On the spectrum of exterior algebra, and generalized exponents of small representations

Bollettino dell'Unione Matematica Italiana Pub Date : 2023-11-02 DOI:10.1007/s40574-023-00390-8

Sabino Di Trani

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Abstract

Abstract We present some results about the irreducible representations appearing in the exterior algebra $$\Lambda \mathfrak {g}$$ Λ g , where $$\mathfrak {g}$$ g is a simple Lie algebra over $${\mathbb {C}}$$ C . For Lie algebras of type B , C or D we prove that certain irreducible representations, associated to weights characterized in a combinatorial way, appear as irreducible components of $$\Lambda \mathfrak {g}$$ Λ g . Moreover, we propose an analogue of a conjecture of Kostant, about irreducibles appearing in the exterior algebra of the little adjoint representation. Finally, we give some closed expressions, in type B , C and D , for generalized exponents of small representations that are fundamental representations and we propose a generalization of some results of De Concini, Möseneder Frajria, Procesi and Papi about the module of special covariants of adjoint and little adjoint type.

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外代数的谱，以及小表示的广义指数

摘要给出了关于外部代数$$\Lambda \mathfrak {g}$$ Λ g中不可约表示的一些结果，其中$$\mathfrak {g}$$ g是$${\mathbb {C}}$$ C上的一个简单李代数。对于B型、C型或D型李代数，我们证明了以组合方式表征权的某些不可约表示表现为$$\Lambda \mathfrak {g}$$ Λ g的不可约分量。此外，我们提出了一个类似于Kostant关于小伴随表示的外代数中出现的不可约的猜想。最后，我们给出了作为基本表示的小表示的广义指数的B型、C型和D型的闭表达式，并推广了De Concini、Möseneder Frajria、Procesi和Papi关于伴随型和小伴随型的特殊协变模的一些结果。

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Bollettino dell'Unione Matematica Italiana

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