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imported>Pythagoras0 (새 문서: It is a well known fact that the Theta divisor on the Jacobian of a non-singular curve is a determinantal variety, i.e. is defined by the zero set of a determinant. * Rahmati, Mohamm...) |
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It is a well known fact that the Theta divisor on the Jacobian of a non-singular curve is a determinantal variety, i.e. is defined by the zero set of a determinant. | It is a well known fact that the Theta divisor on the Jacobian of a non-singular curve is a determinantal variety, i.e. is defined by the zero set of a determinant. | ||
| − | + | * Krämer, Thomas. “Cubic Threefolds, Fano Surfaces and the Monodromy of the Gauss Map.” arXiv:1501.00226 [math], December 31, 2014. http://arxiv.org/abs/1501.00226. | |
* Rahmati, Mohammad Reza. “Motive of Theta Divisor I.” arXiv:1411.3375 [math], October 30, 2014. http://arxiv.org/abs/1411.3375. | * Rahmati, Mohammad Reza. “Motive of Theta Divisor I.” arXiv:1411.3375 [math], October 30, 2014. http://arxiv.org/abs/1411.3375. | ||
2015년 1월 5일 (월) 14:20 판
It is a well known fact that the Theta divisor on the Jacobian of a non-singular curve is a determinantal variety, i.e. is defined by the zero set of a determinant.
- Krämer, Thomas. “Cubic Threefolds, Fano Surfaces and the Monodromy of the Gauss Map.” arXiv:1501.00226 [math], December 31, 2014. http://arxiv.org/abs/1501.00226.
- Rahmati, Mohammad Reza. “Motive of Theta Divisor I.” arXiv:1411.3375 [math], October 30, 2014. http://arxiv.org/abs/1411.3375.