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Outline. IntroductionTest Input SignalsPerformance of a second-order systemEffects of a Third Pole and a Zero on the Second-Order System ResponseEstimation of the Damping RatioThe s-plane Root Location and the Transient Response. 2. Control Systems. References for reading. R.C. Dorf and R.H. Bishop, Modern Control Systems,11th Edition, Prentice Hall, 2008,Chapter 5.1 - 5.122. J.J. DiStefano, A. R. Stubberud, I. J. Williams, Feeedback and Control Systems, Schaum's Outline Series, Mc29
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1. Performance of Feedback Control Systems
Prof. Marian S. Stachowicz
Laboratory for Intelligent Systems
ECE Department, University of Minnesota Duluth
February 25 – March 2, 2010
2. Outline Introduction
Test Input Signals
Performance of a second-order system
Effects of a Third Pole and a Zero on the Second-Order System Response
Estimation of the Damping Ratio
The s-plane Root Location and the Transient Response 2 Control Systems Objectives
The ability to adjust the transient and steady-state response of a feedback control system is a beneficial outcome of the design of control systems. One of the first steps in the design process is to specify the measures of performance. In this chapter we introduce the common time-domain specifications such as percent overshoot, settling time, time to peak, time to rise, and steady-state tracking error. We will use selected input signals such as the step and ramp to test the response of the control system. The correlation between the system performance and the location of the system transfer function poles and zeros in the s-plane is discussed. We will develop valuable relationships between the performance specifications and the natural frequency and damping ratio for second-order systems. Relying on the notion of dominant poles, we can extrapolate the ideas associated with second-order systems to those of higher order.
Objectives
The ability to adjust the transient and steady-state response of a feedback control system is a beneficial outcome of the design of control systems. One of the first steps in the design process is to specify the measures of performance. In this chapter we introduce the common time-domain specifications such as percent overshoot, settling time, time to peak, time to rise, and steady-state tracking error. We will use selected input signals such as the step and ramp to test the response of the control system. The correlation between the system performance and the location of the system transfer function poles and zeros in the s-plane is discussed. We will develop valuable relationships between the performance specifications and the natural frequency and damping ratio for second-order systems. Relying on the notion of dominant poles, we can extrapolate the ideas associated with second-order systems to those of higher order.
3. References for reading
R.C. Dorf and R.H. Bishop, Modern Control Systems,
11th Edition, Prentice Hall, 2008,
Chapter 5.1 - 5.12
2. J.J. DiStefano, A. R. Stubberud, I. J. Williams, Feeedback and Control Systems, Schaum's Outline Series, McGraw-Hill, Inc., 1990
Chapter 9 3 Control Systems
4. Test Input Signal Since the actual input signal of the system is usually unknown, a standard test input signal is normally chosen. Commonly used test signals include step input, ramp input, and the parabolic input. 4 Control Systems In a radar tracking system for antiaircraft missiles, the position and speed of the target to be tracked may vary in an unpredictable manner.
From the step function to the parabolic function, they become progressively faster with respect to time.
For the purposes of analysis and design, it is necessary to assume some basic types of test inputs so that the performance of a system can be evaluated.
The responses due to these inputs allow the prediction of the system’s performance to other more complex inputs.
In a radar tracking system for antiaircraft missiles, the position and speed of the target to be tracked may vary in an unpredictable manner.
From the step function to the parabolic function, they become progressively faster with respect to time.
For the purposes of analysis and design, it is necessary to assume some basic types of test inputs so that the performance of a system can be evaluated.
The responses due to these inputs allow the prediction of the system’s performance to other more complex inputs.
5. General form of the standard test signals 5 Control Systems
6. Test signals r(t) = A tn 6 Control Systems The ramp signal is the integral of the step input, and the parabola is is the integral of the ramp input. The unit impulse function is also useful for test signal purposes.
The responses due to these inputs allow the prediction of the system’s performance to other more complex inputs.
The ramp signal is the integral of the step input, and the parabola is is the integral of the ramp input. The unit impulse function is also useful for test signal purposes.
The responses due to these inputs allow the prediction of the system’s performance to other more complex inputs.
