On an asymptotic behavior of elements of order <IMG > in irreducible representations of the classical algebraic groups with large enough highest weights期刊界 All Journals 搜尽天下杂志传播学术成果专业期刊搜索期刊信息化学术搜索

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On an asymptotic behavior of elements of order in irreducible representations of the classical algebraic groups with large enough highest weights

Authors:	I D Suprunenko

Institution:	Institute of Mathematics, National Academy of Sciences of Belarus, Surganov str. 11, Minsk, 220072, Belarus

Abstract:	The behavior of the images of a fixed element of order in irreducible representations of a classical algebraic group in characteristic with highest weights large enough with respect to and this element is investigated. More precisely, let be a classical algebraic group of rank over an algebraically closed field of characteristic . Assume that an element $x\in G$ of order is conjugate to that of an algebraic group of the same type and rank naturally embedded into . Next, an integer function $\sigma_x$ on the set of dominant weights of and a constant that depend only upon , and a polynomial of degree one are defined. It is proved that the image of in the irreducible representation of with highest weight $\omega$ contains more than Jordan blocks of size if and are not too small and $\sigma_x(\omega)\geq p-1+c_x$ .

Keywords:	Classical groups representations Jordan blocks

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