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| ファイル | 記述 | サイズ | フォーマット | |
|---|---|---|---|---|
| CBO9781107416000.017.pdf | 393.91 kB | Adobe PDF | 見る/開く |
| タイトル: | The automorphism groups of enriques surfaces covered by symmetric quartic surfaces |
| 著者: | Mukai, Shigeru Ohashi, Hisanori |
| 著者名の別形: | 向井, 茂 大橋, 久範 |
| 発行日: | 2015 |
| 出版者: | Cambridge University Press |
| 誌名: | Recent Advances in Algebraic Geometry |
| 開始ページ: | 307 |
| 終了ページ: | 320 |
| 抄録: | Let S be the (minimal) Enriques surface obtained from the symmetric quartic surface (∑i<jxixj)2 = kx1x2x3x4 in P3 with k ≠ 0, 4, 36 by taking a quotient of the Cremona action (xi) → (1/xi). The automorphism group of S is a semidirect product of a free product F of four involutions and the symmetric group S4. Up to action of F, there are exactly 29 elliptic pencils on S.Dedicated to Prof. Robert Lazarsfeld on his 60th birthday |
| 記述: | London Mathematical Society Lecture Note Series: 417, Table of Contents: No.16. |
| 著作権等: | This material has been published in 'The automorphism groups of Enriques surfaces covered by symmetric quartic surfaces' by Mukai, S., & Ohashi, H./ Edited by Christopher D. Hacon, Mircea Mustaţă, Mihnea Popa. This version is free to view and download for personal use only. Not for re-distribution, re-sale or use in derivative works. © Cambridge University Press 2014. |
| URI: | http://hdl.handle.net/2433/224938 |
| DOI(出版社版): | 10.1017/CBO9781107416000.017 |
| 出現コレクション: | 学術雑誌掲載論文等 |
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