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Article

A Method for the Realization of an Interruption Generator Based on Voltage Source Converters

1
School of Electrical Engineering, Northeast Electric Power University, Jilin 132012, China
2
Liaoning Academy of Safety Science, Shenyang 110179, China
*
Author to whom correspondence should be addressed.
Energies 2017, 10(10), 1642; https://doi.org/10.3390/en10101642
Submission received: 9 August 2017 / Revised: 19 September 2017 / Accepted: 11 October 2017 / Published: 19 October 2017

Abstract

:
In this paper we described the structure and working principle of an interruption generator based on voltage source converters (VSCs). The main circuit parameters of the VSCs are determined according to the target of power transfer capability, harmonic suppression, and dynamic response capability. A state feedback linearization method in nonlinear differential geometry theory was used for dq axis current decoupling, based on the mathematical model used in the dq coordinate system of VSCs. The direct current control strategy was adopted to achieve the independent regulation of active power and reactive power. The proportional integral (PI) link was used to optimize the dynamic performance of the controller, and PI parameters were adjusted. Disturbance voltage waves were generated by the regular sampling method. PSCAD/EMTDC simulation results and physical prototype experiments showed that the device could generate various disturbance voltage waveforms steadily, and had good dynamic and steady-state performance.

1. Introduction

With the rapid development of technology, the load structure of the power system has changed a lot in recent years. A large number of non-linear loads have resulted in power quality problems such as voltage fluctuations, distortions, and unbalanced connections to the power system [1,2,3,4]. With the improvement of China’s industrial automation, the precise automatic equipment used is very sensitive to power quality, and power quality problems might cause equipment stoppages. Problems of power quality monitoring, analysis, and management have thus become important issues in electric power supply and utilization [5]. In view of this, a power interruption generator can be used to provide disturbance signal sources to test the correctness of the power quality analysis theory, or examine power quality control devices. In addition, a power interruption generator can also be used to test the operation characteristics of electric power equipment under disturbance conditions. Research on these interruption generators has been focused on trying to achieve flexibility, regulation, and high precision [6].
At present, most power quality interruption generators are designed based on power electronics [7]. The Shanxi Electric Power Research Institute has come up with a power quality interruption device that can simulate the voltage output and current disturbance of a power system. The device has the characteristics of good output waveform, large power, and high voltage grade, and can output the waveforms of voltage sag, voltage fluctuation and flicker, voltage harmonic, current harmonic, and the unbalanced 3-phase voltage and current [8]. A series hybrid power quality interruption generator was developed by the State Key Laboratory of Alternate Electrical Power System with Renewable Energy Sources of North China Electrical University, and it was based on carrier phase –shifting sinusoidal pulse width modulation [9]. In [10], a back to back 2 H bridge is used in the main circuit structure and a multi-level cascade is used in voltage source inverter. Both these devices have the advantages of flexibility and diversity. However, their structures are complex [11]. In [12], it proposed a new design of power electronic voltage interruption generator. It adopts uncontrollable rectifier and booster circuit. It can only simulate voltage swell and sag, but its duration, depth, start-stop phase and type can all be adjusted smoothly.
The method of using the phase shift circuit to regulate transformer taps to produce disturbances has been used in many other devices. These devices are less expensive and stable in operation, but have potential problems such as inconvenient settings, a single disturbance wave, and so on. A device developed by the University of Arizona provides the disturbance signal source by means of a circuit switch and transformer tap controlled by a simulated phase-shift circuit [13]; however, the device can only realize the voltage sag waveform and is unable to adjust continuously. In [14], a scheme based on interleaved paralleled H-bridges topology was proposed. It presented a control method composed of DC voltage feed forward control and a phase shifting PWM method. The scheme reduces the load regulation of the large capacity voltage interruption generator; however, the design of the output impedance parameters is inconvenient for the small capacity one. The synchronous compensator is convenient in realizing power disturbances, but its scope of application is limited by its weight and volume.
In this paper, we presented the idea of applying voltage source converters (VSCs) to the interruption generator to deal with their shortcomings. Compared with the current devices, the interruption generator based on VSCs has a simpler main circuit, but it still has good dynamic and steady-state performance and it can generate various disturbance voltage waveforms compared with the devices that use the phase shift circuit to regulate transformer taps. The rest of this paper is organized as follows: Section 2 gives a mathematical model of the interruption generator based on VSCs in an abc coordinate system. The influence on the system and the selection principle of the main circuit parameters are also analyzed. Section 3 discusses the control objectives; the grid side converter provides a stable DC voltage while the load side converter provides the disturbance waveform according to the specified modulation wave. The power decoupling controller is designed based on the nonlinear feedback linearization theory, and the dynamic performance of the controller is optimized based on the classical control theory. In Section 4, the dynamic and steady-state performance of the controller is verified by PSCAD/EMTDC (Version 4.2.0, Manitoba HVDC Research Centre, Winnipeg, MB, Canada) simulation results. Then, in Section 5, a physical prototype is designed to prove the simulation results in Section 4. Finally, Section 6 presents our conclusions.

