Abstract
We compute the Chow rings with integral coefficients of moduli stacks of minimal Weierstrass fibrations over the projective line. For each integer N ≥ 1 N\geq 1 , there is a moduli stack W N m i n \mathcal {W}^{\mathrm {min}}_N parametrizing minimal Weierstrass fibrations with fundamental invariant N N . Following work of Miranda and Park–Schmitt, we give a quotient stack presentation for each W N m i n \mathcal {W}^{\mathrm {min}}_N . Using these presentations and equivariant intersection theory, we determine a complete set of generators and relations for each of the Chow rings. For the cases N = 1 N=1 (respectively, N = 2 N=2 ), parametrizing rational (respectively, K3) elliptic surfaces, we give a more explicit computation of the relations.
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