{"title":"On the Irreducible Carpets of Additive Subgroups of Type $ F_{4} $","authors":"A. O. Likhacheva","doi":"10.1134/s0037446623060198","DOIUrl":null,"url":null,"abstract":"<p>We consider the irreducible carpets\n<span>\\( \\mathfrak{A}=\\{\\mathfrak{A}_{r}:\\ r\\in\\Phi\\} \\)</span>\nof type <span>\\( F_{4} \\)</span> over an algebraical extension\n<span>\\( K \\)</span> of a field <span>\\( R \\)</span> such that all additive subgroups\n<span>\\( \\mathfrak{A}_{r} \\)</span> are <span>\\( R \\)</span>-modules.\nThe carpets, parametrized by a pair of additive subgroups,\nappear only in characteristic 2.\nThis pair of additive subgroups presents (possibly different) fields\nup to conjugation by a diagonal element in the corresponding\nChevalley group.\nMoreover, we establish\nthat such carpets <span>\\( \\mathfrak{A} \\)</span> are closed.\nUsing Levchuk’s description of the\nirreducible carpets of Lie type of rank greater than 1 over <span>\\( K \\)</span>,\nwe show that\nall additive subgroups of the carpets coincide with an\nintermediate subfield between <span>\\( R \\)</span> and <span>\\( K \\)</span>\nof the carpets of types <span>\\( B_{l} \\)</span>, <span>\\( C_{l} \\)</span>, and <span>\\( F_{4} \\)</span>\nin case of the characteristic of <span>\\( K \\)</span> is not 0 and 2\nwhereas it is neither 0, 2, nor 3 for type <span>\\( G_{2} \\)</span>\nup to conjugation by a diagonal element.</p>","PeriodicalId":49533,"journal":{"name":"Siberian Mathematical Journal","volume":null,"pages":null},"PeriodicalIF":0.7000,"publicationDate":"2023-11-24","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"0","resultStr":null,"platform":"Semanticscholar","paperid":null,"PeriodicalName":"Siberian Mathematical Journal","FirstCategoryId":"100","ListUrlMain":"https://doi.org/10.1134/s0037446623060198","RegionNum":4,"RegionCategory":"数学","ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"Q2","JCRName":"MATHEMATICS","Score":null,"Total":0}
引用次数: 0
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.
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。
期刊介绍:
Siberian Mathematical Journal is journal published in collaboration with the Sobolev Institute of Mathematics in Novosibirsk. The journal publishes the results of studies in various branches of mathematics.
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