This article stud ies a design and implementation of state-feedback control problem for dc-dc Positive Output Super Lift Luo (POSLL) converter by considering the line and load disturbances for needing desired power source for various portable electronic equipment s like battery charger, hard disk drives, medical device, LED TV etc. The POSLL ’ s dynamic performance become s non-linear in nature ; the designed controller able to get superior dynamic performance given by load estimation is done by using an observer and by combining the state-feedback control with the load estimator, a controller which is explicitly developed with strong robustness using separation principle. An effectual stability analysis is exemplified to prove that by carefully selecting the state feedback control and observer gain matrix, the output voltage of the dc-dc POSLL converter tracks the desired value irrespective of the uncertainties. Extensive simulation is carried out using MATLAB/Simulink model. The result based on time domain analysis is done by using the controllers for various disturbances given to the converter.
Switched mode dc-dc power converters are widely used in the field of Power Electronics for the past few decades. In recent years their research, development and production have been in increasing rate due to their wide range of applications in various fields such as computer peripheral systems, medical equipments, communication devices, adapters in consumer electronics, portable electronic devices, fuel cell applications, photo voltaic arrays, power factor correction applications, and harmonic elimination. These switched mode dc-dc power converters have several advantages in comparison with linear power supplies. They are smaller in size, have high power density and efficiency, lesser component stress and lower in cost. Among the dc-dc converters, buck and boost converters are widely used but in practice, the voltage transfer ratio is limited with the increase in duty cycle due to the power semiconductor switches, power diodes and the equivalent series resistance of the passive components. Moreover increase in duty cycle may result in the reverse recovery problems of the semiconductor devices [
The increasing use of micro power consumption technique in the field of microelectronics and computer manufacturing necessitates the usage of high power density switched mode power supplies. In order to fortify the above said requirement, we need to go for the dc-dc converters which combine voltage lift technique and switched capacitor converters. The voltage lift technique which results in high voltage transfer gain is one of the prominent methods used in electronics circuits design. One such converter is a Positive Output Super Lift LUO Converter (POSLLC). The unique features of the POSLLC are miniature size due to the presence of switched capacitor which can easily be incorporated into high power density IC chips, enhanced voltage transfer gain, highly efficient, increased power handling capacity, less sensitivity to EMI and highly reliable [
Since the evolution of modern electronic systems such as manufacturing of computer systems, medical instruments, and communication equipments, the dc-dc converters are endowed with greater challenges for their development with compact, highly reliable and excellent quality. In the past research methods, many linearized models were developed for linear control of the dc-dc converters, which result in deterioration of control performances under line and load variations. In most of the controller design, it’s a common practice to neglect the system uncertainties. But in practice since the dc-dc converters are nonlinear time varying systems, it is inevitable to consider the uncertainties caused due to variation in the system parameters, modeling errors, operating conditions and sensors used for measurements. Hence it is essential to design robust and highly susceptible controllers with excellent dynamic response, faster settling time, reduced steady state error, lesser overshoots and undershoots [
The main objective of this paper is to design the robust observer controller for POSLL converter that rectifies the above mentioned problems. The state feedback control is designed in order to obtain the stability of the converter using pole placement technique. An observer gain matrix is derived in order to estimate all the unmeasurable state variables. The POSLL converter is modeled using state space averaging technique. The observer controller is designed by combining the state feedback control and observer gain matrix using separation principle. The distinctive attribute of the separation principle is that the state feedback control and the observer gain matrix can be designed individually and both can be merged together to provide a dynamic observer controller. MATLAB/Simulink is used to perform the simulation. The controller performance is evaluated experimentally and the results are illustrated. The sections are organized as follows: Section 2 discusses design of POSLL converter; Section 3 discusses the modeling; Sections 4 explains the design of state feedback matrix and the observer gain matrix; and Sections 5 gives the simulation results. Conclusion is given in Section 6.
The POSLL converter shown in
There are two operating modes in POSLL converter which is explained as follows.
Mode1 represents the ON time of the switch and mode 2 represents OFF time of the switch.
