Distance-$k$ locating-dominating sets in graphs
Abstract
Let be a graph with vertex set , and let be a positive integer. A set is a \emph{distance- dominating set} of if, for each vertex , there exists a vertex such that , where is the minimum number of edges linking and in . Let . A set is a \emph{distance- resolving set} of if, for any pair of distinct , there exists a vertex such that . The \emph{distance- domination number} (\emph{distance- dimension} , respectively) of is the minimum cardinality of all distance- dominating sets (distance- resolving sets, respectively) of . The \emph{distance- location-domination number}, , of is the minimum cardinality of all sets such that is both a distance- dominating set and a distance- resolving set of . Note that is the well-known location-domination number introduced by Slater in 1988. For any connected graph of order , we obtain the following sharp bounds: (1) ; (2) ; (3) . We characterize for which . We observe that can be arbitrarily large. Moreover, for any tree of order , we show that , where denotes the number of exterior major vertices of , and we characterize trees achieving equality. We also examine the effect of edge deletion on the distance- location-domination number of graphs.
Cite
@article{arxiv.2106.14848,
title = {Distance-$k$ locating-dominating sets in graphs},
author = {Cong X. Kang and Eunjeong Yi},
journal= {arXiv preprint arXiv:2106.14848},
year = {2022}
}
Comments
12 pages, 2 figures