Proof of a conjecture of Guy on class numbers

Abstract

It is well known that for any prime p 3 (mod 4), the class numbers of the quadratic fields Q(p) and Q(-p), h(p) and h(-p) respectively, are odd. It is natural to ask whether there is a formula for h(p)/h(-p) modulo powers of 2. We show the formula h(p) h(-p) m(p) (mod 16), where m(p) is an integer defined using the "negative" continued fraction expansion of p. Our result solves a conjecture of Richard Guy.