Open access peer-reviewed chapter - ONLINE FIRST

Voltage Regulation in Smart Grids

By Maher Azzouz

Submitted: September 17th 2018Reviewed: February 11th 2019Published: May 22nd 2019

DOI: 10.5772/intechopen.85108

Downloaded: 176

Abstract

The intermittent nature of renewable power sources (RES) can significantly change the voltage profile of smart grids and adversely impact the conventional voltage control devices such as tap-changing transformers and capacitor banks. Furthermore, the growing penetration of plug-in electric vehicles (PEVs) can add high stress on voltage control devices due to the PEV stochastic and concentrated power profiles. Such power profiles may lead to high maintenance costs and reduced lifetimes for voltage control devices and limit actions on accommodation of high penetration levels of RES and PEVs. This chapter explains the basic background of voltage regulation in smart grids. The typical approaches, which are employed by utilities for voltage regulation, are reviewed. Then, the impact of RES and PEVs on voltage regulation is analyzed. Lastly, remedies for voltage violations in smart grids, such as optimal reactive power control and coordination between voltage control devices, are discussed.

Keywords

  • distributed generation
  • active distribution networks
  • voltage regulation
  • electric vehicles
  • onload tap changers

1. Introduction

Ongoing rapid advances in power electronics and communication technologies are facilitating the development of smart grids that are characterized by hosting distributed generation units (DGs). There are many benefits of smart grids such as enhancing power reliability and power quality, improving safety and cyber security, maximizing energy utilization and efficiency, environment protection and conservation, and increasing financial revenues [1]. For instance, as reported in [2], smart grids could reduce greenhouse gas emissions by up to 18%. The integration of renewable-based DGs alters distribution systems so that rather than having passive structures, with unidirectional power flow, they become active distribution networks (ADNs), with multidirectional power flow. Voltage regulation is considered one of the main operational challenges that accompany high penetration levels of renewable-based DGs. RES, such as wind and solar energy, can significantly change the voltage profile of smart grids and interact negatively with conventional schemes of controlling onload tap changers (OLTCs). Another factor is the growing penetration of PEVs, which creates additional stress on voltage control devices due to their stochastic and concentrated power profiles. These combined generation and load power profiles can lead to overvoltages, undervoltages, high system losses, excessive tap operation, infeasible solutions (hunting) with respect to OLTCs, and/or limits on the integration of either PEVs or RES.

2. Background

One of the main objectives of electric utilities is to maintain the grid voltage within standard levels to guarantee customers’ satisfaction. Many equipment are deployed in the grid, such as OLTCs and capacitor banks, to properly fulfill this objective. In general, voltage regulation in a smart grid can be classified as local or communication-assisted [3]. The local voltage regulation is referred to as the conventional control, where the reference values and measurements for voltage control are locally determined. In this section, the fundamentals of the conventional control of OLTC and inverter-interfaced DGs are explained.

2.1 OLTC conventional controller

OLTCs are one of the main voltage regulators in distribution systems. A tap changer equipped with an automatic control system usually regulates the transformer’s secondary voltage to maintain an acceptable voltage near the load center. The tap changer mechanically varies the tap position from zero (no voltage compensation) to Nmax (maximum voltage compensation). This allows for changing the transformer’s turn ratio in discrete steps; each step adjustment may take 3–20 seconds. Figure 1 displays the schematic diagram of an OLTC, where the tap changer is placed on the primary side. The tap changer is usually installed on the high voltage side of the transformer (i.e., the primary side in Figure 1) because of the low current of that side. A reversing switch is employed to change the polarity of the tap winding for positive and negative voltage compensation. In steady state, the transformer model can be given by

Figure 1.

Transformer with tap changer.

