Bounds for the distribution of the Frobenius traces associated to a generic abelian variety
Abstract
Let A be an abelian variety defined over Q and of dimension g. Assume that, for each sufficiently large prime , A has a surjective residual modulo Galois representation. For t∈ Z and x>0, denote by πA(x, t) the number of primes p ≤ x for which the Frobenius trace a1, p(A) associated to A p equals t. Assuming the Generalized Riemann Hypothesis for Dedekind zeta functions (GRH), we obtain that πA(x, 0) A x1 - 12g2+g+1/( x)1 - 22g2+g+1 and πA(x, t) A x1 - 12g2+g+2/( x)1 - 22g2+g+2 if t ≠ 0, and deduce that almost all primes p satisfy |a1, p(A)| > p12 g2 + g + 1/ ( p)22g2+g+1+ for any >0. Assuming, in addition to GRH, Artin's Holomorphy Conjecture and a Pair Correlation Conjecture for Artin L-functions, we obtain that πA(x, 0) A x1 - 1g+1/( x)1 - 4g+1 and πA(x, t) A x1 - 1g+2/( x)1 - 4g+2 if t ≠ 0, and deduce that almost all primes p satisfy |a1, p(A)|> p1g + 2 - for any >0.
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