Current announcements
- On Monday, August 6, at 11:00 we will have a Q&A-session about the lecture in room 3.060. Please prepare questions.
- The lecture notes were updated.
- Problem sheet 14 is now available. It will be discussed on Tuesday, July 17.
- Update of the lecture notes.
- On Monday, July 16, there will be a repetition class instead of the lecture.
- The questions for the exams are available here and the registration for the exam is now open (Number of exam 7700046, German title "Numerische Methoden für zeitabhängige partielle Differentialgleichungen", English title "Numerical Methods for Time-Dependent Partial Differential Equations"). The exams take place between August 6 and 17.
- The solution to problem 37 is available here.
- Problem sheet 13 is now available. It will be discussed on Tuesday, July 10.
- Update of the lecture notes.
- The results of the evaluation of the lecture and problem class are ready and can be found here and here.
- Problem sheet 12 is now available. It will be discussed on Tuesday, July 03.
- Update of the lecture notes.
- Problem sheet 11 is now available. It will be discussed on Tuesday, June 26.
- The solution to problem 33 can be downloaded here.
- The lecture notes were updated. Section 8.2 is new.
- Problem sheet 10 is now available. To work on the exercise you will further need the pdf file Gronwall_DixonMcKee.pdf which also can be found here.
- Update of section 7.5 in the lecture notes.
- Update of section 7.4 in the lecture notes.
- Problem sheet 9 is now available. It will be discussed on Tuesday, June 12.
- The solution to the programming exercise 29 is now available for download.
- Problem sheet 8 is now online. It will be discussed on Tuesday, June 05, in room -1.031, building 20.30 (Poolraum) due to the programming exercise.
- Problem sheet 7 is now available. It will be discussed on Tuesday, Mai 29.
- The solution to problem 20 is provided under additional material.
- A sketch of the solution to problem 18 is provided under additional material.
- Problem sheet 6 is now available. It will be discussed on Tuesday, Mai 22.
- Update of section 7.1 in the lecture notes.
- The solution to the programming exercise 15 is now available for download. Because of small changes the files for the exercise are also updated.
- Problem sheet 5 is available for download. It will be discussed on Tuesday, Mai 15.
- The lecture notes were updated.
- Problem sheet 4 is available for download. It will be discussed on Tuesday, Mai 8. Due to the programming exercise the class takes place in room -1.031, building 20.30 (Poolraum). The files can be found in the category problem sheets.
- Problem sheet 3 is available for download. It will be discussed on Friday, Mai 4.
- Problem sheet 2 is available for download.
- The solution to problem 3 is provided under additional material.
- The first problem sheet is now available. It will be discussed on April 17.
- In order to avoid frequent replacements due to obligations of Prof. Hochbruck for the DFG, there is an alternative date for lectures on Tuesday 17:30 in room 3.061. The lecture dates are always announced here.
- Hide old announcements
Persons
- Prof. Dr. Marlis Hochbruck (lectures)
- M.Sc. Constantin Carle (problem classes)
- M.Sc. Jan Leibold (problem classes)
Weekly hours
4 SWS lecture + 2 SWS problem class
Contents and Prerequisites
The aim of this lecture is to construct, analyze and discuss the efficient implementation of numerical methods for time-dependent partial differential equations (pdes). We will consider traditional methods and techniques as well as very recent research.
The students are expected to be familiar with the basics of the numerical analysis of the time integration of ordinary differential equations (Runge-Kutta and multistep methods) and of finite element methods for elliptic boundary element methods. The lecture starts with a review on Runge-Kutta and multistep methods. Some basic knowledge in functional analysis and the analysis of boundary value problem is helpful but the main results will be repeated in the lecture.
Schedule
Lectures
Monday, | 15:45-17:15 in SR 3.061, building 20.30 |
Tuesday, | 17:30-19:00 in SR 3.061, building 20.30 (alternative date) |
Friday, | 9:45-11:15 in SR 3.061, building 20.30 |
Problem classes
Tuesday, | 15:45-17:15 in SR 2.066, building 20.30 |
Weekly schedule
Please note that the dates for the lectures and problem classes may vary from week to week. The dates for the next weeks are listed below. If changes to already announced dates are required they will be highlighted by color.
