维特列支代数的多项式表示

Pub Date : 2024-06-21 DOI:10.1093/imrn/rnae139

Steven V Sam, Andrew Snowden, Philip Tosteson

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引用次数: 0

摘要

维特代数 ${mathfrak{W}}_{n}$ 是$n$变量多项式环 $\textbf{V}_{n}=\textbf{C}[x_{1}, \ldots , x_{n}]$ （或代数向量场在 $\textbf{A}^{n}$上）的所有派生的李代数。如果 ${mathfrak{W}}_{n}$ 的表示是作为 $\textbf{V}_{n}$ 的张量幂和的子项产生的，那么它就是多项式的。我们的主要定理断言，有限生成的 ${mathfrak{W}}_{n}$ 的多项式表示是 noetherian 的，并且具有有理希尔伯特数列。一个关键的中间结果指出，无限维特代数的多项式表示等价于 $\textbf{Fin}^{textrm{op}}$ 的表示，其中 $\textbf{Fin}$ 是有限集范畴。我们还证明 ${mathfrak{W}}_{n}$ 的多项式表示等价于 $\textbf{A}^{n}$ 的内态单元的多项式表示。这些等价性是舒尔-韦尔对偶性的操作数版本的一个特例，我们建立了舒尔-韦尔对偶性。

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Polynomial Representations of the Witt Lie Algebra

The Witt algebra ${\mathfrak{W}}_{n}$ is the Lie algebra of all derivations of the $n$-variable polynomial ring $\textbf{V}_{n}=\textbf{C}[x_{1}, \ldots , x_{n}]$ (or of algebraic vector fields on $\textbf{A}^{n}$). A representation of ${\mathfrak{W}}_{n}$ is polynomial if it arises as a subquotient of a sum of tensor powers of $\textbf{V}_{n}$. Our main theorems assert that finitely generated polynomial representations of ${\mathfrak{W}}_{n}$ are noetherian and have rational Hilbert series. A key intermediate result states polynomial representations of the infinite Witt algebra are equivalent to representations of $\textbf{Fin}^{\textrm{op}}$, where $\textbf{Fin}$ is the category of finite sets. We also show that polynomial representations of ${\mathfrak{W}}_{n}$ are equivalent to polynomial representations of the endomorphism monoid of $\textbf{A}^{n}$. These equivalences are a special case of an operadic version of Schur–Weyl duality, which we establish.

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