V2=V1aI2ZTaE1

where V1 and V2 are primary and secondary voltages, respectively, I2 is secondary current, a denotes the transformer’s tap ratio, and ZT (a) is the transformer series impedance (referred to the secondary side). The tap changer allows a to vary linearly; thus it can be expressed in terms of the nominal turn ratio (i.e., a0=1.0):

a=a0+niΔaE2

where Δais the change inaas a result of a step change in the tap position ni, which is given by

ni=ni1+ΔnE3

where niis the present tap position and ni1is the previous tap position.Δnis the change in the tap position which is defined by

Δn=0fortTm:b=arbitrary1fort>Tm:b=11fort>Tm:b=1E4

where Tmdenotes mechanical time delay which is required by the motor driver unit to change the tap position by only one step and b is the control signal that is applied to the tap-changing mechanism (see Figure 2) and is given by

Figure 2.

The schematic diagram of the conventional discrete control of the OLTC.

b=0fortTd:e=arbitrary1fort>Td:e=11fort>Td:e=1E5

whereTdis the time delay introduced by the OLTC controller and e is the output of the hysteresis controller, that is,

e=0forΔVDB1forΔV>DB1forΔV<DBE6

The mechanical time delay (Tm) has a constant value; usually, it varies from 3 to 10 seconds, and ΔVis the voltage error. In some models of the OLTC, the controller time delay (Td) is considered constant:

Td=τ0E7

However, Tdis usually variable and depends on the voltage error and the controller’s dead band DB [4]:

Td=τ0DBΔVE8

Tdis inversely proportional to the voltage error ΔVto avoid unnecessary operation during transient voltages and temporary load disturbances. DB must be greater than ∆a to ensure stability when the regulated voltage approaches the reference valueVref; otherwise, the OLTC will suffer from hunting. Vrefis typically between 0.95 p.u. and 1.0 p.u. since it determines the steady-state voltage near the load center (Vk).

2.2 Conventional voltage control of inverter-based DGs

Energy processing strategies for inverter-based DGs typically involve two cascaded loops: inner and outer. The inner loop is a current control loop, which regulates the DG inverter current in the dqreference frame. The outer control loop, on the other hand, can fulfill different control objectives depending on the hosing grid, such as voltage regulation and power management control.

Figure 3 shows an inverter-based DG that is controlled in the current injection mode, which is the typical strategy adopted with RES. A DG inverter model in the dqsynchronous frame represents the dynamics of the interfacing LC filter [5], that is,

Figure 3.

Power circuit and current control diagram for inverter-based DG.

LfdIddt=RfId+VdVod+ωLfIqE9
LfdIqdt=RfIq+VqVoqωLfIdE10
CfdVoddt=IdIod+ωCfVoqE11
CfdVoqdt=IqIoqωCfVodE12
ω=dtE13

where Idqand Iodqrepresent the dqcomponents of the inverter output current and DG current at the PCC, respectively; Vdqand Vodqare the components of the inverter terminal voltage and DG voltage at the PCC, respectively; Rf, Lf, and Cfare the resistance, inductance, and capacitance of the DG interfacing filter, respectively; and ωis the grid frequency.

The current equations, that is, (9) and (10), are coupled through the ωLfIqand ωLfIdterms. For independent control of both the Idand Iqcurrents, the decoupled terms must be eliminated, which can be accomplished if new variables Vdand Vqare defined by

Vd=VdVod+ωLfIqE14
Vq=VqVoqωLfIdE15

Substituting from (14) and (15) into (9) and (10) yields.

LfdIddt=RfId+VdE16
LfdIqdt=RfIq+VqE17

Equations (16) and (17) represent decoupled first-order differential equations for Idand Iq, respectively. Therefore, PI current controllers can be designed based on the transfer functions derived from (16) and (17). If the gains of the PI current controllers are selected as

Kip=LfτiKii=Rfτi,E18

then the equivalent closed-loop transfer functions for the current loops can be given by

IdsIdrefs=IqsIqrefs=1τis+1E19

where τiis the time constant of the closed-loop system. The vector magnitude of the reference current idref2+iqref2should be limited according to the maximum allowable current, typically 20% greater than the rated current of the inverter [5], in order to provide overcurrent protection. The vector magnitude of the modulation index M=Md2+Mq2should also be limited to Mmax=1.0p.u. so that DG operates in a linear modulation region. Figure 3 shows the vector magnitude limiter, which implies a limit on the magnitude of Mwithout a change in the phase angle between MdandMq.

