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Curricular information is subject to change
The student will know:
-the basic properties of rings and modules, including chain conditions and composition series,
-simple and semisimple rings and modules, including the Wedderburn-Artin structure results,
-the Jacobson radical and its links with semisimplicity.
Student Effort Type | Hours |
---|---|
Lectures | 24 |
Practical | 12 |
Autonomous Student Learning | 90 |
Total | 126 |
Prior to taking this module, students should have completed:
1) a reasonably advanced course in linear algebra similar to (for example) MATH20300.
2) an introductory first course on groups or rings. This course should contain at least a presentation of these objects and of their first properties (subgroups or ideals, quotients, morphisms). MATH20310 is an example of such a course.
All questions about eligibility (in particular if you think the meet the requirements but have not passed MATH20300 and MATH20310) should be addressed to the module coordinator.
Description | Timing | Component Scale | % of Final Grade | ||
---|---|---|---|---|---|
Examination: End of trimester exam. | 2 hour End of Trimester Exam | No | Standard conversion grade scale 40% | No | 75 |
Examination: Mid-term exam. The timing of the midterm can be slightly changed in order to accommodate everyone. | Week 7 | No | Standard conversion grade scale 40% | No | 25 |
Resit In | Terminal Exam |
---|---|
Autumn | Yes - 2 Hour |
• Feedback individually to students, post-assessment
• Group/class feedback, post-assessment
Not yet recorded.