On Vertices Contained in All or in No Metric Basis

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dc.contributor.authorHakanen Anni
dc.contributor.authorJunnila Ville
dc.contributor.authorLaihonen Tero
dc.contributor.authorYero Ismael G.
dc.contributor.organizationfi=matematiikka|en=Mathematics|
dc.contributor.organization-code1.2.246.10.2458963.20.41687507875
dc.converis.publication-id68601224
dc.converis.urlhttps://research.utu.fi/converis/portal/Publication/68601224
dc.date.accessioned2022-10-28T13:08:32Z
dc.date.available2022-10-28T13:08:32Z
dc.description.abstract<p>A set <em>R</em> ⊆ <em>V</em> (<em>G</em>) is a <em>resolving set</em> of a graph <em>G</em> if for all distinct vertices <em>v, u</em> ∈ <em>V</em> (<em>G</em>) there exists an element <em>r</em> ∈ <em>R</em> such that d(<em>r</em>, <em>v</em>) ̸ = d(<em>r</em>, <em>u</em>). The <em>metric dimension</em> dim(<em>G</em>) of the graph <em>G</em> is the cardinality of a smallest resolving set of <em>G</em>. A resolving set with cardinality dim(G) is called a metric basis of G. We consider vertices that are in all metric bases, and we call them basis forced vertices. We give several structural properties of sparse and dense graphs where basis forced vertices are present. In particular, we give bounds for the maximum number of edges in a graph containing basis forced vertices. Our bound is optimal whenever the number of basis forced vertices is even. Moreover, we provide a method of constructing fairly sparse graphs with basis forced vertices. We also study vertices which are in no metric basis in connection to cut-vertices and pendants. Furthermore, we show that deciding whether a vertex is in all metric bases is co-NP-hard, and deciding whether a vertex is in no metric basis is NP-hard. <br></p>
dc.format.pagerange407
dc.format.pagerange423
dc.identifier.eissn1872-6771
dc.identifier.jour-issn0166-218X
dc.identifier.olddbid179995
dc.identifier.oldhandle10024/163089
dc.identifier.urihttps://www.utupub.fi/handle/11111/37990
dc.identifier.urlhttps://www.sciencedirect.com/science/article/pii/S0166218X21004820?via%3Dihub
dc.identifier.urnURN:NBN:fi-fe2022012710839
dc.language.isoen
dc.okm.affiliatedauthorHakanen, Anni
dc.okm.affiliatedauthorJunnila, Ville
dc.okm.affiliatedauthorLaihonen, Tero
dc.okm.discipline111 Mathematicsen_GB
dc.okm.discipline111 Matematiikkafi_FI
dc.okm.internationalcopublicationinternational co-publication
dc.okm.internationalityInternational publication
dc.okm.typeA1 ScientificArticle
dc.publisherElsevier BV
dc.publisher.countryNetherlandsen_GB
dc.publisher.countryAlankomaatfi_FI
dc.publisher.country-codeNL
dc.relation.doi10.1016/j.dam.2021.12.004
dc.relation.ispartofjournalDiscrete Applied Mathematics
dc.relation.volume319
dc.source.identifierhttps://www.utupub.fi/handle/10024/163089
dc.titleOn Vertices Contained in All or in No Metric Basis
dc.year.issued2022

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