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An effective method to compute closure ordering for nilpotent orbits of $theta$-representations

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 Added by Oksana Yakimova
 Publication date 2011
  fields
and research's language is English




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We develop an algorithm for computing the closure of a given nilpotent $G_0$-orbit in $g_1$, where $g_1$ and $G_0$ are coming from a $Z$ or a $Z/mZ$-grading $g= bigoplus g_i$ of a simple complex Lie algebra $g$.



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261 - Baohua Fu 2020
In a recent preprint, Y. Namikawa proposed a conjecture on Q-factorial terminalizations and their birational geometry of nilpotent orbits. He proved his conjecture for classical simple Lie algebras. In this note, we prove his conjecture for exceptional simple Lie algebras. For the birational geometry, contrary to the classical case, two new types of Mukai flops appear.
180 - Anne Moreau 2014
We study in this paper the jet schemes of the closure of nilpotent orbits in a finite-dimensional complex reductive Lie algebra. For the nilpotent cone, which is the closure of the regular nilpotent orbit, all the jet schemes are irreducible. This was first observed by Eisenbud and Frenkel, and follows from a strong result of Mustau{t}c{a} (2001). Using induction and restriction of little nilpotent orbits in reductive Lie algebras, we show that for a large number of nilpotent orbits, the jet schemes of their closure are reducible. As a consequence, we obtain certain geometrical properties of these nilpotent orbit closures.
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