CDS 202, Winter 2009: Difference between revisions
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'''Instructor:''' | |||
: Richard Murray, 109 Steele | |||
: murray@cds.caltech.edu | |||
| | |||
'''Teaching Assistant:''' | |||
: Paul Skerritt | |||
|- | |||
|'''Lectures:''' | |||
: TuTh 9-10:30a | |||
| | |||
'''Office Hours:''' | |||
: TBD | |||
|} __NOTOC__ | |||
=== Course Description === | |||
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 === | === Course Schedule === | ||
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{{cds202-wi08 week|10|10 Mar|12 Mar|Integration on manifolds|mra|8|text|None}} | {{cds202-wi08 week|10|10 Mar|12 Mar|Integration on manifolds|mra|8|text|None}} | ||
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=== 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 (if you are registered for the course, send e-mail to Richard Murray [murray@cds] for the password). | |||
In addition, students may find the following textbooks useful: | |||
* Boothby, An Introduction to Differential Manifolds and Riemannian Geometry, Revised second edition, 2002. | |||
=== Grading === | |||
[[Category:Courses]] | [[Category:Courses]] | ||
Revision as of 18:57, 6 December 2008
|
Instructor:
|
Teaching Assistant:
|
Lectures:
|
Office Hours:
|
Course Description
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 | Lec 1 | Lec 2 | Topic | Reading | Homework |
| 1 | N/A | 8 Jan | Course introduction | None | None |
| 2 | 13 Jan | 15 Jan | Point set topology | MTA Ch 1 | HW #1 (solns) |
| 3 | 20 Jan | 22 Jan | Inverse fcn thm, immersions, submersions | MTA Ch 2 | HW #2 (solns) |
| 4 | 27 Jan | 29 Jan | Manifolds, mappings, tangent space | MTA Ch 3 | HW #3 (solns) |
| 5 | 3 Feb | 5 Feb | Tangent bundle, vector fields | MTA Ch 4 | HW #4 (solns) |
| 6 | 10 Feb | 12 Feb | Distributions, Frobenius theorem | MTA Ch 4 | HW #5 (solns) |
| 7 | 17 Feb | 19 Feb | Lie groups and Lie algebras | MTA Ch 5 | HW #6 (solns) |
| 8 | 24 Feb | 26 Feb | Tensor fields | MTA Ch 6 | HW #7 (solns) |
| 9 | 3 Mar | 5 Mar | Differential forms | MTA Ch 7 | HW #8 (solns) |
| 10 | 10 Mar | 12 Mar | Integration on manifolds | MTA Ch 8 | None |
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 (if you are registered for the course, send e-mail to Richard Murray [murray@cds] for the password).
In addition, students may find the following textbooks useful:
- Boothby, An Introduction to Differential Manifolds and Riemannian Geometry, Revised second edition, 2002.
