Representations of Solvable Groups / Olaf Manz, Thomas R. Wolf.
Material type:
TextSeries: London Mathematical Society Lecture Note Series ; no. 185Publisher: Cambridge : Cambridge University Press, 1993Description: 1 online resource (316 pages) : digital, PDF file(s)Content type: text Media type: computer Carrier type: online resourceISBN: 9780511525971 (ebook)Subject(s): Solvable groups | Representations of groups | Permutation groupsAdditional physical formats: Print version: : No titleDDC classification: 512/.2 LOC classification: QA177 | .M36 1993Online resources: Click here to access online Summary: Representation theory plays an important role in algebra, and in this book Manz and Wolf concentrate on that part of the theory which relates to solvable groups. The authors begin by studying modules over finite fields, which arise naturally as chief factors of solvable groups. The information obtained can then be applied to infinite modules, and in particular to character theory (ordinary and Brauer) of solvable groups. The authors include proofs of Brauer's height zero conjecture and the Alperin-McKay conjecture for solvable groups. Gluck's permutation lemma and Huppert's classification of solvable two-transive permutation groups, which are essentially results about finite modules of finite groups, play important roles in the applications and a new proof is given of the latter. Researchers into group theory, representation theory, or both, will find that this book has much to offer.
E-BOOKS
| Current library | Home library | Call number | Materials specified | URL | Status | Date due | Barcode |
|---|---|---|---|---|---|---|---|
| IMSc Library | IMSc Library | Link to resource | Available | EBK12023 |
Title from publisher's bibliographic system (viewed on 16 Oct 2015).
Representation theory plays an important role in algebra, and in this book Manz and Wolf concentrate on that part of the theory which relates to solvable groups. The authors begin by studying modules over finite fields, which arise naturally as chief factors of solvable groups. The information obtained can then be applied to infinite modules, and in particular to character theory (ordinary and Brauer) of solvable groups. The authors include proofs of Brauer's height zero conjecture and the Alperin-McKay conjecture for solvable groups. Gluck's permutation lemma and Huppert's classification of solvable two-transive permutation groups, which are essentially results about finite modules of finite groups, play important roles in the applications and a new proof is given of the latter. Researchers into group theory, representation theory, or both, will find that this book has much to offer.
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