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Module Availability |
Spring semester |
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Assessment Pattern |
Unit(s) of Assessment
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Weighting Towards Module Mark( %)
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Coursework: One take-home assignment and one class test
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25%
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Exam: 2 hours, unseen
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75%
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Module Overview |
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Prerequisites/Co-requisites |
Required: MAT2005 Algebra and Codes
Desirable: MAT2006 Groups and Symmetry
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Module Aims |
Galois Theory applies the principles of algebraic structure to questions about the solvability of polynomial equations. The feasibility of certain geometrical constructions is also considered. The course will aim to show the power of abstract algebra to produce practical and applicable results. |
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Learning Outcomes |
On completion students should: (1) have a deeper appreciation of algebraic structures and of the power of linking different structures, using knowledge of the simpler to gain insights into the more complicated; (2) be able to construct simple proofs similar to those met in the course; (3) be able to evaluate the degree of finite field extensions and apply this to geometric examples; (4) be able to evaluate specific Galois groups and relate their structure to that of field extensions and the solvability of polynomial equations. |
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Module Content |
Groups, rings and fields. Field extensions, degree of extension, geometric constructions.
Finite fields.
Normality and separability, field degrees and group orders, automorphisms.
The Galois correspondence, solvable groups, solutions of equations by radicals.
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Methods of Teaching/Learning |
Teaching is by lectures and tutorials. Learning takes place through lectures, tutorials, exercises and class tests. |
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Selected Texts/Journals |
Recommended: Ian Stewart : Galois Theory, CRC Press (1990) or other edition, ISBN 0412345501.
Also useful: Joseph Rotman : Galois Theory (2nd Edition), Springer-Verlag (1998), ISBN 0387985417.
D.J.H. Garling : A Course in Galois Theory, CUP (1986), ISBN 0521312493.
S. Roman : Field Theory, Springer-Verlag (1995), ISBN 0387944079. |
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Last Updated |
04.11.08 |
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