CDS 202, Spring 2013: Difference between revisions
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* Katie Broersma | * Katie Broersma | ||
'''Office hours/recitations:''' | '''Office hours/recitations:''' | ||
* | * Recitations: TBD | ||
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| <br>2 || 5 Apr (F) <br> 10 Apr (W) | | <br>2 || 5 Apr (F) <br> 10 Apr (W) | ||
| Point set topology || {{cds202-sp13 pdf|caltech/MTA-ch1.pdf|MTA, 1.1-1.5}} || HW 1 | | Point set topology || {{cds202-sp13 pdf|caltech/MTA-ch1.pdf|MTA, 1.1-1.5}} || {{cds202-sp13 pdf|hw1.pdf|HW 1}} | ||
|- valign=top | |- valign=top | ||
| <br>3 || 12 Apr (F) <br> 15 Apr (M) | | <br>3 || 12 Apr (F) <br> 15 Apr (M) | ||
| Manifolds, maps, tangent spaces || {{cds202-sp13 pdf|caltech/MTA-ch2.pdf|MTA 2.3-2.4}}, | | Manifolds, maps, tangent spaces || {{cds202-sp13 pdf|caltech/MTA-ch2.pdf|MTA 2.3-2.4}}, {{cds202-sp13 pdf|caltech/MTA-ch3.pdf | 3.1-3.3}},<br>Boothby II.1-II.3, III.1-III.3 | ||
| {{cds202-sp13 pdf|hw2.pdf|HW 2}} | |||
|- valign=top | |- valign=top | ||
| 4 || 24 Apr (W) <br> 26 Apr (F) | | 4 || 24 Apr (W) <br> 26 Apr (F) | ||
| Immersions, submersions, inverse function theorem || {{cds202-sp13 pdf|caltech/MTA-ch2.pdf|MTA 2.5}}, | | Immersions, submersions, inverse function theorem || {{cds202-sp13 pdf|caltech/MTA-ch2.pdf|MTA 2.5}}, {{cds202-sp13 pdf|caltech/MTA-ch3.pdf|3.5}} | ||
| {{cds202-sp13 pdf|hw3.pdf|HW 3}} | |||
|- valign=top | |- valign=top | ||
| 5 || 29 Apr (M) <br> 1 May (W) | | 5 || 29 Apr (M) <br> 1 May (W) | ||
| Tangent bundle, vector fields, flows || MTA 3. | | Tangent bundle, vector fields, flows || {{cds202-sp13 pdf|caltech/MTA-ch3.pdf|MTA 3.5}}, {{cds202-sp13 pdf|caltech/MTA-ch4.pdf|4.1-4.2}} | ||
| {{cds202-sp13 pdf|hw4.pdf|HW 4}} | |||
|- valign=top | |- valign=top | ||
| 6 || 6 May (M) <br> 10 May (F) | | 6 || 6 May (M) <br> <s>10 May (F)</s> <br> <font color=blue>9 May@12p</font> | ||
| Distributions, Frobenius theorem || MTA 4.2, 4.4 || HW 5 | | Distributions, Frobenius theorem || {{cds202-sp13 pdf|caltech/MTA-ch4.pdf|MTA 4.2, 4.4}} | ||
| {{cds202-sp13 pdf|hw5.pdf|HW 5}} | |||
|- valign=top | |- valign=top | ||
| 7 || 13 May (M) <br> 15 May (W) | | 7 || 13 May (M) <br> 15 May (W) | ||
| Lie groups and Lie algebras || MTA 5.1-5.2 || HW 6 | | Lie groups and Lie algebras || {{cds202-sp13 pdf|caltech/MTA-ch5.pdf|MTA 5.1-5.2}} | ||
| {{cds202-sp13 pdf|hw6.pdf|HW 6}} | |||
|- valign=top | |- valign=top | ||
| 8 || 20 May | | 8 || 20 May<font color=blue>@4p</font> <br> 22 May (W) | ||
| Applications of Lie groups || MTA 5.3 + KM94 || HW 7 | | Applications of Lie groups || {{cds202-sp13 pdf|caltech/MTA-ch5.pdf|MTA 5.3}} + [http://www.cds.caltech.edu/~murray/preprints/cds94-014.pdf KM94] | ||
| {{cds202-sp13 pdf|hw7.pdf|HW 7}} | |||
|- valign=top | |- valign=top | ||
| 9 || 29 May ( | | 9 || 29 May (W) <br> 31 May (F) | ||
| Differential forms || MTA 6.1-6.2, 7.1-7.3 || HW 8 | | Differential forms || {{cds202-sp13 pdf|caltech/MTA-ch6.pdf|MTA 6.1-6.2}}, {{cds202-sp13 pdf|caltech/MTA-ch7.pdf|7.1-7.3}} | ||
| {{cds202-sp13 pdf|hw8.pdf|HW 8}} | |||
|- valign=top | |- valign=top | ||
| 10 || 3 Jun (M) <br> 5 Jun (W) | | 10 || 3 Jun (M) <br> 5 Jun (W) | ||
| Integration on manifolds, exterior derivative || MTA 7.4-7.5,8.1-8.3 || | | Integration on manifolds, exterior derivative || {{cds202-sp13 pdf|caltech/MTA-ch7.pdf|MTA 7.4-7.5}}, {{cds202-sp13 pdf|caltech/MTA-ch8.pdf|8.1-8.3}} | ||
| {{cds202-sp13 pdf|hw9.pdf|HW 9}} | |||
|} | |} | ||
Latest revision as of 15:27, 2 June 2013
This is the homepage for ACM/CDS 202 (Geometry of Nonlinear Systems) for Spring 2013.
