- Source: Cox ring
In algebraic geometry, a Cox ring is a sort of universal homogeneous coordinate ring for a projective variety, and is (roughly speaking) a direct sum of the spaces of sections of all isomorphism classes of line bundles. Cox rings were introduced by Hu & Keel (2000), based on an earlier construction by David A. Cox in 1995 for toric varieties.
See also
Cox–Zucker machine
References
Cox, David A. (1995), "The homogeneous coordinate ring of a toric variety", J. Algebraic Geom., 4 (1): 17–50, MR 1299003
Hu, Yi; Keel, Sean (2000), "Mori dream spaces and GIT", Michigan Math. J., 48: 331–348, arXiv:math/0004017, doi:10.1307/mmj/1030132722, MR 1786494
Arzhantsev, Ivan; Derenthal, Ulrich; Hausen, Jürgen; Laface, Antonio (2015), Cox Rings, Cambridge Studies in Advanced Mathematics, vol. 144 (1st ed.), Cambridge: Cambridge University Press, ISBN 978-1-107-02462-5, MR 3307753
Kata Kunci Pencarian:
- The Ring (film 2002)
- Laverne Cox
- Sadako Yamamura
- Ring of Honor Wrestling
- Djong (kapal)
- Neptunus
- Tsunami
- Alef
- Belerang
- Anesthesia (film 2015)
- Cox ring
- Cox–Zucker machine
- David A. Cox
- The Ring (2002 film)
- Brian Cox (physicist)
- Laverne Cox
- List of Brian Cox performances
- Brian Cox (actor)
- The Lord of the Rings: The War of the Rohirrim
- Ring (company)
No More Posts Available.
No more pages to load.
