Higher modularity of elliptic curves over function fields
Abstract
We investigate a notion of "higher modularity" for elliptic curves over function fields. Given such an elliptic curve E and an integer r≥ 1, we say that E is r-modular when there is an algebraic correspondence between a stack of r-legged shtukas, and the r-fold product of E considered as an elliptic surface. The (known) case r=1 is analogous to the notion of modularity for elliptic curves over Q. Our main theorem is that if E/Fq(t) is a nonisotrivial elliptic curve whose conductor has degree 4, then E is 2-modular. Ultimately, the proof uses properties of K3 surfaces. Along the way we prove a result of independent interest: A K3 surface admits a finite morphism to a Kummer surface attached to a product of elliptic curves if and only if its Picard lattice is rationally isometric to the Picard lattice of such a Kummer surface.
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