Metric dimension of maximal outerplanar graphs
Abstract
In this paper, we study the metric dimension problem in maximal outerplanar graphs. Concretely, if β (G) is the metric dimension of a maximal outerplanar graph G of order n, we prove that 2 β (G) 2n5 and that the bounds are tight. We also provide linear algorithms to decide whether the metric dimension of G is 2 and to build a resolving set of size 2n5 for G. Moreover, we characterize the maximal outerplanar graphs with metric dimension 2.
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