On the optimal rate of equidistribution in number fields

Abstract

Let k be a number field. We study how well can finite sets of Ok equidistribute modulo powers of prime ideals, for all prime ideals at the same time. Our main result states that the optimal rate of equidistribution in Ok predicted by the local contstraints cannot be achieved unless k= Q. We deduce that Q is the only number field where the ring of integers Ok admits a simultaneous p-ordering, answering a question of Bhargava. Along the way we establish a non-trivial upper bound on the number of solutions x∈ Ok of the inequality |Nk/ Q(x(a-x))|≤ X2 where X is a positive real parameter and a∈ Ok is of norm at least e-BX for a fixed real number B. The latter can be translated as an upper bound on the average number of solutions of certain unit equations in Ok.