Orthogonal, symplectic and unitary representations of finite groups lie at the crossroads of two more traditional subjects of mathematics--linear representations of finite groups, and the theory of quadratic, skew symmetric and Hermitian forms--and thus inherit some of the characteristics of both. This book is written as an introduction to the subject and not as an encyclopaedic reference text. The principal goal is an exposition of the known results on the equivalence theory, and related matters such as the Witt and Witt-Grothendieck groups, over the "classical" fields--algebraically closed, real closed, finite, local and global. A detailed exposition of the background material needed is given in the first chapter. It was A. Fröhlich who first gave a systematic organization of this subject, in a series of papers beginning in 1969. His paper Orthogonal and symplectic representations of groups represents the culmination of his published work on orthogonal and symplectic representations. The author has included most of the work from that paper, extending it to include unitary representations, and also providing new approaches, such as the use of the equivariant Brauer-Wall group in describing the principal invariants of orthogonal representations and their interplay with each other. Titles in this series are co-published with The Fields Institute for Research in Mathematical Sciences (Toronto, Ontario, Canada).
Author(s): Carl R. Riehm
Series: Fields Institute Monographs 28
Publisher: American Mathematical Society
Year: 2011
Language: English
Commentary: decrypted from D1174CC50860FFCBEBCCB1E64B97E532 source file
Pages: 291
Cover
Title page
Contents
Preface
Notation
Background material
Isometry representations of finite groups
Hermitian forms over semisimple algebras
Equivariant Witt-Grothendieck and Witt groups
Representations over finite, local and global fields
Fröhlich’s invariant, Clifford algebras and the equivariant Brauer-Wall group
Bibliography
Glossary
Index
Back Cover