Murty, Modular forms and the Chebotarev density theorem II, Analytic number theory (Kyoto, 1996), London Math

· 1996

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Bounds for the distribution of the Frobenius traces associated to a generic abelian variety

math.NT · 2022-07-06 · unverdicted · novelty 5.0

Under GRH, the count of primes p ≤ x with Frobenius trace a_{1,p}(A) = t is ≪ x to a power strictly less than 1, yielding that |a_{1,p}(A)| exceeds p to a positive power for almost all p.

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Bounds for the distribution of the Frobenius traces associated to a generic abelian variety math.NT · 2022-07-06 · unverdicted · none · ref 35
Under GRH, the count of primes p ≤ x with Frobenius trace a_{1,p}(A) = t is ≪ x to a power strictly less than 1, yielding that |a_{1,p}(A)| exceeds p to a positive power for almost all p.

Murty, Modular forms and the Chebotarev density theorem II, Analytic number theory (Kyoto, 1996), London Math

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