Endoisomorphisms and character triple isomorphisms
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- 作者:Alexandre Turull turull@ufl.edu
- 关键词:20C15
- 刊名:Journal of Algebra
- 出版年:2017
- 出版时间:15 March 2017
- 年:2017
- 卷:474
- 期:Complete
- 页码:466-504
- 全文大小:629 K
- 卷排序:474
文摘
This paper concerns aspects of Clifford Theory of finite groups. In earlier papers, Turull proved that if two finite groups yielded the same element of the Brauer–Clifford group, then there was an endoisomorphism from one group to the other, and furthermore, that associated with each endoisomorphism there was an essentially unique correspondence of modules over many different fields from one group to the other. The paper adapts the definition of Character Triple Isomorphism so that it involves ordinary and Brauer characters, and it preserves fields of definition, Schur indices, decomposition numbers, and blocks. It is proved that each endoisomorphism yields exactly one character triple isomorphism. Character triple isomorphisms can be composed, restricted, produced by direct sums, extension of fields, and these operations have their parallel for the endoisomorphisms. One goal of the paper is to provide tools for the study of the character theory of finite groups in an accessible way suitable for applications.