The infinitude of Q(-p) with class number divisible by 16

Abstract

The density of primes p such that the class number h of Q(-p) is divisible by 2k is conjectured to be 2-k for all positive integers k. The conjecture is true for 1≤ k≤ 3 but still open for k≥ 4. For primes p of the form p = a2 + c4 with c even, we describe the 8-Hilbert class field of Q(-p) in terms of a and c. We then adapt a theorem of Friedlander and Iwaniec to show that there are infinitely many primes p for which h is divisible by 16, and also infinitely many primes p for which h is divisible by 8 but not by 16.