Reductions of points on algebraic groups, II

Abstract

Let A be the product of an abelian variety and a torus over a number field K, and let m be a positive integer. If α ∈ A(K) is a point of infinite order, we consider the set of primes p of K such that the reduction (α p) is well defined and has order coprime to m. This set admits a natural density, which we are able to express as a finite sum of products of -adic integrals, where varies in the set of prime divisors of m. We deduce that the density is a rational number, whose denominator is bounded (up to powers of m) in a very strong sense. This extends the results of the paper "Reductions of points on algebraic groups" by Davide Lombardo and the second author, where the case m prime is established.