2. Structure of the Main Circuit in VSCs

The structure diagram of an interruption generator based on the VSC is given in Figure 1. The controlled rectifier transforms the AC voltage into a high precision DC voltage. The inverter is used to generate a specified disturbance voltage for the load.

2.1. Mathematical Models in an abc Coordinate System

To simplify the study, we made two assumptions:
(1)
A 3-phase infinite power supply is ideal and symmetrical.
(2)
The switch is ideal, and its switching-delay is ignored.
The single side topology of the VSC is shown in Figure 2. Esa, Esb, and Esc are AC voltages; ia, ib, and ic are AC input currents; Ua, Ub, and Uc are AC side output voltages of the converter; iL is the load current; R is the equivalent resistance; L is AC filter reactance; and C is the DC side capacitor.
The mathematical model of the converter can be expressed as follows:
{ L d i a d t = E s a R i a U a L d i b d t = E s b R i b U b L d i c d t = E s c R i c U c C d U d c d t = i s i L

2.2. The Design of AC Side Inductance

According to Equation (1), the equivalent circuit of the AC side is shown in Figure 3. Since the filter inductance has a restraining effect on the high frequency current component, the fundamental component frequency current is the only component that should be considered. In addition, the filter inductance also stores reactive power, which flows in 3-phase circuits. When the capacity of the device is fixed, a large reactive power will reduce the transmission capability of the active power, thus reducing the efficiency of the device. As a result, there is an upper limit on the selection of the inductance. Meanwhile, the filter inductor also plays a role in restraining the sudden change in current. Therefore, there is also a lower limit on the selection of the inductance [15,16].
Three indices are defined as follows for the limits of the inductance:
(1)
The steady-state active transmission capacity index: the inductance voltage should not be greater than 20% of the AC rated voltage.
(2)
Transient operation performance: the current variation in a control cycle should be less than 10% of the AC rated current. It reflects the transient condition constraints.
(3)
Filtering performance: the total harmonic distortion of current should be less than or equal to 5%.
According to the above indices, which are related to device capacity, AC voltage, DC capacitor voltage, control cycle, and other parameters [17,18], the expression of the inductance selection is shown in Equation (2):
( 2 u d c + 3 E s a ) E s a T s cos φ 0.4 P L L 3 E s a 2 cos φ 10 ω P L

2.3. The Design of DC Side Capacitor

As shown in Equation (1), the increase of the DC side capacitor C can reduce the voltage fluctuation. Meanwhile, the capacitor cannot be too large considering the size and cost of the device. The main reason for causing the DC voltage fluctuation is the difference of instantaneous power between the rectifier and the inverter [19]. During device testing, the maximum power change occurs at the moment of loading, when the power of the DC side capacitor suddenly changes from 0 to P. However, when the device is applied to power quality problems in a lab, there may be backward power flow, that is to say, the operation performance of the inverter changes from the absorbed power P to the feedback power P, and the fluctuation of the DC side voltage is the most severe at this time [20,21]. The DC side voltage fluctuation rate is defined as 10% in a control cycle. Considering the characteristic of the capacitor element, the expression of the capacitance C is as follows:
C 20 P max T s u d c Δ u d c max

2.4. Constraint of Disturbance Load

The choice of the disturbance load is limited when the DC side voltage is stable [22]. If the load is very small, it will inevitably lead to a larger load current and the power for the load demand will be greater. When the power of the load exceeds the capacity of the device, the DC side voltage will no longer be stable, and voltage drop will occur. In addition, the current should be less than the maximum allowable current of the power device, otherwise the device will be burned out [23,24,25]. Therefore, the minimum load is subject to the two constraints above, as shown in Equation (4). Smax is the capacity of AC power, and Imax is the maximum current through the switching device.
Z > max ( u d c r e f 2 S max , u d c r e f I max )

3. Design of the Controller Device

3.1. Dynamic Mathematical Model in dq Coordinate System

For a 3-phase power supply, the d axis is coincided with the space vector, and the d axis is π/2 ahead of the q axis. Esd = Um, and Esq = 0. The Kirchhoff equations and power equations of the rectifier in the rotating dq coordinate system are shown in Equations (5) and (6):
( L d i d d t L d i q d t C d u d c d t ) = ( E s d E s q 0 ) ( R ω L m d ω L R m q m d m q 0 ) ( i d i q u d c ) ( 0 0 i L )
{ P = E s d i d Q = E s d i q
The function of the rectifier is to stabilize the DC side voltage, that is to say, the essence of the rectifier is to control the power supply to inject the active power into the DC side capacitor. The design of the power controller is based on Equation (6). The active and reactive power of the AC side power supply are respectively proportional to the current of the d axis and q axis. Based on the above analysis, the direct current control strategy is determined [26].

