Rational surface: Difference between revisions
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In [[algebraic geometry]], a branch of [[mathematics]], a '''rational surface''' is a surface [[birational geometry|birationally equivalent]] to the [[projective plane]]. Rational surfaces are the simplest of the 10 or so classes of surface in the [[ |
{{short description|Surface birationally equivalent to the projective plane; rational variety of dimension two}} |
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In [[algebraic geometry]], a branch of [[mathematics]], a '''rational surface''' is a surface [[birational geometry|birationally equivalent]] to the [[projective plane]], or in other words a [[rational variety]] of dimension two. Rational surfaces are the simplest of the 10 or so classes of surface in the [[Enriques–Kodaira classification]] of complex surfaces, |
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and were the first surfaces to be investigated. |
and were the first surfaces to be investigated. |
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==Structure== |
==Structure== |
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'''[[Homological mirror symmetry#Hodge diamond|Hodge diamond]]:''' |
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{{Hodge diamond|style=font-weight:bold |
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| 1 |
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'''Hodge diamond:''' |
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| 0 | 0 |
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<table border="0" cellpadding="2" cellspacing="0"> |
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| 0 | 1+''n'' | 0 |
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<tr><th></th><th></th><th>1</th></tr> |
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| 0 | 0 |
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<tr><th></th><th>0</th><th></th><th>0</th></tr> |
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| 1 |
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<tr><th>0</th><th></th><th>1+''n''</th><th></th><th>0</th></tr> |
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}} |
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<tr><th></th><th>0</th><th></th><th>0</th></tr> |
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<tr><th></th><th></th><th>1</th></tr> |
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</table> |
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and greater than 1 for other rational surfaces. |
and greater than 1 for other rational surfaces. |
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The [[Picard group]] is the odd [[unimodular lattice]] I<sub>1,''n''</sub>, except for the Hirzebruch |
The [[Picard group]] is the odd [[unimodular lattice]] I<sub>1,''n''</sub>, except for the [[Hirzebruch surface]]s Σ<sub>2''m''</sub> when it is the even unimodular lattice II<sub>1,1</sub>. |
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==Hirzebruch surfaces == |
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The Hirzebruch surface |
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Σ<sub>n</sub> is the ''P''<sup>1</sup> bundle over ''P''<sup>1</sup> |
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associated to the sheaf |
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:O(0)+O(''n''). |
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The notation here means: O(''n'') is the ''n''-th tensor power of the [[Serre twist sheaf]] O(1), the [[invertible sheaf]] or [[line bundle]] with associated [[Cartier divisor]] a single point. The surface Σ<sub>0<sub> is isomorphic to ''P''<sup>1</sup>×''P''<sup>1</sup>, and Σ<sub>1<sub> is isomorphic to ''P''<sup>2</sup> blown up at a point so is not minimal. |
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Hirzebruch surfaces for ''n''>0 have a special curve ''C'' on them |
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given by the projective bundle of O(''n''). This curve has self intersection number −''n'', and is the only irreducible curve with negative self intersection number. The only irreducible curves with zero self intersection number are the fibers of the Hirzebruch surface (considered as a fiber bundle over ''P''<sup>1</sup>). The Picard group is generated by the curve ''C'' and one of the fibers, and these generators have intersection matrix |
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:<math>{0\quad 1\choose 1\quad -n}</math> |
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so the bilinear form is two dimensional unimodular, and is even or odd depending on whether ''n'' is even or odd. |
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The Hirzebruch surface Σ<sub>''n''</sub> (''n''>1) blown up at a point on the special curve ''C'' is isomorphic to Σ<sub>''n-1''</sub> blown up at a point not on the special curve. |
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==Castelnuovo's theorem== |
==Castelnuovo's theorem== |
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⚫ | [[Guido Castelnuovo]] proved that any complex surface such that ''q'' and ''P''<sub>2</sub> (the irregularity and second plurigenus) both vanish is rational. This is used in the Enriques–Kodaira classification to identify the rational surfaces. {{harvtxt|Zariski|1958}} proved that Castelnuovo's theorem also holds over fields of positive characteristic. |
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⚫ | [[Guido Castelnuovo]] proved that any complex surface such that ''q'' and ''P''<sub>2</sub> (the irregularity and second plurigenus) both vanish is rational. This is used in the |
