class groups of unramified cyclic p-extensions of imaginary quadratic fields

Question

Let $K$ be an imaginary quadratic number field with $p$-Sylow-class group $A(K)$ and $L/K$ be an unramified cyclic extension of $K$ of degree $p$ ($p$ prime). Then I am looking for heuristics on

$ker(N_{L/K}:A(L)\rightarrow A(K))$,

where $N_{L/K}$ is the usual norm map on ideal classes. Numerical data suggest that:

$|KerN_{L/K}|\le p^2$ with high probability. But that is rather unprecise. Are there any more satisfactory known results ?

There is a result by Wittmann who gives some heuristics for cyclic $p$-extensions of $\mathbb{Q}$ and I wonder if one can possibly generalize his ideas to the above scenario.

Answer 1

The forthcoming paper "Heuristics for p-class towers of imaginary quadratic fields," by Nigel Boston, Michael Bush, and Farshid Hajir, will answer your question. In fact, given any finite p-group G, it provides a heuristic for the question "What is the probability that the maximal everywhere-unramified p-extension of K has Galois group isomorphic to G?"

They don't seem to have posted a paper yet, so I'm hesitant to say more about the result without asking their permission, but I'm sure one of them will be happy to send you the preprint or at least tell you what the heuristic is.