3.2. Decoupling Method Based on State Feedback Linearization

Based on Equation (5), there is a coupling between id and iq. That is to say, there is a coupling between P and Q, which brings great inconvenience to the design of the controller. The nonlinear state feedback linearization theory is a powerful tool for solving this kind of problem. This theory makes the non-linear systems linearized by non-linear coordinate transformation over a wide range. This enables the multiple input and output system to be linearized and decoupled at the same time [27,28].
The state equations and output equations of the decoupled controllable linear system by coordinate transformation and state feedback are shown in Equation (7):
{ [ d z 1 d t d z 2 d t ] = k [ z 1 z 2 ] + k [ υ 1 υ 2 ] [ Y 1 Y 2 ] = [ z 1 z 2 ]
The state variables z1 and z2 are equal to id and iq, respectively. According to the optimal control theory, the relations between the new input variables, υ1 and υ2, and state variables can be represented as:
[ υ 1 υ 2 ] = ( 1 0 0 1 ) [ z 1 z 2 ]
Based on Equations (7) and (8), a set of output variables id and iq corresponds to a set of reference values idref and iqref of the dq axis currents. Thus, direct current control is achieved. The power switch function, which is applied in the power switch by sinusoidal pulse width modulation (SPWM) is deduced as in Equation (9):
( m d m q ) = 1 u d c ( R x 1 + ω x 2 L z 1 L + E s d ω x 1 L R x 2 z 1 L )

