A reduction theorem for good basic invariants of finite complex reflection groups (2409.00380v2)

Abstract: This is a sequel to our previous article arXiv:2307.07897. We describe a certain reduction process of Satake's good basic invariants. We show that if the largest degree $d_1$ of a finite complex reflection group $G$ is regular and if $\delta$ is a divisor of $d_1$, a set of good basic invariants of $G$ induces that of the reflection subquotient $G_{\delta}$. We also show that the potential vector field of a duality group $G$, which gives the multiplication constants of the natural Saito structure on the orbit space, induces that of $G_{\delta}$. Several examples of this reduction process are also presented.