Hikita conjecture for classical Lie algebras

Abstract

Let G be Sp2n, SO2n or SO2n+1 and let G be its Langlands dual group. Barbasch and Vogan based on earlier work of Lusztig and Spaltenstein, define a duality map D that sends nilpotent orbits Oe ⊂ g to special nilpotent orbits Oe⊂ g. In a work by Losev, Mason-Brown and Matvieievskyi, an upgraded version D of this duality is considered, called the refined BVLS duality. D(Oe) is a G-equivariant cover Oe of Oe. Let Se be the nilpotent Slodowy slice of the orbit Oe. The two varieties X= Se and X= Spec(C[Oe]) are expected to be symplectic dual to each other. In this context, a version of the Hikita conjecture predicts an isomorphism between the cohomology ring of the Springer fiber Be and the ring of regular functions on the scheme-theoretic fixed point XT for some torus T. This paper verifies the isomorphism for certain pairs e and e. These cases are expected to cover almost all instances in which the Hikita conjecture holds when e regular in a Levi l⊂ g. Our results in these cases follow from the relations of three different types of objects: generalized coinvariant algebras, equivariant cohomology rings, and functions on scheme-theoretic intersections. We also give evidence for the Hikita conjecture when e is distinguished.