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dc.contributor.authorDošen, Kostaen
dc.contributor.authorPetrić, Zoranen
dc.date.accessioned2020-04-12T18:10:32Z-
dc.date.available2020-04-12T18:10:32Z-
dc.date.issued2013-04-01en
dc.identifier.issn0168-0072en
dc.identifier.urihttp://researchrepository.mi.sanu.ac.rs/handle/123456789/328-
dc.description.abstractA split preorder is a preordering relation on the disjoint union of two sets, which function as source and target when one composes split preorders. The paper presents by generators and equations the category SplPre, whose arrows are the split preorders on the disjoint union of two finite ordinals. The same is done for the subcategory Gen of SplPre, whose arrows are equivalence relations, and for the category Rel, whose arrows are the binary relations between finite ordinals, and which has an isomorphic image within SplPre by a map that preserves composition, but not identity arrows. It was shown previously that SplPre and Gen have an isomorphic representation in Rel in the style of Brauer.The syntactical presentation of Gen and Rel in this paper exhibits the particular Frobenius algebra structure of Gen and the particular bialgebraic structure of Rel, the latter structure being built upon the former structure in SplPre. This points towards algebraic modelling of various categories motivated by logic, and related categories, for which one can establish coherence with respect Rel and Gen. It also sheds light on the relationship between the notions of Frobenius algebra and bialgebra. The completeness of the syntactical presentations is proved via normal forms, with the normal form for SplPre and Gen being in some sense orthogonal to the composition-free, i.e. cut-free, normal form for Rel. The paper ends by showing that the assumptions for the algebraic structures of SplPre, Gen and Rel cannot be extended with new equations without falling into triviality.en
dc.publisherElsevier-
dc.relationRepresentations of logical structures and formal languages and their application in computing-
dc.relation.ispartofAnnals of Pure and Applied Logicen
dc.subjectBialgebra | Comonad | Frobenius algebra | Monad | Normal form | Split preorderen
dc.titleSyntax for split preordersen
dc.typeArticleen
dc.identifier.doi10.1016/j.apal.2012.10.008en
dc.identifier.scopus2-s2.0-84873095118en
dc.contributor.affiliationMathematical Institute of the Serbian Academy of Sciences and Arts-
dc.relation.firstpage443en
dc.relation.lastpage481en
dc.relation.issue4en
dc.relation.volume164en
dc.description.rankM22-
item.cerifentitytypePublications-
item.openairecristypehttp://purl.org/coar/resource_type/c_18cf-
item.openairetypeArticle-
item.grantfulltextnone-
item.fulltextNo Fulltext-
crisitem.author.orcid0000-0003-2049-9892-
crisitem.project.projectURLhttp://www.mi.sanu.ac.rs/novi_sajt/research/projects/174026e.php-
crisitem.project.fundingProgramDirectorate for Social, Behavioral & Economic Sciences-
crisitem.project.openAireinfo:eu-repo/grantAgreement/NSF/Directorate for Social, Behavioral & Economic Sciences/1740267-
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