I tiakina i:
| Ngā kaituhi matua: | , |
|---|---|
| Hōputu: | Preprint |
| I whakaputaina: |
2008
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| Ngā marau: | |
| Urunga tuihono: | https://arxiv.org/abs/0803.2074 |
| Ngā Tūtohu: |
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| _version_ | 1866910963195707392 |
|---|---|
| author | Catanese, Fabrizio Mangolte, Frederic |
| author_facet | Catanese, Fabrizio Mangolte, Frederic |
| contents | Let W -> X be a real smooth projective 3-fold fibred by rational curves. J. Kollár proved that, if W(R) is orientable, then a connected component N of W(R) is essentially either a Seifert fibred manifold or a connected sum of lens spaces. Our Main Theorem, answering in the affirmative three questions of Kollár, gives sharp estimates on the number and the multiplicities of the Seifert fibres and on the number and the torsions of the lens spaces when X is a geometrically rational surface. When N is Seifert fibred over a base orbifold F, our result generalizes Comessatti's theorem on smooth real rational surfaces: F cannot be simultaneously orientable and of hyperbolic type. We show as a surprise that, unlike in Comessatti's theorem, there are examples where F is non orientable, of hyperbolic type, and X is minimal. The technique we use is to construct Seifert fibrations as projectivized tangent bundles of Du Val surfaces. |
| format | Preprint |
| id |
arxiv_https___arxiv_org_abs_0803_2074 |
| institution | arXiv |
| publishDate | 2008 |
| record_format | arxiv |
| spellingShingle | Real singular Del Pezzo surfaces and 3-folds fibred by rational curves, II Catanese, Fabrizio Mangolte, Frederic Algebraic Geometry Geometric Topology 14P25, 14M20, 14J26 Let W -> X be a real smooth projective 3-fold fibred by rational curves. J. Kollár proved that, if W(R) is orientable, then a connected component N of W(R) is essentially either a Seifert fibred manifold or a connected sum of lens spaces. Our Main Theorem, answering in the affirmative three questions of Kollár, gives sharp estimates on the number and the multiplicities of the Seifert fibres and on the number and the torsions of the lens spaces when X is a geometrically rational surface. When N is Seifert fibred over a base orbifold F, our result generalizes Comessatti's theorem on smooth real rational surfaces: F cannot be simultaneously orientable and of hyperbolic type. We show as a surprise that, unlike in Comessatti's theorem, there are examples where F is non orientable, of hyperbolic type, and X is minimal. The technique we use is to construct Seifert fibrations as projectivized tangent bundles of Du Val surfaces. |
| title | Real singular Del Pezzo surfaces and 3-folds fibred by rational curves, II |
| topic | Algebraic Geometry Geometric Topology 14P25, 14M20, 14J26 |
| url | https://arxiv.org/abs/0803.2074 |