Scorza variety: Difference between revisions
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*{{Citation | last1=Hartshorne | first1=Robin | author1-link=Robin Hartshorne | title=Varieties of small codimension in projective space | doi=10.1090/S0002-9904-1974-13612-8 |mr=0384816 | year=1974 | journal=[[Bulletin of the American Mathematical Society]] | issn=0002-9904 | volume=80 | issue=6 | pages=1017–1032| doi-access=free }} |
*{{Citation | last1=Hartshorne | first1=Robin | author1-link=Robin Hartshorne | title=Varieties of small codimension in projective space | doi=10.1090/S0002-9904-1974-13612-8 |mr=0384816 | year=1974 | journal=[[Bulletin of the American Mathematical Society]] | issn=0002-9904 | volume=80 | issue=6 | pages=1017–1032| doi-access=free }} |
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*{{Citation | last1=Zak | first1=F. L. | title=Projections of algebraic varieties |mr=665860 | year=1981 | journal=Matematicheskii Sbornik |series=Novaya Seriya | issn=0368-8666 | volume=116(158) | issue=4 | pages=593–602, 608}} |
*{{Citation | last1=Zak | first1=F. L. | title=Projections of algebraic varieties |mr=665860 | year=1981 | journal=Matematicheskii Sbornik |series=Novaya Seriya | issn=0368-8666 | volume=116(158) | issue=4 | pages=593–602, 608}} |
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*{{Citation | last1=Lazarsfeld | first1=Robert | last2=Van de Ven | first2=Antonius | title=Topics in the geometry of projective space | url=https://books.google.com/books?id=GU |
*{{Citation | last1=Lazarsfeld | first1=Robert | last2=Van de Ven | first2=Antonius | title=Topics in the geometry of projective space | url=https://books.google.com/books?id=GU | publisher=Birkhäuser Verlag | series=DMV Seminar | isbn=978-3-7643-1660-0 |mr=808175 | year=1984 | volume=4 | doi=10.1007/978-3-0348-9348-0}} |
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*{{Citation | last1=Zak | first1=F. L. | title=Severi varieties |mr=773432 | year=1985 | journal=Matematicheskii Sbornik |series=Novaya Seriya | issn=0368-8666 | volume=126(168) | issue=1 | pages=115–132, 144}} |
*{{Citation | last1=Zak | first1=F. L. | title=Severi varieties |mr=773432 | year=1985 | journal=Matematicheskii Sbornik |series=Novaya Seriya | issn=0368-8666 | volume=126(168) | issue=1 | pages=115–132, 144}} |
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*{{Citation | last1=Zak | first1=F. L. | title=Tangents and secants of algebraic varieties | url=https://books.google.com/books?id=j9ZXQ-ARR7EC | publisher=[[American Mathematical Society]] | location=Providence, R.I. | series=Translations of Mathematical Monographs | isbn=978-0-8218-4585-1 |mr=1234494 | year=1993 | volume=127}} |
*{{Citation | last1=Zak | first1=F. L. | title=Tangents and secants of algebraic varieties | url=https://books.google.com/books?id=j9ZXQ-ARR7EC | publisher=[[American Mathematical Society]] | location=Providence, R.I. | series=Translations of Mathematical Monographs | isbn=978-0-8218-4585-1 |mr=1234494 | year=1993 | volume=127}} |
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Revision as of 00:12, 30 December 2021
In mathematics, a k-Scorza variety is a smooth projective variety, of maximal dimension among those whose k–1 secant varieties are not the whole of projective space. Scorza varieties were introduced and classified by Zak (1993), who named them after Gaetano Scorza. The special case of 2-Scorza varieties are sometimes called Severi varieties, after Francesco Severi.
Classification
Zak showed that k-Scorza varieties are the projective varieties of the rank 1 matrices of rank k simple Jordan algebras.
Severi varieties
The Severi varieties are the non-singular varieties of dimension n (even) in PN that can be isomorphically projected to a hyperplane and satisfy N=3n/2+2.
- Severi showed in 1901 that the only Severi variety with n=2 is the Veronese surface in P5.
- The only Severi variety with n=4 is the Segre embedding of P2×P2 into P8, found by Scorza in 1908.
- The only Segre variety with n=8 is the 8-dimensional Grassmannian G(1,5) of lines in P5 embedded into P14, found by John Greenlees Semple in 1931.
- The only Severi variety with n=16 is a 16-dimensional variety E6/Spin(10)U(1) in P26 found by Robert Lazarsfeld in 1981.
These 4 Severi varieties can be constructed in a uniform way, as orbits of groups acting on the complexifications of the 3 by 3 hermitian matrices over the four real (possibly non-associative) division algebras of dimensions 2k = 1, 2, 4, 8. These representations have complex dimensions 3(2k+1) = 6, 9, 15, and 27, giving varieties of dimension 2k+1 = 2, 4, 8, 16 in projective spaces of dimensions 3(2k)+2 = 5, 8, 14, and 26.
Zak proved that the only Severi varieties are the 4 listed above, of dimensions 2, 4, 8, 16.
References
- Hartshorne, Robin (1974), "Varieties of small codimension in projective space", Bulletin of the American Mathematical Society, 80 (6): 1017–1032, doi:10.1090/S0002-9904-1974-13612-8, ISSN 0002-9904, MR 0384816
- Zak, F. L. (1981), "Projections of algebraic varieties", Matematicheskii Sbornik, Novaya Seriya, 116(158) (4): 593–602, 608, ISSN 0368-8666, MR 0665860
- Lazarsfeld, Robert; Van de Ven, Antonius (1984), Topics in the geometry of projective space, DMV Seminar, vol. 4, Birkhäuser Verlag, doi:10.1007/978-3-0348-9348-0, ISBN 978-3-7643-1660-0, MR 0808175
- Zak, F. L. (1985), "Severi varieties", Matematicheskii Sbornik, Novaya Seriya, 126(168) (1): 115–132, 144, ISSN 0368-8666, MR 0773432
- Zak, F. L. (1993), Tangents and secants of algebraic varieties, Translations of Mathematical Monographs, vol. 127, Providence, R.I.: American Mathematical Society, ISBN 978-0-8218-4585-1, MR 1234494