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Instructor:
Lectures and course mailing list:
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Teaching Assistant:
Office hours/recitations:
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Course Description
ACM/CDS 202. Geometry of Nonlinear Systems. 9 units (3-0-6); second term. Prerequisites: CDS 201 or AM 125 a. Basic differential geometry, oriented toward applications in control and dynamical systems. Topics include smooth manifolds and mappings, tangent and normal bundles. Vector fields and flows. Distributions and Frobeniuss theorem. Matrix Lie groups and Lie algebras. Exterior differential forms, Stokes theorem.
Course Schedule
| Week | Date | Topic | Reading | Homework |
|---|---|---|---|---|
| 1 | 3 Apr (W) | Course introduction, scheduling | Mur94-NAS | None |
| 2 |
5 Apr (F) 10 Apr (W) |
Point set topology | MTA, 1.1-1.5 | HW 1 |
| 3 |
12 Apr (F) 15 Apr (M) |
Manifolds, maps, tangent spaces | MTA 2.3-2.4, 3.1-3.3, Boothby II.1-II.3, III.1-III.3 |
HW 2 |
| 4 | 24 Apr (W) 26 Apr (F) |
Immersions, submersions, inverse function theorem | MTA 2.5, 3.5 | HW 3 |
| 5 | 29 Apr (M) 1 May (W) |
Tangent bundle, vector fields, flows | MTA 3.5, 4.1-4.2 | HW 4 |
| 6 | 6 May (M) 9 May@12p |
Distributions, Frobenius theorem | MTA 4.2, 4.4 | HW 5 |
| 7 | 13 May (M) 15 May (W) |
Lie groups and Lie algebras | MTA 5.1-5.2 | HW 6 |
| 8 | 20 May@4p 22 May (W) |
Applications of Lie groups | MTA 5.3 + KM94 | HW 7 |
| 9 | 29 May (W) 31 May (F) |
Differential forms | MTA 6.1-6.2, 7.1-7.3 | HW 8 |
| 10 | 3 Jun (M) 5 Jun (W) |
Integration on manifolds, exterior derivative | MTA 7.4-7.5, 8.1-8.3 | HW 9 |
Course Text
The primary course text is the third edition of Manifolds, Tensor Analysis, and Applications:
- Marsden, Ratiu and Abraham, Manifolds, Tensor Analysis, and Applications (only available to students enrolled in course).
In addition, students may find the following textbooks useful:
- Boothby, An Introduction to Differential Manifolds and Riemannian Geometry, Revised second edition, 2002.
Grading
The final grade will be based on homework and a final exam:
- Homework (75%) - There will be 8 one-week problem sets, due in class one week after they are assigned. Late homework will not be accepted without prior permission from the instructor.
- Final exam (25%) - The final will be handed out the last day of class and is due back at the end of finals week. Open book, time limit to be decided (likely N hours over a 4-8N hour period).
The lowest homework score you receive will be dropped in computing your homework average. In addition, if your score on the final is higher than the weighted average of your homework and final, your final will be used to determine your course grade.
Collaboration Policy
Collaboration on homework assignments is encouraged. You may consult outside reference materials, other students, the TA, or the instructor. Use of solutions from previous years in the course is not allowed. All solutions that are handed should reflect your understanding of the subject matter at the time of writing.
No collaboration is allowed on the final exam.