3.3. Optimization of Controller Dynamic Performance

The closed-loop transfer function of current shown in Equation (10) is derived from the Laplace transform of the Equation (7):
{ Φ i d ( s ) = i d ( s ) i d r e f ( s ) = k s + k Φ i q ( s ) = i q ( s ) i q r e f ( s ) = k s + k
According to Equations (7) and (10), the closed-loop transfer function of current is a first-order inertial element. The classical control theory shows that the first-order inertial element provides good dynamic properties and there is no overshoot, static error or oscillation in the system. The stability of the system is determined by the proportionality coefficient k. According to the Routh criterion, if k > 0, the system is stable, that is to say, the closed-loop poles should be in the left half plane of the s domain. And the response speed can be regulated by adjusting k.
The device is controlled by digital signal processors. In digital control systems, the sampling delay and the switching delay are related to the control cycle Tc. The sampling delay time is equal to the control cycle. And the switch has two states: turn-on and turn-off in one control cycle, so the switching delay cycle is half of the control cycle. The dynamic block diagram of the current loop is shown in Figure 4.
The frequency of the electronic power switch is high. The s2 term coefficient is much smaller than the s term coefficient after the combination of the delay link. Therefore, the s2 term can be neglected, and the open-loop transfer function is expressed as:
G i ( s ) = k s ( 1.5 T c s + 1 )
where k is the proportionality coefficient and Tc is the control cycle. Equation (12) is the closed-loop characteristic equation of the current loop system:
s 2 + 1 1.5 T c s + k 1.5 T c = 0
The angular frequency and damping ratio of the system is expressed as:
{ ω n = k 1.5 T c ξ = 1 2 1 1.5 k T c
The overshoot and adjusting time of the system are shown in Equation (14). In this paper, we defined the current tracking index as the overshoot σ % < 10% and the adjusting time ts < 5 ms. The proportionality coefficient k can be calculated according to Equations (12) and (13):
{ σ % = e π ξ / 1 ξ 2 × 100 % t s = 4.5 ξ ω n
Equations (10)–(14) express the rapidity and stability of current tracking. However, there is a condition that the inductance L and the equivalent resistance R be completely determined. In actual engineering, reactors are usually installed on the grid side, and the inductance on the transmission line is very small compared with the reactors. Therefore, the transmission line inductance can be neglected and the inductance L of the system can be considered as accurate. The equivalent resistance R is the grid side equivalent loss resistance of the device and is not easy to determine. It is related to the line loss, the switching loss, and temperature [29]. Based on Equation (9), the power switch function considering the disturbance resistance Δ R is expressed as:
( m d m q ) = 1 u d c ( ( R + Δ R ) x 1 + ω x 2 L z 1 L + E s d ω x 1 L ( R + Δ R ) x 2 z 1 L )
Based on Equations (5) and (15), the open loop transfer function of the current-loop considering the disturbance resistance Δ R is shown in Equation (16). The d axis current has the same open-loop transfer function as the q axis current, therefore, we take the d axis current as an example:
G i d ( s ) = k L s L + Δ R ,
The switching delay and sampling delay make the order of the system transfer function higher. The PI link is used to reduce the order and improve its stability. In order to simplify the design, k is set to 1, and the dynamic block diagram of the current loop considering resistance disturbance and system delay is shown in Figure 5.
The open-loop transfer function is expressed as:
G i d ( s ) = k p ( s + T i ) s 1 1.5 T c s + 1 1 s + Δ R L ,
T i = k i k p ,
Equation (17) is a three order oscillation link. The pole-zero cancellation is used to reduce the order. According to the automatic control theory, in the s domain, the poles far from the imaginary axis have little influence on the system. In general, the poles caused by the resistance disturbance are closer to the imaginary axis than those caused by the delay link.
Let T i = Δ R L . Based on the pole-zero cancellation, the pole caused by the resistance disturbance is eliminated by the zero point of PI correction. This will offset the influence of the pole. The corrected open-loop transfer function is expressed as:
G i d ( s ) = k p s ( 1.5 T c s + 1 )
In this study, the optimal damping ratio ξ was set to 0.707. Equations (20) and (21) show the PI correction of the current loop:
k p = 1 3 T c ,
k i = Δ R 3 T c L
Substituting Equations (20) into Equation (19) and neglecting the higher order terms, the open-loop transfer function is expressed as:
G i d ( s ) = 1 3 T c s ,
The closed-loop transfer function is expressed as:
G i d ( s ) = 1 3 T c s + 1
According to Equations (22) and (23), the current loop is approximately equivalent to a first order inertial link, and the inertial time constant is 3Tc. Based on the step response property of the first order inertial link, 98.2% reference value can be reached after 12Tc–15Tc. When the switching frequency is high, that is to say, the control cycle is short, the current tracking has good rapidity.
DC side capacitor voltage relates to the active power injected into the VSC from the AC power supply. Based on Equation (6), the DC side voltage loop with PI correction is added onto the d axis current loop. It forms a double closed loop system. The dynamic structure is shown in Figure 6.
According to the characteristics of the switching function, md is a nonlinear link, and it is inconvenient for the system design. When using SPWM modulation, the maximum value of md is 1. Therefore, when md = 1, it has the greatest impact on the system. Combining the delay terms and neglecting the higher order terms, the simplified dynamic structure is shown in Figure 7.
According to Mason Gain Formula, the system transfer function is expressed as:
u d c ( s ) = k v p s + k v i 4 C T c s 3 + C s 2 + k v p s + k v i · u d c r e f ( s ) 4 T c s 2 + s 4 C T c s 3 + C s 2 + k v p s + k v i · i L ( s )
The system consists of two responses: the DC voltage, and the disturbance current of the load. The system error E(s) is expressed as:
E ( s ) = u d c r e f ( s ) u d c ( s ) ,
The input is a unit step signal, and the disturbance current is also a step signal, but its amplitude is a:
u d c r e f ( s ) = 1 s ,
i L ( s ) = a s ,
According to the final theorem, the steady-state error can be represented as:
e s s = lim s 0 s E ( s ) = 0 ,
The steady-state error is not influenced by the disturbance current. There is no static error during the steady state. The characteristic equation of closed loop voltage is as follows:
s 3 + 1 4 T c s 2 + k v p 4 C T c s + k v i 4 C T c = 0 ,
To achieve the required dynamic performance and steady-state performance in higher order systems, the usual treatment in engineering is to arrange two of the poles as a pair of conjugate poles, and configure the other two poles far away from the imaginary axis. The characteristic equation is expressed as:
( s 2 + 2 ξ ω n s + ω n 2 ) ( s + n ξ ω n ) = 0 ,
Comparing Equations (29) and (30), the parameters after the PI correction of the voltage loop are as follows:
{ k v p = 4 C T c ( 2 n ξ 2 + 1 ) ω n 2 k v i = 4 C T c n ξ ω n 3 ,
ω n = 1 4 ξ T c ( n + 2 ) ,
In summary, the control structure of the interruption generator based on VSCs is shown in Figure 8.

4. Analysis of Simulation Case

4.1. Parameters of Simulation Case

The simulation parameters of the main circuit and the controller are respectively shown in Table 1 and Table 2. The simulation platform based on PSCAD/EMTDC is shown in Figure 9.

