Book contents
- Frontmatter
- Contents
- 0 Introduction
- I Algebras and modules
- II Quivers and algebras
- III Representations and modules
- IV Auslander–Reiten theory
- V Nakayama algebras and representation–finite group algebras
- VI Tilting theory
- VII Representation–finite hereditary algebras
- VIII Tilted algebras
- IX Directing modules and postprojective components
- A Appendix: Categories, functors, and homology
- Bibliography
- Index
- List of symbols
0 - Introduction
Published online by Cambridge University Press: 12 January 2010
- Frontmatter
- Contents
- 0 Introduction
- I Algebras and modules
- II Quivers and algebras
- III Representations and modules
- IV Auslander–Reiten theory
- V Nakayama algebras and representation–finite group algebras
- VI Tilting theory
- VII Representation–finite hereditary algebras
- VIII Tilted algebras
- IX Directing modules and postprojective components
- A Appendix: Categories, functors, and homology
- Bibliography
- Index
- List of symbols
Summary
The idea of representing a complex mathematical object by a simpler one is as old as mathematics itself. It is particularly useful in classification problems. For instance, a single linear transformation on a finite dimensional vector space is very adequately characterised by its reduction to its rational or its Jordan canonical form. It is now generally accepted that the representation theory of associative algebras traces its origin to Hamilton's description of the complex numbers by pairs of real numbers. During the 1930s, E. Noether gave to the theory its modern setting by interpreting representations as modules. That allowed the arsenal of techniques developed for the study of semisimple algebras as well as the language and machinery of homological algebra and category theory to be applied to representation theory. Using these, the theory grew rapidly over the past thirty years.
Nowadays, studying the representations of an algebra (which we always assume to be finite dimensional over an algebraically closed field, associative, and with an identity) is understood as involving the classification of the (finitely generated) indecomposable modules over that algebra and the homomorphisms between them. The rapid growth of the theory and the extent of the published original literature became major obstacles for the beginners seeking to make their way into this area.
We are writing this textbook with these considerations in mind: It is therefore primarily addressed to graduate students starting research in the representation theory of algebras.
- Type
- Chapter
- Information
- Elements of the Representation Theory of Associative AlgebrasTechniques of Representation Theory, pp. vii - xPublisher: Cambridge University PressPrint publication year: 2006