Cohen-Lenstra-Gerth Heuristics via Automorphism Counts

Abstract

For a finite abelian 2-group G, we study the frequency with which quadratic imaginary number fields K have 2-part of their class group K isomorphic to G. A philosophy enunciated by Gerth extends the Cohen-Lenstra heuristics for imaginary quadratic number fields to the case p=2, by referencing both the 2-rank and the 4-rank of the group in question. A recent paper by Smith provides relative density statements about the 2k+1-rank of such a class group given its 21- through 2k-ranks, for k ≥ 2. We deduce from Smith's results an explicit automorphism-count-theoretic statement of the Cohen-Lenstra-Gerth heuristics, also describing connections to "higher R\'edei matrices" introduced by Kolster to study the 2k-ranks of the class group of K.