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Castelnuovo's theorem also implies that any [[unirational]] complex surface is rational, because if a complex surface is unirational then its irregularity and plurigenera are bounded by those of a rational surface and are therefore all 0, so the surface is rational. Most unirational complex varieties of dimension 3 or larger are not rational. |
Castelnuovo's theorem also implies that any [[unirational]] complex surface is rational, because if a complex surface is unirational then its irregularity and plurigenera are bounded by those of a rational surface and are therefore all 0, so the surface is rational. Most unirational complex varieties of dimension 3 or larger are not rational. |
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At one time it was unclear whether a complex surface such that ''q'' and ''P''<sub>1</sub> both vanish |
At one time it was unclear whether a complex surface such that ''q'' and ''P''<sub>1</sub> both vanish |
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is rational, but a counterexample (an [[Enriques surface]]) was found by [[Federigo Enriques]]. |
is rational, but a counterexample (an [[Enriques surface]]) was found by [[Federigo Enriques]]. |
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*Zariski, Oscar ''On Castelnuovo's criterion of rationality ''p''<sub>a</sub>=''P''<sub>2</sub>=0 of an algebraic surface.'' Illinois J. Math. 2 1958 303--315. |
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==Examples of rational surfaces== |
==Examples of rational surfaces== |
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* [[Châtelet surface]]s |
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* [[Coble surface]]s |
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*[[del Pezzo surface]]s (Fano surfaces) |
*[[del Pezzo surface]]s (Fano surfaces) |
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* [[Enneper surface]] |
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* Hirzebruch |
* [[Hirzebruch surface]]s Σ<sub>''n''</sub> |
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* ''P''<sup>1</sup> |
* ''P''<sup>1</sup>×''P''<sup>1</sup> The product of two projective lines is the Hirzebruch surface Σ<sub>0</sub>. It is the only surface with two different rulings. |
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* The [[projective plane]] |
* The [[projective plane]] |
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* [[Segre surface]] An intersection of two quadrics, isomorphic to the projective plane blown up in 5 points. |
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*[[White surface]]s, a generalization of Bordiga surfaces. |
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* [[Veronese surface]] An embedding of the projective plane into ''P''<sup>5</sup>. |
* [[Veronese surface]] An embedding of the projective plane into ''P''<sup>5</sup>. |
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==See also== |
==See also== |
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*[[rational variety]] |
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==References== |
==References== |
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*{{Citation | last1=Barth | first1=Wolf P. | last2=Hulek | first2=Klaus | last3=Peters | first3=Chris A.M. | last4=Van de Ven | first4=Antonius | title=Compact Complex Surfaces | publisher= Springer-Verlag, Berlin | series=Ergebnisse der Mathematik und ihrer Grenzgebiete. 3. Folge. | isbn=978-3-540-00832-3 | mr=2030225 | year=2004 | volume=4}} |
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* ''Compact Complex Surfaces'' by Wolf P. Barth, Klaus Hulek, Chris A.M. Peters, Antonius Van de Ven ISBN 3-540-00832-2 |
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*{{Citation | last1=Beauville | first1=Arnaud | title=Complex algebraic surfaces | publisher=[[Cambridge University Press]] | edition=2nd | series=London Mathematical Society Student Texts | isbn=978-0-521-49510-3 |mr= 1406314| year=1996 | volume=34}} |
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* ''Complex algebraic surfaces'' by Arnaud Beauville, ISBN 05214985105 {{invalid isbn|05214985105}}. |
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*{{Citation | last1=Zariski | first1=Oscar | author1-link=Oscar Zariski | title=On Castelnuovo's criterion of rationality p<sub>a</sub> = P<sub>2</sub> = 0 of an algebraic surface | mr= 0099990 | year=1958 | journal=Illinois Journal of Mathematics | issn=0019-2082 | volume=2 | pages=303–315}} |
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== External links == |
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* [https://superficie.info/ Le Superficie Algebriche]: A tool to visually study the geography of (minimal) complex algebraic smooth surfaces |
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[[Category:Complex |
[[Category:Complex surfaces]] |
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[[Category: |
[[Category:Birational geometry]] |
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[[Category: |
[[Category:Algebraic surfaces]] |
Latest revision as of 00:14, 17 March 2024
In algebraic geometry, a branch of mathematics, a rational surface is a surface birationally equivalent to the projective plane, or in other words a rational variety of dimension two. Rational surfaces are the simplest of the 10 or so classes of surface in the Enriques–Kodaira classification of complex surfaces, and were the first surfaces to be investigated.
