Modularity of elliptic curves defined over function fields

de Frutos Fernández, María Inés

30 September 2020

We provide explicit equations for moduli spaces of Drinfeld shtukas over the projective line with Γ(N), Γ_1(N) and Γ_0(N) level structures, where N is an effective divisor on P^1 . If the degree of N is big enough, these moduli spaces are relative surfaces. We study how the moduli space of shtukas over P^1 with Γ_0(N) level structure, Sht^{2,tr}(Γ_0(N)), can be used to provide a notion of motivic modularity for elliptic curves defined over function fields. Elliptic curves over function fields are known to be modular in the sense of admitting a parametrization from a Drinfeld modular curve, provided that they have split multiplicative reduction at one place. We conjecture a different notion of modularity that should cover the curves excluded by the reduction hypothesis. We use our explicit equations for Sht^{2,tr}(Γ_0(N)) to verify our modularity conjecture in the cases where N = 2(0) + (1) + (∞) and N = 3(0) + (∞).

Mathematics

Drinfeld shtukas

Elliptic curves

Function fields

Modularity

Moduli spaces

Number theory