Mode 1: When the switch is in ON state, the diode D1 starts conducting and within a very short duration of time the capacitor C1 starts charging and attains a constant voltage level of source voltage, VS. The current through the inductor IL depends on the source voltage. The capacitor C2 supplies energy to the load R. The equivalent circuit for the POSLL Converter is shown in
Mode 2: When the switch is in OFF state, the diode D2 conducts and the energy to the capacitor C2 and the load resistance R are supplied by the decreasing inductor current, iL. At the end of this mode, the inductor current decreases to the value of (
Based on the above discussion the peak?peak ripple value of the inductor current and peak peak ripple voltage of the capacitor is obtained as follows:
where Toff is the off time of the converter given by
where VO is the output voltage of the converter and f is the switching frequency. “
The mathematical modeling of the POSLL converter is derived based on the state space averaging technique. It is an effective method in which the PWM type converters are switched in between two or more operating states based on the duty cycle ratio of the converter. The semiconductor switch employed in the POSLL converter is turned on and off by a sequence of pulses generated at particular switching frequency, fS. Here the inductor current iL, and capacitor voltage VC are considered as the state vectors. The converter can be represented by the following set of dynamic equations describing the converter system during ON mode and OFF mode of the switch respectively.
During ON time,
During OFF time,
Variables | Modeling values of converter | |
---|---|---|
Parameters | Values of POSLL converter | |
L | Magnetizing inductance (µH) | 100 µH |
C1 & C2 | Capacitors (µF) | 30 µF |
VS | Dc Input voltage source (V) | 12 V |
Po | Output power (W) | 25.92 W |
fs | Switching frequency (KHz) | 100 KHZ |
Ro | Load resistance (Ω) | 40 - 120 Ω |
In general, the state modeling of the system can be represented by the following set of affine continuous time state equations,
Here sw = 1 represents the on state of the switch and sw = 0 represents the off state of the switch. A1, A2, B1 and B2 are the coefficient matrices given by,
The output equation of the converter is represented as,
The ultimate objective is to design the state feedback matrix, m for the POSLL converter using pole placement technique. The control scheme for the converter is shown in
Pole placement method is an effectual one through which it is probable to stabilize a completely controllable system by arbitrarily choosing the closed loop poles. The assumptions are made that all the state variables are measurable and available for feedback. In this method the state vector x is measured and is weighted by a constant feedback gain matrix, m and the result is deducted from the reference signal r.
The dynamic equations corresponding to continuous time system are as follows:
The output equation is given as follows,
The Eigen values of (A − Bm) should be placed in the left half plane for continuous time system in controllable canonical for (A, B) pair is equivalent to (
It is necessary to change the converter equations into accessible canonical structure and the transformation matrix T which converts the state equation of the POSLL converter in to canonical form is given by the following equation,
where
The closed loop control scheme is structured by feeding back each state variable to u, thereby giving,
where
By substituting the equation (6) in equations (8) and (17), the system matrix (A − Bm), for closed loop system is obtained and is described as,
Here the system equations are converted into controllable canonical form.
The characteristic equation of the closed loop system is written by inspection as follows,
By investigating the Equations (10) and (14), it is clearly observed that the equation of the closed loop converter in controllable canonical form can be obtained by careful assessment of the open loop system equation thereby appending the suitable mi to each and every coefficient. The required distinctive equation of the converter system for appropriate pole assignment is presumed as,
Here
From which,
By using the above steps the values for the state feedback matrices obtained for POSLL converter is given by
The full order observer gain matrix is derived using the similar pole assignment procedure with the eventual objective of estimating the unmeasurable state parameters. The observer always intends to act upon the error resulting in faster response of the converter. The essential provision for the observer gain matrix design is that the dc-dc converter considered for the analysis should be completely state-controllable. Hence for the appropriate location of the observer poles the following assumptions are made as defined by the thumb rule.