4.2. Verification of Controller Performance

According to Figure 5 and Figure 7, a dynamic structure based on double closed loop control was constructed in MATLAB/Simulink (R2014b, MathWorks, Natick, MA, USA), which is shown in Figure 10a,b; its unit step response is shown in Figure 11a,b.
The current tracking can be completed in 4 ms, which is basically consistent with the theoretical value. The overshoot is very small, and there is no static error in steady state. The DC side voltage reaches the steady-state value of 700 V in 100 ms with no static error in steady state, and the overshoot is 7%. The simulation results thus verified the correctness of the controller design.

4.3. Simulation Research

The performance of the rectifier is verified in Figure 12. At 0.2 s, the reactive power of the AC side flowing into the rectifier increased from 0 to 20 kVar, that is to say, Qref = 20 kVar, under the no-load operating condition. The power tracking was done in about 5 ms, as shown in Figure 12a. In Figure 12b, the reactive power jump did not affect the voltage stability of the DC side. Figure 12c shows waveforms of the AC side voltage and current, whose phase difference was 90°. Figure 12d is the current spectrum of the AC side, and shows that there was no low-order harmonic which will cause pollution to the grid. Figure 12e is the voltage waveform of the DC side sudden increase load. The DC voltage recovered after one cycle, and the maximum change rate was 2%. Furthermore, the performance of the controller against external disturbances was good. In Figure 12f, when the equivalent resistance of the AC side increased by 0.1 Ω, the DC side voltage was almost unchanged, which shows that the controller had good performance against internal disturbances.
In Figure 13, the feasibility of the method of the interruption generator was verified by several typical disturbance waveforms produced by SPWM waves based on the regular sampling method. Figure 13a is the voltage sag waveform. The voltage dropped by 10%, and the voltage sag lasted for four cycles. Figure 13b is the voltage swell waveform. The voltage increased by 12.5%, and the voltage swell lasted for four cycles. Figure 13c is the voltage interruption waveform, which lasted four cycles. Figure 13d,e are frequency offset waveforms. The frequencies of the modulation wave were 49 Hz and 51 Hz. Figure 13f is the fundamental waveform with 0.5 times third harmonic injection. Figure 13g is the 3-phase unbalanced waveform with a degree of unbalance of 32.5%. Figure 13h is the voltage flick waveform. The modulation wave was obtained by superposition of the fundamental waveform and the wave whose amplitude was 10% of the fundamental waveform and frequency was 15 Hz.

5. Experimental Results and Analyses

A 30 kVA VSC physical prototype shown in Figure 14 was designed to prove the method above. The control chip is TMS320LF2812 (Texas Instruments, Dallas, TX, USA). Figure 15 gives the structure diagram of the physical prototype, which consists of a grid-side converter, an isolation transformer, a DC unit, a load side converter, and a line switch. Technical indices of the device are shown in Table 3.
The device provides the following disturbance waveforms.
Figure 16 shows the waveform of voltage sag: the voltage dropped by 21.4% from 220 V to 173 V for 100 ms.
Figure 17 shows the waveform of voltage swell: voltage increased by 12.5% from 220 V to 248 V for 100 ms.
Voltage interruption is the most serious problem for power quality. Figure 18 is the waveform of voltage interruption, showing an interruption for 120 ms.
A 0.5 times third harmonic voltage was injected into the fundamental voltage, as shown in Figure 19.
The output of the 3-phase unbalanced waveform was realized by differing the amplitudes of the 3-phase modulation wave. The 3-phase voltage waveform with a degree of unbalance of 32.5% is shown in Figure 20.
The stability of the DC voltage guarantees the output waveform. Figure 21 shows the error of the DC side voltage under the condition of the voltage sag shown in Figure 16. The error was between −0.2% and 0.6%, and the maximum fluctuation was 6 V. These results met the device indices.
When the load side was connected to the grid for the grid connected experiment, and the device is working in the state of uncontrolled rectifier, the phases of the grid voltage and output voltage shown in Figure 22 coincided.
The load side was connected to the grid through 50 Ω resistance. Figure 23 provides the relationships between the grid-side voltage, load side output voltage, and system voltage. The fluctuation of the current was small, thus proving that the load side was connected to the grid. The voltage sag experiment after grid connection is shown in Figure 24. Phases of the output voltage and the grid voltage were the same. The output voltage dropped by 5.4% from 280 V to 265 V for 100 ms, while the device remained stable.

6. Conclusions

In this paper, we presented a universal design method for the main circuit and controller based on the operation condition and power control theory. A PSCAD/EMTDC simulation platform for an interruption generator was created, and then a 30 kVA physical prototype was established in a dynamic simulation lab based on the simulation. The simulation and experimental results showed that the interruption generator based on the VSC has the advantages of high voltage accuracy, and various disturbance waves. We provided an experimental platform for addressing power quality problems and measuring operating characteristics of compensation equipment under disturbance conditions.

