Products of prime ideals in ray class groups

Abstract

We prove that every class in the narrow ray class group modulo an integral ideal q of a fixed number field is represented by a product of three prime ideals of norm at most ( N q)(1,3α,4α0)+κ for any κ>0, where α is the exponent in short character sum bounds for general non-principal ray class characters and α0 comes from a bounded-order subconvexity input for Hecke L-functions. Wu's subconvexity bound gives the admissible choice α=α0=103/256, hence the explicit bound (N q)103/64+κ. This improves the previous OK((N q)3)-scale bound of Deshouillers, Gun, Ramaré, and Sivaraman. We also prove that a positive proportion of ray classes are represented by products of two prime ideals. The proof extends the multiplicative dense-model and transference framework of Matomäki--Teräväinen to narrow ray class groups.