Kummer surface

In algebraic geometry Kummer's quartic surface is an irreducible algebraic surface over a field ${\displaystyle K}$ of characteristic different then 2, which is a hypersurface of degree 4 in ${\displaystyle \mathbb {P} ^{3}}$ 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 ${\displaystyle x\mapsto -x}$. 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 ${\displaystyle K\subset \mathbb {P} ^{2}}$ be a quartic surface, and let ${\displaystyle p}$ be a singular point of this surface. Then the projection from ${\displaystyle p}$ on ${\displaystyle \mathbb {P} ^{2}}$ is a double cover. The ramification locus of the double cover is a plane curve ${\displaystyle C}$ of degree 6, and all the nodes of ${\displaystyle K}$ which are not ${\displaystyle p}$ map to nodes of ${\displaystyle C}$. The maximal number possible number of nodes on a sextic curve is obtained when the curve is a a union of ${\displaystyle 6}$ lines, in which case we have 15 nodes.

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 ${\displaystyle 60_{15}}$ configuration

Kummer's ${\displaystyle 16_{6}}$ 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)