Structure
[edit]Every non-singular rational surface can be obtained by repeatedly blowing up a minimal rational surface. The minimal rational surfaces are the projective plane and the Hirzebruch surfaces Σr for r = 0 or r ≥ 2.
Invariants: The plurigenera are all 0 and the fundamental group is trivial.
1 | ||||
0 | 0 | |||
0 | 1+n | 0 | ||
0 | 0 | |||
1 |
where n is 0 for the projective plane, and 1 for Hirzebruch surfaces and greater than 1 for other rational surfaces.
The Picard group is the odd unimodular lattice I1,n, except for the Hirzebruch surfaces Σ2m when it is the even unimodular lattice II1,1.
Castelnuovo's theorem
[edit]Guido Castelnuovo proved that any complex surface such that q and P2 (the irregularity and second plurigenus) both vanish is rational. This is used in the Enriques–Kodaira classification to identify the rational surfaces. Zariski (1958) proved that Castelnuovo's theorem also holds over fields of positive characteristic.
Castelnuovo's theorem also implies that any unirational complex surface is rational, because if a complex surface is unirational then its irregularity and plurigenera are bounded by those of a rational surface and are therefore all 0, so the surface is rational. Most unirational complex varieties of dimension 3 or larger are not rational. In characteristic p > 0 Zariski (1958) found examples of unirational surfaces (Zariski surfaces) that are not rational.
At one time it was unclear whether a complex surface such that q and P1 both vanish is rational, but a counterexample (an Enriques surface) was found by Federigo Enriques.
Examples of rational surfaces
[edit]- Bordiga surfaces: A degree 6 embedding of the projective plane into P4 defined by the quartics through 10 points in general position.
- Châtelet surfaces
- Coble surfaces
- Cubic surfaces Nonsingular cubic surfaces are isomorphic to the projective plane blown up in 6 points, and are Fano surfaces. Named examples include the Fermat cubic, the Cayley cubic surface, and the Clebsch diagonal surface.
- del Pezzo surfaces (Fano surfaces)
- Enneper surface
- Hirzebruch surfaces Σn
- P1×P1 The product of two projective lines is the Hirzebruch surface Σ0. It is the only surface with two different rulings.
- The projective plane
- Segre surface An intersection of two quadrics, isomorphic to the projective plane blown up in 5 points.
- Steiner surface A surface in P4 with singularities which is birational to the projective plane.
- White surfaces, a generalization of Bordiga surfaces.
- Veronese surface An embedding of the projective plane into P5.
See also
[edit]References
[edit]- Barth, Wolf P.; Hulek, Klaus; Peters, Chris A.M.; Van de Ven, Antonius (2004), Compact Complex Surfaces, Ergebnisse der Mathematik und ihrer Grenzgebiete. 3. Folge., vol. 4, Springer-Verlag, Berlin, ISBN 978-3-540-00832-3, MR 2030225
- Beauville, Arnaud (1996), Complex algebraic surfaces, London Mathematical Society Student Texts, vol. 34 (2nd ed.), Cambridge University Press, ISBN 978-0-521-49510-3, MR 1406314
- Zariski, Oscar (1958), "On Castelnuovo's criterion of rationality pa = P2 = 0 of an algebraic surface", Illinois Journal of Mathematics, 2: 303–315, ISSN 0019-2082, MR 0099990
External links
[edit]- Le Superficie Algebriche: A tool to visually study the geography of (minimal) complex algebraic smooth surfaces