A Radical Characterization of Abelian Varieties
Abstract
Let A be a square-free abelian variety defined over a number field K. Let S be a density one set of prime ideals p of OK. A famous theorem of Faltings says that the Frobenius polynomials PA,p(x) for p∈ S determine A up to isogeny. We show that the prime factors of |A(Fp)|=PA,p(1) for p∈ S also determine A up to isogeny over an explicit finite extension of K. The proof relies on understanding the -adic monodromy groups which come from the -adic Galois representations of A, and the absolute Weyl group action on their weights.
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