Non--tautological cycles on Prym moduli spaces

Abstract

We denote by Rg;m the moduli space of m--pointed Prym curves of genus g, that is, tuples [ C / C; x1, …, xm] where [C, x1, …, xm] is an m--pointed curve of genus g and C/ C is an étale double cover of C. In this paper, we address the problem of the non--tautology of the Chow ring of Rg;m. The locus which allows us to achieve earlier bounds for the non--tautology of CH(Rg) compared to Mg is the component RBg0 of the locus of bi--elliptic Prym curves. This parametrises covers [ C/ C] such that, if C → E is the bi--elliptic structure, the composition C → E factors through an elliptic cover of E. Our main contribution is thus the non--tautology of the class [RB80] ∈ CH*(R8). In the course of establishing this theorem, a similar result for the compact moduli spaces Rg; 2m for g + m ≥ 8 is proven.