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Hardness of Metric Dimension in Graphs of Constant Treewidth

The Metric Dimension problem asks for a minimum-sized resolving set in a given (unweighted, undirected) graph $G$. Here, a set $S \subseteq V(G)$ is resolving if no two distinct vertices of $G$ have the same distance vector to $S$. The complexity of Metric Dimension in graphs of bounded treewidth remained elusive in the past years. Recently, Bonnet and Purohit [IPEC 2019] showed that the problem is W[1]-hard under treewidth parameterization. In this work, we strengthen their lower bound to show that Metric Dimension is NP-hard in graphs of treewidth 24.

preprint2021arXivOpen access
Shaohua LiMarcin Pilipczuk
Data Structures and AlgorithmsDiscrete Mathematics
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Shaohua LiMarcin Pilipczuk

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