Power and Voltage Control for Single-Phase Cascaded H-Bridge Multilevel Converters Under Unbalanced Loads
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energies Article Power and Voltage Control for Single-Phase Cascaded H-Bridge Multilevel Converters under Unbalanced Loads Daliang Yang 1, * , Li Yin 1 , Shengguang Xu 2 1 2 3 * and Ning Wu 3 College of Electrical Engineering, Guangxi University, Nanning 530004, China; 1612305002@st.gxu.edu.cn Liuzhou Power Supply Bureau, Gxuangxi Power Grid Corporation, Liuzhou 545005, China; hu_fm.lzg@gx.csg.cn Electric Power Research Institute, Guangxi Power Grid Corporation, Nanning 530023, China; wu_n.sy@gx.csg.cn Correspondence: yangdl@gxu.edu.cn; Tel.: +86-0771-3232264 Received: 31 August 2018; Accepted: 11 September 2018; Published: 14 September 2018 Abstract: The conventional control method for a single-phase cascaded H-bridge (CHB) multilevel converter is vector (dq) control; however, dq control requires complicated calculations and additional time delays. This paper presents a novel power control strategy for the CHB multilevel converter. A power-based dc-link voltage balance control is also proposed for unbalanced load conditions. The new control method is designed in a virtual αβ stationary reference frame without coordinate transformation or phase-locked loop (PLL) to avoid the potential issues related to computational complexity. Because only imaginary voltage construction is needed in the proposed control method, the time delay from conventional imaginary current construction can be eliminated. The proposed method can obtain a sinusoidal grid current waveform with unity power factor. Compared with the conventional dq control method, the power control strategy possesses the advantage of a fast dynamic response. The stability of the closed-loop system with the dc-link voltage balance controller is evaluated. Simulation and experimental results are presented to verify the accuracy of the proposed power and voltage control method. Keywords: cascaded H-bridge (CHB); dc-link voltage balance control; multilevel converter; power control; single-phase system 1. Introduction Multilevel converters have gained increasing attention as of late. Commonly used multilevel converters include cascaded H-bridge (CHB), flying capacitor, and neutral-point-clamped converters [1]. Among these, the CHB converter has advantages of simple implementation, high reliability, and low harmonics [2], hence, it has been widely researched in academia and industry, particularly in relation to static synchronous compensators [3], solid-state transformers [4], and active power filters [5]. Many control schemes have been proposed to enable the pulse width modulation (PWM) converter to achieve a high power factor and near-sinusoidal grid current [6]. These strategies can be broadly classified into two categories: direct power control (DPC) and direct current control (DCC). DPC was originally proposed by Ohnishi [7], whose method directly controls the active and reactive power of the PWM converter using three-phase instantaneous power theory. Compared with DCC, DPC has advantages of simple structure, fast dynamic response, high efficiency, and wide applicability [8]. Currently, many advanced DPC strategies have been proposed, such as predictive DPC (P-DPC) [9], deadbeat DPC [10], and slide-mode DPC [11]. In the single-phase PWM converter Energies 2018, 11, 2435; doi:10.3390/en11092435 www.mdpi.com/journal/energies Energies 2018, 11, 2435 2 of 18 system, instantaneous power estimation is more complicated than in the three-phase system, which limits the development of DPC schemes in single-phase systems [12]. DCC methods have been frequently used with the PWM converter. The most commonly used DCC method utilizes vector control theory (dq control) [13–16]. Coordination transformation is needed in dq control to change the ac signals into dc signals [17]. The grid voltage phase angle is essential in the coordinate transformation; therefore, a phase-locked loop (PLL) is employed to synchronize the output voltage with the grid voltage vector [18]. To accurately obtain the information on the grid voltage including the amplitude and phase angle, some advanced PLLs have been proposed, such as hybrid filtering technique-based PLL [19], grid sequence separator PLL [20], frequency-fixed SOGI-based PLL [21], and repetitive learning-based PLL [22]. However, the computational complexity of coordinate transformation and PLL increases the calculation burden of the embedded processor like the digital signal processor (DSP) [23]. Therefore, the development of a convenient control method without PLL or coordination transformation is appealing. Recently proposed control methods of the CHB converter are based on model-predictive control (MPC) [24,25]. However, three major problems arise in the MPC scheme used for the CHB converter. First, the calculation burden persists in the MPC method because the number of switching states increases exponentially as more H-bridges are added [26]. The second one is the MPC system sensitiveness problem like sensitive to the parameter [27]. The third problem is that under unbalanced load conditions, the MPC strategy cannot provide a proper control function [28]. It is exceedingly difficult to implement the dq control scheme in the single-phase CHB converter system; imaginary orthogonal current and voltage signals must be created for coordinate transformation (αβ to dq) because only one physical axis is accessible [29]. In dq control, the imaginary orthogonal current signal is essential in acquiring the dc current signals id and iq for the inner current loop [30]. Thus, an imaginary current construction module is required to produce the imaginary orthogonal current signal [31]. Although the performance of conventional imaginary current construction under the steady state is mostly acceptable, the time delay tends to slow down the system dynamic response and result in further distortion [32,33]. The control scheme performance of the CHB converter in the single-phase system depends on two key factors: sinusoidal grid current waveform with unity power factor and balanced dc-link voltages [34,35]. Therefore, the CHB multilevel converters need a control method to balance the dc-link voltages, especially when the dc-side loads are unbalanced. In [36,37], the dc-link voltages were controlled using individual capacitor voltage controllers. In [38], the presented voltage balance control method uses a weighting factor to adjust the dc-link voltages. In [39], two voltage-balancing techniques were presented, allowing for much more efficient regulation of dc-link voltages. However, these voltage balanced control methods are all based on ac voltage reference duty cycle regulation; a power-based dc-link voltage balance controller has not been analyzed in detail. In the conventional dq control strategy, the current calculation