关于雅各布森-莫罗佐夫定理向偶数特征的扩展

IF 1 2区数学 Q1 MATHEMATICS Journal of the London Mathematical Society-Second Series Pub Date : 2024-10-21 DOI:10.1112/jlms.70007

David I. Stewart, Adam R. Thomas

{"title":"关于雅各布森-莫罗佐夫定理向偶数特征的扩展","authors":"David I. Stewart, Adam R. Thomas","doi":"10.1112/jlms.70007","DOIUrl":null,"url":null,"abstract":"Let <math>\n <semantics>\n <mi>G</mi>\n <annotation>$G$</annotation>\n </semantics></math> be a simple algebraic group over an algebraically closed field <math>\n <semantics>\n <mi>k</mi>\n <annotation>$\\mathbb {k}$</annotation>\n </semantics></math> of characteristic 2. We consider analogues of the Jacobson–Morozov theorem in this setting. More precisely, we classify those nilpotent elements with a simple 3-dimensional Lie overalgebra in <math>\n <semantics>\n <mrow>\n <mi>g</mi>\n <mo>:</mo>\n <mo>=</mo>\n <mo>Lie</mo>\n <mo>(</mo>\n <mi>G</mi>\n <mo>)</mo>\n </mrow>\n <annotation>$\\mathfrak {g}:=\\operatorname{Lie}(G)$</annotation>\n </semantics></math> and also those with overalgebras isomorphic to the algebras <math>\n <semantics>\n <mrow>\n <mo>Lie</mo>\n <mo>(</mo>\n <msub>\n <mi>SL</mi>\n <mn>2</mn>\n </msub>\n <mo>)</mo>\n </mrow>\n <annotation>$\\operatorname{Lie}(\\mathrm{SL}_2)$</annotation>\n </semantics></math> and <math>\n <semantics>\n <mrow>\n <mo>Lie</mo>\n <mo>(</mo>\n <msub>\n <mi>PGL</mi>\n <mn>2</mn>\n </msub>\n <mo>)</mo>\n </mrow>\n <annotation>$\\operatorname{Lie}(\\mathrm{PGL}_2)$</annotation>\n </semantics></math>. This leads us to calculate the dimension of the Lie automiser <math>\n <semantics>\n <mrow>\n <msub>\n <mi>n</mi>\n <mi>g</mi>\n </msub>\n <mrow>\n <mo>(</mo>\n <mi>k</mi>\n <mo>·</mo>\n <mi>e</mi>\n <mo>)</mo>\n </mrow>\n <mo>/</mo>\n <msub>\n <mi>c</mi>\n <mi>g</mi>\n </msub>\n <mrow>\n <mo>(</mo>\n <mi>e</mi>\n <mo>)</mo>\n </mrow>\n </mrow>\n <annotation>$\\mathfrak {n}_\\mathfrak {g}(\\mathbb {k}\\cdot e)/\\mathfrak {c}_\\mathfrak {g}(e)$</annotation>\n </semantics></math> for all nilpotent orbits; in even characteristic this quantity is very sensitive to isogeny.","PeriodicalId":49989,"journal":{"name":"Journal of the London Mathematical Society-Second Series","volume":null,"pages":null},"PeriodicalIF":1.0000,"publicationDate":"2024-10-21","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"https://onlinelibrary.wiley.com/doi/epdf/10.1112/jlms.70007","citationCount":"0","resultStr":"{\"title\":\"On extensions of the Jacobson–Morozov theorem to even characteristic\",\"authors\":\"David I. Stewart, Adam R. Thomas\",\"doi\":\"10.1112/jlms.70007\",\"DOIUrl\":null,\"url\":null,\"abstract\":\"Let <math>\\n <semantics>\\n <mi>G</mi>\\n <annotation>$G$</annotation>\\n </semantics></math> be a simple algebraic group over an algebraically closed field <math>\\n <semantics>\\n <mi>k</mi>\\n <annotation>$\\\\mathbb {k}$</annotation>\\n </semantics></math> of characteristic 2. We consider analogues of the Jacobson–Morozov theorem in this setting. More precisely, we classify those nilpotent elements with a simple 3-dimensional Lie overalgebra in <math>\\n <semantics>\\n <mrow>\\n <mi>g</mi>\\n <mo>:</mo>\\n <mo>=</mo>\\n <mo>Lie</mo>\\n <mo>(</mo>\\n <mi>G</mi>\\n <mo>)</mo>\\n </mrow>\\n <annotation>$\\\\mathfrak {g}:=\\\\operatorname{Lie}(G)$</annotation>\\n </semantics></math> and also those with overalgebras isomorphic to the algebras <math>\\n <semantics>\\n <mrow>\\n <mo>Lie</mo>\\n <mo>(</mo>\\n <msub>\\n <mi>SL</mi>\\n <mn>2</mn>\\n </msub>\\n <mo>)</mo>\\n </mrow>\\n <annotation>$\\\\operatorname{Lie}(\\\\mathrm{SL}_2)$</annotation>\\n </semantics></math> and <math>\\n <semantics>\\n <mrow>\\n <mo>Lie</mo>\\n <mo>(</mo>\\n <msub>\\n <mi>PGL</mi>\\n <mn>2</mn>\\n </msub>\\n <mo>)</mo>\\n </mrow>\\n <annotation>$\\\\operatorname{Lie}(\\\\mathrm{PGL}_2)$</annotation>\\n </semantics></math>. This leads us to calculate the dimension of the Lie automiser <math>\\n <semantics>\\n <mrow>\\n <msub>\\n <mi>n</mi>\\n <mi>g</mi>\\n </msub>\\n <mrow>\\n <mo>(</mo>\\n <mi>k</mi>\\n <mo>·</mo>\\n <mi>e</mi>\\n <mo>)</mo>\\n </mrow>\\n <mo>/</mo>\\n <msub>\\n <mi>c</mi>\\n <mi>g</mi>\\n </msub>\\n <mrow>\\n <mo>(</mo>\\n <mi>e</mi>\\n <mo>)</mo>\\n </mrow>\\n </mrow>\\n <annotation>$\\\\mathfrak {n}_\\\\mathfrak {g}(\\\\mathbb {k}\\\\cdot e)/\\\\mathfrak {c}_\\\\mathfrak {g}(e)$</annotation>\\n </semantics></math> for all nilpotent orbits; in even characteristic this quantity is very sensitive to isogeny.\",\"PeriodicalId\":49989,\"journal\":{\"name\":\"Journal of the London Mathematical Society-Second Series\",\"volume\":null,\"pages\":null},\"PeriodicalIF\":1.0000,\"publicationDate\":\"2024-10-21\",\"publicationTypes\":\"Journal Article\",\"fieldsOfStudy\":null,\"isOpenAccess\":false,\"openAccessPdf\":\"https://onlinelibrary.wiley.com/doi/epdf/10.1112/jlms.70007\",\"citationCount\":\"0\",\"resultStr\":null,\"platform\":\"Semanticscholar\",\"paperid\":null,\"PeriodicalName\":\"Journal of the London Mathematical Society-Second Series\",\"FirstCategoryId\":\"100\",\"ListUrlMain\":\"https://onlinelibrary.wiley.com/doi/10.1112/jlms.70007\",\"RegionNum\":2,\"RegionCategory\":\"数学\",\"ArticlePicture\":[],\"TitleCN\":null,\"AbstractTextCN\":null,\"PMCID\":null,\"EPubDate\":\"\",\"PubModel\":\"\",\"JCR\":\"Q1\",\"JCRName\":\"MATHEMATICS\",\"Score\":null,\"Total\":0}","platform":"Semanticscholar","paperid":null,"PeriodicalName":"Journal of the London Mathematical Society-Second Series","FirstCategoryId":"100","ListUrlMain":"https://onlinelibrary.wiley.com/doi/10.1112/jlms.70007","RegionNum":2,"RegionCategory":"数学","ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"Q1","JCRName":"MATHEMATICS","Score":null,"Total":0}

