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On the structure of compact graphs

creativeworkseries.issn1232-9274
dc.contributor.authorNikandish, Reza
dc.contributor.authorShaveisi, Farzad
dc.date.available2025-05-29T10:42:12Z
dc.date.issued2017
dc.descriptionBibliogr. 885.
dc.description.abstractA simple graph $G$ is called a compact graph if $G$ contains no isolated vertices and for each pair $x$, $y$ of non-adjacent vertices of $G$, there is a vertex z with $N(x)\cup N(y)\subseteq N(z)$, where $N(v)$ is the neighborhood of $v$, for every vertex $v$ of $G.$ In this paper, compact graphs with sufficient number of edges are studied. Also, it is proved that every regular compact graph is strongly regular. Some results about cycles in compact graphs are proved, too. Among other results, it is proved that if the ascending chain condition holds for the set of neighbors of a compact graph $G$, then the descending chain condition holds for the set of neighbors of $G$.en
dc.description.placeOfPublicationKraków
dc.description.versionwersja wydawnicza
dc.identifier.doihttp://dx.doi.org/10.7494/OpMath.2017.37.6.875
dc.identifier.eissn2300-6920
dc.identifier.issn1232-9274
dc.identifier.urihttps://repo.agh.edu.pl/handle/AGH/112766
dc.language.isoeng
dc.publisherWydawnictwa AGH
dc.relation.ispartofOpuscula Mathematica
dc.rightsAttribution 4.0 International
dc.rights.accessotwarty dostęp
dc.rights.urihttps://creativecommons.org/licenses/by/4.0/legalcode
dc.subjectcompact graphen
dc.subjectvertex degreeen
dc.subjectcycleen
dc.subjectneighborhooden
dc.titleOn the structure of compact graphsen
dc.title.relatedOpuscula Mathematicaen
dc.typeartykuł
dspace.entity.typePublication
publicationissue.issueNumberNo. 6
publicationissue.paginationpp. 875-886
publicationvolume.volumeNumberVol. 37
relation.isJournalIssueOfPublicationf02e9aff-d8f6-4ce3-b233-5cedb1c5a988
relation.isJournalIssueOfPublication.latestForDiscoveryf02e9aff-d8f6-4ce3-b233-5cedb1c5a988
relation.isJournalOfPublication304b3b9b-59b9-4830-9178-93a77e6afbc7

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