is complicated and additional time delay is required. For optimization purposes, a power control method without coordinate transformation, PLL or conventional imaginary current construction is introduced and applied to control the single-phase CHB multilevel converter system. Moreover, a power-based dc-link voltage balance control scheme is presented to make the proposed power control strategy available under unbalanced load conditions. This power and voltage control method can achieve a sinusoidal grid current waveform and balanced dc-link voltages. Several experimental tests were conducted to compare dynamic responses of the presented control scheme with those of the classical dq control method. The proposed voltage balance controller is verified as well. The remainder of this paper is organized as follows: in Section 2, principles of the proposed control scheme and dc-link voltage balance controller are discussed, and the stability of the closed-loop system with the dc-link voltage balance controller is evaluated. Section 3 presents the simulation results. Experimental results are addressed in Section 4. The proposed control method is discussed in Section 5. Finally, relevant conclusions are drawn in Section 6. Energies 2018, 11, x11, 2435 Energies 2018, 3 of319 of 18 Energies 2018, 11, x 3 of 19 2. Control Method Principles 2. Control Method 2. Control MethodPrinciples Principles 2.1. Model of the Cascaded H-Bridge Multilevel Converter 2.1.2.1. Model of of thetheCascaded Model CascadedH-Bridge H-BridgeMultilevel Multilevel Converter Converter Figure 1 presents the topology of a two-cell CHB system in which us is the grid voltage, isa is the Figure topology ofLaatwo-cell two-cell CHBsystem system in which the line grid voltage, isa is s isand Figure the topology which us isuthe grid voltage, isa is the grid current, u1c 1presents ispresents the acthe side voltage,of and RL CHB denote the in filter inductor resistance, the grid current, is the ac side voltage, L and denote the filter inductor and line resistance, grid current, u c uis the ac side voltage, L and R LRdenote the filter inductor and line resistance, c L respectively,. udc1 and udc2 represent the dc-link voltages of the first and second H-bridge, and udc_sum respectively,. udc1 and dc-link voltages voltagesof ofthe thefirst firstand andsecond secondH-bridge, H-bridge,and anduudc_sum respectively,. uvoltage dc1 anduu dc2 represent represent the dc-link dc2 is the total dc-link (u dc1 + udc2). R1 and R2 are the resistive loads connected to the dc side dc_sum of is the total dc-link voltage(u(u dc1++uudc2 dc2). to to thethe dcdc side of of is H-bridge. the total dc-link voltage ). R R11 and andRR2 2are arethe theresistive resistiveloads loadsconnected connected side dc1 each each H-bridge. each H-bridge. Figure 1.1. Two-cell single-phase CHBconverter. converter. Figure Two-cell single-phase CHB Figure 1. Two-cell single-phase CHB converter. The mathematical model ofofthe CHB converter is as follows: The mathematical model the CHB converter is as follows: The mathematical model of the CHB ( converter is as follows: Ldidisadtsa = us − uc − R L isa di Lsa u c − R L isa (1) L = u s= −u su=c− −u R isa u udt (1) dc_sum dc1L + dc2 dt (1) dc _ sum = u dc1 + u dc 2 u dc_usum = u dc1 + u dc 2 stability, To simplify analysis of system according to Equation (1), a small-signal model of the To simplify analysis of system stability, according to Equation (1), a small-signal model of the stationary reference frame (αβ frame) was built, as illustrated in Figure Here, usα equals , and To simplify analysis of system stability, according to Equation (1), a2.small-signal modelusof theusβ stationary reference frame (αβ frame) was~built, as illustrated in Figure 2. Here, usα equals us, and usβ ~ and is the orthogonal signal(αβ of u u represent the small-signal ac variation of u and s ; u~ sαwas sα sβ stationary reference frame frame) built, as illustrated in Figure 2. Here, u sα equals u s , and usβusβ ; orthogonal signal of us; u sα and u~sβ represent the small-signal ac variation of usα and usβ; u~dc1 ~ is the ~ ~ ~ ~ u and u denote the small-signal ac variation of u and u ; i equals i , and i is sα is thedc1 orthogonal acdc2 variation of usαsaand usβsβ ; u dc1the dc2signal of us; u sα and u sβ represent the small-signal and u~dc2 denote the small-signal ac variation of udc1 and udc1 dc2; isα equals isa, and isβ is the orthogonal ~ ~ ~dc2 denote signal of isa~; i sα and small-signal ac variation of isβ ; Isα and Isβ andorthogonal usignal small-signal aci variation of uthe dc1 and udc2; isα equals isa, iand isβisα is and the orthogonal sβ represent of isa; the i~sα and i sβ represent the small-signal ac variation of isα and sβ; Isα and Isβ stand for the ~ ~ stand for the quiescent operating point of i and i ; D , D , D , and D are the duty cycles of the sα α1 α2 signalquiescent of isa; i sαoperating and i sβ represent sα and isβ;β2 Isα and Isβ stand for the sβvariation of iβ1 point of isαthe andsmall-signal isβ; Dα1, Dα2, Dac β1, and Dβ2 are the duty cycles of the first and second ~ , d~ , d~ , and d~ first and second H-bridge; and d represent the small-signal ac variation of Dα2 , quiescent operating of sβ α1α2 , Dα2, β1 Dβ1the , and Dβ2β2 are the cycles the and second ~α1, d~α2 H-bridge; and dpoint , di~sαβ1,and andiα1 d~; β2Drepresent small-signal acduty variation ofof Dα2 , Dfirst β1, and Dβ2 . Dβ1 , and Dβ2 H-bridge; and d~.α1, d~α2, d~β1, and d~β2 represent the small-signal ac variation of Dα2, Dβ1, and Dβ2. u~sα u ~ sβ u~sα i ~ sα i ~ sα d ~ α 1 I sα + Dα 1i ~ sα + + Dα 1i ~ sα~ + d β 1 I s β + D β 1i s β d ~ β 1 I s β + D β 1i ~ s β d ~ α 1~I sα C1 C1 u ~ dc1 u ~ dc1 udc1d ~α 1 + Dα 1u ~ dc1 + udc 2 d ~α 2 + Dα 2u ~ dc 2 udc1d ~α 1 + Dα 1u ~ dc1 + udc 2 d ~α 2 + Dα 2u ~ dc 2 udc1d ~ β 1 + Dβ 1u ~ dc1 + udc 2 d ~ β 2 + Dβ 2u ~ dc 2 u ~ sβ i ~ sβ i ~ sβ udc1d ~ β 1 + Dβ 1u ~ dc1 + udc 2 d ~ β 2 + Dβ 2u ~ dc 2 d ~ α 2 I sα + Dα 2 i ~ sα + d ~ αd 2~Iβs2αI s+β D+αD2 βi ~2siα~ s+β C2 C2 u ~ dc 2 u ~ dc 2 ~ d ~single-phase Figure 2. Small-signal model of two-cell in αβ frame coordination. sβ β 2 I s β + DCHB β 2 i converter Figure 2. Small-signal model of two-cell single-phase CHB converter in αβ coordination. Figure 2. Small-signal model of two-cell single-phase CHB converter in frame αβ frame coordination. Energies 2018, 11, x 4 of 19 Energies 2018, 11, 2435 4 of 18 2.2. Principle of the Proposed Power Control Method The main function of CHB multilevel converter is to obtain active power and reactive power 2.2. Principle of the Proposed Power Control Method from the grid to satisfy load needs. For the CHB converter, the essence of controlling the grid main as function of CHB multilevel converter is toinput obtainand active power and reactive powerand from currentThe as well the dc-link voltage is control of the output power. By rapidly the grid to satisfy load thereactive CHB converter, theconverter