Acknowledgments

This work is supported by special fund for industrial innovation of Jilin Province Development and Reform Commission (2017C017-2), Science and Technology Project of State Grid Corporation of China (Key Technology and Application of Grid Connected Operation of Large Capacity Battery Energy Storage Power Station), Jilin Provincial “13th Five-Year Plan” Science and Technology Project ([2016]88), and Jilin Provincial “12th Five-Year Plan” Education and Science Key Self-Help Project (ZC13072).

Author Contributions

Junhui Li designed the experiments and wrote the paper; Tianyang Zhang performed the experiments; Gangui Yan provided important guidance; Lei Qi contributed reagents/materials/analysis tools.

Conflicts of Interest

The authors declare no conflict of interest.

References

  1. Luís, R.; Silva, J.F.; Quadrado, J.C. Output Voltage Quality Evaluation of Stand-alone Four-Leg Inverters Using Linear and Non-Linear Controllers. Energies 2017, 10, 504. [Google Scholar] [CrossRef]
  2. Yao, W.; Jiang, L.; Wen, J.; Wu, Q.; Cheng, S. Wide-area Damping Controller for Power System Interarea Oscillations: A Networked Predictive Control Approach. IEEE Tran. Control Syst. Technol. 2015, 23, 27–36. [Google Scholar] [CrossRef]
  3. Pinto, R.; Mariano, S.; Calado, M.; de Souza, J. Impact of Rural Grid-Connected Photovoltaic Generation Systems on Power Quality. Energies 2016, 9, 739. [Google Scholar] [CrossRef]
  4. Arias-Guzmán, S.; Ruiz-Guzmán, O.A.; Garcia-Arías, L.F.; Jaramillo-Gonzáles, M.; Cardona-Orozco, P.D.; Ustariz-Farfán, A.J.; Cano-Plata, E.A.; Salazar-Jiménez, A.F. Analysis of Voltage Sag Severity Case Study in an Industrial Circuit. IEEE Trans. Ind. Appl. 2017, 53, 15–21. [Google Scholar] [CrossRef]
  5. Zhu, K.; Ni, J.; Liu, Y.; Sun, Y.; Sun, Y. Detect Transient Power Disturbance for Power Disturbance Data Analytics. Trans. China Electrotech. Soc. 2017, 32, 35–44. [Google Scholar]
  6. Kumar, R.; Singh, B.; Shahani, D.T. Symmetrical Components-Based Modified Technique for Power-Quality Disturbances Detection and Classification. IEEE Trans. Ind. Appl. 2016, 52, 3443–3450. [Google Scholar] [CrossRef]
  7. Fan, X.; Xie, W.; Jiang, W.; Yi, L.; Huang, X. An Improved Threshold Function Method for Power Quality Disturbance Signal De-Noising Based on Stationary Wavelet Transform. Trans. China Electrotech. Soci. 2016, 31, 219–226. [Google Scholar]
  8. Wang, J.; Qi, Y.; Xv, L.; Chen, X.; Qiu, Z. Development of 10 kV Power Quality Disturbance Generator. Power Capacit. React. Power Compens. 2015, 36, 66–72. [Google Scholar]
  9. Cao, S.; Yin, Z.D. Study of Multi Objectives Voltage Disturbance Generator Based on Carrier Phase Shift. Power Electron. 2013, 47, 93–95. [Google Scholar]
  10. Wang, Y.; Wang, L.; Ye, Q. Research on a Novel Multi-functional VDG of Cascade Multilevel. Power Electron. 2016, 50, 19–21. [Google Scholar] [CrossRef]
  11. Chen, X.; Li, K.; Xiao, J.; Meng, Q.; Cai, D. A Method of Real-Time Power Quality Disturbance Classification. Trans. China Electrotech. Soc. 2017, 32, 45–55. [Google Scholar]
  12. Yin, J.; Li, G.; Tang, W.; Liu, L. A Kind of Power Electronic Voltage Disturbance Generator Used in Thermal Power Units. Power Syst. Prot. Control 2016, 44, 109–113. [Google Scholar]
  13. Ma, Y.; Karady, G.G. A Single-Phase Voltage Sag Generator for Testing Electrical Equipments. In Proceedings of the 2008 IEEE/PES Transmission and Distribution Conference and Exposition, Chicago, IL, USA, 21–24 April 2008; pp. 1–5. [Google Scholar]
  14. Dong, L.; Zhang, Y.; Yao, J.; Yu, Z. Design of an Interleaved Paralleled High Capacity 380V Voltage Disturbance Generator. Power Electron. 2014, 48, 71–74. [Google Scholar]
  15. Renedo, J.; Garcı´a-Cerrada, A.G.; Rouco, L. Active Power Control Strategies for Transient Stability Enhancement of AC/DC Grid With VSC-HVDC Multi-Terminal Systems. IEEE Trans. Power Syst. 2016, 31, 4595–4604. [Google Scholar] [CrossRef]
  16. Baggu, M.M.; Chowdhury, B.H.; Kimball, J.W. Comparison of Advanced Control Techniques for Grid Side Converter of Doubly-Fed Induction Generator Back-to-Back Converters to Improve Power Quality Performance During Unbalanced Voltage Dips. IEEE J. Emerg. Sel. Top. Power Electron. 2015, 3, 516–524. [Google Scholar] [CrossRef]
