On Triple Quadratic Residue Symbols in Real Quadratic Fields

Abstract

We introduce triple quadratic residue symbols [p1, p2, p3] for certain finite primes pi's of a real quadratic field k with trivial narrow class group. For this, we determine a presentation of the Galois group of the maximal pro-2 Galois extension over k unramified outside p1, p2, p3 and infinite primes, from which we derive mod 2 arithmetic triple Milnor invariants μ2(123) yielding the triple symbol [p1, p2, p3] = (-1)μ2(123). Our symbols [p1, p2, p3] describes the decomposition law of p3 in a certain dihedral extension K over k of degree 8, determined by p1, p2. The field K and our symbols [p1, p2, p3] are generalizations over real quadratic fields of Rédei's dihedral extension of Q and Rédei's triple symbol of rational primes. We give examples of Rédei type extensions K over real quadratic fields. We also give a cohomological interpretation of our symbols in terms of Massey products.