有限群模块场扩展、格林理论和绝对不可分解简单模块

IF 0.7 4区数学 Q2 MATHEMATICS

Bulletin of The Iranian Mathematical Society Pub Date : 2024-01-05 DOI:10.1007/s41980-023-00838-9

Morton E. Harris

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引用次数: 0

摘要

让 \(\Phi\) 是素特性 p 的域，让 G 是有限群。我们在不可分解（简单）KG 模块的同构类型集合之间建立了等价关系，其中 K 是 \(\Phi \) 的任意有限子域，并将等价类与不可分解（或简单） \(\Phi G\) 模块的同构类型集合联系起来。当 \(\Phi \) 是阶为 p 的域 F 的代数闭包时，我们研究了不可分解（或简单）的 \(\Phi G\)模块，并得到了简单 \(\Phi G\)模块的同构类型的分类，以及每个等价类中这种类型的数量的新公式。

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Finite Group Modular Field Extensions, Green Theory and Absolutely Indecomposable and Simple Modules

Let \(\Phi \) be a field of prime characteristic p and let G be a finite group. We develop an equivalence relation between the set of isomorphism types of indecomposable (simple) KG-modules, where K is any finite subfield of \(\Phi \), and relate the equivalence classes to the set of isomorphism types of indecomposable (resp. simple) \(\Phi G\)-modules. When \(\Phi \) is the algebraic closure of a field F of order p, we study indecomposable (resp. simple) \(\Phi G-\)modules and obtain a classification of the isomorphism types of simple \(\Phi G\)-modules and a new formula for the number of such types in each equivalence class.

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来源期刊

Bulletin of The Iranian Mathematical Society Mathematics-General Mathematics

CiteScore

1.40

自引率

0.00%

发文量

期刊介绍： The Bulletin of the Iranian Mathematical Society (BIMS) publishes original research papers as well as survey articles on a variety of hot topics from distinguished mathematicians. Research papers presented comprise of innovative contributions while expository survey articles feature important results that appeal to a broad audience. Articles are expected to address active research topics and are required to cite existing (including recent) relevant literature appropriately. Papers are critically reviewed on the basis of quality in its exposition, brevity, potential applications, motivation, value and originality of the results. The BIMS takes a high standard policy against any type plagiarism. The editorial board is devoted to solicit expert referees for a fast and unbiased review process.