The eleventh cohomology group of Mg,n
Abstract
We prove that the rational cohomology group H11(Mg,n) vanishes unless g = 1 and n ≥ 11. We show furthermore that Hk(Mg,n) is pure Hodge-Tate for all even k ≤ 12 and deduce that \# Mg,n(Fq) is surprisingly well approximated by a polynomial in q. In addition, we use H11(M1,11) and its image under Gysin push-forward for tautological maps to produce many new examples of moduli spaces of stable curves with nonvanishing odd cohomology and non-tautological algebraic cycle classes in Chow cohomology.
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