代數幾何 中,加權射影空間
P
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{\displaystyle \mathbf {P} (a_{0},\ \ldots ,\ a_{n})}
分次環
k
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]
{\displaystyle k[x_{0},\ \ldots ,\ x_{n}]}
射影簇
P
r
o
j
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k
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)
{\displaystyle {\rm {Proj}}(k[x_{0},\ \ldots ,\ x_{n}])}
x k a k
有正整數d ,則
P
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a
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{\displaystyle \mathbf {P} (a_{0},\ a_{1},\ \ldots ,\ a-n)}
P
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d
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…
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d
a
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{\displaystyle \mathbf {P} (da_{0},\ da_{1},\ \ldots ,\ da_{n})}
射影結構 的性質;從幾何學角度看,它對應於d元委羅內塞嵌入 。因此,在不失一般性的前提下,可以假設
a
i
{\displaystyle a_{i}}
假設
a
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a
1
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…
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a
n
{\displaystyle a-0,\ a_{1},\ldots ,\ a_{n}}
i
≠
j
{\displaystyle i\neq j}
a
i
{\displaystyle a_{i}}
P
(
a
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a
1
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a
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{\displaystyle \mathbf {P} (a_{0},\ a_{1},\ldots ,\ a_{n})}
P
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a
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/
d
,
…
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a
j
−
1
/
d
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a
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a
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+
1
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d
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a
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/
d
)
{\displaystyle \mathbf {P} (a_{0}/d,\ldots ,\ a_{j-1}/d,\ a_{j},\ a_{j+1}/d,\ldots ,\ a_{n}/d)}
a
j
{\displaystyle a_{j}}
a
i
{\displaystyle a_{i}}
加權射影空間位移的奇異點是循環商奇異點。
加權射影空間是Q法諾簇 [ 1] 環面簇 。
加權射影空間
P
(
a
0
,
a
1
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…
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a
n
)
{\displaystyle \mathbf {P} (a_{0},\ a_{1},\ldots ,\ a_{n})}
a
0
,
a
1
,
…
,
a
n
{\displaystyle a_{0},\ a_{1},\ldots ,\ a_{n}}
[ 2]
^ M. Rossi and L. Terracini, Linear algebra and toric data of weighted projective spaces. Rend. Semin. Mat. Univ. Politec. Torino 70 (2012), no. 4, 469--495, proposition 8
^ This should be understood as a GIT quotient . In a more general setting, one can speak of a weighted projective stack . See https://mathoverflow.net/questions/136888/ .
Dolgachev, Igor, Weighted projective varieties, Group actions and vector fields (Vancouver, B.C., 1981), Lecture Notes in Math. 956 , Berlin: Springer: 34–71, 1982, CiteSeerX 10.1.1.169.5185 ISBN 978-3-540-11946-3MR 0704986 doi:10.1007/BFb0101508 Hosgood, Timothy, An introduction to varieties in weighted projective space, 2016, Bibcode:2016arXiv160402441H arXiv:1604.02441 Reid, Miles, Graded rings and varieties in weighted projective space (PDF) , 2002 [2023-11-27 ] , (原始內容存檔 (PDF) 於2023-06-02)
![{\displaystyle k[x_{0},\ \ldots ,\ x_{n}]}](https://wikimedia.org/api/rest_v1/media/math/render/svg/3ffd575415037b3da852baf4524d8310e1d012f6)
![{\displaystyle {\rm {Proj}}(k[x_{0},\ \ldots ,\ x_{n}])}](https://wikimedia.org/api/rest_v1/media/math/render/svg/83edc2504763a490bf1887ed7633e7ed81fc4237)
, ISBN 978-3-540-11946-3, MR 0704986, doi:10.1007/BFb0101508
