A Density of Ramified Primes

Abstract

Let K be a cyclic totally real number field of odd degree over Q with odd class number, such that every totally positive unit is the square of a unit, and such that 2 is inert in K/Q. We define a family of number fields \K(p)\p, depending on K and indexed by the rational primes p that split completely in K/Q, such that p is always ramified in K(p) of degree 2. Conditional on a standard conjecture on short character sums, the density of such rational primes p that exhibit one of two possible ramified factorizations in K(p)/Q is strictly between 0 and 1 and is given explicitly as a formula in terms of [K:Q]. Our results are unconditional in the cubic case. Our proof relies on a detailed study of the joint distribution of spins of prime ideals.