The family of lines on the Fano threefold V5

Mikio Furushima; Noboru Nakayama

doi:10.1017/S0027763000001719

Extract

Core share and HTML view are not available for this content. However, as you have access to this content, a full PDF is available via the ‘Save PDF’ action button.

A smooth projective algebraic 3-fold V over the field C is called a Fano 3-fold if the anticanonical divisor — Kv is ample. The integer g = g(V) = ½(- Kv)3 is called the genus of the Fano 3-fold V. The maximal integer r ≧ 1 such that ϑ(— Kv)≃ ℋ r for some (ample) invertible sheaf ℋ ε Pic V is called the index of the Fano 3-fold V. Let V be a Fano 3-fold of the index r = 2 and the genus g = 21 which has the second Betti number b2(V) = 1. Then V can be embedded in P6 with degree 5, by the linear system |ℋ|, where ϑ(— Kv)≃ ℋ2 (see Iskovskih [5]). We denote this Fano 3-fold V by V5.

References

[1] Fujita, T., On the structure of polarized manifolds with total deficiency one II, J. Math. Soc. Japan, 33 (1981), 415–434.Google Scholar

[2] Furushima, M., Singular del Pezzo surfaces and analytic compactifications of 3-dimensional complex affine space C³ , Nagoya Math. J., 104 (1986), 1–28.CrossRef Google Scholar

[3] Furushima, N. - Nakayama, N., A new construction of a compactification of C³ , Tôhoku Math. J., 41 (1989), 543–560.Google Scholar

[4] Hirzebruch, F., Some problems on differentiate and complex manifolds, Ann. Math., 60 (1954), 213–236.CrossRef Google Scholar

[5] Iskovskih, V. A., Fano 3-fold I, Math. U.S.S.R. Izvestija, 11 (1977), 485–527.Google Scholar

[6] Peternell, Th.–Schneider, M., Compactifications of C³(I), Math. Ann., 280 (1988), 129–146.Google Scholar

[7] Miyanishi, M., Algebraic methods in the theory of algebraic threefolds, Advanced study in Pure Math. 1, 1983 Algebraic varieties and Analytic varieties, 66–99.Google Scholar

[8] Mori, S., Threefolds whose canonical bundle are not numerical effective, Ann. Math., 116 (1982), 133–176.Google Scholar

[9] Mukai, S. - Umemura, H., Minimal rational threefolds, Lecture Notes in Math., 1016, Springer-Verlag (1983), 490–518.Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Furushima, Mikio 1990. Algebraic Geometry. p. 163.

Furushima, Mikio 1992. Mukai-Umemura’s example of the Fano threefold with genus 12 as a compactification of C3. Nagoya Mathematical Journal, Vol. 127, Issue. , p. 145.

Furushima, Mikio 1992. The structure of compactifications of $C^3 $. Proceedings of the Japan Academy, Series A, Mathematical Sciences, Vol. 68, Issue. 2,

Furushima, Mikio 1993. A new example of a compactification of ℂ3. Mathematische Zeitschrift, Vol. 212, Issue. 1, p. 395.

Furushima, Mikio 1993. The complete classification of compactifications of ?3 which are projective manifolds with the second Betti number one. Mathematische Annalen, Vol. 297, Issue. 1, p. 627.

Iliev, Atanas 1994. Lines on the Gushel' threefold. Indagationes Mathematicae, Vol. 5, Issue. 3, p. 307.

Furushima, Mikio 2000. A birational construction of projective compactifications of ℂ3 with second Betti number equal to onewith second Betti number equal to one. Annali di Matematica Pura ed Applicata, Vol. 178, Issue. 1, p. 115.

Iliev, Atanas and Schuhmann, Carmen 2000. Tangent scrolls in prime Fano threefolds. Kodai Mathematical Journal, Vol. 23, Issue. 3,

Iliev, Atanas and Markushevich, Dimitri 2004. Elliptic curves and rank-2 vector bundles on the prime Fano threefold of genus 7. advg, Vol. 4, Issue. 3, p. 287.

Furushima, Mikio 2004. Singular Fano compactifications of (I). Mathematische Zeitschrift, Vol. 248, Issue. 4, p. 709.

Kishimoto, Takashi 2005. Compactifications of contractible affine 3-folds into smooth Fano 3-folds with B2=2. Mathematische Zeitschrift, Vol. 251, Issue. 4, p. 783.

Arrondo, Enrique and Faenzi, Daniele 2006. Vector bundles with no intermediate cohomology on Fano threefolds of type V22. Pacific Journal of Mathematics, Vol. 225, Issue. 2, p. 201.

Peternell, Thomas 2008. Finite morphisms of projective and Kähler manifolds. Science in China Series A: Mathematics, Vol. 51, Issue. 4, p. 685.

Takagi, Hiromichi and Zucconi, Francesco 2011. Spin curves and Scorza quartics. Mathematische Annalen, Vol. 349, Issue. 3, p. 623.

Takagi, Hiromichi and Zucconi, Francesco 2012. The moduli space of genus four even spin curves is rational. Advances in Mathematics, Vol. 231, Issue. 5, p. 2413.

Takagi, Hiromichi and Zucconi, Francesco 2012. Geometries of lines and conics on the quintic del Pezzo 3-fold and its application to varieties of power sums. Michigan Mathematical Journal, Vol. 61, Issue. 1,

Loray, Frank Pereira, Jorge Vitório and Touzet, Frédéric 2013. Foliations with trivial canonical bundle on Fano 3‐folds. Mathematische Nachrichten, Vol. 286, Issue. 8-9, p. 921.

2015. Cremona Groups and the Icosahedron. p. 438.

Prokhorov, Yuri and Zaidenberg, Mikhail 2016. Examples of cylindrical Fano fourfolds. European Journal of Mathematics, Vol. 2, Issue. 1, p. 262.

Prokhorov, Yu G 2016. Singular Fano threefolds of genus 12. Sbornik: Mathematics, Vol. 207, Issue. 7, p. 983.

Download full list

Article contents

The family of lines on the Fano threefold V5

Extract

References

Save article to Kindle

Save article to Dropbox

Save article to Google Drive

Reply to: Submit a response

Your details

You have entered the maximum number of contributors

Conflicting interests