Projections of the minimal nilpotent orbit in a simple Lie algebra and secant varieties

D. Panyushev
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引用次数: 2

Abstract

Abstract Let G be a simple algebraic group with ${\mathfrak g}={\textrm{Lie }} G$ and ${\mathcal O}_{\textsf{min}}\subset{\mathfrak g}$ the minimal nilpotent orbit. For a ${\mathbb Z}_2$ -grading ${\mathfrak g}={\mathfrak g}_0\oplus{\mathfrak g}_1$ , let $G_0$ be a connected subgroup of G with ${\textrm{Lie }} G_0={\mathfrak g}_0$ . We study the $G_0$ -equivariant projections $\varphi\,:\,\overline{{\mathcal O}_{\textsf{min}}}\to {\mathfrak g}_0$ and $\psi:\overline{{\mathcal O}_{\textsf{min}}}\to{\mathfrak g}_1$ . It is shown that the properties of $\overline{\varphi({\mathcal O}_{\textsf{min}})}$ and $\overline{\psi({\mathcal O}_{\textsf{min}})}$ essentially depend on whether the intersection ${\mathcal O}_{\textsf{min}}\cap{\mathfrak g}_1$ is empty or not. If ${\mathcal O}_{\textsf{min}}\cap{\mathfrak g}_1\ne\varnothing$ , then both $\overline{\varphi({\mathcal O}_{\textsf{min}})}$ and $\overline{\psi({\mathcal O}_{\textsf{min}})}$ contain a 1-parameter family of closed $G_0$ -orbits, while if ${\mathcal O}_{\textsf{min}}\cap{\mathfrak g}_1=\varnothing$ , then both are $G_0$ -prehomogeneous. We prove that $\overline{G{\cdot}\varphi({\mathcal O}_{\textsf{min}})}=\overline{G{\cdot}\psi({\mathcal O}_{\textsf{min}})}$ . Moreover, if ${\mathcal O}_{\textsf{min}}\cap{\mathfrak g}_1\ne\varnothing$ , then this common variety is the affine cone over the secant variety of ${\mathbb P}({\mathcal O}_{\textsf{min}})\subset{\mathbb P}({\mathfrak g})$ . As a digression, we obtain some invariant-theoretic results on the affine cone over the secant variety of the minimal orbit in an arbitrary simple G-module. In conclusion, we discuss more general projections that are related to either arbitrary reductive subalgebras of ${\mathfrak g}$ in place of ${\mathfrak g}_0$ or spherical nilpotent G-orbits in place of ${\mathcal O}_{\textsf{min}}$ .
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简单李代数中最小幂零轨道的投影和割线变分
摘要设G为具有${\mathfrak g}={\textrm{Lie }} G$和${\mathcal O}_{\textsf{min}}\subset{\mathfrak g}$最小幂零轨道的简单代数群。对于${\mathbb Z}_2$ -级${\mathfrak g}={\mathfrak g}_0\oplus{\mathfrak g}_1$,设$G_0$为G与${\textrm{Lie }} G_0={\mathfrak g}_0$的连通子群。我们研究了$G_0$ -等变投影$\varphi\,:\,\overline{{\mathcal O}_{\textsf{min}}}\to {\mathfrak g}_0$和$\psi:\overline{{\mathcal O}_{\textsf{min}}}\to{\mathfrak g}_1$。证明了$\overline{\varphi({\mathcal O}_{\textsf{min}})}$和$\overline{\psi({\mathcal O}_{\textsf{min}})}$的性质本质上取决于交集${\mathcal O}_{\textsf{min}}\cap{\mathfrak g}_1$是否为空。如果${\mathcal O}_{\textsf{min}}\cap{\mathfrak g}_1\ne\varnothing$,则$\overline{\varphi({\mathcal O}_{\textsf{min}})}$和$\overline{\psi({\mathcal O}_{\textsf{min}})}$都包含一个封闭的$G_0$ -轨道的1参数族,而如果${\mathcal O}_{\textsf{min}}\cap{\mathfrak g}_1=\varnothing$,则两者都是$G_0$ -预均匀的。我们证明$\overline{G{\cdot}\varphi({\mathcal O}_{\textsf{min}})}=\overline{G{\cdot}\psi({\mathcal O}_{\textsf{min}})}$。此外,如果${\mathcal O}_{\textsf{min}}\cap{\mathfrak g}_1\ne\varnothing$,那么这个共同变量就是仿射锥除以${\mathbb P}({\mathcal O}_{\textsf{min}})\subset{\mathbb P}({\mathfrak g})$的正割变量。作为题外话,我们得到了任意简单g模中最小轨道割线变化上仿射锥的一些不变性理论结果。总之,我们讨论了与任意约化子代数${\mathfrak g}$代替${\mathfrak g}_0$或球形幂零g轨道代替${\mathcal O}_{\textsf{min}}$有关的更一般的投影。
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来源期刊
CiteScore
1.70
自引率
0.00%
发文量
39
审稿时长
6-12 weeks
期刊介绍: Papers which advance knowledge of mathematics, either pure or applied, will be considered by the Editorial Committee. The work must be original and not submitted to another journal.
期刊最新文献
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