7. Table 5.1 Test Signal Inputs 7 Control Systems Step-for representation a stationary target
Ramp- for track a constant angular position (first derivatives are constant)
Parabolas- can be used to represent accelerating targets (second derivatives are constant) Step-for representation a stationary target
Ramp- for track a constant angular position (first derivatives are constant)
Parabolas- can be used to represent accelerating targets (second derivatives are constant)
8. fig_07_01 8 Control Systems 1.Step inputs represent constant position.
An antenna position control is an example of a system that can be tested for accuracy using step function for control of the satellite in geostationary orbit.
2. Ramp inputs represent constant velocity inputs.
A position control system that tracks a satellite that moves across the sky at constant angular velocity
3. Parabolas, whose second derivatives are constant, represent constant-acceleration inputs to position control systems and can be used to represent accelerating targets, such as missile, to determine the steady-state error performance..1.Step inputs represent constant position.
An antenna position control is an example of a system that can be tested for accuracy using step function for control of the satellite in geostationary orbit.
2. Ramp inputs represent constant velocity inputs.
A position control system that tracks a satellite that moves across the sky at constant angular velocity
3. Parabolas, whose second derivatives are constant, represent constant-acceleration inputs to position control systems and can be used to represent accelerating targets, such as missile, to determine the steady-state error performance..
9. Steady-state error Is a difference between input and the output for a prescribed test input as
9 Control Systems
10. Application to stable systems Unstable systems represent loss of control in the steady state and are not acceptable for use at all. 10 Control Systems The expressions we derive to calculate the steady-state error can be applied erroneously to unstable system.
Thus the engineer must check the system for stability while performing steady-state error analysis and design.
We assume that all the systems in examples are stable.The expressions we derive to calculate the steady-state error can be applied erroneously to unstable system.
Thus the engineer must check the system for stability while performing steady-state error analysis and design.
We assume that all the systems in examples are stable.
11. fig_07_02 11 Control Systems Fig. a Output 1 has zero-steady-state error, and output 2 has a finite steady-state error
Fig. b Output 3 steady-state error is infinite as measured vertically between input and output 3 after the transients have died down, and t approaches infinity Fig. a Output 1 has zero-steady-state error, and output 2 has a finite steady-state error
Fig. b Output 3 steady-state error is infinite as measured vertically between input and output 3 after the transients have died down, and t approaches infinity
12. Time response of systems
c(t) = ct(t) + css(t)
The time response of a control system is divided
into two parts:
ct(t) - transient response
css(t) - steady state response
12 Control Systems The time response of a control system is divided into two parts: the transient response and the steady-state response.
The time response of a control system is divided into two parts: the transient response and the steady-state response.
13. Transient response All real control systems exhibit transient phenomena to some extend before steady state is reached.
13 Control Systems
14. Steady-state response The response that exists for a long time following any input signal initiation. 14 Control Systems
15. fig_04_01 15 Control Systems A pole of the input function generates the form of the forced response ( that is the pole at the origin generated a step function at the output.
A pole of the transfer function generate the form of the exponential response
A pole on the real axis generate an exponential response of the form Exp[-at] where -a is the pole location on real axis. The farther to the left a pole is on the negative real axis, the faster the exponential transit response will decay to zero.
4. The zeros and poles generate the amplitudes for both the transit and steady state responses ( see A, B in partial fraction extension)A pole of the input function generates the form of the forced response ( that is the pole at the origin generated a step function at the output.
A pole of the transfer function generate the form of the exponential response
A pole on the real axis generate an exponential response of the form Exp[-at] where -a is the pole location on real axis. The farther to the left a pole is on the negative real axis, the faster the exponential transit response will decay to zero.
4. The zeros and poles generate the amplitudes for both the transit and steady state responses ( see A, B in partial fraction extension)
16. Poles and zeros A pole of the input function generates the form of the forced response ( that is the pole at the origin generated a step function at the output).
A pole of the transfer function generate the form of the exponential response
3. The zeros and poles generate the amplitudes for both the transit and steady state responses ( see A, B in partial fraction extension) 16 Control Systems
17. fig_04_02 17 Control Systems
18. fig_04_03 18 Control Systems Write the output, c(t), in general terms. Specify the transit and steady state parts of solutions for t > 0.
By inspection, each system pole generate an exponential as part of transient response. The input’ pole generates the steady-state response.Write the output, c(t), in general terms. Specify the transit and steady state parts of solutions for t > 0.
