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dc.contributor.authorBuchdahl, N.en
dc.identifier.citationAnnals of Global Analysis and Geometry, 2003; 23(2):189-204en
dc.descriptionThe original publication can be found at www.springerlink.comen
dc.description.abstractThe classical conjectures of Weil on K3 surfaces – that the set of such surfaces is connected; that a version of the Torelli theorem holds; that each such surface is Kähler; and that the period map is surjective – are reconsidered in the light of a generalisation of the Nakai-Moishezon criterion, and short proofs of all the conjectures are given. Most of the proofs apply equally or with minor variation to complex 2-tori, the only other compact Kähler surfaces with trivial canonical bundle.en
dc.description.statementofresponsibilityNicholas Buchdahlen
dc.publisherKluwer Academic Publen
dc.rights© 2003 Kluwer Academic Publishersen
dc.subjectKähler surface; K3 surface; complex 2-torus; period map; Torelli theoremen
dc.titleCompact Kähler surfaces with trivial canonical bundleen
dc.title.alternativeCompact Kahler surfaces with trivial canonical bundleen
dc.typeJournal articleen
pubs.library.collectionPure Mathematics publicationsen
Appears in Collections:Pure Mathematics publications

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