On the Irreducible Carpets of Additive Subgroups of Type $ F_{4} $

Pub Date : 2023-11-24 DOI:10.1134/s0037446623060198

A. O. Likhacheva

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Abstract

We consider the irreducible carpets $ \mathfrak{A}=\{\mathfrak{A}_{r}:\ r\in\Phi\} $ of type $ F_{4} $ over an algebraical extension $ K $ of a field $ R $ such that all additive subgroups $ \mathfrak{A}_{r} $ are $ R $-modules. The carpets, parametrized by a pair of additive subgroups, appear only in characteristic 2. This pair of additive subgroups presents (possibly different) fields up to conjugation by a diagonal element in the corresponding Chevalley group. Moreover, we establish that such carpets $ \mathfrak{A} $ are closed. Using Levchuk’s description of the irreducible carpets of Lie type of rank greater than 1 over $ K $, we show that all additive subgroups of the carpets coincide with an intermediate subfield between $ R $ and $ K $ of the carpets of types $ B_{l} $, $ C_{l} $, and $ F_{4} $ in case of the characteristic of $ K $ is not 0 and 2 whereas it is neither 0, 2, nor 3 for type $ G_{2} $ up to conjugation by a diagonal element.

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$ F_{4} $型可加子群的不可约地毯

我们考虑域$ R $的代数扩展$ K $上类型为$ F_{4} $的不可约地毯$ \mathfrak{A}=\{\mathfrak{A}_{r}:\ r\in\Phi\} $，使得所有可加子群$ \mathfrak{A}_{r} $都是$ R $ -模块。由一对相加子群参数化的地毯只出现在特征2中。这对加性子群通过对应的chevalley群中的对角元素共轭呈现出(可能不同的)域。此外，我们确定这些地毯$ \mathfrak{A} $是封闭的。利用Levchuk对秩大于1 / $ K $的Lie类型的可约地毯的描述，我们表明，在$ K $的特征不为0和2的情况下，地毯的所有可加子群都与类型为$ B_{l} $、$ C_{l} $和$ F_{4} $的地毯的$ R $和$ K $之间的中间子域重合，而对于类型$ G_{2} $，直到对角元素共轭，它既不是0、2也不是3。

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