On Greenberg's generalized conjecture for imaginary quartic fields

Abstract: For an algebraic number field $K$ and a prime number $p$, let $\widetilde{K}/K$ be the maximal multiple $\mathbb{Z}_p$-extension. Greenberg's generalized conjecture (GGC) predicts that the Galois group of the maximal unramified abelian pro-$p$ extension of $\widetilde{K}$ is pseudo-null over the completed group ring $\mathbb{Z}_p[![\mathop{\mathrm{Gal}}\nolimits(\widetilde{K}/K)]!]$. We show that GGC holds for some imaginary quartic fields containing imaginary quadratic fields and some prime numbers.