essence ofcan controlling griddynamic current as well effectively controlling theneeds. activeFor and power, the achieve the strong and as the dc-link voltage is control of the input and output power. By rapidly and effectively controlling static characteristics. theInactive and reactive CHB power, the converter canthe achieve strong dynamic staticpower characteristics. the three-phase converter system, active power p and and reactive q can be In the described as: three-phase CHB converter system, the active power p and reactive power q can be described as: " # " #" # p p usαusα usβusβisα isα (2) (2) = * ∗ * ∗ q = q u suα sαu suβ sβisβ isβ where =. −usα . where u*sαu*=sαu=sβ,uusβ*sβ, u =*−u sβ sα Only one phase physical variable is available in the single-phase converter system; Only one phase physical variable is available in the single-phase CHBCHB converter system; a a second-order generalized integrator (SOGI) block is needed to introduce the imaginary signal. second-order generalized integrator (SOGI) block is needed to introduce the imaginary signal. The The virtual αβ stationary reference is depicted in Figure 3, the α-axis coincides with a-axis, virtual αβ stationary reference frameframe is depicted in Figure 3, the α-axis coincides with thethe a-axis, and β-axis is orthogonal α-axis. and thethe β-axis is orthogonal to to thethe α-axis. β b (α ) 0 c Figure 3. Schematic diagram virtual coordinate axis. Figure 3. Schematic diagram of of virtual αβαβ coordinate axis. single-phase CHB converter system, p and q can described follows: In In thethe single-phase CHB converter system, p and q can bebe described asas follows: #" # " # " p p 11 usαusα usβusβisα isα = = q q 33u*suα∗ sαu*suβ ∗sβisβ isβ (3) (3) * and * are defined theactive activepower powerand andreactive reactivepower powerreference, reference,respectively; respectively;i*isα* sαand andi*sβi* sβ p* pand q* qare defined asasthe represent current reference. represent thethe current reference. Equations(4) (4)and and (5) are as as follows according to Equation (3), and(3), theand coefficient calculation Equations areshown shown follows according to Equation the coefficient of the proposed power control is control shown in Equation (6): calculation of the proposed power is shown in Equation (6): " #" # " * # u *s u * ∗ 33 β sβ −u s− β usβp p∗ i∗sαi sα = * = * ∗ * ∗ * uu*∗ssβ −uu*s∗αsα*∗uu i∗sβi s β uusα q q sα ∗ β − s βsβ −u− sαu sαu sα usα (4) (4) # 3u*sβ 3u∗ sβ −3−u3u ∗ * sβ sβ * p∗ + sα usα*∗u∗ sβ −u* ∗ sα ∗usβ q q * usα ∗u*∗ sβ −∗u∗ sα ∗pusβ+ * = (5) * usαsβ * u sβ −3uusα sα * usβq∗ i sα i∗ sβ usα * u sβ − u s−α 3u ∗us+ α p ∗ −u∗ ∗u ∗ −u∗ ∗u u ∗ u u ∗ u = sα sα sα sα sβ sβ sβ sβ * u*sα 3usα −3 (5) i sβ * * ∗ 3u p + sβ q * = * * k usα * u*sβ ∗ ∗ 1 − u sα * uusβsα ∗u sβ −uusαsα*∗uusβsβ − u sα * usβ (6) −3usβ k2 = usα*∗u∗ sβ −u∗ sα ∗usβ 3u sβ * * * * k1 = *result *of usα * u sβ + u sα * u sβ is constant; p is controlled If the grid voltage is sinusoidal, then the usα * u sβ − u sα * usβ * by the outer power loop; q is constant because it is given directly; therefore the frequency and phase of −with 3usβ the instantaneous grid voltage, and the real-time (6) the current references isα and isβ are consistent k2 = * * * − u * u u * u tracking can be achieved. Notably, only i sαsα is used assthe current reference, because the CHB multilevel sβ α sβ " i∗ converter is used on a single-phase system. Energies 2018, 11, x 5 of 19 If the grid voltage is sinusoidal, then the result of usα * u*sβ + u*sα * u*sβ is constant; p* is controlled by the outer power loop; q* is constant because it is given directly; therefore the frequency and phase of the current references isα and isβ are consistent with the instantaneous grid voltage, and the Energies 2018, 11, 2435 5 of 18 real-time tracking can be achieved. Notably, only i*sα is used as the current reference, because the CHB multilevel converter is used on a single-phase system. 2.3. Presentation of Proposed Dc-Link Balance Controller 2.3. Presentation of Proposed Dc-Link Balance Controller Figure 4 presents the conventional dc-link voltage balance controller. In this approach, the duty 4 presents the conventional dc-link voltage balance controller. In this the duty cyclesFigure of each ac voltage reference u* a1 and u* a2 are modified separately to keep theapproach, voltages balanced, * *a2 are modified separately to keep the voltages balanced, cycles of each ac voltage reference u a1 and u and the scheme is suitable for the dq method. A power-based dc-link voltage balance controller and the scheme is suitable for theduty dq method. A power-based balance controller adjusting the ac current reference cycle is introduced in thisdc-link paper voltage to regulate the individual adjusting dc-link the ac current H-bridge voltage.reference duty cycle is introduced in this paper to regulate the individual H-bridge dc-link voltage. Δdu1 Δdu 2 Figure Conventional voltage Figure 4. 4. Conventional voltage balance balance controller controller [37]. [37]. If each H-bridge is unbalanced (mainly via load then the power If the thedc-link dc-linkvoltage voltageofof each H-bridge is unbalanced (mainly via imbalance), load imbalance), then the of these H-bridges becomes uneven. To keep the dc-link voltage balanced, the uneven power should power of these H-bridges becomes uneven. To keep the dc-link voltage balanced, the uneven power be extracted from thefrom grid.the ∆dp1 and∆d ∆d p2 are used as the compensation values to eliminate uneven should be extracted grid. p1 and ∆dp2 are used as the compensation values to eliminate power. ∆d p1 and∆d p2 are calculated by the voltage balance controller: uneven∆d power. p1 and ∆dp2 are calculated by the voltage balance controller: ∆d p1 = (K p + KKsii )(ure f − udc1 ) · udc1 (7) Δd p1 = ( K p + Ksi )(uref − udc1 ) ⋅ udc1 ∆d = (K p + s )(ure f − udc2 ) · udc2 (7) p2 Δd = ( K + K i )(u − u ) ⋅ u pand integral ref dc 2 dc 2 of the proportional-integral (PI) where Kp and Ki represent the proportional coefficient p 2 s controller, respectively, and uref is the voltage reference of every H-bridge cell. and Ki represent proportional integral of themodifies proportional-integral where Kppresented The voltage the balance controllerand is shown in coefficient Figure 5, which the duty cycles(PI) of controller, respectively, and u ref is the voltage reference of every H-bridge cell. * * each ac current reference i sa1 and i sa2 individually to reduce the dc voltage imbalance. The current The presented voltage can balance controlleraccording is shown to inEquations Figure 5, which modifies the duty cycles reference for each H-bridge be calculated (8)–(10): * * of each ac current reference i sa1 and i sa2 individually to reduce the dc voltage imbalance. The current ( reference for each H-bridge can be calculated according (8)–(10): i∗ sα1 = ∆di∗ sa1 +toi∗Equations sα (8) ∗ ∗ = ∆di∗ sa2 *+ i sα ii* sαsα2 1 = Δ d i* sa1 + i sα (8) * * ( i sα 2 = Δ d i* sa 2 + i sα ∗ ∗ ∗ i sα1 = ∆d p1 (k1 + k2 ) + p k1 + q k2 (9) ∗ = ∆d p2 (k1 + k2 ) +* p∗ k1 *+ q∗ k2 ii* sαsα2 1 = Δ d p1 ( k1 + k 2 ) + p k1 + q k 2 (9) ( * k 2 ∗) )++p *kk1(+ q*k =Δ ∗ ii∗ sα1 2 ( k1 + sα 2 = k1d(p∆d 2 ∆d p1 2+ q ) p1 + p (10) i∗*sα2 = k1 (∆d p2 +* p∗ ) + k2 (∆d p2* + q∗ ) ( Energies 2018, 11, x i sα 1 = k1 ( Δd p1 + p ) + k 2 ( Δd p1 + q ) * * * i sα 2 = k1 ( Δd p 2 + p ) + k 2 ( Δd p 2 + q ) Δd p1 Δd p 2 6 of 19 (10) Δdi*sa1 = Δd p1 (k1 + k2 ) Δdi*sa 2 = Δd p 2 (k1 + k2 ) Figure 5. 