cw 16: | Mo | 16.4. | (lecture), | Tu | 16.4., 15:45 | (tutorial), | Fr | 20.4. | (lecture) |
cw 17: | Mo | 23.4. | (lecture), | Tu | 24.4., 15:45 | (tutorial), | Fr | 27.4. | (lecture) |
cw 18: | Mo | 30.4. | (lecture), | Fr | 04.5. | (tutorial) | |||
cw 19: | Mo | 07.5. | (lecture), | Tu | 08.5., 15:45 | (tutorial), | Fr | 11.5. | (lecture) |
cw 20: | Mo | 14.5. | (lecture), | Tu | 15.5., 15:45 | (tutorial), | Fr | 18.5. | (lecture) |
cw 21: | Tu | 22.5., 15:45 | (tutorial), | Tu | 22.5., 17:30 | (lecture), | Fr | 25.5. | (lecture) |
cw 22: | Mo | 28.5. | (lecture), | Tu | 29.5., 15:45 | (tutorial), | Fr | 01.6. | (lecture) |
cw 23: | Tu | 05.6., 15:45 | (tutorial), | Tu | 05.6., 17:30 | (lecture), | Fr | 08.6. | (lecture) |
cw 24: | Mo | 11.6. | (lecture), | Tu | 12.6., 15:45 | (tutorial), | Tu | 12.6., 17:30 | (lecture) |
cw 25: | Mo | 18.6. | (lecture), | Tu | 19.6., 15:45 | (tutorial), | Tu | 19.6., 17:30 | (lecture) |
cw 26: | Mo | 25.6. | (lecture), | Tu | 26.6., 15:45 | (tutorial), | Fr | 29.6. | (lecture) |
cw 27: | Mo | 02.7. | (lecture), | Tu | 03.7., 15:45 | (tutorial), | Fr | 06.7. | (lecture) |
cw 28: | Mo | 09.7. | (lecture), | Tu | 10.7., 15:45 | (tutorial), | Tu | 10.7., 17:30 | (lecture) |
cw 29: | Mo | 16.7. | (repetition), | Tu | 17.7., 15:45 | (tutorial), | Fr | 20.7. | (lecture) |
Exam
The registration for the exam is open (Number of exam 7700046, German title "Numerische Methoden für zeitabhängige partielle Differentialgleichungen", English title "Numerical Methods for Time-Dependent Partial Differential Equations"). The exams take place between August 6 and 17.
The format of the exams will be the following:
- Until the end of the semester, we will provide you with a list of possible questions for each chapter of the lecture.
- You randomly draw three questions from this list, each from another chapter. One question can be redrawn from the same chapter with the possibility to answer the original question.
- Then you are given 20 minutes for preparation (without any aid). Any notes that you prepare during this time can be used in the oral exam.
- The actual oral exam will last additional 20 minutes during which you have to answer the questions. This leaves approximatly 7 minutes for each question. If the answer is too short we expect you to present further details of the topic. In order to assure that you understand all aspects of the topic in question, you can always be asked further questions.
- The final grade will be the mean of the grades (1-6) from the three answered questions.
The list of questions can be found here: Questions
Lecture notes (draft version)
The lecture notes provided here are a draft version, since they are written when the lecture progresses. This includes corrections shortly after the corresponding topic was discussed.
I am gratefull for any suggested corrections and improvements.
- lecture notes (version from 23.08.2018)
The lecture notes are a continuation of the lecture notes for the Finite Element Methods from WS 15/16.
Problem sheets
sheet 1, sheet 2, sheet 3, sheet 4, sheet 5, sheet 6, sheet 7, sheet 8, sheet 9, sheet 10, sheet 11, sheet 12, sheet 13, sheet 14
Additional material:
- solution to problem 3
- files for problem 15 (updated)
- solution to problem 15
- sketch of solution to problem 18
- sketch of solution to problem 20
- files for problem 29 (updated)
- solution to problem 29
- Gronwall_DixonMcKee
- solution to problem 33
- solution to problem 37
Literature
- M. Hochbruck, lecture notes
- M. Hochbruck, lecture notes "Numerik I, Numerik II & Numerische Methoden für Differentialgleichungen"
- S. Brenner, R. Scott, The Mathematical Theory of Finite Element Methods, Springer Texts in Appl. Mathematics, Vol 15, Springer-Verlag, 3rd ed., 2008
- D. Braess, Finite Elements, Cambridge University Press, 3rd ed., 2007