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Showing below up to 50 results in range #21 to #70.
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- (hist) Figure 2.9: Responses to a unit step change in the reference signal for different values of the design parameters [3,218 bytes]
- (hist) Figure 2.8: Step responses for a first-order, closed loop system with proportional and PI control [3,197 bytes]
- (hist) Figure 1.11: A feedback system for controlling the velocity of a vehicle [3,185 bytes]
- (hist) Figure 3.2: Illustration of a state model [3,118 bytes]
- (hist) Figure 4.13: Internet congestion control for N identical sources across a single link [3,104 bytes]
- (hist) Figure 2.11: Response to a step change in the reference signal for a system with a PI controller having two degrees of freedom [3,006 bytes]
- (hist) Figure 2.12: Responses of a static nonlinear system [2,966 bytes]
- (hist) Software [2,940 bytes]
- (hist) Biomolecular Feedback Systems [2,836 bytes]
- (hist) Figure 6.5: Modes for a second-order system with real eigenvalues [2,772 bytes]
- (hist) Exercise: Exploring the dynamics of a rolling mill [2,755 bytes]
- (hist) Figure 3.4: Input/output response of a linear system [2,462 bytes]
- (hist) Figure 5.10: Phase portraits for a congestion control protocol running with N = 60 identical source computers [2,401 bytes]
- (hist) Figure 3.28: Response of a neuron to a current input [2,319 bytes]
- (hist) Figure 3.8: Discrete-time simulation of the predator–prey model [2,317 bytes]
- (hist) Figure 6.1: Superposition of homogeneous and particular solutions [2,249 bytes]
- (hist) Figure 3.24: Consensus protocols for sensor networks [2,126 bytes]
- (hist) Supplement: Linear Systems Theory [2,095 bytes]
- (hist) Admin [2,061 bytes]
- (hist) Figure 5.5: Phase portrait and time domain simulation for a system with a limit cycle [2,024 bytes]
- (hist) Figure 5.7: Phase portrait and time domain simulation for a system with a single stable equilibrium point [2,003 bytes]
- (hist) Errata: Example 8.10 missing factor of v, a1 and a2 flipped [2,002 bytes]
- (hist) Bibliography [1,980 bytes]
- (hist) Question: What is a state? How does one determine what is a state and what is not? [1,935 bytes]
- (hist) Question: What is the advantage of having a model? [1,898 bytes]
- (hist) Figure 5.9: Phase portrait and time domain simulation for a system with a single unstable equilibrium point [1,833 bytes]
- (hist) Figure 4.12: Internet congestion control [1,774 bytes]
- (hist) Feedback Principles [1,752 bytes]
- (hist) Figure 5.8: Phase portrait and time domain simulation for a system with a single asymptotically stable equilibrium point [1,732 bytes]
- (hist) Karl J. Åström [1,725 bytes]
- (hist) Figure 5.11: Comparison between phase portraits for a nonlinear system and its linearization [1,659 bytes]
- (hist) Architecture and System Design [1,651 bytes]
- (hist) Figure 5.1: Response of a damped oscillator [1,615 bytes]
- (hist) Figure 5.3: Phase portraits [1,612 bytes]
- (hist) Robust Performance [1,506 bytes]
- (hist) Exercise: Popular articles about control [1,456 bytes]
- (hist) Figure 5.4: Equilibrium points for an inverted pendulum [1,451 bytes]
- (hist) Question: How do you know when your model is sufficiently complex? [1,436 bytes]
- (hist) Figure 5.6: Illustration of Lyapunov’s concept of a stable solution [1,362 bytes]
- (hist) Fundamental Limits [1,305 bytes]
- (hist) PID Control [1,268 bytes]
- (hist) Transfer Functions [1,240 bytes]
- (hist) Question: How are stability, performance and robustness different? [1,210 bytes]
- (hist) Frequency Domain Design [1,200 bytes]
- (hist) Main Page [1,147 bytes]
- (hist) Frequency Domain Analysis [1,129 bytes]
- (hist) Lecture: Introduction to Feedback and Control (Caltech, Fall 2008) [1,104 bytes]
- (hist) Examples [1,100 bytes]
- (hist) Question: Why does the effective service rate f(x) go to zero when x = 0 in the example on queuing systems? [1,048 bytes]
- (hist) Question: How can I go from a continuous time linear ODE to a discrete time representation? [956 bytes]