\'Etale cohomological stability of the moduli space of stable elliptic surfaces

Abstract

We compute the (stable) \'etale cohomology of Homn(C, P(λ)), the moduli stack of degree n morphisms from a smooth projective curve C to the weighted projective stack P(λ), the latter being a stacky quotient defined by P(λ) := [AN-\0\/Gm], where Gm acts by weights λ = (λ0, ·s, λN) ∈ ZN+. Our key ingredient is formulating and proving the \'etale cohomological descent over the category S, the symmetric (semi)simplicial category. An immediate arithmetic consequence is the resolution of the geometric Batyrev--Manin type conjecture for weighted projective stacks over global function fields. Along the way, we also analyze the intersection theory on weighted projectivizations of vector bundles on smooth Deligne-Mumford stacks.

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