Book contents
- Frontmatter
- Contents
- Preface
- 1 Groups and homorphisms
- 2 Vector spaces and linear transformations
- 3 Group representations
- 4 FG-modules
- 5 FG-submodules and reducibility
- 6 Group algebras
- 7 FG-homomorphisms
- 8 Maschke's Theorem
- 9 Schur's Lemma
- 10 Irreducible modules and the group algebra
- 11 More on the group algebra
- 12 Conjugacy classes
- 13 Characters
- 14 Inner products of characters
- 15 The number of irreducible characters
- 16 Character tables and orthogonality relations
- 17 Normal subgroups and lifted characters
- 18 Some elementary character tables
- 19 Tensor products
- 20 Restriction to a subgroup
- 21 Induced modules and characters
- 22 Algebraic integers
- 23 Real representations
- 24 Summary of properties of character tables
- 25 Characters of groups of order pq
- 26 Characters of some p-groups
- 27 Character table of the simple group of order 168
- 28 Character table of GL(2, q)
- 29 Permutations and characters
- 30 Applications to group theory
- 31 Burnside's Theorem
- 32 An application of representation theory to molecular vibration
- Solutions to exercises
- Bibligraphy
- Index
Preface
Published online by Cambridge University Press: 05 June 2012
- Frontmatter
- Contents
- Preface
- 1 Groups and homorphisms
- 2 Vector spaces and linear transformations
- 3 Group representations
- 4 FG-modules
- 5 FG-submodules and reducibility
- 6 Group algebras
- 7 FG-homomorphisms
- 8 Maschke's Theorem
- 9 Schur's Lemma
- 10 Irreducible modules and the group algebra
- 11 More on the group algebra
- 12 Conjugacy classes
- 13 Characters
- 14 Inner products of characters
- 15 The number of irreducible characters
- 16 Character tables and orthogonality relations
- 17 Normal subgroups and lifted characters
- 18 Some elementary character tables
- 19 Tensor products
- 20 Restriction to a subgroup
- 21 Induced modules and characters
- 22 Algebraic integers
- 23 Real representations
- 24 Summary of properties of character tables
- 25 Characters of groups of order pq
- 26 Characters of some p-groups
- 27 Character table of the simple group of order 168
- 28 Character table of GL(2, q)
- 29 Permutations and characters
- 30 Applications to group theory
- 31 Burnside's Theorem
- 32 An application of representation theory to molecular vibration
- Solutions to exercises
- Bibligraphy
- Index
Summary
We have attempted in this book to provide a leisurely introduction to the representation theory of groups. But why should this subject interest you?
Representation theory is concerned with the ways of writing a group as a group of matrices. Not only is the theory beautiful in its own right, but it also provides one of the keys to a proper understanding of finite groups. For example, it is often vital to have a concrete description of a particular group; this is achieved by finding a representation of the group as a group of matrices. Moreover, by studying the different representations of the group, it is possible to prove results which lie outside the framework of representation theory. One simple example: all groups of order p2 (where p is a prime number) are abelian; this can be shown quickly using only group theory, but it is also a consequence of basic results about representations. More generally, all groups of order paqb (p and q primes) are soluble; this again is a statement purely about groups, but the best proof, due to Burnside, is an outstanding example of the use of representation theory. In fact, the range of applications of the theory extends far beyond the boundaries of pure mathematics, and includes theoretical physics and chemistry – we describe one such application in the last chapter.
The book is suitable for students who have taken first undergraduate courses involving group theory and linear algebra.
- Type
- Chapter
- Information
- Representations and Characters of Groups , pp. vii - viiiPublisher: Cambridge University PressPrint publication year: 2001