English

Distance-$k$ locating-dominating sets in graphs

Combinatorics 2022-06-30 v2

Abstract

Let GG be a graph with vertex set VV, and let kk be a positive integer. A set DVD \subseteq V is a \emph{distance-kk dominating set} of GG if, for each vertex uVDu \in V-D, there exists a vertex wDw\in D such that d(u,w)kd(u,w) \le k, where d(u,w)d(u,w) is the minimum number of edges linking uu and ww in GG. Let dk(x,y)=min{d(x,y),k+1}d_k(x, y)=\min\{d(x,y), k+1\}. A set RVR\subseteq V is a \emph{distance-kk resolving set} of GG if, for any pair of distinct x,yVx,y\in V, there exists a vertex zRz\in R such that dk(x,z)dk(y,z)d_k(x,z) \neq d_k(y,z). The \emph{distance-kk domination number} γk(G)\gamma_k(G) (\emph{distance-kk dimension} dimk(G)\dim_k(G), respectively) of GG is the minimum cardinality of all distance-kk dominating sets (distance-kk resolving sets, respectively) of GG. The \emph{distance-kk location-domination number}, γLk(G)\gamma_L^k(G), of GG is the minimum cardinality of all sets SVS\subseteq V such that SS is both a distance-kk dominating set and a distance-kk resolving set of GG. Note that γL1(G)\gamma_L^1(G) is the well-known location-domination number introduced by Slater in 1988. For any connected graph GG of order n2n\ge 2, we obtain the following sharp bounds: (1) γk(G)dimk(G)+1\gamma_k(G) \le \dim_k(G)+1; (2) 2γk(G)+dimk(G)n2\le\gamma_k(G)+\dim_k(G) \le n; (3) 1max{γk(G),dimk(G)}γLk(G)min{dimk(G)+1,n1}1\le \max\{\gamma_k(G), \dim_k(G)\} \le \gamma_L^k(G) \le \min\{\dim_k(G)+1, n-1\}. We characterize GG for which γLk(G){1,V1}\gamma_L^k(G)\in\{1, |V|-1\}. We observe that dimk(G)γk(G)\frac{\dim_k(G)}{\gamma_k(G)} can be arbitrarily large. Moreover, for any tree TT of order n2n\ge 2, we show that γLk(T)nex(T)\gamma_L^k(T)\le n-ex(T), where ex(T)ex(T) denotes the number of exterior major vertices of TT, and we characterize trees TT achieving equality. We also examine the effect of edge deletion on the distance-kk location-domination number of graphs.

Keywords

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

R2 v1 2026-06-24T03:41:01.799Z