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Curricular information is subject to change
On successful completion of this module the student should appreciate the shortcomings in the Riemann integral and the necessity for the introduction of the Lebesgue integration; be familiar with the basic theory of sigma algebras,
measurable functions and integrable functions; know the conditions under which it is possible to swap limits and integration; be familiar with applications of measure theory to functional analysis, potential theory and other areas of mathematics.
Student Effort Type | Hours |
---|---|
Lectures | 30 |
Tutorial | 6 |
Specified Learning Activities | 24 |
Autonomous Student Learning | 60 |
Total | 120 |
Not applicable to this module.
Description | % of Final Grade | Timing |
---|---|---|
Examination: End of Semester (2hr) | 80 |
2 hour End of Trimester Exam |
Continuous Assessment: Homework | 20 |
Throughout the Trimester |
Compensation
This module is passable by compensation
Resit Opportunities
End of Semester Exam
Remediation
If you fail this module you may repeat, resit or substitute where permissible