dc.contributor.author
Burgos Gil, José I.
dc.date.issued
2011-03-08T09:49:16Z
dc.date.issued
2011-03-08T09:49:16Z
dc.identifier
https://hdl.handle.net/2445/16924
dc.description.abstract
In this paper we define the formal and tempered Deligne cohomology groups, that are obtained by applying the Deligne complex functor to the complexes of formal differential forms and tempered currents respectively. We then prove the existence of a duality between them, a vanishing theorem for the former and a semipurity property for the latter. The motivation of these results comes from the study of covariant arithmetic Chow groups. The semipurity property of tempered Deligne cohomology implies, in particular, that several definitions of covariant arithmetic Chow groups agree for projective arithmetic varieties.
dc.format
application/pdf
dc.format
application/pdf
dc.publisher
Universitat de Barcelona
dc.relation
Reproducció del document publicat a: http://www.collectanea.ub.edu/index.php/Collectanea/article/view/5157/6332
dc.relation
Collectanea Mathematica, 2008, vol. 59, num. 1, p. 79-102
dc.rights
(c) Universitat de Barcelona, 2008
dc.rights
info:eu-repo/semantics/openAccess
dc.source
Articles publicats en revistes (Matemàtiques i Informàtica)
dc.subject
Geometria algebraica
dc.subject
Algebraic geometry
dc.title
Semi-purity of tempered Deligne cohomology
dc.type
info:eu-repo/semantics/article
dc.type
info:eu-repo/semantics/publishedVersion
