On enhanced reductive groups (II): Finiteness of nilpotent orbits under enhanced group action and their closures

Abstract

This is a sequel to osy and sxy. Associated with G:=n and its rational representation (, M) over an algebraically closed filed , we define an enhanced algebraic group :=G M which is a product variety n× M, endowed with an enhanced cross product. In this paper, we first show that the nilpotent cone :=() of the enhanced Lie algebra :=() has finite nilpotent orbits under adjoint -action if and only if up to tensors with one-dimensional modules, M is isomorphic to one of the three kinds of modules: (i) a one-dimensional module, (ii) the natural module n, (iii) the linear dual of n when n>2; and M is an irreducible module of dimension not bigger than 3 when n=2. We then investigate the geometry of enhanced nilpotent orbits when the finiteness occurs. Our focus is on the enhanced group =(V)ηV with the natural representation (η, V) of (V), for which we give a precise classification of finite nilpotent orbits via a finite set of so-called enhanced partitions of n= V, then give a precise description of the closures of enhanced nilpotent orbits via constructing so-called enhanced flag varieties. Finally, the -equivariant intersection cohomology decomposition on the nilpotent cone of along the closures of nilpotent orbits is established.

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