Metric Dimension Parameterized by Feedback Vertex Set and Other Structural Parameters
Abstract
For a graph , a subset is called a \emph{resolving set} if for any two vertices , there exists a vertex such that . The {\sc Metric Dimension} problem takes as input a graph and a positive integer , and asks whether there exists a resolving set of size at most . This problem was introduced in the 1970s and is known to be \NP-hard~[GT~61 in Garey and Johnson's book]. In the realm of parameterized complexity, Hartung and Nichterlein~[CCC~2013] proved that the problem is \W[2]-hard when parameterized by the natural parameter . They also observed that it is \FPT\ when parameterized by the vertex cover number and asked about its complexity under \emph{smaller} parameters, in particular the feedback vertex set number. We answer this question by proving that {\sc Metric Dimension} is \W[1]-hard when parameterized by the combined parameter feedback vertex set number plus pathwidth. This also improves the result of Bonnet and Purohit~[IPEC 2019] which states that the problem is \W[1]-hard parameterized by the pathwidth. On the positive side, we show that {\sc Metric Dimension} is \FPT\ when parameterized by either the distance to cluster or the distance to co-cluster, both of which are smaller parameters than the vertex cover number.
Cite
@article{arxiv.2206.15424,
title = {Metric Dimension Parameterized by Feedback Vertex Set and Other Structural Parameters},
author = {Esther Galby and Liana Khazaliya and Fionn Mc Inerney and Roohani Sharma and Prafullkumar Tale},
journal= {arXiv preprint arXiv:2206.15424},
year = {2023}
}