Chow motives associated to certain algebraic Hecke characters

Abstract

Shimura and Taniyama proved that if A is a potentially CM abelian variety over a number field F with CM by a field K linearly disjoint from F, then there is an algebraic Hecke character λA of K such that L(A/F,s)=L(λA,s). We consider a certain converse to their result. Namely, let A be a potentially CM abelian variety appearing as a factor of the Jacobian of a curve of the form ye=γ xf+δ. Fix positive integers a and n such that n/2 < a ≤ n. Under mild conditions on e, f, γ, δ, we construct a Chow motive M, defined over F=Q(γ,δ), such that L(M/F,s) and L(λAaλAn-a,s) have the same Euler factors outside finitely many primes.