Representing ideal classes of ray class groups by product of prime ideals of small size

Abstract

We prove that, for every modulus q, every class of the narrow ray class group Hq(K) of an arbitrary number field K contains a product of three unramified prime ideals p of degree one with Np (t(K)Nq)3, where t(K) is an explicit function of K described in the paper. To achieve this result, we first obtain a sharp explicit Brun-Titchmarsh Theorem for ray classes and then an equally explicit improved Brun-Titchmarsh Theorem for large subgroups of narrow ray class groups. En route, we deduce an explicit upper bound for the least prime ideal in a quadratic subgroup of a narrow ray class group and also for the size of the least ideal that is a product of degree one primes in any given class of Hq(K).