5. Proposed Proposed voltage voltage balance balance controller. controller. Figure 2.4. Proposed Power Control of the Cascaded H-Bridge Multilevel Converter The overall control topology of the proposed control method is depicted in Figure 6. The main idea of the proposed control is to obtain command signals in the orthogonal αβ frame; as such, the p1 i sa1 Δd p 2 1 2 Δdi*sa 2 = Δd p 2 (k1 + k2 ) Energies 2018, 11, 2435 6 of 18 Figure 5. Proposed voltage balance controller. 2.4. Proposed Power Control of the Cascaded H-Bridge Multilevel Converter 2.4. Proposed Power Control of the Cascaded H-Bridge Multilevel Converter The overall control topology of the control method inFigure Figure6.6.The The main idea The overall control topology of proposed the proposed control methodisisdepicted depicted in main of the proposed is to obtain command signalssignals in theinorthogonal αβ αβ frame; asassuch, idea of thecontrol proposed control is to obtain command the orthogonal frame; such,the the dc-link can be balanced. voltagesdc-link can bevoltages balanced. udc1 udc 2 q* − is a u*a1 u*a2 i*sa1 i*sa2 p* 2 * uref + udc1 + udc2 udc 2 is a usα udc1 us β isa us us Figure 6. Proposed power control CHB converter. Figure 6. Proposed powerand and voltage voltage control of of CHB converter. The control system is formed as as a double control structure the current inner current The control system is formed a doubleclosed-loop closed-loop control structure usingusing the inner loop the outer power loop. loop and theand outer power loop. The current inner current is implementedininthe the orthogonal orthogonal αβαβ frame. Compared with classical The inner looploop is implemented frame. Compared with classical single-phase dq schemes, the current calculation of the proposed control method is simpler because single-phase dq schemes, the current calculation of the proposed control method is simpler because no no coordinate transformation, PLL, or conventional imaginary current construction is needed. coordinate transformation, PLL, or conventional current construction is needed. However, However, the current references i*sa1 and i*sa2 areimaginary ac variables. To track the current references with * * the current areand ac variables. To tracking track the currentwhen references zero error in zero references error in thei stationary frame achieve high accuracy the gridwith frequency sa1 and i sa2 fluctuates, rather relying conventional PI when controllers or afrequency repetitive fluctuates, controller [40], the stationary frame and than achieve highon tracking accuracy the grid rather than (PR) controllers are utilized in the current relying proportional-plus-resonant on conventional PI controllers or a repetitive controller [40],loop. proportional-plus-resonant (PR) As for the outer power loop, a PI controller is used to adjust the total dc-link voltage udc_sum (udc1 controllers are utilized in the current loop. + udc2). The active power p* is generated by multiplying the output of the PI controller by the total Asdc-link for thevoltage outerudc_sum power loop, a PI controller is used to adjust the total dc-link voltage udc_sum . Reactive power reference q* is given directly. (udc1 + udc2 ).The The active power p* is generated by and multiplying the output the PI in controller detailed control topology of the power voltage control module of is shown Figure 7. by the * * * total dc-link voltage udc_sum power and reference q second is given directly. Current reference i sa1 of. Reactive the first H-bridge i sa2 of the H-bridge are acquired through the voltage balance controlofblock; these current references are controlled Thedc-link detailed control topology the power and voltage control module isindependently. shown in Figure 7. * Deviation values between the grid current i sa* and the current references are input into the PR Current reference i sa1 of the first H-bridge and i sa2 of the second H-bridge are acquired through the regulators separately, and the modulation voltage signals u*a1 and u*a2 are generated for the first and dc-link voltage balance control block; these current references are controlled independently. Deviation second H-bridge. Carrier phase-shifted PWM (CPS-PWM) technology is adopted to generate values between grid achieving current isamulti-level and the current references are input the PR regulators five-levelthe voltage, modulation. Furthermore, if theinto reactive power referenceseparately, q* * * and theismodulation voltage u a1 can andbeuachieved. a2 are generated for the first and second H-bridge. set to zero, then a unitysignals power factor Carrier phase-shifted PWM (CPS-PWM) technology is adopted to generate five-level voltage, achieving multi-level modulation. Furthermore, if the reactive power reference q* is set to zero, then a unity Energies 2018, 11,be x achieved. 7 of 19 power factor can udc1 udc 2 us usα isα isβ us β Figure 7. 7.Power controlmodule. module. Figure Powerand and voltage voltage control 2.5. Stability Analysis of the Power and Voltage Control Scheme Assume that the parameters of the H-bridges are identical, such that the dc-link voltage udc1 = udc2 = udc. The double-loop control diagram presented in Figure 6 can thus be transformed as illustrated in Figure 8. In Figure 8, GV is the voltage gain of CHB, GPIV is the voltage PI regulator, K Energies 2018, 11, 2435 7 of 18 Figure 7. Power and voltage control module. 