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Resolving set and exchange property in nanotube

Ali N. A. Koam, Sikander Ali, Ali Ahmad, Muhammad Azeem, Muhammad Jamil

2023AIMS Mathematics15 citationsDOIOpen Access PDF

Abstract

<abstract><p>Give us a linked graph, $ G = (V, E). $ A vertex $ w\in V $ distinguishes between two components (vertices and edges) $ x, y\in E\cup V $ if $ d_G(w, x)\neq d_G (w, y). $ Let $ W_{1} $ and $ W_{2} $ be two resolving sets and $ W_{1} $ $ \neq $ $ W_{2} $. Then, we can say that the graph $ G $ has double resolving set. A nanotube derived from an quadrilateral-octagonal grid belongs to essential and extensively studied compounds in materials science. Nano-structures are very important due to their thickness. In this article, we have discussed the metric dimension of the graphs of nanotubes derived from the quadrilateral-octagonal grid. We proved that the generalized nanotube derived from quadrilateral-octagonal grid have three metric dimension. We also check that the exchange property is also held for this structure.</p></abstract>

Topics & Concepts

QuadrilateralCombinatoricsVertex (graph theory)GridGraphNanotubeMathematicsDimension (graph theory)Metric (unit)Discrete mathematicsGeometryPhysicsMaterials scienceNanotechnologyEngineeringCarbon nanotubeThermodynamicsFinite element methodOperations managementGraph Labeling and Dimension ProblemsGraph theory and applications
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