Representation Theory
A Homological Algebra Point of View
Zimmermann, Alexander.
creator
author.
SpringerLink (Online service)
text
gw
2014
monographic
eng
access
XX, 707 p. 59 illus. online resource.
Introducing the representation theory of groups and finite dimensional algebras, this book first studies basic non-commutative ring theory, covering the necessary background of elementary homological algebra and representations of groups to block theory. It further discusses vertices, defect groups, Green and Brauer correspondences and Clifford theory. Whenever possible the statements are presented in a general setting for more general algebras, such as symmetric finite dimensional algebras over a field. Then, abelian and derived categories are introduced in detail and are used to explain stable module categories, as well as derived categories and their main invariants and links between them. Group theoretical applications of these theories are given – such as the structure of blocks of cyclic defect groups – whenever appropriate. Overall, many methods from the representation theory of algebras are introduced. Representation Theory assumes only the most basic knowledge of linear algebra, groups, rings and fields, and guides the reader in the use of categorical equivalences in the representation theory of groups and algebras. As the book is based on lectures, it will be accessible to any graduate student in algebra and can be used for self-study as well as for classroom use.
Rings, Algebras and Modules -- Modular Representations of Finite Groups -- Abelian and Triangulated Categories -- Morita theory -- Stable Module Categories -- Derived Equivalences.
by Alexander Zimmermann.
Mathematics
Algebra
Associative rings
Rings (Algebra)
Category theory (Mathematics)
Homological algebra
Group theory
Mathematics
Algebra
Associative Rings and Algebras
Category Theory, Homological Algebra
Group Theory and Generalizations
QA150-272
512
Springer eBooks
Algebra and Applications, 19
9783319079684
http://dx.doi.org/10.1007/978-3-319-07968-4
http://dx.doi.org/10.1007/978-3-319-07968-4
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978-3-319-07968-4