The natural frequency of oscillation (observer controller) is approximately equal to 2 to5 times that of the natural frequency of oscillation of the system. Now, the active system equation along with a full-order state observer is described as follows:
Here m1 represents the coefficient of the state feedback matrix and r represents the step function.
The system equation along with the full order observer can be described by the following,
Here g represents the full order observer gain matrix.
Now the transfer function of the observer controller, which is a combination of state feedback matrix and full order observer, is obtained using separation principle. It is given by,
The POSLL converter along with observer controller is designed and simulated using MATLAB/Simulink. The design is carried out in continuous conduction mode with the values tabulated in
Sl. No. | Dynamic characteristics of converter | |
---|---|---|
Parameters | Values | |
1 | Settling time (s) | 0.01 s |
2 | Rise time (s) | 0.005 s |
3 | Peak overshoot (%) | 0 |
4 | Steady state error (V) | ±0.05 V |
5 | Output voltage ripple (V) | 0 |
swiftly with much lesser settling time and with no output ripples. The corresponding output current and inductor current are also given in
The controller performance is evaluated by changing the input voltage values from 12 V to 14 V reference values as set 36 V and to measure the output voltage, output current and inductor current are shown in
In order to show the controller performance based on reference voltages should be changed from 36 V to 40 V at the same time line and load side disturbance also per-
pendicularly given to the controller the output voltage will be maintained constant that are shown in
The controller performance is further evaluated by changing the reference values as 36 V and 40 V and it is exemplified in
The reference values are varied and the controller is capable of tracking any of the references as shown in
Sl. No. | Output voltage and current value of the converter | |||||
---|---|---|---|---|---|---|
Input voltage (V) | Reference voltage (V) | Output voltage (V) | Output current (A) | Output inductor current (A) | ||
1 | 12 | 14 | 36 | 36 | 0.86 | 0.0586 |
2 | 14 | 10 | 36 | 36 | 0.86 | 0.0486 |
Sl. No. | Line variation (V) | Load variation (Ω) | Change of reference voltage (V) | Voltage across the load (V) | |||||
---|---|---|---|---|---|---|---|---|---|
Input voltage (V) | Load resistance (Ω) | Set value (V) | Output voltage (V) | ||||||
1 | 12 | 14 | 120 | 115 | 36 | 36.0 | |||
2 | 14 | 10 | 115 | 110 | 40 | 40.0 | |||
Sl. No. | Load parameters | Reference voltage (V) | Voltage across the load (V) | ||
---|---|---|---|---|---|
R (Ω) | L (mH) | E (V) | Set value (V) | Output voltage (V) | |
1 | 100 | - | - | 36 | 36.00 |
2 | 110 | - | - | 36 | 35.97 |
3 | 110 | 100e−3 | - | 36 | 36.01 |
4 | 90 | 50e−3 | - | 36 | 35.98 |
5 | 105 | 50e−3 | - | 36 | 36.00 |
6 | 100 | 100e−3 | 2 | 36 | 36.00 |
7 | 100 | 100e−3 | 4 | 40 | 40.01 |
Thus, the design and implementation of observer based controller for POSLL converter by means of pole assignment method and separation principle have been successfully demonstrated in MATLAB/Simulink at different operating conditions. So as to guarantee the robustness of the controller load estimator is derived with help of full order state feedback control. The investigation and analysis are carried out using a classical root locus method which endows with a competent and effectual compensation for the POSLL converter. The numerical examination and simulation study shows that the observer controller designed for POSLL converter accomplishes rigid output voltage regulation, excellent dynamic characteristics and superior efficiency. It is suitable for any low power source applications such as portable electronic devices, computer peripherals, medical equipment, and power factor correction or fuel cell applications. In future work, the POSLL converter with observer controller plus pole placement technique will be analyzed.
Arunkumar, N., Sivakumaran, T.S., Ramashkumar, K. and Shenbagalakshmi, R. (2016) Analysis, Modeling and Simulation of State Feedback Con- trol for Positive Output Super Lift Luo Con- verter. Circuits and Systems, 7, 3971-3983. http://dx.doi.org/10.4236/cs.2016.711329