Digital Control Systems: Difference between revisions
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**[http://eceweb1.rutgers.edu/~gajic/psfiles/observers.pdf Zoran Gajic's notes on Observers.] This is a very short set of lecture notes that explains the why's of observers, with several interesting derivations. |
**[http://eceweb1.rutgers.edu/~gajic/psfiles/observers.pdf Zoran Gajic's notes on Observers.] This is a very short set of lecture notes that explains the why's of observers, with several interesting derivations. |
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*Papers |
*Papers |
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**[ |
**[http://docphdpersonalstuff.googlecode.com/svn/trunk/literature/an%20introduction%20to%20observers.pdf David Luenberger's Review of Observers] |
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===MATLAB/Octave=== |
===MATLAB/Octave=== |
Revision as of 09:28, 12 May 2014
Links
- Textbooks
- Introduction to Applied Digital Control, Greg Starr, University of New Mexico
- Greg's ME481/ME581 web pages contain solutions to the book problems and other things.
- Optimal Sampled-Data Control Systems, Chen & Francis
- Digital Control System Analysis and Design, 3rd Ed., Philips
- Control Systems and Control Engineering
- Introduction to Signal Processing
- Zoran Gajic's Book on Control Systems (Continuous & Discrete) and some other documents. Look for the documents entitled Chapter N.
- Introduction to Applied Digital Control, Greg Starr, University of New Mexico
- Lectures
- Sampled Time Control
- Zoran Gajic's notes on Observers. This is a very short set of lecture notes that explains the why's of observers, with several interesting derivations.
- Papers
MATLAB/Octave
- Octave Control Systems Toolbox This is not the same thing that is on Octave Forge here.
Z Transforms
- Relationship between the Laplace and Z transforms
- Convolution and Z Transforms
- Z Transforms and Convolution
- Here is an animation of convolution with continuous signals. Look at it so you understand what is happening with the mechanics of convolution. To convolve with , you flip shift into on the axis, then you multiply it by to get , then you integrate with respect to , so that the convolution is: . The first animation shows this happening with sampled waveforms: and .
- Notice that this is really the same as Polynomial Multiplication.
Discretization
- This is how the c2d zero order hold works in MATLAB/octave. It uses the "exact" solution to the discretization problem.
- Also check Chapter 7.3 of Greg Starr's book.