To introduce the basic techniques of finite group theory with the objective of explaining the ideas needed to solve classification results.

(LO1) Understanding of abstract algebraic systems (groups) by concrete, explicit realisations (permutations, matrices, Mobius transformations).

(LO2) The ability to understand and explain classification results to users of group theory.

(LO3) The understanding of connections of the subject with other areas of Mathematics.

(LO4) To have a general understanding of the origins and history of the subject.

(S1) Problem solving skills

(S2) Logical reasoning

- Definitions and examples.

- Cyclic, dyhedral and symmetric groups.

- Abelian groups. Orders of elements.

- Subgroups, cosets and Lagrange's Theorem.

- Normal subgroups and quotient groups.

- Automorphisms. Semi-direct products.

- The Homomorphism Theorem.

- The Orbit-Stabiliser Theorem.

- Mobius transformations.

- The Sylow Theory. Applications of Sylow Theory to classification problems.