  17. Tummuru, N.R.; Mishra, M.K.; Srinivas, S. An Improved Current Controller for Grid Connected Voltage Source Converter in Microgrid Applications. IEEE Trans. Sustain. Energy 2015, 6, 595–605. [Google Scholar] [CrossRef]
  18. Dou, X.; Yang, K.; Quan, X.; Hu, Q.; Wu, Z.; Zhao, B.; Li, P.; Zhang, S.; Jiao, Y. An Optimal PR Control Strategy with Load Current Observer for a Three-Phase Voltage Source Inverter. Energies 2015, 8, 7542–7562. [Google Scholar] [CrossRef]
  19. Wang, J.Y.; Ma, X.K. A Study about Method for Capacitor Reactive Power Compensation by Adjusting Voltage with Thyristors. J. Northeast Dianli Univ. 2015, 35, 23–27. [Google Scholar]
  20. Ortega, Á.; Milano, F. Generalized Model of VSC-Based Energy Storage Systems for Transient Stability Analysis. IEEE Trans. Power Syst. 2016, 31, 3369–3380. [Google Scholar] [CrossRef]
  21. Ma, C.L.; Pan, W.M.; Yao, T.L.; Sun, L. Research on Control Strategy of VSC-HVDC in AC Power Grid. J. Northeast Dianli Univ. 2015, 35, 26–32. [Google Scholar]
  22. Bukhari, S.S.H.; Atiq, S.; Kwon, B.I. A Sag Compensator That Eliminates the Possibility of Inrush Current While Powering Transformer-Coupled Loads. IEEE J. Emerg. Sel. Top. Power Electron. Power Electron. 2017, 5, 891–900. [Google Scholar] [CrossRef]
  23. Alawasa, K.M.; Mohamed, Y.A.R.I. Impedance and Damping Characteristics of Grid-Connected VSCs With Power Synchronization Control Strategy. IEEE Trans. Power Syst. 2015, 30, 952–961. [Google Scholar] [CrossRef]
  24. Xiao, L.; Xu, Z.; An, T.; Bian, Z. Improved Analytical Model for the Study of Steady State Performance of Droop-Controlled VSC-MTDC Systems. IEEE Trans. Power Syst. 2017, 32, 2083–2093. [Google Scholar] [CrossRef]
  25. Jiang, W.; Li, W.; She, Y.; Wu, Z.; Hu, Y. Control Strategy for PWM Rectifier Based on Feedback of the Energy Stored in Capacitor and Load Power Feed-Forward. Trans. China Electrotech. Soc. 2015, 30, 151–158. [Google Scholar]
  26. Zhang, W.; Remon, D.; Cantarellas, A.M.; Rodriguez, P. A Unified Current Loop Tuning Approach for Grid-Connected Photovoltaic Inverters. Energies 2016, 9, 723. [Google Scholar] [CrossRef]
  27. Yang, W.; Song, Q.; Zhu, Z.; Li, J.; Xu, S.; Liu, W. Decoupled Control of Inner DC Electric Potential of Modular Multilevel Converter. Proc. CSEE 2016, 36, 648–655. [Google Scholar]
  28. Qader, M. Design and simulation of a different innovation controller-based UPFC (unified power flow controller) for the enhancement of power quality. Energy 2015, 89, 576–592. [Google Scholar] [CrossRef]
  29. Oates, C. Modular Multilevel Converter Design for VSC HVDC Applications. IEEE J. Emerg. Sel. Top. Power Electron. 2015, 3, 505–515. [Google Scholar] [CrossRef]
Figure 1. Structure diagram of the proposed system.
Figure 1. Structure diagram of the proposed system.
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Figure 2. Structure diagram of the topology.
Figure 2. Structure diagram of the topology.
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Figure 3. Structure diagram of the AC side equivalent circuit.
Figure 3. Structure diagram of the AC side equivalent circuit.
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Figure 4. Dynamic block diagram of the current loop.
Figure 4. Dynamic block diagram of the current loop.
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Figure 5. Dynamic block diagram of the current loop considering resistance disturbance and system delay.
Figure 5. Dynamic block diagram of the current loop considering resistance disturbance and system delay.
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Figure 6. Dynamic block diagram of voltage loop.
Figure 6. Dynamic block diagram of voltage loop.
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Figure 7. Simplified dynamic block diagram of voltage loop.
Figure 7. Simplified dynamic block diagram of voltage loop.
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Figure 8. Structure diagram of the control system.
Figure 8. Structure diagram of the control system.
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Figure 9. Simulation platform based on PSCAD/EMTDC.
Figure 9. Simulation platform based on PSCAD/EMTDC.
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Figure 10. (a) Dynamic simulation model of current loop; (b) dynamic simulation model of voltage loop.
Figure 10. (a) Dynamic simulation model of current loop; (b) dynamic simulation model of voltage loop.
