Cohomology of the universal smooth cubic surface
Abstract
We compute the rational cohomology of the universal family of smooth cubic surfaces using Vassiliev's method of simplicial resolution. Modulo embedding, the universal family has cohomology isomorphic to that of P2. A consequence of our theorem is that over the finite field Fq, away from finitely many characteristics, the average number of points on a smooth cubic surface is q2 + q + 1.
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