Congruences for odd class numbers of quadratic fields with odd discriminant

Abstract

For any distinct two primes p1 p2 3 (mod 4), let h(-p1), h(-p2) and h(p1p2) be the class numbers of the quadratic fields Q(-p1), Q(-p2) and Q(p1p2), respectively. Let ωp1p2:=(1+p1p2)/2 and let (ωp1p2) be the Hirzebruch sum of ωp1p2. We show that h(-p1)h(-p2) h(p1p2)(ωp1p2)/n (mod 8), where n=6 (respectively, n=2) if \p1,p2\>3 (respectively, otherwise). We also consider the real quadratic order with conductor 2 in Q(p1p2).