Representation Theory of Finite Groups - 2019 entry

This course is an introduction to the representation theory of finite groups. We will develop the basic theory of finite dimensional representations over the complex numbers. A key result is that such representations are completely reducible and completely determined by their characters. We will also see how characters are used to effectively calculate such decompositions. We will study many examples.

Prerequisite modules: MTH2002 Algebra or equivalent (i.e. ECM2711 Groups, Rings and Fields and ECM2712 Linear Algebra).

The aim of this module is to motivate and develop the basic theory of the representation theory of finite groups both as an abstract theory and through the study of important examples.

On successful completion of this module you should be able to:

Module Specific Skills and Knowledge:

Discipline Specific Skills and Knowledge:

Personal and Key Transferable / Employment Skills and Knowledge:

• Brief review of concepts from group and rings theory (groups, rings, homomorphisms, subgroups, subrings, normal subgroups)
• Brief review of concepts from linear algebra (vector spaces, linear transformations)
• Group representations
• Group algebras
• Modules over a group algebra
• Mascke’s Theorem
• Schur’s Lemma
• Characters
• Inner products of characters
• The number of irreducible characters
• Character tables
• Orthogonality relations
• Normal subgroups and lifted characters
• Tensor products
• Restriction
• Induction
• Examples of character tables
• Algebraic integers
• Burnside’s theorem
• Revision

Referred and deferred assessment will normally be by examination. For referrals, only the examination will count, a mark of 50% being awarded if the examination is passed. For deferrals, candidates will be awarded the higher of the deferred examination mark or the deferred examination mark combined with the original coursework mark.

ELE: http://vle.exeter.ac.uk/

Reading list for this module: