Distribution of primes of split reductions for abelian surfaces
Abstract
Let A be an absolutely simple abelian surface defined over a number field K with a commutative (geometric) endomorphism ring. Let πA, split(x) denote the number of primes p in K such that each prime has norm bounded by x, of good reduction for A, and the reduction of A at p splits. It is known that the density of such primes is zero. Under the Generalized Riemann Hypothesis for Dedekind zeta functions and possibly extending the field K, we prove that πA, split(x) A, K x4142 x if the endomorphism ring of A is trivial; πA, split(x) A, F, K x1112( x)23 if A has real multiplication by a real quadratic field F; πA, split(x) A, F, K x23( x)13 if A has complex multiplication by a CM field F. These results improve the bounds by J. Achter in 2012 and D. Zywina in 2014. We also provide better bounds under other credible conjectures.
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