By inspection, each system pole generate an exponential as part of transient response. The input’ pole generates the steady-state response.
19. fig_04_04 19 Control Systems First order system without zeros., where the input pole at the origin generate the steady-state css(t)=1 and the system pole at - a , generate the transit response -Exp(-at)First order system without zeros., where the input pole at the origin generate the steady-state css(t)=1 and the system pole at - a , generate the transit response -Exp(-at)
20. fig_04_05 20 Control Systems 1/a = time constant of the response. From Fig., the time constant can be described as the time for 1 - Exp[-at] to rise to 63 % of initial value.
1/a = time constant of the response. From Fig., the time constant can be described as the time for 1 - Exp[-at] to rise to 63 % of initial value.
21. Transient response specification for a first-order system
Time-constant, 1/a
Can be described as the time for (1 - Exp[- a t])
to rise to 63 % of initial value.
Rise time, Tr = 2.2/a
The time for the waveform to go from 0.1 to 0.9
of its final value.
Settling time, Ts = 4/a
The time for response to reach, and stay within, 2% of its final value
21 Control Systems Rise time is found by solving equation c(t) = 1- Exp[-a t] for difference in time at c(t) = 0.9 and c(t) = 0.1. Tr = 2.31/a - 0.11/a = 2.2/a
Settling time, for example 2% by letting c(t) = 0,98 = 1- Exp[-a t] Rise time is found by solving equation c(t) = 1- Exp[-a t] for difference in time at c(t) = 0.9 and c(t) = 0.1. Tr = 2.31/a - 0.11/a = 2.2/a
Settling time, for example 2% by letting c(t) = 0,98 = 1- Exp[-a t]
22. fig_04_06 22 Control Systems If we can identify K and a from laboratory testing, we can obtain the G(s) of the system. Assume the unit step response given in Fig.
We measure the time constant, that is the time for amplitude to reach 63% of its final value: 63 x 0.72 = 0.45, or about 0.13 sec . Hence a=1/0.13=7.7
From equation, we see that the forced response reaches a steady-state value of K/a =0.72 . K= 0.72 x 7.7= 5.54
G(s) = 5.54/(s+7.7) . In reality the Fig was generated using the transfer function, G(s)= 5/(s+7)If we can identify K and a from laboratory testing, we can obtain the G(s) of the system. Assume the unit step response given in Fig.
We measure the time constant, that is the time for amplitude to reach 63% of its final value: 63 x 0.72 = 0.45, or about 0.13 sec . Hence a=1/0.13=7.7
From equation, we see that the forced response reaches a steady-state value of K/a =0.72 . K= 0.72 x 7.7= 5.54
G(s) = 5.54/(s+7.7) . In reality the Fig was generated using the transfer function, G(s)= 5/(s+7)
23. Identify K and a from testing 23 Control Systems We measure the time constant, that is the time for amplitude to reach 63% of its final value: 63 x 0.72 = 0.45, or about 0.13 sec . Hence a=1/0.13=7.7
From equation, we see that the forced response reaches a steady-state value of K/a =0.72 . K= 0.72 x 7.7= 5.54
G(s) = 5.54/(s+7.7) . In reality the Fig was generated using the transfer function, G(s)= 5/(s+7)We measure the time constant, that is the time for amplitude to reach 63% of its final value: 63 x 0.72 = 0.45, or about 0.13 sec . Hence a=1/0.13=7.7
From equation, we see that the forced response reaches a steady-state value of K/a =0.72 . K= 0.72 x 7.7= 5.54
G(s) = 5.54/(s+7.7) . In reality the Fig was generated using the transfer function, G(s)= 5/(s+7)
24. Exercise A system has a transfer function
G(s)= 50/(s+50).
Find the transit response specifications
such as Tc, Tr, Ts. 24 Control Systems
25. 25 Control Systems
26. Steady-state response If the steady-state response of the output does not agree with the steady-state of the input exactly, the system is said to have a steady-state error.
It is a measure of system accuracy when a specific type of input is applied to a control system.
26 Control Systems
27. 27 Control Systems
28. Steady-state error 28 Control Systems
29. fig_07_04 29 Control Systems
30. 30 Control Systems
31. Control Systems 31
