Please use this identifier to cite or link to this item: https://research.matf.bg.ac.rs/handle/123456789/177
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dc.contributor.authorMoconja, Slavkoen_US
dc.contributor.authorTanović, Predragen_US
dc.date.accessioned2022-08-06T17:03:46Z-
dc.date.available2022-08-06T17:03:46Z-
dc.date.issued2020-03-01-
dc.identifier.issn01680072en
dc.identifier.urihttps://research.matf.bg.ac.rs/handle/123456789/177-
dc.description.abstractWe introduce the notions of stationarily ordered types and theories; the latter generalizes weak o-minimality and the former is a relaxed version of weak o-minimality localized at the locus of a single type. We show that forking, as a binary relation on elements realizing stationarily ordered types, is an equivalence relation and that each stationarily ordered type in a model determines some order-type as an invariant of the model. We study weak and forking non-orthogonality of stationarily ordered types, show that they are equivalence relations and prove that invariants of non-orthogonal types are closely related. The techniques developed are applied to prove that in the case of a binary, stationarily ordered theory with fewer than 2ℵ0 countable models, the isomorphism type of a countable model is determined by a certain sequence of invariants of the model. In particular, we confirm Vaught's conjecture for binary, stationarily ordered theories.en
dc.relation.ispartofAnnals of Pure and Applied Logicen
dc.subjectColoured orderen
dc.subjectdp-Minimalityen
dc.subjectShuffling relationen
dc.subjectStationarily ordered typeen
dc.subjectVaught's conjectureen
dc.subjectWeakly quasi-o-minimal theoryen
dc.titleStationarily ordered types and the number of countable modelsen_US
dc.typeArticleen_US
dc.identifier.doi10.1016/j.apal.2019.102765-
dc.identifier.scopus2-s2.0-85076428376-
dc.identifier.urlhttps://api.elsevier.com/content/abstract/scopus_id/85076428376-
dc.contributor.affiliationAlgebra and Mathematical Logicen_US
dc.relation.volume171en
dc.relation.issue3en
item.fulltextNo Fulltext-
item.openairecristypehttp://purl.org/coar/resource_type/c_18cf-
item.cerifentitytypePublications-
item.grantfulltextnone-
item.openairetypeArticle-
crisitem.author.deptAlgebra and Mathematical Logic-
crisitem.author.orcid0000-0003-4095-8830-
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