A note on the distribution of Iwasawa invariants of imaginary quadratic fields

Abstract

Given an odd prime number p and an imaginary quadratic field K, we establish a relationship between the p-rank of the class group of K, and the classical λ-invariant of the cyclotomic Zp-extension of K. Exploiting this relationship, we prove statistical results for the distribution of λ-invariants for imaginary quadratic fields ordered according to their discriminant. Some of our results are conditional since they rely on the original Cohen--Lenstra heuristics for the distribution of the p-parts of class groups of imaginary quadratic fields. Some results are unconditional results ad are obtained by leveraging theorems of Byeon, Craig and others.