Horrocks–Mumford bundle: Difference between revisions
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| ⚫ | In [[algebraic geometry]], the '''Horrocks–Mumford bundle''' is an indecomposable rank 2 [[vector bundle]] on 4-dimensional [[projective space]] ''P''<sup>4</sup> introduced by {{harvs|txt|author1-link= Geoffrey Horrocks (mathematician) |author2-link=David Mumford|first=Geoffrey|last= Horrocks |first2=David|last2= Mumford|year=1973}}. It is the only such bundle known, although a generalized construction involving [[Paley graph]]s produces other rank 2 [[Sheaf (mathematics)|sheaves]] (Sasukara et al. 1993). The zero sets of sections of the Horrocks–Mumford bundle are [[abelian surface]]s of degree 10, called '''Horrocks–Mumford surfaces'''. |
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In [[algebraic geometry]], a branch of [[mathematics]], the '''Horrocks-Mumford bundle''' |
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is an indecomposable rank 2 [[vector bundle]] on 4-dimensional [[projective space]] ''P''<sup>4</sup>. |
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| ⚫ | It is the only such bundle known, although a generalized construction involving [[Paley graph]]s produces other rank 2 [[Sheaf (mathematics)|sheaves]] (Sasukara et al 1993). The zero sets of sections of the |
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By computing [[Chern classes]] one sees that the second [[exterior power]] <math> \wedge^2 F </math> of the Horrocks–Mumford bundle ''F'' is the line bundle ''O(5)'' on ''P<sup>4</sup>''. Therefore, the zero set ''V'' of a general section of this bundle is a [[quintic threefold]] called a '''Horrocks–Mumford quintic'''. Such a ''V'' has exactly 100 nodes; there exists a small resolution ''V′'' which is a [[Calabi–Yau]] threefold fibered by Horrocks–Mumford surfaces. |
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*[[List of algebraic surfaces]] |
*[[List of algebraic surfaces]] |
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==References== |
==References== |
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*{{citation |
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| author1-link=Geoffrey Horrocks (mathematician) |
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*{{cite journal |
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| last1=Horrocks|first1= G. |
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| author2-link=David Mumford |
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| last2=Mumford|first2= D. |
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| title = A rank 2 vector bundle on ''P''<sup>4</sup> with 15000 symmetries |
| title = A rank 2 vector bundle on ''P''<sup>4</sup> with 15000 symmetries |
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| journal = Topology |
| journal = Topology |
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| volume = 12 |
| volume = 12 |
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| pages = 63–81 |
| pages = 63–81 |
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| year = 1973 |
| year = 1973 |
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| doi = 10.1016/0040-9383(73)90022-0 |
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|mr=0382279 |
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| doi-access= |
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}} |
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*{{Citation | last1=Hulek | first1=Klaus | title=Vector bundles in algebraic geometry (Durham, 1993) | publisher=[[Cambridge University Press]] | series=London Math. Soc. Lecture Note Ser. | doi=10.1017/CBO9780511569319.007 |mr=1338416 | year=1995 | volume=208 | chapter=The Horrocks–Mumford bundle | pages=139–177| isbn=9780511569319 }} |
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*{{cite journal |
*{{cite journal |
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|author1=Sasakura, Nobuo|author2=Enta, Yoichi|author3=Kagesawa, Masataka |
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| title = Construction of rank two reflexive sheaves with similar properties to the |
| title = Construction of rank two reflexive sheaves with similar properties to the Horrocks–Mumford bundle |
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| journal = Proc. Japan Acad., Ser. A |
| journal = Proc. Japan Acad., Ser. A |
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| volume = 69 |
| volume = 69 |
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| issue = 5 |
| issue = 5 |
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| pages = 144–148 |
| pages = 144–148 |
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| year = 1993 |
| year = 1993 |
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| doi = 10.3792/pjaa.69.144| doi-access = free |
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}} |
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{{DEFAULTSORT:Horrocks-Mumford bundle}} |
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{{math-stub}} |
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[[Category: |
[[Category:Algebraic varieties]] |
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[[Category:Vector bundles]] |
[[Category:Vector bundles]] |
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* [http://www.numdam.org/item/AST_1986__137__1_0/ Projective geometry of elliptic curves] - contains chapter on constructions of the bundle |
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{{algebraic-geometry-stub}} |
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Latest revision as of 07:35, 18 August 2023
In algebraic geometry, the Horrocks–Mumford bundle is an indecomposable rank 2 vector bundle on 4-dimensional projective space P4 introduced by Geoffrey Horrocks and David Mumford (1973). It is the only such bundle known, although a generalized construction involving Paley graphs produces other rank 2 sheaves (Sasukara et al. 1993). The zero sets of sections of the Horrocks–Mumford bundle are abelian surfaces of degree 10, called Horrocks–Mumford surfaces.
By computing Chern classes one sees that the second exterior power of the Horrocks–Mumford bundle F is the line bundle O(5) on P4. Therefore, the zero set V of a general section of this bundle is a quintic threefold called a Horrocks–Mumford quintic. Such a V has exactly 100 nodes; there exists a small resolution V′ which is a Calabi–Yau threefold fibered by Horrocks–Mumford surfaces.
See also
[edit]References
[edit]- Horrocks, G.; Mumford, D. (1973), "A rank 2 vector bundle on P4 with 15000 symmetries", Topology, 12: 63–81, doi:10.1016/0040-9383(73)90022-0, MR 0382279
- Hulek, Klaus (1995), "The Horrocks–Mumford bundle", Vector bundles in algebraic geometry (Durham, 1993), London Math. Soc. Lecture Note Ser., vol. 208, Cambridge University Press, pp. 139–177, doi:10.1017/CBO9780511569319.007, ISBN 9780511569319, MR 1338416
- Sasakura, Nobuo; Enta, Yoichi; Kagesawa, Masataka (1993). "Construction of rank two reflexive sheaves with similar properties to the Horrocks–Mumford bundle". Proc. Japan Acad., Ser. A. 69 (5): 144–148. doi:10.3792/pjaa.69.144.
- Projective geometry of elliptic curves - contains chapter on constructions of the bundle
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