The Chow rings of moduli spaces of elliptic surfaces over P1

Abstract

Let EN denote the coarse moduli space of smooth elliptic surfaces over P1 with fundamental invariant N. We compute the Chow ring A*(EN) for N≥ 2. For each N≥ 2, A*(EN) is Gorenstein with socle in codimension 16, which is surprising in light of the fact that the dimension of EN is 10N-2. As an application, we show that the maximal dimension of a complete subvariety of EN is 16. When N=2, the corresponding elliptic surfaces are K3 surfaces polarized by a hyperbolic lattice U. We show that the generators for A*(E2) are tautological classes on the moduli space FU of U-polarized K3 surfaces, which provides evidence for a conjecture of Oprea and Pandharipande on the tautological rings of moduli spaces of lattice polarized K3 surfaces.

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