Monogamous subvarieties of the nilpotent cone
Abstract
Let G be a reductive algebraic group over an algebraically closed field k of prime characteristic not 2, whose Lie algebra is denoted g. We call a subvariety X of the nilpotent cone N ⊂ g monogamous if for every e∈ X, the sl2-triples (e,h,f) with f∈ X are conjugate under the centraliser CG(e). Building on work by the first two authors, we show there is a unique maximal closed G-stable monogamous subvariety V ⊂ N and that it is an orbit closure, hence irreducible. We show that V can also be characterised in terms of Serre's G-complete reducibility.
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