引用次数: 0

摘要

让 G $G$ 是特征为 2 的代数闭域 k $\mathbb {k}$ 上的一个简单代数群。我们考虑雅各布森-莫罗佐夫定理在这种情况下的相似性。更准确地说，我们将那些在 g : = Lie ( G ) $\mathfrak {g}:=\operatorname{Lie}(G)$中具有简单三维 Lie 上代数的无幂元素以及那些具有与 Lie ( SL 2 ) $\operatorname{Lie}(\mathrm{SL}_2)$ 和 Lie ( PGL 2 ) $\operatorname{Lie}(\mathrm{PGL}_2)$ 同构的上代数的无幂元素进行了分类。这样我们就可以计算 Lie 自动机的维度 n g ( k - e ) / c g ( e ) $\mathfrak {n}_\mathfrak {g}(\mathbb {k}\cdot e)/\mathfrak {c}_\mathfrak {g}(e)$ 适用于所有零势轨道；在偶数特征中，这个量对同源性非常敏感。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

摘要图片

查看原文

微信好友朋友圈 QQ好友复制链接

本刊更多论文

On extensions of the Jacobson–Morozov theorem to even characteristic

Let $G$ be a simple algebraic group over an algebraically closed field $k$ of characteristic 2. We consider analogues of the Jacobson–Morozov theorem in this setting. More precisely, we classify those nilpotent elements with a simple 3-dimensional Lie overalgebra in $g : = Lie (G)$ and also those with overalgebras isomorphic to the algebras $Lie ({SL}_{2})$ and $Lie ({PGL}_{2})$ . This leads us to calculate the dimension of the Lie automiser $n_{g} (k \cdot e) / c_{g} (e)$ for all nilpotent orbits; in even characteristic this quantity is very sensitive to isogeny.

求助全文

通过发布文献求助，成功后即可免费获取论文全文。去求助

来源期刊

Journal of the London Mathematical Society-Second Series 数学-数学

CiteScore

1.90

自引率

0.00%

发文量

186

审稿时长

6-12 weeks

期刊介绍： The Journal of the London Mathematical Society has been publishing leading research in a broad range of mathematical subject areas since 1926. The Journal welcomes papers on subjects of general interest that represent a significant advance in mathematical knowledge, as well as submissions that are deemed to stimulate new interest and research activity.

期刊最新文献

Corrigendum: A topology on E $E$ -theory Elliptic curves with complex multiplication and abelian division fields Realizability of tropical pluri-canonical divisors Partitioning problems via random processes Zero-curvature subconformal structures and dispersionless integrability in dimension five