Beauville surface

In mathematics, a Beauville surface is one of the surfaces of general type introduced by. They are examples of "fake quadrics", with the same Betti numbers as quadric surfaces.

Construction

Let C₁ and C₂ be smooth curves with genera g₁ and g₂.
Let G be a finite group acting on C₁ and C₂ such that

G has order
No nontrivial element of G has a fixed point on both C₁ and C₂
C₁/G and C₂/G are both rational.

Then the quotient /G is a Beauville surface.
One example is to take C₁ and C₂ both copies of the genus 6 quintic
X⁵ + Y⁵ + Z⁵ =0, and G to be an elementary abelian group of order 25, with suitable actions on the two curves.

Invariants

'''Hodge diamond:'''