Curve classes on conic bundle threefolds and applications to rationality

Abstract

We undertake a study of conic bundle threefolds π X W over geometrically rational surfaces whose associated discriminant covers ⊂ W are smooth and geometrically irreducible. First, we determine the structure of the group CH2 Xk of rational equivalence classes of curves. Precisely, we construct a Galois-equivariant group homomorphism from CH2Xk to a group scheme associated to the discriminant cover of X. The target group scheme is a generalization of the Prym variety of and so our result can be viewed as a generalization of Beauville's result that the algebraically trivial curve classes on Xk are parametrized by the Prym variety. We apply our structural result on curve classes to study the refined intermediate Jacobian torsor (IJT) obstruction to rationality introduced by Hassett--Tschinkel and Benoist--Wittenberg. The first case of interest is W = P2 and is a smooth plane quartic. In this case, we show that the IJT obstruction characterizes rationality when the ground field has less arithmetic complexity (precisely, when the 2-torsion in the Brauer group of the ground field is trivial). We also show that a hypothesis of this form is necessary by constructing, over any k ⊂ R, a conic bundle threefold with a smooth quartic where the IJT obstruction vanishes, yet X is irrational over k.

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