Reye Congruence

In mathematics, Enriques surfaces are algebraic surfaces such that the irregularity ''q'' = 0 and the canonical line bundle ''K'' is non-trivial but has trivial square. Enriques surfaces are all projective (and therefore Kähler over the complex numbers) and are elliptic surfaces of genus 0.
Over fields of characteristic not 2 they are quotients of K3 surfaces by a group of order 2 acting without fixed points and their theory is similar to that of algebraic K3 surfaces. Enriques surfaces were first studied in detail by as an answer to a question discussed by about whether a surface with ''q'' = ''p''_''g'' = 0 is necessarily rational, though some of the Reye congruences introduced earlier by are also examples of Enriques surfaces.

Enriques surfaces can also be defined over other fields.
Over fields of characteristic other than 2, showed that the theory is similar to that over the complex numbers. Over fields of characteristic 2 the definition is modified, and there are two new families, called singular and supersingular Enriques surfaces, described by . These two extra families are related to the two non-discrete algebraic group schemes of order 2 in characteristic 2.

Invariants of complex Enriques surfaces

The plurigenera ''P''_''n'' are 1 if ''n'' is even and 0 if ''n'' is odd. The fundamental group has order 2. The second cohomology group H²(''X'', Z) is isomorphic to the sum of the unique even unimodular lattice II_1,9 of dimension 10 and signature -8 and a group of order 2.

Hodge diamond:

Marked Enriques surfaces form a connected 10-dimensional family, which showed is rational.

Characteristic 2

In characteristic 2 there are some new families of Enriques surfaces,
sometimes called quasi Enriques surfaces or non-classical Enriques surfaces or (super)singular Enriques surfaces. (The term "singular" does not mean that the surface has singularities, but means that the surface is "special" in some way.)
In characteristic 2 the definition of Enriques surfaces is modified: they are defined to be minimal surfaces whose canonical class ''K'' is numerically equivalent to 0 and whose second Betti number is 10. (In characteristics other than 2 this is equivalent to the usual definition.) There are now 3 families of Enriques surfaces:
*Classical: dim(H¹(O)) = 0. This implies 2''K'' = 0 but ''K'' is nonzero, and Pic^τ is Z/2Z. The surface is a quotient of a reduced singular Gorenstein surface by the group scheme μ₂.
*Singular: dim(H¹(O)) = 1 and is acted on non-trivially by the Frobenius endomorphism. This implies ''K'' = 0, and Pic^τ is μ₂. The surface is a quotient of a K3 surface by the group scheme Z/2Z.
*Supersingular: dim(H¹(O)) = 1 and is acted on trivially by the Frobenius endomorphism. This implies ''K'' = 0, and Pic^τ is α₂. The surface is a quotient of a reduced singular Gorenstein surface by the group scheme α₂.

All Enriques surfaces are elliptic or quasi elliptic.

Examples

*A Reye congruence is the family of lines contained in at least 2 quadrics of a given 3-dimensional linear system of quadrics in P³. If the linear system is generic then the Reye congruence is an Enriques surface. These were found by , and may be the earliest examples of Enriques surfaces.
* Take a surface of degree 6 in 3 dimensional projective space with double lines along the edges of a tetrahedron, such as
::$w^2x^2y^2 + w^2x^2z^2 + w^2y^2z^2 + x^2y^2z^2 + wxyzQ(w,x,y,z) = 0$
:for some general homogeneous polynomial ''Q'' of degree 2. Then its normalization is an Enriques surface. This is the family of examples found by .

* The quotient of a K3 surface by a fixed point free involution is an Enriques surface, and all Enriques surfaces in characteristic other than 2 can be constructed like this. For example, if ''S'' is the K3 surface ''w''⁴ + ''x''⁴ + ''y''⁴ + ''z''⁴ = 0 and ''T'' is the order 4 automorphism taking (''w'',''x'',''y'',''z'') to (''w'',''ix'',–''y'',–''iz'') then ''T''² has eight fixed points. Blowing up these eight points and taking the quotient by ''T''² gives a K3 surface with a fixed-point-free involution ''T'', and the quotient of this by ''T'' is an Enriques surface. Alternatively, the Enriques surface can be constructed by taking the quotient of the original surface by the order 4 automorphism ''T'' and resolving the eight singular points of the quotient. Another example is given by taking the intersection of 3 quadrics of the form ''P''_''i''(''u'',''v'',''w'') + ''Q''_''i''(''x'',''y'',''z'') = 0 and taking the quotient by the involution taking (''u'':''v'':''w'':''x'':''y'':''z'') to (–''x'':–''y'':–''z'':''u'':''v'':''w''). For generic quadrics this involution is a fixed-point-free involution of a K3 surface so the quotient is an Enriques surface.

See also

*List of algebraic surfaces
*Enriques–Kodaira classification
* Supersingular variety

References

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*''Compact Complex Surfaces'' by Wolf P. Barth, Klaus Hulek, Chris A.M. Peters, Antonius Van de Ven This is the standard reference book for compact complex surfaces.
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{{DEFAULTSORT:Enriques Surface
Complex surfaces
Birational geometry
Algebraic surfaces