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Classification of n-Dimensional Subvarieties of G(1, 2n) that can be Projected to G(1, n + 1)

Classification of n-Dimensional Subvarieties of G(1, 2n) that can be Projected to G(1, n + 1) Abstract A structure theorem is given for n-dimensional smooth subvarieties of the Grassmannian G(1, N), with N ≥ n + 3, that can be isomorphically projected to G(1, n + 1). A complete classification in the cases N = 2n + 1 and N = 2n follows, as a corollary. 2000 Mathematics Subject Classification 14N15. © London Mathematical Society http://www.deepdyve.com/assets/images/DeepDyve-Logo-lg.png Bulletin of the London Mathematical Society Oxford University Press

Classification of n-Dimensional Subvarieties of G(1, 2n) that can be Projected to G(1, n + 1)

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References (8)

Publisher
Oxford University Press
Copyright
© London Mathematical Society
ISSN
0024-6093
eISSN
1469-2120
DOI
10.1112/S002460930500473X
Publisher site
See Article on Publisher Site

Abstract

Abstract A structure theorem is given for n-dimensional smooth subvarieties of the Grassmannian G(1, N), with N ≥ n + 3, that can be isomorphically projected to G(1, n + 1). A complete classification in the cases N = 2n + 1 and N = 2n follows, as a corollary. 2000 Mathematics Subject Classification 14N15. © London Mathematical Society

Journal

Bulletin of the London Mathematical SocietyOxford University Press

Published: Oct 1, 2005

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