Group Representations I, TCD 2012/13

Syllabus

The purpose of this course is to give an introduction to representation theory for the case of finite groups (and demonstrate that most of those approaches work well for infinite compact groups). A really important idea in mathematics is that a proper theory for anything should possess enough symmetries, and that for studying mathematical theories it makes sense to study their symmetries. Representation theory is the main instrument for studying symmetries.
The course covers the following topics:

Representation of a group. Examples of representations. Trivial representation. Regular representation.
Equivalent representations. Arithmetics of representations. Irreducible representations. Schur's lemma.
Characters and matrix elements. Orthogonality relations for matrix elements and characters.
Applications. Representations of a product of two groups. Tensor powers of a faithful representation contain all irreducibles as constituents. Dimensions of irreducibles divide the order of the group. Burnside's p^aq^b-theorem.
Set representations. Orbits, intertwining numbers etc.
Representations and character table of A₅.

Learning outcomes

On successful completion of this module, students will be able to:

construct complex irreducible representations for various finite groups of small orders
reproduce proofs of basic results that create theoretical background for dealing with group representations
apply orthogonality relations for characters of finite groups to find multiplicities of irreducible constituents of a representation
apply representation theoretic methods to simplify problems from other areas that "admit symmetries"
identify group theoretic questions arising in representation theoretic problems, and use results in group theory to solve problems on group representations.

Materials

Homework 1 [PDF]
Homework 2 [PDF]
Homework 3 [PDF]
Homework 4 [PDF]
Homework 5 [PDF]
Tutorial 1 [PDF]
Tutorial 2 [PDF]
Sample exam [PDF]

Notes of the course taken by Stiofáin Fordham (use at your own risk) [PDF]

Compound of 5 Cubes in Dodecahedron at Wolfram.com (was used in the lectures to prove that rotations of the dodecahedron form the alternating group A₅).

Textbooks

Three main recommended textbooks are:

Charles W. Curtis, Irving Reiner, "Methods of representation theory (with applications to finite groups and orders)"
William Fulton, Joe Harris, "Representation theory: a first course"
J.-P. Serre, "Linear representations of finite groups"

All three of these books cover (much) more topics than we shall address, but most things we discuss in class is in at least one of them. The most accessible reference might be the second one, the most concise and to the point --- the third one. There are several copies of the third one which School of Maths bought for students taking this course to use, you can borrow them from me when you need them.

Disclaimer

The person who is solely responsible for the choice of content on this page is Vladimir Dotsenko. Any views expressed here do not necessarily represent the official views of Trinity College Dublin.