In mathematics, Scholz's reciprocity law is a reciprocity law for quadratic residue symbols of real quadratic number fields discovered by and rediscovered by .
Suppose that p and q are rational primes congruent to 1 mod 4 such that the Legendre symbol (p/q) is 1. Then the ideal (p) factorizes in the ring of integers of Q() as (p)=ðÂÂÂðÂÂÂ' and similarly (q)=ðÂÂÂðÂÂÂ' in the ring of integers of Q(). Write õ<sub>p</sub> and õ<sub>q</sub> for the fundamental units in these quadratic fields. Then Scholz's reciprocity law says that
where [] is the quadratic residue symbol in a quadratic number field.