On automorphisms of some semidirect product groups and ranks of Iwasawa modules
Satoshi Fujii
Abstract
Let $p$ be an odd prime number and $k$ an imaginary quadratic field in which $p$ does not split. Based on their heuristic, Kundu and Washington posed a question which asks whether $λ$- and $μ$-invariant of the anti-cyclotomic ${\Bbb Z}_p$-extension $k_{\infty}^a$ of $k$ are always trivial. Also, if $k_{\infty}^a/k$ is totally ramified, for $n\geq 1$, they showed that the $p$-part of the ideal class group of the $n$th layer of the anti-cyclotomic ${\Bbb Z}_p$-extension of $k$ is not cyclic. In this article, inspired by their paper, we study anti-cyclotomic like ${\Bbb Z}_p$-extensions, extending both the above question and Kundu-Washington's result. We show that the values of $λ$ of certain anti-cyclotomic like ${\Bbb Z}_p$-extensions are always even. We also show the $p$-part of the ideal class groups of certain anti-cyclotomic like ${\Bbb Z}_p$-extensions of CM-fields are always not cyclic.