The Threshold Dimension and Irreducible Graphs
Abstract
Let be a graph, and let , , and be vertices of . If the distance between and does not equal the distance between and , then is said to resolve and . The metric dimension of , denoted , is the cardinality of a smallest set of vertices such that every pair of vertices of is resolved by some vertex of . The threshold dimension of , denoted , is the minimum metric dimension among all graphs having as a spanning subgraph. In other words, the threshold dimension of is the minimum metric dimension among all graphs obtained from by adding edges. If , then is said to be irreducible. We give two upper bounds for the threshold dimension of a graph, the first in terms of the diameter, and the second in terms of the chromatic number. As a consequence, we show that every planar graph of order has threshold dimension . We show that several infinite families of graphs, known to have metric dimension , are in fact irreducible. Finally, we show that for any integers and with , there is an irreducible graph of order and metric dimension .
Cite
@article{arxiv.2002.11048,
title = {The Threshold Dimension and Irreducible Graphs},
author = {Lucas Mol and Matthew J. H. Murphy and Ortrud R. Oellermann},
journal= {arXiv preprint arXiv:2002.11048},
year = {2020}
}
Comments
15 pages, 2 figures