Measure and Integration Theory II
Syllabus, Master's level, 1MA050
This course has been discontinued.
- Code
- 1MA050
- Education cycle
- Second cycle
- Main field(s) of study and in-depth level
- Mathematics A1F, Mathematics A1F
- Grading system
- Fail (U), Pass (3), Pass with credit (4), Pass with distinction (5)
- Finalised by
- The Faculty Board of Science and Technology, 15 March 2007
- Responsible department
- Department of Mathematics
Entry requirements
BSc, Measure and Integration Theory I
Learning outcomes
In order to pass the course (grade 3) the student should be able to
Higher grades, 4 or 5, require a higher level of proficiency. The student should be able to solve problems of greater complexity, i.e. problems requiring a combination of ideas and methods for their solution, and be able to give a more detailed account of the proofs of important theorems and by examples and counter-examples be able to motivate the scope of various results. Requirements concerning the student's ability to present mathematical arguments and reasoning are greater.
Content
Convergence in measure, almost everywhere, and in Lp. Lp as a normed space. The dual of Lp. Hölder's and Minkowski's inequalities. Real-valued, extended real-valued and complex measures. Riesz's representation theory. Functions of bounded variation. Differentiation of measures and functions. Absolute continuous functions. Complete measures. Regular measures.
Instruction
Lectures and problem solving sessions.
Assessment
Written and, possibly, oral examination at the end of the course. Moreover, compulsory assignments may be given during the course.