2.5. Stability Analysis of the Power and Voltage Control Scheme Assume that that the theparameters parametersofofthethe H-bridges identical, the dc-link voltage H-bridges areare identical, suchsuch that that the dc-link voltage udc1 = udc1 = udc2 = udc double-loop . The double-loop control diagram presented in Figure 6 canthus thusbe be transformed transformed as dc2 = dc. The control diagram presented in Figure 6 can illustrated in Figure 8. In In Figure Figure 8,8,GGVVisisthe thevoltage voltagegain gainofofCHB, CHB,GG voltage regulator, PIV is is thethe voltage PI PI regulator, K PIV K conversion coefficient between p* and GqPR the current PR regulator, GTPWM is the is is thethe conversion coefficient between p* and i*sa, Gi*qPR the is current PR regulator, GTPWM is the transfer sa , is transfer of the PWM modulator, is the transfer of the to voltage tocurrent output current functionfunction of the PWM modulator, GIV is theGIV transfer functionfunction of the voltage output i*sa, and * iGsa and transfer function of the to current tovoltage output u voltage udc . G GVIIVcan andbe GVI can be deduced VI, is theGtransfer of the current output dc. GIV and deduced from the VI is the function from the small-signal modelinshown small-signal model shown Figurein 2. Figure 2. uref + Δudc − GPIV udc p* K ∗ isa + − GqPR GTPWM + us isa u dc − GIV isa 1 K p 1 udc GVI u dc Figure 8. Basic double-loop controller structure diagram of the proposed power control. control. The closed-loop transfer function can be expressed expressed as as follows: follows: GGVV == GPIV GqPR GTPW GIV GVVII G PIV G qPRG TPWM IV G MG 11+ G qPRG +G GPIV GTPW MG IV PIV GqPR TPWM IV GV VII (11) (11) One bridge of the CHB converter can be be simplified simplified according according to to Figure Figure 99 per per Thevenin Thevenin law. law. However, the dc-link voltage unbalance problem in CHB remains under the unbalanced load condition; However, the dc-link voltage unbalance problem in CHB remains under the unbalanced load therefore voltagethe balance control module should be added. Figure 10 Figure shows 10 theshows Thevenin condition;the therefore voltage balance control module should be added. the equivalent circuit withcircuit the dc-link balance module, wheremodule, Z1 is the where load impedance, Thevenin equivalent with voltage the dc-link voltage balance Z1 is the Zload io is the impedance between the input and output of CHB, is theofgain of the balance control impedance, Zio is the impedance between the input andM output CHB, M isvoltage the gain of the voltage module, G1 is themodule, conversion of power to voltage, iout to is the outputand current. case balance control G1 iscoefficient the conversion coefficient of and power voltage, iout is In thethis output G * ucase ). current. InPIV this G 1 = 1/(G PIV * u dc ). 1 = 1/(G dc Taking Taking the the first first H-bridge H-bridge as as an an example: example: uu dc1 G1 [ pp∗* ++ ((uurereff − ) M]]GGVV == ZZioio dc1 ++uudc1 − udc1 dc 1 ) dc 1 ZZ1 1 (12) (12) GVGG GG M1 M V1G 11 VG VG pp∗*+ udc1 = udc1 = + uref ure f Zio /Z + 1 + G G M Z /Z + 1 +V G1VMG1 M Z io 1/ Z1 + 1 + GVV G11 M Z ioio / Z11+ 1 + G (13) (13) Because Z1 >> Zio , GG1 M represents the gain in the basic double-loop controller with the dc-link voltage balance module from Equation (13); the Bode plot is shown in Figure 11. The amplitude margin is 12.7 dB, the cut-off frequency is 272 Hz, the phase margin is 105◦ , and the cross-over frequency is 78 Hz. All roots of (Zio /Z1 + 1 + GG1 M) are on the left half-complex plane, ensuring stability of the system2018, with11,the Energies x voltage balance control module. 8 of 19 Zio uref GV uref iout Z1 Thevenin equivalent circuit of the basic double-loop. Figure 9. Thevenin Z1 GV uref Energies 2018, 11, 2435 Figure 9. Thevenin equivalent circuit of the basic double-loop. 8 of 18 Figure 10. Thevenin equivalent circuit with the voltage balance module controller. Because Z1 >> Zio, GG1M represents the gain in the basic double-loop controller with the dc-link voltage balance module from Equation (13); the Bode plot is shown in Figure 11. The amplitude margin is 12.7 dB, the cut-off frequency is 272 Hz, the phase margin is 105°, and the cross-over frequency is 78 Hz. All roots of (Zio/Z1 + 1 + GG1M) are on the left half-complex plane, ensuring stability of the system with the voltage balance control module. Figure10. 10.Thevenin Theveninequivalent equivalentcircuit circuitwith withthe thevoltage voltagebalance balancemodule modulecontroller. controller. Figure Because Z1 >> Zio, GG1M represents the gain in the basic double-loop controller with the dc-link voltage balance module from Equation (13); the Bode plot is shown in Figure 11. The amplitude margin is 12.7 dB, the cut-off frequency is 272 Hz, the phase margin is 105°, and the cross-over frequency is 78 Hz. All roots of (Zio/Z1 + 1 + GG1M) are on the left half-complex plane, ensuring stability of the system with the voltage balance control module. Figure 11. 11. Bode Bode plot plot of of the the basic basic double-loop double-loop controller controller with Figure with the the dc-link dc-link voltage voltage balance balance module. module. 3. Simulation Results 3. Simulation Results The CHB converter system shown in Figure 1 was modelled in the MATLAB/Simulink R2015a The CHB converter system shown in Figure 1 was modelled in the MATLAB/Simulink R2015a (MATLAB/Simulink R2015a, MathWorks, Natick, MA, USA) software environment to verify the power (MATLAB/Simulink R2015a, MathWorks, Natick, MA, USA) software environment to verify the and voltage control scheme. The main system parameters used for simulation are shown in Table 1. Tabledouble-loop 1. Parameters Used For Simulation. Figure 11. Bode plot of the basic controller with the dc-link voltage balance module. Parameter Symbol Simulation Value Grid voltage rms value us 220 V dc-link total voltage dc-link capacitance dc-link load resistance Switching frequency Inner current loop control parameters Outer power loop control parameters Udc C1 , C2 R1 , R2 fsw P, R, wc P, I 400 V 4700 µF 10 Ω, 15 Ω 10 kHz 0.5, 100, 6.28 0.1, 8 3. Simulation Results The CHB converterGrid system shown in Figure 1 was modelled in the MATLAB/Simulink R2015a frequency fg 50 Hz Input inductance L 3.0 mH (MATLAB/Simulink R2015a, MathWorks, Natick, MA, USA) software environment to verify the Input Inputinductance inductance dc-link dc-linktotal totalvoltage voltage dc-link dc-linkcapacitance capacitance dc-link dc-linkload loadresistance resistance Switching Switchingfrequency frequency Inner Innercurrent currentloop loopcontrol controlparameters parameters Energies 2018, 11, 2435 Outer Outerpower powerloop loopcontrol controlparameters parameters LL U Udcdc CC11,,CC22 RR11,,RR22 ffswsw P, P,R, R,wwcc P,I P,I 3.0 3.0mH mH 400 400VV 4700 4700μF μF 10 10Ω, Ω,15 15Ω Ω 10 10kHz kHz 0.5, 0.5,100, 100,6.28 6.28 0.1, 0.1,88 9 of 18 3.1. Proposed Power Control Scheme Simulation 3.1. 3.1.Proposed ProposedPower PowerControl ControlScheme SchemeSimulation Simulation Figures with unbalanced loads, where R1 R = Ω R2 R =R2215 Ω. Figures 12–14 show the simulation results with unbalanced loads, where == 10 Ω == 15 Figures12–14 12–14show showthe thesimulation simulationresults results with unbalanced loads, where R1110 10and Ω and and 15 Figure 12a displays the grid voltage and grid current waveform in the steady state, revealing that the Ω. Ω. Figure Figure 12a 12a displays displays the the grid grid voltage voltage and and grid grid current current waveform waveform in in the the steady steady state, state, revealing revealing unity power was achieved. that unity power factor was thatthe the unityfactor power factor wasachieved. achieved. (a) (a) (b) (b) Figure Figure12. 