Kummer surface: Difference between revisions
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=== Singular quartic surfaces and the double plane model === | === Singular quartic surfaces and the double plane model === | ||
Let <math>K\subset\mathbb{P}^ | Let <math>K\subset\mathbb{P}^3 </math> be a quartic surface, and let <math>p</math> be a singular point of this surface. Identifying the lines in <math>\mathbb{P}^3</math> thorugh the point <math>p</math> with <math>\mathbb{P}^2</math>, we get a double cover | ||
<math>\mathbb{P}^2</math> | from the blow up of <math>K</math> at <math>p</math> to <math>\mathbb{P}^2</math>; this double cover is given by | ||
sending <math>q\neq p\mapsto\overline{pq}</math>, and any line in the [[tangent cone]] of <math>p</math> in <math>K</math> to itself. The [[ramification locus]] of the double cover is a plane curve <math>C</math> of degree 6, and all the nodes of <math>K</math> which are not <math>p</math> map to nodes of <math>C</math>. | |||
By the [[genus degree formula]], the maximal number possible number of nodes on a sextic curve is obtained when the curve is a a union of <math>6</math> lines, in which case we have 15 nodes. Hence the maximal number of nodes on a quartic is 16, and in this case they are all simple nodes (to show that <math>p</math> is simple project from another node). A quartic which obtains these 16 nodes is called a Kummer Quartic, and we will concentrate on them below. | |||
Since <math>p</math> is a simple node, the tangent cone to this point is mapped to a conic under the double cover. This conic is in fact tangent to the six lines (w.o proof). Conversely, given a configuration of a conic and six lines which tangent to it in the plane, we may define the double cover of the plane ramified over the union of these 6 lines. This double cover may be mapped to <mathbb>\mathbb{P}^3</math>, under a map which [[blow down|blows down]] the doubel cover of the special conic, and is an isomorphism elsewhere (w.o. proof). | |||
=== Kummers's quartic surfaces and kummer varieties of Jacobians === | === Kummers's quartic surfaces and kummer varieties of Jacobians === |
Revision as of 21:37, 5 March 2007
In algebraic geometry Kummer's quartic surface is an irreducible algebraic surface over a field of characteristic different then 2, which is a hypersurface of degree 4 in with 16 singularities; the maximal possible number of singularities of a quartic surface. It is a remarkable fact that any such surface is the Kummer variety of the Jacobian of a smooth hyperelliptic curve of genus 2; i.e. a quotient of the Jacobian by the Kummer involution . The Kummer involution has 16 fixed points: the 16 2-torsion point of the Jacobian, and they are the 16 singular points of the quartic surface.
Geometry of the Kummer surface
Singular quartic surfaces and the double plane model
Let be a quartic surface, and let be a singular point of this surface. Identifying the lines in thorugh the point with , we get a double cover from the blow up of at to ; this double cover is given by sending , and any line in the tangent cone of in to itself. The ramification locus of the double cover is a plane curve of degree 6, and all the nodes of which are not map to nodes of .
By the genus degree formula, the maximal number possible number of nodes on a sextic curve is obtained when the curve is a a union of lines, in which case we have 15 nodes. Hence the maximal number of nodes on a quartic is 16, and in this case they are all simple nodes (to show that is simple project from another node). A quartic which obtains these 16 nodes is called a Kummer Quartic, and we will concentrate on them below.
Since is a simple node, the tangent cone to this point is mapped to a conic under the double cover. This conic is in fact tangent to the six lines (w.o proof). Conversely, given a configuration of a conic and six lines which tangent to it in the plane, we may define the double cover of the plane ramified over the union of these 6 lines. This double cover may be mapped to <mathbb>\mathbb{P}^3</math>, under a map which blows down the doubel cover of the special conic, and is an isomorphism elsewhere (w.o. proof).
Kummers's quartic surfaces and kummer varieties of Jacobians
The quadric line complex
Geometry and combinatorics of the level structure
Polar lines
Apolar complexes
Klien's configuration
Kummer's configurations
fundamental quadrics
fundamental tetrahedra
Rosenheim tetrads
Gopel tetrads
References
- The ultimate classical reference : R. W. H. T. Hudson Kummer's Quartic Surface ISBN 0521397901. Available online at http://www.hti.umich.edu:80/cgi/b/broker20/broker20?verb=Display&protocol=CGM&ver=1.0&identifier=oai:lib.umich.edu:ABR1780.0001.001 (this is the main source of the second part of this article)
- Igor Dolgachev's online notes on classical algebraic geometry (this is the main source of the first part of this article)