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Figure 11. (a) Unit step response of current loop; (b) unit step response of voltage loop.
Figure 11. (a) Unit step response of current loop; (b) unit step response of voltage loop.
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Figure 12. (a) Jump of the reactive power; (b) voltage of DC side; (c) voltage and current of AC side; (d) current spectrum; (e) voltage of DC side with external disturbances; (f) voltage of DC side with internal disturbances.
Figure 12. (a) Jump of the reactive power; (b) voltage of DC side; (c) voltage and current of AC side; (d) current spectrum; (e) voltage of DC side with external disturbances; (f) voltage of DC side with internal disturbances.
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Figure 13. (a) Voltage sag; (b) voltage swell; (c) voltage interruption; (d) waveform of 49 Hz; (e) waveform of 51 Hz; (f) harmonic injection; (g) 3-phase unbalanced waveform; (h) voltage flick.
Figure 13. (a) Voltage sag; (b) voltage swell; (c) voltage interruption; (d) waveform of 49 Hz; (e) waveform of 51 Hz; (f) harmonic injection; (g) 3-phase unbalanced waveform; (h) voltage flick.
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Figure 14. Physical prototype.
Figure 14. Physical prototype.
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Figure 15. Structure diagram of the physical prototype.
Figure 15. Structure diagram of the physical prototype.
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Figure 16. Waveform of voltage sag.
Figure 16. Waveform of voltage sag.
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Figure 17. Waveform of voltage swell.
Figure 17. Waveform of voltage swell.
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Figure 18. Waveform of voltage interruption.
Figure 18. Waveform of voltage interruption.
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Figure 19. Waveform with third harmonic injection.
Figure 19. Waveform with third harmonic injection.
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Figure 20. Waveform of 3-phase unbalanced voltage.
Figure 20. Waveform of 3-phase unbalanced voltage.
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Figure 21. DC voltage error of voltage sag.
Figure 21. DC voltage error of voltage sag.
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Figure 22. Voltage relation before grid connection.
Figure 22. Voltage relation before grid connection.
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Figure 23. Parameters in grid connection.
Figure 23. Parameters in grid connection.
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Figure 24. Voltage sag experiment after grid connection.
Figure 24. Voltage sag experiment after grid connection.
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Table 1. Parameters of the main circuit.
Table 1. Parameters of the main circuit.
Parameters of Main CircuitValues
AC phase voltage/V220
Grid-side reactor/mH2.3
Equivalent loss resistance/Ω0.05
Equivalent capacitance of DC side/μF7050
Operating voltage of DC side capacitor/V700
Control cycle/ms0.25
Equivalent disturbance load/Ω50
Table 2. Parameters of the controller.
Table 2. Parameters of the controller.
PI Parameters of Current LoopPI Parameters of Voltage Loop
kpTikvpTvi
14000.00089 s0.60.02 s
Table 3. Technical indices of device.
Table 3. Technical indices of device.
Electrical ParametersTechnical Indexes
Capacity of device30 kVA
Capacity of load100 A
Error of DC voltage±1%
Range of disturbance voltage0–112%
Maximum harmonic number of voltage17

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Li, J.; Zhang, T.; Qi, L.; Yan, G. A Method for the Realization of an Interruption Generator Based on Voltage Source Converters. Energies 2017, 10, 1642. https://doi.org/10.3390/en10101642

AMA Style

Li J, Zhang T, Qi L, Yan G. A Method for the Realization of an Interruption Generator Based on Voltage Source Converters. Energies. 2017; 10(10):1642. https://doi.org/10.3390/en10101642

Chicago/Turabian Style

Li, Junhui, Tianyang Zhang, Lei Qi, and Gangui Yan. 2017. "A Method for the Realization of an Interruption Generator Based on Voltage Source Converters" Energies 10, no. 10: 1642. https://doi.org/10.3390/en10101642

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