Artin's Conjecture for Abelian Varieties with Frobenius Condition
Abstract
A be an abelian variety over a number field K of dimension r, a1, …, ag ∈ A(K) and F/K a finite Galois extension. We consider the density of primes p of K such that the quotient A(k( p))/ a1,…,ag has at most 2r-1 cyclic components and p satisfies a Frobenius condition with respect to F/K, where A is the reduction of A modulo p, k( p) is the residue class field of p and a1,…,ag is the subgroup generated by the reductions a1,…,ag. We develop a general framework to prove the existence of the density under the Generalized Riemann Hypothesis.
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