Geometry of Sporadic Groups: Volume 2, Representations and Amalgams
Geometry of Sporadic Groups: Volume 2, Representations and Amalgams

Author: A. A. Ivanov

Publisher: Cambridge University Press

Published: 2002-03-14

Total Pages: 0

ISBN-13: 9780521623490

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This second volume in a two-volume set provides a complete self-contained proof of the classification of geometries associated with sporadic simple groups: Petersen and tilde geometries. It contains a study of the representations of the geometries under consideration in GF(2)-vector spaces as well as in some non-Abelian groups. The central part is the classification of the amalgam of maximal parabolics, associated with a flag transitive action on a Petersen or tilde geometry. By way of their systematic treatment of group amalgams, the authors establish a deep and important mathematical result.

Geometry of Sporadic Groups II
Geometry of Sporadic Groups II

Author: Aleksandr Anatolievich Ivanov

Publisher:

Published: 2002

Total Pages: 286

ISBN-13: 9781107095304

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The second in a two-volume set, for researchers into finite groups, geometry and algebraic combinatorics.

Diagram Geometry
Diagram Geometry

Author: Francis Buekenhout

Publisher: Springer Science & Business Media

Published: 2013-01-26

Total Pages: 597

ISBN-13: 3642344534

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This book provides a self-contained introduction to diagram geometry. Tight connections with group theory are shown. It treats thin geometries (related to Coxeter groups) and thick buildings from a diagrammatic perspective. Projective and affine geometry are main examples. Polar geometry is motivated by polarities on diagram geometries and the complete classification of those polar geometries whose projective planes are Desarguesian is given. It differs from Tits' comprehensive treatment in that it uses Veldkamp's embeddings. The book intends to be a basic reference for those who study diagram geometry. Group theorists will find examples of the use of diagram geometry. Light on matroid theory is shed from the point of view of geometry with linear diagrams. Those interested in Coxeter groups and those interested in buildings will find brief but self-contained introductions into these topics from the diagrammatic perspective. Graph theorists will find many highly regular graphs. The text is written so graduate students will be able to follow the arguments without needing recourse to further literature. A strong point of the book is the density of examples.

Group Theory and Computation
Group Theory and Computation

Author: N.S. Narasimha Sastry

Publisher: Springer

Published: 2018-09-21

Total Pages: 213

ISBN-13: 9811320470

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This book is a blend of recent developments in theoretical and computational aspects of group theory. It presents the state-of-the-art research topics in different aspects of group theory, namely, character theory, representation theory, integral group rings, the Monster simple group, computational algorithms and methods on finite groups, finite loops, periodic groups, Camina groups and generalizations, automorphisms and non-abelian tensor product of groups. Presenting a collection of invited articles by some of the leading and highly active researchers in the theory of finite groups and their representations and the Monster group, with a focus on computational aspects, this book is of particular interest to researchers in the area of group theory and related fields of mathematics.

Buildings, Finite Geometries and Groups
Buildings, Finite Geometries and Groups

Author: N.S. Narasimha Sastry

Publisher: Springer Science & Business Media

Published: 2011-11-13

Total Pages: 348

ISBN-13: 1461407095

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This is the Proceedings of the ICM 2010 Satellite Conference on “Buildings, Finite Geometries and Groups” organized at the Indian Statistical Institute, Bangalore, during August 29 – 31, 2010. This is a collection of articles by some of the currently very active research workers in several areas related to finite simple groups, Chevalley groups and their generalizations: theory of buildings, finite incidence geometries, modular representations, Lie theory, etc. These articles reflect the current major trends in research in the geometric and combinatorial aspects of the study of these groups. The unique perspective the authors bring in their articles on the current developments and the major problems in their area is expected to be very useful to research mathematicians, graduate students and potential new entrants to these areas.