Almost global problems in the LOCAL model

dc.contributorAalto-yliopistofi
dc.contributorAalto Universityen
dc.contributor.authorBalliu, Alkidaen_US
dc.contributor.authorBrandt, Sebastianen_US
dc.contributor.authorOlivetti, Dennisen_US
dc.contributor.authorSuomela, Jukkaen_US
dc.contributor.departmentDepartment of Computer Scienceen
dc.contributor.groupauthorProfessorship Suomela J.en
dc.contributor.groupauthorComputer Science Professorsen
dc.contributor.groupauthorComputer Science - Large-scale Computing and Data Analysis (LSCA)en
dc.contributor.groupauthorComputer Science - Algorithms and Theoretical Computer Science (TCS)en
dc.contributor.organizationSwiss Federal Institute of Technology Zurichen_US
dc.date.accessioned2021-11-24T07:23:47Z
dc.date.available2021-11-24T07:23:47Z
dc.date.issued2021-08en_US
dc.descriptionFunding Information: Open access funding provided by Aalto University. We thank the anonymous reviewers for their helpful comments and suggestions. This work was supported in part by the Academy of Finland, Grant 285721. Funding Information: Open access funding provided by Aalto University. We thank the anonymous reviewers for their helpful comments and suggestions. This work was supported in part by the Academy of Finland, Grant 285721. Publisher Copyright: © 2020, The Author(s).
dc.description.abstractThe landscape of the distributed time complexity is nowadays well-understood for subpolynomial complexities. When we look at deterministic algorithms in the LOCAL model and locally checkable problems (LCLs) in bounded-degree graphs, the following picture emerges:There are lots of problems with time complexities of Θ(log ∗n) or Θ(log n).It is not possible to have a problem with complexity between ω(log ∗n) and o(log n).In general graphs, we can construct LCL problems with infinitely many complexities between ω(log n) and no(1).In trees, problems with such complexities do not exist. However, the high end of the complexity spectrum was left open by prior work. In general graphs there are LCL problems with complexities of the form Θ(nα) for any rational 0 < α≤ 1 / 2 , while for trees only complexities of the form Θ(n1/k) are known. No LCL problem with complexity between ω(n) and o(n) is known, and neither are there results that would show that such problems do not exist. We show that:In general graphs, we can construct LCL problems with infinitely many complexities between ω(n) and o(n).In trees, problems with such complexities do not exist. Put otherwise, we show that any LCL with a complexity o(n) can be solved in time O(n) in trees, while the same is not true in general graphs.en
dc.description.versionPeer revieweden
dc.format.extent23
dc.format.extent259-281
dc.format.mimetypeapplication/pdfen_US
dc.identifier.citationBalliu, A, Brandt, S, Olivetti, D & Suomela, J 2021, ' Almost global problems in the LOCAL model ', Distributed Computing, vol. 34, no. 4, pp. 259-281 . https://doi.org/10.1007/s00446-020-00375-2en
dc.identifier.doi10.1007/s00446-020-00375-2en_US
dc.identifier.issn0178-2770
dc.identifier.issn1432-0452
dc.identifier.otherPURE UUID: 624e64dc-42b3-45d4-9c0b-a2dd70b752eden_US
dc.identifier.otherPURE ITEMURL: https://research.aalto.fi/en/publications/624e64dc-42b3-45d4-9c0b-a2dd70b752eden_US
dc.identifier.otherPURE LINK: http://www.scopus.com/inward/record.url?scp=85083884932&partnerID=8YFLogxKen_US
dc.identifier.otherPURE FILEURL: https://research.aalto.fi/files/75858498/Almost_global_problems_in_the_LOCAL_model.pdfen_US
dc.identifier.urihttps://aaltodoc.aalto.fi/handle/123456789/111198
dc.identifier.urnURN:NBN:fi:aalto-2021112410357
dc.language.isoenen
dc.publisherSpringer Verlag
dc.relation.ispartofseriesDISTRIBUTED COMPUTINGen
dc.relation.ispartofseriesVolume 34, issue 4en
dc.rightsopenAccessen
dc.subject.keywordDistributed complexity theoryen_US
dc.subject.keywordLOCAL modelen_US
dc.subject.keywordLocally checkable labellingsen_US
dc.titleAlmost global problems in the LOCAL modelen
dc.typeA1 Alkuperäisartikkeli tieteellisessä aikakauslehdessäfi
dc.type.versionpublishedVersion

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