Please use this identifier to cite or link to this item: https://hdl.handle.net/2440/3603
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dc.contributor.authorQuinn, Catherine T.en
dc.date.issued2002en
dc.identifier.citationJournal of Geometry, 2002; 74(1-2):123-138en
dc.identifier.issn0047-2468en
dc.identifier.urihttp://hdl.handle.net/2440/3603-
dc.descriptionReceived 1 September 1999; revised 17 July 2000en
dc.description.abstractThe André/Bruck and Bose representation ([1], [5,6]) of PG(2,q 2) in PG(4,q) is a tool used by many authors in the proof of recent results. In this paper the André/Bruck and Bose representation of conics in Baer subplanes of PG(2,q 2) is determined. It is proved that a non-degenerate conic in a Baer subplane of PG(2,q 2) is a normal rational curve of order 2, 3, or 4 in the André/Bruck and Bose representation. Moreover the three possibilities (classes) are examined and we classify the conics in each classen
dc.description.statementofresponsibilityCatherine T. Quinnen
dc.language.isoenen
dc.publisherBirkhauser Verlag Agen
dc.rights© 2002 Springer, Part of Springer Science+Business Mediaen
dc.subjectBaer subplane ; conic ; Desarguesian planeen
dc.titleThe André/Bruck and Bose representation of conics in Baer subplanes of PG(2,q2)en
dc.typeJournal articleen
dc.identifier.doi10.1007/PL00012531en
Appears in Collections:Pure Mathematics publications

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