graph.

Keywords

Cite

@article{arxiv.2311.16307,
  title  = {Orientable total domination in graphs},
  author = {Sarah E. Anderson and Tanja Dravec and Daniel Johnston and Kirsti Kuenzel},
  journal= {arXiv preprint arXiv:2311.16307},
  year   = {2023}
}
R2 v1 2026-06-28T13:33:24.542Z