Difference between revisions of "Algorithms for Scientific Computing - Summer 17"

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[http://www5.in.tum.de/lehre/vorlesungen/asc/ss17/blatt5/ws5_solution.ipynb Ws5 solution Notebook]  
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| 6 || Hierarchical Basis || [http://www5.in.tum.de/lehre/vorlesungen/asc/ss17/blatt6/ws6.pdf Worksheet 6] || Jun. 07 ||  
| 6 || Hierarchical Basis || [http://www5.in.tum.de/lehre/vorlesungen/asc/ss17/blatt6/ws6-new.pdf Worksheet 6] || Jun. 07 ||  
[http://www5.in.tum.de/lehre/vorlesungen/asc/ss17/blatt6/ws6_solution_ex1-2.ipynb Ws6 Ex1-2 solution Notebook] [http://www5.in.tum.de/lehre/vorlesungen/asc/ss17/blatt6/ws6_solution_ex3.pdf Ws6 Ex3 solution]  
[http://www5.in.tum.de/lehre/vorlesungen/asc/ss17/blatt6/ws6_solution_ex1-2.ipynb Ws6 Ex1-2 solution Notebook] [http://www5.in.tum.de/lehre/vorlesungen/asc/ss17/blatt6/ws6_solution_ex3.pdf Ws6 Ex3 solution]  

Revision as of 12:09, 19 July 2017

Summer 2017
Univ.-Prof. Dr. Michael Bader
Time and Place
Lecture: Mon 8:30-10:00, Fri 10:15-11:45, MI Hörsaal 2 (1st lecture: Mon, Apr 24)
Tutorial: Wed 10:15-11:45, MI 00.13.09A
see module description (IN2001) in TUMonline
Emily Mo-Hellenbrand, M.Sc., Jean-Matthieu Gallard, M.Sc.
Mon, Aug 7, 10.30 in lecture hall MI HS 1 (F.L. Bauer Hörsaal)
Semesterwochenstunden / ECTS Credits
6 SWS (4V + 2Ü) / 8 Credits

News & Announcements

  • The tutorial on Wednesday 12.07 will include the beginning of the lecture on space-filling curve
  • The Mock Exam and its solution is now posted in the "Worksheets and Solutions" table. Please note:
    • Disclaimer: this mock exam merely serves the purpose of giving you some ideas/hints on what to expect in the actual exam (e.g., exam format, possible questions, difficulty levels). Please do NOT assume that you will get the same (or very similar) questions in the actual exam, as there are many ways to ask a question on the same subject!
    • Exam coverage: You should prepare for all 4 topics, i.e., FFT, Hier. methods, Sparse grids, SFC. And you should expect questions from all lecture slides (except for Red parts) and worksheet exercises. Pseudo code questions are possible to appear.
    • Preparation hint: Try to solve & understand all the exercises in the worksheets and the mock exam.
  • The supplement material of transforming the regularization formula into a linear system (Lecture July 10, slide 18) is uploaded.
  • Worksheet 9 code template is updated (fixed compatibility issues with Python 3). Please re-download the template zip. NOTE: you need the files supplied in the template zip to run the Worksheet 9 code solution.
  • Worksheet 7 solution is updated (mistake in ex4 corrected). Please re-check the solution!
  • please re-check the solution of exercise 1 on worksheet 4; this has been corrected!
  • as an exception, the lecture on Fri, May 19, will start at 10.30 (until 12.00)

What's ASC about?

Many applications in computer science require methods of (numerical) mathematics - especially in science and engineering, of course, but also in surprisingly many areas that one might suspect to be directly at the heart of computer science:

Consider, for example, Fourier and wavelet transformations, which are indispensable in image processing and image compression. Similar, numerical methods for approximation have become essential techniques for high-dimensional classification problems in data science. Essentially, these methods come down to the question of how to represent and process information or data as (multi-dimensional) continuous functions. "Algorithms for Scientific Computing" thus provides an algorithmically oriented introduction to the foundations of such mathematical methods.

Topics include:

  • The fast Fourier transformation (FFT) and some of its variants:
    • FCT (Fast Cosine Transform), real FFT, Application for compression of video and audio data
  • Hierarchical and recursive methods in scientific computing
    • From Archimedes' quadrature to the hierarchical basis
    • Classification problems
    • From the hierarchical basis to wavelets
  • High-demonsional problems
    • Sparse grids and the sparse-grid combination technique
  • Octrees and Space filling curves (SFCs):
    • Tree-structured (hierarchical) adaptivity
    • Construction and properies of SFCs
    • Application for parallelization and to linearize multidimensional data spaces in data bases

Lecture Slides and Supplementary Materials

Lecture slides are published here successively. For future lectures, the respective slides from summer 2016 will be linked.

Fast Fourier Transform

Hierarchical Methods

Sparse Grids

Space-Filling Curves

Worksheets and Solutions

Number Topic Worksheet Tutorial Solution
1 Discrete Fourier Transform I Worksheet 1Python Introduction Apr. 26

Ws1 solution Ws1 solution Notebook

2 Discrete Fourier Transform II Worksheet 2 Worksheet 2 Notebook template May 3

Ws2 solution Ws2 solution Notebook Ws2 Ex2 solution code

- - - May 10 tutorial cancelled due to student assembly
3 Discrete Cosine Transform Worksheet 3 Worksheet 3 Notebook template Template Exercise 1 May 17

Ws3 solution Ws3 solution code

4 Discrete Fourier Transform III Worksheet 4 May 24

Ws4 solution

5 Numerical Quadrature 1D Worksheet 5 Worksheet 5 Notebook template May 31

Ws5 solution Notebook

6 Hierarchical Basis Worksheet 6 Jun. 07

Ws6 Ex1-2 solution Notebook Ws6 Ex3 solution

7-Part1 Function Approximation and Wavelet Ex1-3: Worksheet 7 Worksheet 7 Notebook template Jun. 14

Ws7 solution

7-Part2 Function Approximation and Wavelet Ex4-5: See above Jun. 21 See above
8 Multi-dimensional Quadrature Worksheet 8 Worksheet 8 template Jun. 28

Ws8 solution

9 Multi-dimensional hierarchization and adaptive sparse grids Worksheet 9 Worksheet 9 code template Jul. 05

Ws9 code solution Ws9 Ex2 solution

- Mock Exam Mock exam -

Mock exam solution

10 Grammars for space-filling curves Worksheet 10 Worksheet 10 code template Notebook template Jul. 12
11 Arithmetization of space-filling curves Worksheet 11 code template Notebook template Jul. 19

Jupyter Notebook


  • type: written exam, duration: 100 min
  • time, date, room: Mon, Aug 7, 2017, 10.30-12.10 (MI HS 1, Friedrich L. Bauer Hörsaal)
    • note that the exam will start precisely on 10.30; please be in the exam room by 10.15, at the latest!
  • helping material:
    • you may use one hand-written sheet of paper (size A4, front and back may be used)
    • no other helping material of any kind is allowed
  • extra session for questions: t.b.a.

Literature and Additional Material

Books that are labeled as "available as e-book" can be accessed as e-book via the TUM library - see the ebooks website of the library for details on how to access the books.

Fast Fourier Transform:

The lecture is oriented on:

Hierarchical Methods and Sparse Grids


Space-filling Curves:

Background Material Concerning Scientific and High Performance Computing