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Welcome to the course! The schedule for the course can be found in TimeEdit.
The list with the questiones for the oral examination can be found here.
Teachers
Course coordinator: Maria Roginskaya
Course literature
Gerald B. Folland, Real Analysis: Modern Techniques and Their Applications, 2nd ed. Wiley 1999, Chapters 1-3. (abbreviated F below) (Warning: At many bookstores, they sell what may appear to be a paperback version of the book, but unfortunately it is only something of a glossary. The real book is available only in hardback.) You also will need this book for the next course MMA120 Functional Analysis
Johan Jonasson, (abbreviated JJ below) notes can be downloaded here
Preliminary program
Lectures
| Day | Sections | Contents |
|---|---|---|
| 3/9 | F pp.19-22 JJ 3.1,2,5 |
Why can we not measure all sets? Concept of ?-algebra. ?- and d-systems. Dynkin lemma |
| 6/9 | JJ 3.7 + Thm 3.10 F 1.3,4 |
Outer measure, Caratheodory's theorem |
| 7/9 | F 2.1,2 up to (but not including) Thm 2.14 JJ 5 till Thm 5.6 |
Measurable functions, integration of non-negative functions. |
| 13/9 | F Thm 2.14-20, F 2.3 till p.55 | Monotone convergence theorem, integration of complex valued functions, Lebesgue’s dominated convergence theorem |
| 14/9 | F 2.4 | Modes of convergence |
| 20/9 | F p.22-23+ F2.5 | Product ?-algebras, product measures, Fubini-Tonelli theorem |
| 24/9 | JJ p.16,pp.21-22,24-25 | Lebesgue-Stieltjes measures, Expectations, Independent random variables |
| 27/9 | JJ pp.9-10, 26-28 | Borell-Cantelli lemmas, I and II, Kolmogorov’s 0-1 law |
| 28/9 | F 3.1 | Signed measures, Jordan-Hahn decomposition theorem |
| 1/10 | F 3.2 | Radon-Nikodym theorem,Lebesgue’s decomposition theorem |
| 4/10 | F pp.95-96 | 3-times covering lemma, Hardy-Littlewood maximal function, maximal theorem |
| 5/10 | F pp.97-100 | Lebesgue’s differentiation theorem |
| 8/10 | F pp. 101-104 | Functions of bounded variation |
| 11/10 | F pp. 105-107 | Fundamental theorem of calculus and integration by parts for Lebesgue integral |
| 15/10 18/10 19/10 |
Presentations of reading projects | |
| 22/10 | Reserv |
Recommended exercises
F 1.2.4
F 1.4.17, 1.4.18, 1.4.24
F 2.2.13, 2.2.15
F 2.4.33-39,42
F 2.5.45,(46),48
Read examples on JJ pp.21-22
F 3.1.1, 2, 3, 6
F 3.2.8,10, 11, 12*, 13
F 3.2.16, 17
F 3.4.22, 23
F 3.4.24, 25, 26
F 3.5.30, 31, 32
F 3.5.33, 40, 41
Course requirements
The learning goals of the course can be found in the course plan.
Projects
The list of projects approved this year will come later
Examination
The course is examined by a short reading project towards the end of the course, and a combination of written and oral examination. Dates for the oral examination will be agreed on during the course.
Examination procedures
In Chalmers Student Portal you can read about when exams are given and what rules apply on exams at Chalmers. In addition to that, there is a schedule when exams are given for courses at University of Gothenburg.
Before the exam, it is important that you sign up for the examination. If you study at Chalmers, you will do this by the Chalmers Student Portal, and if you study at University of Gothenburg, you sign up via GU's Student Portal, where you also can read about what rules apply to examination at University of Gothenburg.
At the exam, you should be able to show valid identification.
After the exam has been graded, you can see your results in Ladok by logging on to your Student portal.
At the annual (regular) examination:
When it is practical, a separate review is arranged. The date of the
review will be announced here on the course homepage. Anyone who can not
participate in the review may thereafter retrieve and review their exam
at the Mathematical
Sciences Student office. Check that you have the right grades and
score. Any complaints about the marking must be submitted in writing at
the office, where there is a form to fill out.
At re-examination:
Exams are reviewed and retrieved at the Mathematical
Sciences Student office. Check that you have the right grades and
score. Any complaints about the marking must be submitted in writing at
the office, where there is a form to fill out.
Old exams