Groups and Rings III 2010

Description

The algebraic notions of groups and rings are of great interest in their own right, but knowledge and understanding of them is of benefit well beyond the realms of pure algebra. Areas of application include, for example, advanced number theory; cryptography; coding theory; differential, finite and algebraic geometry; algebraic topology; representation theory and harmonic analysis including Fourier series. The theory also has many practical applications including, for example, to the structure of molecules, crystallography and elementary particle physics.

Objectives

To introduce students to the basic ideas and methods of modern algebra. At the end of this course students should be able to understand the idea of a group, a ring and an integral domain, and be aware of examples of these structures in mathematics; appreciate and be able to prove the basic results of group theory and ring theory; understand and be able to apply the fundamental theorem of finite abelian groups; understand Sylow's theorems and be able to apply them to prove elementary results about finite groups; appreciate the significance of unique factorization in rings and integral domains.

Content

Topics covered are: (1)Groups, subgroups, cosets and normal subgroups, homomorphisms and factor groups, products of groups, finitely generated abelian groups, groups acting on sets and the Sylow theorems. (2) Rings, integral domains and fields, polynomials, ideals, factorization in integral domains and unique factorization domains.

Linkage

Prerequisite is MATHS 1007A/B Mathematics I (Pass Div I) or both MATHS 1007A/B Mathematics I (Pass Div II) and MATHS 2004 Mathematics IIM (Pass Div I). PURE MTH 2002 Algebra II is assumed knowledge but the necessary material is revised at the start of the course.

This course is not a prerequisite for any specific course, but is a recommended course for students intending to take Honours Pure Mathematics. This course also provides a useful background for PURE MTH 3012 Fields and Geometry III.

Pre-requisites

Recommended Text

A First Course in Abstract Algebra , J.B. Fraleigh.

Supplementary Examinations

Information about supplementary examinations is here on the University's website.

Consulting time

Consulting hour Tuesday 2.30 to 3.30. My office is room 4.19, 10 Pulteney Street. For consulting at other times ring me on 8303 4174 or email me.

Handouts

Monday 1st March
Thursday 5th March
- Class Exercise 1
Tuesday 9th March
- Plagiarism cover sheet
Thursday 12th March
- Tutorial Exercise 2
Thursday 18th March
- Class Exercise 2
Thursday 25th March
- Tutorial Exercise 3
Thursday 1st April
- Class Exercise 3
Monday 19th April
- Information about mid-term examination
- Example questions for mid-term examination
Thursday 22nd April
- Tutorial Exercise 4
Thursday 6th May
- Class Exercise 4
Thursday 13th May
- Tutorial Exercise 5
Thursday 20th May
- Class Exercise 5
Thursday 27th May
- Tutorial Exercise 6
- Semester 2 courses
Friday 3rd June
Monday 6th June
- Scan of last lecture