When does the zero fiber of the moment map have rational singularities?

Abstract

Let G be a complex reductive group and V a G-module. There is a natural moment mapping μ V V*g* and we denote μ-1(0) (the shell) by NV. We use invariant theory and results of Mustata [Mus01] to find criteria for NV to have rational singularities and for the categorical quotient NV /\!\!/ G to have symplectic singularities, the latter results improving upon [HSS20]. It turns out that for ``most'' G-modules V, the shell NV has rational singularities. For the case of direct sums of classical representations of the classical groups, NV has rational singularities and NV /\!\!/ G has symplectic singularities if NV is a reduced and irreducible complete intersection. Another important special case is V=p\,g (the direct sum of p copies of the Lie algebra of G) where p≥ 2. We show that NV has rational singularities and that NV /\!\!/ G has symplectic singularities, improving upon results of [Bud19], [AA16], [Kap19] and [GH20]. Let π=π1() where is a closed Riemann surface of genus p≥ 2. Let G be semisimple and let Hom(π,G) and X\!(π,G) be the corresponding representation variety and character variety. We show that Hom(π,G) is a complete intersection with rational singularities and that X\!(π,G) has symplectic singularities. If p>2 or G contains no simple factor of rank 1, then the singularities of Hom(π,G) and X\!(π,G) are in codimension at least four and Hom(π,G) is locally factorial. If, in addition, G is simply connected, then X\!(π,G) is locally factorial.