Restriction Theorems and Root Systems for Symmetric Superspaces (2401.04652v2)

Abstract: In this paper we consider those involutions $\theta$ of a finite-dimensional Kac-Moody Lie superalgebra $\mathfrak g$, with associated decomposition $\mathfrak g=\mathfrak k\oplus\mathfrak p$, for which a Cartan subspace $\mathfrak a$ in $\mathfrak p_{\bar 0}$ is self-centralizing in $\mathfrak p$. For such $\theta$ the restriction map $C_\theta$ from $\mathfrak p$ to $\mathfrak a$ is injective on the algebra $P(\mathfrak p)^{\mathfrak k}$ of $\mathfrak k$-invariant polynomials on $\mathfrak p$. There are five infinite families and five exceptional cases of such involutions, and for each case we explicitly determine the structure of $P(\mathfrak p)^{\mathfrak k}$ by giving a complete set of generators for the image of $C_\theta$. We also determine precisely when the restriction map $R_\theta$ from $P(\mathfrak g)^{\mathfrak g}$ to $P(\mathfrak p)^{\mathfrak k}$ is surjective. Finally we introduce the notion of a generalized restricted root system, and show that in the present setting the $\mathfrak a$-roots $\Delta(\mathfrak a,\mathfrak g)$ always form such a system.