12.Simulation Simulationwaveforms waveformsof ofCHB CHBconverter converterin insteady steadystate: state:(a) (a)Grid state: (a) Grid voltage voltage and and grid grid current; current; (b) waveform. (b)Five-level Five-levelvoltage voltagestaircase staircasewaveform. waveform. (a) (a) (b) (b) Figure from 00var 1500 (a) the (b) Figure13. 13.q* q*changed changed fromfrom var0to tovar 1500tovar: var: (a)Dynamic Dynamic response ofresponse the grid grid current; current; (b) Dynamic Dynamic Figure q* changed 1500 var: (a) response Dynamicof of the grid current; response of the reactive power. response of the reactive power. (b) Dynamic response of the reactive power. (a) (a) (b) (b) Figure 14. q* changed from 0 var to −1500 var: (a) Dynamic response of the grid current; (b) Dynamic response of the reactive power. Figure 12b shows the ac side five-level staircase voltage. Dynamic responses of the proposed method under sudden reactive power change conditions are shown in Figures 13 and 14. In these, the active power reference p* is governed by the outer power loop, and the reactive power reference q* is changed from 0 to −1500 var and 0 to 1500 var at 0.34 s. 3.2. Power-Based Voltage Balance Control Simulation In this simulation, the initial loads of two H-bridges were 15 Ω resistors. At 1.0 s, the resistor of the first H-bridge declined to 10 Ω. Two distinct cases were considered. In Figure 15a, the voltage balance control module was not utilized, and the dc-link voltages became different after the load change. The second H-bridge, whose resistor was unchanged, demonstrated higher dc-link voltage Figure 12breference shows the side five-level staircase voltage.loop, Dynamic responses the proposed the active power p ac is governed by the outer power and the reactiveofpower reference under reactive power change conditions are shown in Figures 13 and 14. In these, q* ismethod changed fromsudden 0 to −1500 var and 0 to 1500 var at 0.34 s. the active power reference p* is governed by the outer power loop, and the reactive power reference * is changed from 0 to −1500 var and 0 to 1500 var at 0.34 s. 3.2.qPower-Based Voltage Balance Control Simulation InPower-Based this simulation, the initialControl loads of two H-bridges were 15 Ω resistors. At 1.0 s, the resistor of 3.2. Voltage Balance Simulation Energies 2435 10 of 18 the2018, first11,H-bridge declined to 10 Ω. Two distinct cases were considered. In Figure 15a, the voltage In this simulation, the initial loads of two H-bridges were 15 Ω resistors. At 1.0 s, the resistor of balance control module was not utilized, and the dc-link voltages became different after the load the first H-bridge declined to 10 Ω. Two distinct cases were considered. In Figure 15a, the voltage change. The second H-bridge, whose resistor was unchanged, demonstrated higher dc-link voltage balance control module was not dc-linkvoltages voltages became different afterbalance the load control than than the first H-bridge. Figure 15butilized, showsand thethe dc-link with the voltage the first H-bridge. Figure 15b shows the dc-link voltages with the voltage balance control change. The second H-bridge, whosebalance resistor was unchanged, demonstrated higher dc-linkreturned voltage method. Using the proposed voltage control module, the dc-link voltages method. Using the proposed voltage balance control module, the dc-link voltages returned to theto the than the first H-bridge. Figure 15b shows the dc-link voltages with the voltage balance control initialinitial value (200(200 V). value method. UsingV). the proposed voltage balance control module, the dc-link voltages returned to the initial value (200 V). (a) (b) (a) (b) Figure 15. Simulated responseofofdc-link dc-link voltages voltages when (a) (a) Without voltage balance Figure 15. Simulated response whenload loadchanged: changed: Without voltage balance Figure 15. Simulated response of dc-link voltages when load changed: (a) Without voltage balance control; (b) With voltage balance control. control;control; (b) With voltage balance control. (b) With voltage balance control. 4. Experimental Results 4. Experimental Results 4. Experimental Results 4.1.4.1. Experimental Prototype 4.1. Experimental Prototype Experimental Prototype A single-phase five-level CHB converter experimental platform was adopted validate A single-phase five-level CHB converter platform was adopted to validate A single-phase five-level CHB converter experimental experimental platform was adopted totovalidate thethe the presented power and voltage control scheme, as shown in Figure 16. presented and voltage control scheme,as asshown shown in 16.16. presented powerpower and voltage control scheme, inFigure Figure Figure 16.16.Platform ofthe theexperiments. experiments. Figure Platform of Figure 16. Platform of the experiments. Two H-bridge converters with serially connected inputs formed the ac side of the experimental setup. The dc output of each converter fed the loads. The converter was interfaced to the grid through a coupling transformer and a voltage regulator to ensure safety during the experiments. The secondary-side voltage of the regulator was set to 80 V (rms), while the dc-link voltage references udc1 and udc2 were set to 50 V. The grid voltage, grid current, ac side voltage, and dc-link voltages were measured using the outer high-performance hall sensors. A TMS320F28377D DSP processor board was utilized to implement the control algorithm. Measured voltage and current signals were fed back to the DSP processor board employing a built-in, 16-bit analog-digital conversion module. The power factor and total harmonic distortion (THD) of the grid current were measured via a Fluke 435 power quality analyzer. 4.2. Steady State Figure 17 depicts the experimental waveforms of the grid voltage us (200 V/division), the grid current isa (20 A/division), the dc-link voltage of the first H-bridge udc1 (20 V/division), and the ac side voltage uc (100 V/division) for the proposed scheme in the steady state, where loads R1 and R2 in Figure 1 are 10 Ω and 15 Ω, separately. When the reactive power reference q* was set to zero, the grid conversion module. The power factor and total harmonic distortion (THD) of the grid current were measured via a Fluke 435 power quality analyzer. 4.2. Steady State Figure 17 depicts the experimental waveforms of the grid voltage us (200 V/division), the grid 11 of 18 current isa (20 A/division), the dc-link voltage of the first H-bridge udc1 (20 V/division), and the ac side voltage uc (100 V/division) for the proposed scheme in the steady state, where loads R1 and R2 in Figure are 10 with Ω andthe 15 Ω, separately. reactive power reference q* was setThe to zero, theof the current was in1 phase grid voltage, When so thethe unity power factor was achieved. THD grid current was in phase with the grid voltage, so the unity power factor was achieved. The THD grid current in the steady state was 4.3%, indicated in Figure 18. Moreover, this method was found of the grid current in the steady state was 4.3%, indicated in Figure 18. Moreover, this method was to compensate for the reactive power: CHB converters can generate or absorb reactive power to the found to compensate for the reactive power: CHB converters can generate or absorb reactive power power whengrid the reactive is positive or negative. In Figure 19, the gridgrid current to grid the power when thepower reactivereference power reference is positive or negative. In Figure 19, the was leading the grid voltage; thus, the CHB converter was generating reactive power to the system. current was leading the grid voltage; thus, the CHB converter was generating reactive power to the In Figure 20, In theFigure grid current voltage, CHB converter was converter absorbingwas reactive system. 