On abelian 2-ramification torsion modules of quadratic fields

Abstract

For a number field F and a prime number p, the Zp-torsion module of the Galois group of the maximal abelian pro-p extension of F unramified outside p over F, denoted as Tp(F), is an important subject in abelian p-ramification theory. In this paper we study the group T2(F)=T2(m) of the quadratic field F=Q( m). Firstly, assuming m>0, we prove an explicit 4-rank formula for T2(-m). Furthermore, applying this formula, we obtain the 4-rank density of T2-groups of imaginary quadratic fields. Secondly, for l an odd prime, we obtain results about the 2-divisibility of orders of T2( l) and T2( 2l). In particular we find that \#T2(l) 2\# T2(2l) h2(-2l)16 if l 78 where h2(-2l) is the 2-class number of Q(-2l). We then obtain density results for T2( l) and T2( 2l). Finally, based on our density results and numerical data, we propose distribution conjectures about Tp(F) when F varies over real or imaginary quadratic fields for any prime p, and about T2( l) and T2( 2 l) when l varies, in the spirit of Cohen-Lenstra heuristics. Our conjecture in the T2(l) case is closely connected to Shanks-Sime-Washington's speculation on the distributions of the zeros of 2-adic L-functions and to the distributions of the fundamental units.