English

Minimum Weight Resolving Sets of Grid Graphs

Combinatorics 2016-06-23 v1

Abstract

For a simple graph G=(V,E)G=(V,E) and for a pair of vertices u,vVu,v \in V, we say that a vertex wVw \in V resolves uu and vv if the shortest path from ww to uu is of a different length than the shortest path from ww to vv. A set of vertices RV{R \subseteq V} is a resolving set if for every pair of vertices uu and vv in GG, there exists a vertex wRw \in R that resolves uu and vv. The minimum weight resolving set problem is to find a resolving set MM for a weighted graph GG such thatvMw(v)\sum_{v \in M} w(v) is minimum, where w(v)w(v) is the weight of vertex vv. In this paper, we explore the possible solutions of this problem for grid graphs PnPmP_n \square P_m where 3nm3\leq n \leq m. We give a complete characterisation of solutions whose cardinalities are 2 or 3, and show that the maximum cardinality of a solution is 2n22n-2. We also provide a characterisation of a class of minimals whose cardinalities range from 44 to 2n22n-2.

Keywords

Cite

@article{arxiv.1409.4510,
  title  = {Minimum Weight Resolving Sets of Grid Graphs},
  author = {Patrick Andersen and Cyriac Grigorious and Mirka Miller},
  journal= {arXiv preprint arXiv:1409.4510},
  year   = {2016}
}

Comments

21 pages, 10 figures

R2 v1 2026-06-22T05:57:33.229Z