The Subgroup Structure of the Finite Classical Groups / Peter B. Kleidman, Martin W. Liebeck.
Material type:
TextSeries: London Mathematical Society Lecture Note Series ; no. 129Publisher: Cambridge : Cambridge University Press, 1990Description: 1 online resource (316 pages) : digital, PDF file(s)Content type: text Media type: computer Carrier type: online resourceISBN: 9780511629235 (ebook)Subject(s): Group theoryAdditional physical formats: Print version: : No titleDDC classification: 512/.2 LOC classification: QA171 | .K53 1990Online resources: Click here to access online Summary: With the classification of the finite simple groups complete, much work has gone into the study of maximal subgroups of almost simple groups. In this volume the authors investigate the maximal subgroups of the finite classical groups and present research into these groups as well as proving many new results. In particular, the authors develop a unified treatment of the theory of the 'geometric subgroups' of the classical groups, introduced by Aschbacher, and they answer the questions of maximality and conjugacy and obtain the precise shapes of these groups. Both authors are experts in the field and the book will be of considerable value not only to group theorists, but also to combinatorialists and geometers interested in these techniques and results. Graduate students will find it a very readable introduction to the topic and it will bring them to the very forefront of research in group theory.
E-BOOKS
| Current library | Home library | Call number | Materials specified | URL | Status | Date due | Barcode |
|---|---|---|---|---|---|---|---|
| IMSc Library | IMSc Library | Link to resource | Available | EBK11940 |
Title from publisher's bibliographic system (viewed on 16 Oct 2015).
With the classification of the finite simple groups complete, much work has gone into the study of maximal subgroups of almost simple groups. In this volume the authors investigate the maximal subgroups of the finite classical groups and present research into these groups as well as proving many new results. In particular, the authors develop a unified treatment of the theory of the 'geometric subgroups' of the classical groups, introduced by Aschbacher, and they answer the questions of maximality and conjugacy and obtain the precise shapes of these groups. Both authors are experts in the field and the book will be of considerable value not only to group theorists, but also to combinatorialists and geometers interested in these techniques and results. Graduate students will find it a very readable introduction to the topic and it will bring them to the very forefront of research in group theory.
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