Cohomological Arithmetic Statistics for Principally Polarized Abelian Varieties over Finite Fields

Abstract

There is a natural probability measure on the set of isomorphism classes of principally polarized Abelian varieties of dimension g over Fq, weighted by the number of automorphisms. The distributions of the number of Fq-rational points are related to the cohomology of fiber powers of the universal family of principally polarized Abelian varieties. To that end we compute the cohomology Hi(X× ng,Q) for g=1 using results of Eichler-Shimura and for g=2 using results of Lee-Weintraub and Petersen, and we compute the compactly supported Euler characteristics ec(X× ng,Q) for g=3 using results of Hain and conjectures of Bergstr\"om-Faber-van der Geer. In each of these cases we identify the range in which the point counts \#X× ng(Fq) are polynomial in q. Using results of Borel and Grushevsky-Hulek-Tommasi on cohomological stability, we adapt arguments of Achter-Erman-Kedlaya-Wood-Zureick-Brown to pose a conjecture about the asymptotics of the point counts \#X× ng(Fq) in the limit g→∞.