Secant Varieties and Degrees of Invariants

Pub Date : 2018-11-29 DOI:10.7546/jgsp-51-2019-73-85
V. Tsanov
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引用次数: 1

Abstract

The ring of invariant polynomials ${\mathbb C}[V]^G$ over a given finite dimensional representation space $V$ of a complex reductive group $G$ is known, by a famous theorem of Hilbert, to be finitely generated. The general proof being nonconstructive, the generators and their degrees have remained a subject of interest. In this article we determine certain divisors of the degrees of the generators. Also, for irreducible representations, we provide lower bounds for the degrees, determined by the geometric properties of the unique closed projective $G$-orbit $\mathbb X$, and more specifically its secant varieties. For a particular class of representations, where the secant varieties are especially well behaved, we exhibit an exact correspondence between the generating invariants and the secant varieties intersecting the semistable locus.
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Secant变种与不变量的度
复归约群$G$的给定有限维表示空间$V$上的不变多项式${\mathbb C}[V]^G$的环,根据Hilbert的一个著名定理,已知是有限生成的。一般的证明是非结构化的,生成器及其程度一直是人们感兴趣的主题。在本文中,我们确定了生成元的度的某些除数。此外,对于不可约表示,我们提供了度的下界,由唯一闭投影$G$-轨道$\mathbb X$的几何性质决定,更具体地说,由其割线变体决定。对于一类特殊的表示,其中割线变体表现得特别好,我们展示了生成不变量和与半稳定轨迹相交的割线变体之间的精确对应关系。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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