On the Frobenius fields of abelian varieties over number fields
Abstract
Let A be a non-CM simple abelian variety over a number field K. For a place v of K such that A has good reduction at v, let F(A,v) denote the Frobenius field generated by the corresponding Frobenius eigenvalues. Assuming A has connected monodromy groups, we show that the set of places v such that F(A,v) is isomorphic to a fixed number field has upper Dirichlet density zero. Assuming the GRH, we give a power saving upper bound for the number of such places.
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