20, thewas gridlagging currentthe was laggingand thethe voltage, and the CHB absorbing power from the system. power from thereactive system. Energies 2018, 11, 2435 Energies 2018, 11, x Energies 2018, 11, x Figure 17.17. Experimental of CHB CHBconverter converter steady state. Figure Experimentalwaveforms waveforms of in in steady state. Figure 18.THD THD of grid grid current state. Figure currentin insteady steady state. Figure18. 18. THD of of grid current in steady state. Figure 19.19. Experimental currentsofofCHB CHBcapacitive capacitive mode. Figure Experimental grid grid currents mode. Figure 19. Experimental grid currents of CHB capacitive mode. 12 of 19 12 of 19 Energies 2018, 11, 2435 12 of 18 Figure 19. Experimental grid currents of CHB capacitive mode. Figure 20. Experimental CHB inductive mode. Figure 20. Experimentalgrid grid currents currents ofofCHB inductive mode. 4.3. Dynamic Response Compared with dqdq Control 4.3. Dynamic Response Compared with Control Currently, the most popular controlmethod method for CHBCHB converter is dq control. Currently, the most popular control forthe thesingle-phase single-phase converter is dq control. Several experiments were carried out tocompare compare conventional conventional dq dq control withwith the proposed control control Several experiments were carried out to control the proposed Energies 2018, 11, x 13 of 19 method. These experiments tested the dynamic responses of the systems under sudden power change method.InThese testeddc-link the dynamic of the systems sudden power was conditions. theseexperiments tests, the total voltageresponses udc_sum was kept at 100under V, and the system change conditions. In these tests, the total dc-link voltage u dc_sum was kept at 100 V, and the system connected to two resistive loads where R1 is 10 Ω and R2 is 15 Ω, respectively. The dynamic of the connected two resistive loads where R1 is 10 Ω and R2 is 15 Ω, respectively. The dynamic *of d-axiswas current i* d intothe dq control was managed by the outer voltage loop, and active power p in the the d-axis current i*d in the dq control was managed by the outer voltage loop, and active power p* in proposed scheme was controlled by the outer power loop. Therefore, only step changes in the reactive the proposed scheme was controlled by the outer power loop. Therefore, only step changes in the current reference i* in the dq control and reactive power reference q* in the proposed control were reactive currentq reference i*q in the dq control and reactive power reference q* in the proposed applied to evaluate the dynamic control of each. Differences the Differences dynamic performance control were applied to evaluate theperformance dynamic control performance of in each. in the of thedynamic dq control scheme and the proposed control method are illustrated in Figures performance of the dq control scheme and the proposed control method are 21–28. illustrated in The total dc-link voltage udc_sum is 100 V; i* q and q* are given directly in each control method. Figures 21–28. The total dc-link voltage udc_sum is 100 i*q and directly in each method. Reactive power reference q* equals udc_sum * i*V; * i*qq*).are Forgiven instance, when the control step change of i* q is q (100 * * * * * * * Reactive power reference q equals * ivar); q (100when * i q). For when i q ischange 5 5 A, the step change of q equals 100 * iudc_sum the instance, step change ofthe i q step is −5change A, theofstep q (500 * equals 100 * i*q (500 var); when the step change of i*q is −5 A, the step change * * A, the step change of q of q equals 100 * i q (−500 var). of q* equals 100 * i*q (−500 var). As shown, the transient responses of the proposed power control method (less than 1 ms) were As shown, the transient responses of the proposed power control method (less than 1 ms) were faster than the dq control method (more than 5 ms). In the dq control method, a time delay of 1/4 in the faster than the dq control method (more than 5 ms). In the dq control method, a time delay of 1/4 in fundamental period arose from classical imaginary current construction. the fundamental period arose from classical imaginary current construction. Grid Grid current and five-level staircase voltage continuous distortions also appeared in in thethe dq control current and five-level staircase voltage continuous distortions also appeared dq method duemethod to conventional imaginaryimaginary current construction. control due to conventional current construction. Figure 21.21. i* qi*changed A to to55AA(dq (dqcontrol control method). q changed from Figure from 00 A method). Energies 2018, 11, 2435 Energies 2018, 11, x Energies 2018, 11, x Figure 21. i*q changed from 0 A to 5 A (dq control method). Figure 22. 22. qq**changed changedfrom from00var varto to500 500var var(proposed (proposed control control method). method). Figure Figure 23. i**q changed from 0 A to −5 A (dq control method). Figure changed from A(dq (dqcontrol controlmethod). method). Figure23. 23.ii*qq changed from 00 A A to to − −55A * changed from 0 var to −500 var (proposed control method). Figure Figure 24. 24. qq* changed from 0 var to −500 var (proposed control method). Figure 24. q* changed from 0 var to −500 var (proposed control method). 13 of 18 14 of 19 14 of 19 Energies 2018, 11, 2435 Energies 2018, 11, x Energies 2018, 11, x Figure 24. q* changed from 0 var to −500 var (proposed control method). * Figure A (dq (dq control control method). method). Figure25. 25.i i*qq changed changed from from 55 A A to to − −55 A Figure 26. q** changed from 500 var to −500 var (proposed control method). Figure changed from from 500 500 var var to to −500 −500var var(proposed (proposedcontrol controlmethod). method). Figure 26. 26. qq* changed * Figure Ato to55A A (dq (dq control control method). method). Figure27. 27.ii*qq changed changed from from − −55A Figure 27. i*q changed from −5 A to 5 A (dq control method). 14 of 18 15 of 19 15 of 19 Energies 2018, 11, 2435 15 of 18 Figure 27. i*q changed from −5 A to 5 A (dq control method). Figure 28. q* changed from −500 var to 500 var (proposed control method). Figure 28. q* changed from −500 var to 500 var (proposed control method). 