English

Resolving dominating partitions in graphs

Combinatorics 2018-11-13 v3

Abstract

A partition Π={S1,,Sk}\Pi=\{S_1,\ldots,S_k\} of the vertex set of a connected graph GG is called a \emph{resolving partition} of GG if for every pair of vertices uu and vv, d(u,Sj)d(v,Sj)d(u,S_j)\neq d(v,S_j), for some part SjS_j. The \emph{partition dimension} βp(G)\beta_p(G) is the minimum cardinality of a resolving partition of GG. A resolving partition Π\Pi is called \emph{resolving dominating} if for every vertex vv of GG, d(v,Sj)=1d(v,S_j)=1, for some part SjS_j of Π\Pi. The \emph{dominating partition dimension} ηp(G)\eta_p(G) is the minimum cardinality of a resolving dominating partition of GG. In this paper we show, among other results, that βp(G)ηp(G)βp(G)+1\beta_p(G) \le \eta_p(G) \le \beta_p(G)+1. We also characterize all connected graphs of order n7n\ge7 satisfying any of the following conditions: ηp(G)=n\eta_p(G)= n, ηp(G)=n1\eta_p(G)= n-1, ηp(G)=n2\eta_p(G)= n-2 and βp(G)=n2\beta_p(G) = n-2. Finally, we present some tight Nordhaus-Gaddum bounds for both the partition dimension βp(G)\beta_p(G) and the dominating partition dimension ηp(G)\eta_p(G).

Keywords

Cite

@article{arxiv.1711.01086,
  title  = {Resolving dominating partitions in graphs},
  author = {Carmen Hernando and Mercè Mora and Ignacio M. Pelayo},
  journal= {arXiv preprint arXiv:1711.01086},
  year   = {2018}
}

Comments

22 pages, 9 figures

R2 v1 2026-06-22T22:35:06.306Z