An occlusion calculus based on an interval algebra

Página do item simplificado
dc.contributor.authorPaulo Santos
dc.contributor.authorLIGOZAT, G.
dc.contributor.authorSAFI-SAMGHABAD, M.
dc.contributor.authorOrcidhttps://orcid.org/0000-0001-8484-0354
dc.date.accessioned2022-01-12T21:59:10Z
dc.date.available2022-01-12T21:59:10Z
dc.date.issued2016
dc.description.abstract© 2015 IEEE.This paper introduces a new qualitative spatial reasoning formalism, called Interval Occlusion Calculus (IOC), that takes into account multiple viewpoints of a scene. This formalism extends Allen's Algebra by including an interval-based definition for spatial occlusion. We prove that IOC is a relation algebra and show complexity results for this formalism.
dc.description.firstpage128
dc.description.lastpage133
dc.identifier.citationSANTOS, P. E.; LIGOZAT, G.; LIGOZAT, G. An occlusion calculus based on an interval algebra. Proceedings - 2015 Brazilian Conference on Intelligent Systems, BRACIS 2015, p. 128-133, nov. 2016.
dc.identifier.doi10.1109/BRACIS.2015.12
dc.identifier.urihttps://repositorio.fei.edu.br/handle/FEI/3912
dc.relation.ispartofProceedings - 2015 Brazilian Conference on Intelligent Systems, BRACIS 2015
dc.rightsAcesso Restrito
dc.subject.otherlanguageAllen Algebra
dc.subject.otherlanguageMultiple Viewpoints
dc.subject.otherlanguageQualitative Spatial Reasoning
dc.titleAn occlusion calculus based on an interval algebra
dc.typeArtigo de evento
fei.scopus.citations7
fei.scopus.eid2-s2.0-84964692714
fei.scopus.subjectComplexity results
fei.scopus.subjectInterval algebra
fei.scopus.subjectMultiple viewpoints
fei.scopus.subjectQualitative spatial reasoning
fei.scopus.subjectRelation algebras
fei.scopus.updated2024-07-01
fei.scopus.urlhttps://www.scopus.com/inward/record.uri?partnerID=HzOxMe3b&scp=84964692714&origin=inward
Arquivos
Coleções
Artigos