Catanese surface

In mathematics, a Catanese surface is one of the surfaces of general type introduced by Catanese (1981).

Construction

The construction starts with a quintic V with 20 double points. Let W be the surface obtained by blowing up the 20 double points. Suppose that W has a double cover X branched over the 20 exceptional 2-curves. Let Y be obtained from X by blowing down the 20 1-curves in X. If there is a group of order 5 acting freely on all these surfaces, then the quotient Z of Y by this group of order 5 is a Catanese surface. Catanese found a 4-dimensional family of curves constructed like this.

Invariants

The fundamental group is trivial. The irregularity and the geometric genus are both 0.

The Hodge diamond
1
0 0
0 8 0
0 0
1

References

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