On the Birch--Swinnerton-Dyer conjecture and Schur indices

Abstract

For every odd prime p, we exhibit families of irreducible Artin representations τ with the property that for every elliptic curve E the order of the zero of the twisted L-function L(E,τ,s) at s\!=\!1 must be a multiple~of~p. Analogously, the multiplicity of τ in the Selmer group of E must also be divisible by p. We give further examples where τ can moreover be twisted by any character that factors through the p-cyclotomic extension, and examples where the L-functions are those of twists of certain Hilbert modular forms by Dirichlet charaters. These results are conjectural, and rely on a standard generalisation of the Birch--Swinnerton-Dyer conjecture. Our main tool is the theory of Schur indices from representation theory.