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Module Availability |
Semester 2 |
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Assessment Pattern |
Assessment Pattern
Unit(s) of Assessment
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Weighting Towards Module Mark( %)
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Class tests
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25
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Examination: two hours unseen
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75
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Qualifying Condition(s)
A weighted aggregate mark of 40% is required to pass this module.
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Module Overview |
This module extends the group theory and ring theory introduced at Level 2. |
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Prerequisites/Co-requisites |
MAT1016 Linear Algebra MAT2006 Groups and Symmetry or MAT2048 Groups & Rings or MAT3001 Galois Theory
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Module Aims |
The module aims to extend students' knowledge of abstract algebra and their appreciation of the inter-connectedness of the different areas of the subject. |
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Learning Outcomes |
Students should acquire a deeper knowledge of groups and rings. They will become familiar with some classical theorems in algebraic structure theory and will have an introduction to Algebras. |
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Module Content |
Topics covered will include some or all of: • Further group theory. Group actions, conjugacy. The class equation. • Cauchy's theorem and the Sylow theorems. • Further ring theory. Division rings. The quaternions. • Maximal and prime ideals, principal ideal domain, euclidean domains. • Representations of groups and rings. • Algebras. Group algebras. Wedderburn's structure theorem.
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Methods of Teaching/Learning |
Teaching is by lectures and tutorials, 3 hours per week for 11 weeks. Learning takes place through lectures, tutorials, exercises and class tests.
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Selected Texts/Journals |
J. B. Fraleigh, A First Course in Abstract Algebra, Addison-Wesley (2003), ISBN 0321156080 M.A. Armstrong, Groups and Symmetry, Springer-Verlag, (1988), ISBN 0387966757 R. B. J. T. Allenby, Rings, Fields and Groups, Arnold (1991), ISBN. 0340544406 W. Gilbert and W. Nicholson : Modern Algebra with Applications, Wiley (2004), ISBN 0471414514
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Last Updated |
3 May 2011 |
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