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On the chromatic number of (P5,windmill)-free graphs

creativeworkseries.issn1232-9274
dc.contributor.authorSchiermeyer, Ingo
dc.date.available2025-05-29T07:39:15Z
dc.date.issued2017
dc.descriptionBibliogr. 614-615.
dc.description.abstractIn this paper we study the chromatic number of $(P_{5},windmill)$-free graphs. For integers $r,p\geq 2$ the windmill graph $W_{r+1}^p=K_1 \vee pK_r$ is the graph obtained by joining a single vertex (the center) to the vertices of $p$ disjoint copies of a complete graph $K_r$. Our main result is that every $(P_{5},windmill)$-free graph $G$ admits a polynomial $\chi$-binding function. Moreover, we will present polynomial $\chi$-binding functions for several other subclasses of $P_{5}$-free graphs.en
dc.description.placeOfPublicationKraków
dc.description.versionwersja wydawnicza
dc.identifier.doihttp://dx.doi.org/10.7494/OpMath.2017.37.4.609
dc.identifier.eissn2300-6919
dc.identifier.issn1232-9274
dc.identifier.urihttps://repo.agh.edu.pl/handle/AGH/112752
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.subjectvertex colouringen
dc.subjectperfect graphsen
dc.subjectχ-binding functionen
dc.subjectforbidden induced subgraphen
dc.titleOn the chromatic number of (P5,windmill)-free graphsen
dc.title.relatedOpuscula Mathematicaen
dc.typeartykuł
dspace.entity.typePublication
publicationissue.issueNumberNo. 4
publicationissue.paginationpp. 609-615
publicationvolume.volumeNumberVol. 37
relation.isJournalIssueOfPublication258acafc-2b1e-4e1c-afa0-21eb4a5c2bbd
relation.isJournalIssueOfPublication.latestForDiscovery258acafc-2b1e-4e1c-afa0-21eb4a5c2bbd
relation.isJournalOfPublication304b3b9b-59b9-4830-9178-93a77e6afbc7

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