4.4. Voltage Balance Control Energies 2018, 11, x 16 of 19 Besides grid current control, balance control of the dc-link voltages is another important issue. 4.4. Voltage Balance Control A dc-link voltage balance control method based on power was adopted to render the proposed power Besides grid current balance controlunder of the unbalanced dc-link voltages is another important issue. control strategy applicable to control, the CHB converter load conditions. A dc-link voltage balance control method on power was adopted to render the proposed Unbalanced load experimental tests werebased conducted to verify the voltage-balancing performance power control strategy applicable to the CHB converter under unbalanced load conditions. of the presented scheme. In these experiments, the load resistor of the first H-bridge R1 was stepped Unbalanced load experimental tests were conducted to verify the voltage-balancing from 15performance Ω to 10 Ω of whereas that of the second R2the was 15 H-bridge Ω. In Figure 29a, the presented scheme. In these H-bridge experiments, loadmaintained resistor of theatfirst R1 when the resistors were thethat dc-link of the first H-bridge udc1at(10 V/division) wasload stepped from 15 Ω tochanged, 10 Ω whereas of thevoltage second H-bridge R2 was maintained 15 Ω. In declinedFigure from29a, 50 V to 45 andresistors that of were the second H-bridge udc2 (10 V/division) increased from 50 V when theV,load changed, the dc-link voltage of the first H-bridge udc1 (10 fromwhen 50 V the to 45 V, andbalance that of controller the second was H-bridge udc2 (10 to 55 V. V/division) Figure 29bdeclined shows that voltage adopted, theV/division) dc-link voltages increased from 50 V to 55 V. Figure 29b shows that when the voltage balance controller could be controlled to 50 V when the load resistors were changed. Thus, the accuracy of thewas presented adopted, the dc-link voltages could be controlled to 50 V when the load resistors were changed. dc-link voltage balance control method was confirmed. Thus, the accuracy of the presented dc-link voltage balance control method was confirmed. (a) (b) Figure 29. Experimental response of dc-link voltages when load changed: Withoutvoltage voltagebalance Figure 29. Experimental response of dc-link voltages when load changed: (a)(a)Without balance controller, (b) With voltage balance controller. controller, (b) With voltage balance controller. 5. Discussion 5. Discussion The proposed power and voltage control method offers many advantages including no Thecoordinate proposedtransformation, power and voltage control method offers many advantages including no coordinate PLL, or conventional imaginary current construction. Moreover, it was transformation, PLL, or conventional imaginary current construction. Moreover, it was dq found to found to exhibit faster transient responses and lower distortions compared with the conventional exhibit control faster transient lower distortions compared with the conventional dq control method, asresponses illustrated inand Figures 21–28. The natural frame control21–28. scheme presented in [23] also shows the advantages of no coordinate method, as illustrated in Figures PLL, or conventional imaginary current from the natural frame Thetransformation, natural frame control scheme presented in [23]construction. also shows Differ the advantages of no coordinate control scheme, the proposed scheme connects power control with current control through the transformation, PLL, or conventional imaginary current construction. Differ from the natural frame instantaneous power theory. Besides, the proposed voltage balance control module is based on power, in which the power compensation values are used to eliminate the uneven power in active power p and reactive power q. Even so, this control strategy has some limitations: First, although classical imaginary current construction is not necessary, the creation of an imaginary voltage component cannot be avoided. Therefore, an algorithm can be developed to reduce the time delay caused by imaginary voltage Energies 2018, 11, 2435 16 of 18 control scheme, the proposed scheme connects power control with current control through the instantaneous power theory. Besides, the proposed voltage balance control module is based on power, in which the power compensation values are used to eliminate the uneven power in active power p and reactive power q. Even so, this control strategy has some limitations: First, although classical imaginary current construction is not necessary, the creation of an imaginary voltage component cannot be avoided. Therefore, an algorithm can be developed to reduce the time delay caused by imaginary voltage construction. Second, only the steady grid voltage condition was considered here, although abnormal operating states (e.g., grid voltage distortion) exist; thus, the control method should be optimized to make it applicable to such states. 6. Conclusions A power control method is introduced for the single-phase CHB multilevel converter in this paper. A power-based dc-link voltage balance control module is also presented to eliminate the different dc-link voltages caused by the unbalanced loads. The proposed power and voltage control method is designed in a virtual αβ stationary reference frame without coordinate transformation or phase-locked loop. So, the complicated calculation issue can be avoided. What is more, conventional imaginary current construction is not necessary. Problems like time delay can also be avoided. The inner loop current calculation is simplified compared with the conventional dq control scheme. Stability of the proposed control scheme can be guaranteed through the analysis based on small-signal model. Simulation and experimental results were presented to verify the effectiveness of the proposed control method. In the steady state, the proposed method can obtain the sinusoidal grid current and unity power factor under unbalanced load conditions. Upon comparing the dynamic response of the presented control strategy with that of the dq control scheme, the conducted experiments indicate that the salient feature of the proposed scheme is as follows: the proposed scheme maintains a fast dynamic response advantage over the conventional dq control method. This approach has been shown to be useful for the single-phase CHB multilevel converter system. The proposed control scheme can also be utilized with other multilevel converter systems. Author Contributions: The individual contribution of each co-author with regards to the reported research and writing of the paper is as follows. D.Y. conceived the idea, L.Y. carried out the experiments and analyzed the data, and all authors wrote the paper. Acknowledgments: This study is partly supported by the National Nature Science Foundation of China (No. 61861003). Conflicts of Interest: The authors declare no conflict of interest. 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