| Title Transcription | アル シュ ノ キョクメン ノ ジコ ドウケイ シャゾウ ト ドウヘン チョクセン ソク ニツイテ
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| Title Alternative (English) | Automorphisms of Some Surfaces and Equivariant Line Bundles
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| File | |
| language |
eng
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| Author |
Matsunaga, Hiromichi
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| Description | In §1 it is proved that any elliptic surface without exceptional curve admits a canonical involution, which is an extension of the involution in [7]. Since a general elliptic curve admits the unique non trivial involutive isomorphism, then we will call this a canonicall one. By making use of a lemma in III [2], it is easy to construct the involution but in order to find invariant divisors, we make it concretely. Non singular surfaces of degree 4 in P^3 are K3 surfaces and one of them is a singular K3 surface. We deduce an informatiom about the homotopical cell structure of a K3 surface. Automorphisms of this surface are constructed in §2. Some of them translate a global section to another section and others do not preserve the elliptic structure. In the last section some remarks are given about clliptic modular sufaces which are singular K3 surfaces.
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| Journal Title |
Memoirs of the Faculty of Science, Shimane University
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| Volume | 13
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| Start Page | 23
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| End Page | 29
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| ISSN | 03879925
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| Published Date | 1979-12-20
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| NCID | AN00108106
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| Publisher | 島根大学理学部
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| Publisher Aalternative | The Faculty of Science, Shimane University
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| NII Type |
Departmental Bulletin Paper
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| OAI-PMH Set |
Faculty of Science and Engineering
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| 他の一覧 |
