Equivariant D-modules on alternating senary 3-tensors

Abstract

Let X be the third exterior power of a six-dimensional complex vector space, equipped with the natural action of the group GL6(C) of invertible linear transformations of C6. We describe explicitly the category of GL6(C)-equivariant coherent DX-modules as the category of representations of a quiver with relations, which has finite representation type. We give a construction of the six simple equivariant DX-modules and give formulas for the characters of their underlying GL6(C)-structures. We describe the (iterated) local cohomology groups with supports given by orbit closures, determining, in particular, the Lyubeznik numbers associated to the orbit closures.