Determination of the reference currents, Idrefand Iqref, is usually affiliated to the DG output power. In the synchronous dqframe, the output active PGand reactive QGpowers are given by

PG=1.5VodId+VoqIqE20
QG=1.5VoqIdVodIqE21

For decoupled control of the active and reactive powers, a phase-locked loop (PLL) should be used for aligningVodwith the output voltage of phase a so that Voq=0[6]. To determine Idref, a maximum power point tracking (MPPT) algorithm along with a DC link voltage controller is employed [7]. On the other hand, Idrefcan be calculated, as in (22), to regulate the output reactive power, thus, providing voltage support.

Idref=QGref1.5VodE22

where QGrefis the reference value of the DG reactive power which can be determined using an outer voltage control loop or received from a communication-assisted voltage regulation scheme [8].

2.3 DG contribution to voltage violation

Usually, distribution networks have unidirectional power flow from the substation to customers. This leads to a descending voltage profile which may only suffer from an undervoltage near the load center, a problem typically tackled using OLTC and capacitor banks. On the other hand, DG integration into distribution networks makes the power flow bi-directional; thus an overvoltage problem may also occur. To understand the impact of DGs on the system voltage, the simplified distribution network in Figure 4(a) is used, where a DG is connected at a load bus. In this figure, R and X are the feeder resistance and reactance, respectively; IR is the feeder current; V1, V2 are the primary and secondary voltage of the distribution transformer, respectively; and VG is the DG output voltage. The phasor diagram of the simplified distribution network is shown in Figure 4(b), in which δ is the power angle and φ is the phase shift between VG and IR.

Figure 4.

Simplified distribution network with DG. (a) Single-line diagram and (b) phasor diagram.

Using the phasor diagram, the relation between the DG voltage and V2 can be formulated:

VG=V2+IRRcosφ+IRXsinφ=VGcosδE23

The power angle (δ) is very small; hence (23) can be approximated by

VGV2+IRRcosφ+IRXsinφE24

Therefore, the voltage rise caused by the DG, that is, ΔVG=VGV2, is given by.

ΔVGIRRcosφ+IRXsinφ=PRR+QRXVG=PGPLR+QGQLXVGE25

where PG and QG are the DG output active and reactive powers, respectively, while PL and QL are the load active and reactive powers, respectively. It can be seen from (25) that the highest overvoltage happens when the DG generates its maximum power during a light load condition. This problem is mainly associated with the excessive reverse power flow caused by the DG.

3. Communication-assisted voltage regulation

Due to the intermittency of RES and PEVs, the conventional control schemes for OLTC and DGs fail to provide proper voltage regulation. This shortcoming can be compensated using communication-assisted voltage regulation schemes. In the literature, the communication-assisted schemes fall under two approaches: distributed and centralized [3]. Both approaches involve investment in communication links and remote terminal units. The distributed (intelligent) approach is considered to be an expert-based control or model-free approach, which coordinates a variety of voltage control devices with the goal of providing effective and nonoptimal voltage regulation with fewer communication requirements [9]. On the other hand, the centralized approach relies on a central point that monitors the system status and optimizes the operation of voltage control equipment. Typically, a centralized optimization problem is solved to dispatch the reactive power of different voltage control equipment based on (i) load forecasting and (ii) generation monitoring. Several solutions have been proposed in the literature to provide optimal reactive power dispatch for DGs [10, 11, 12]. In this section, the role of PEVs in optimal voltage regulation is explained as in [13].

3.1 PEV impact on voltage regulation

Figure 5 represents a simplified multi-feeder distribution network connected to a substation through an OLTC. The test network has a photovoltaic (PV)-based DG and a PEV parking lot, which are connected at different feeder terminals. Following the derivation of (25), the per-unit voltage deviation for both DG and PEV busses can be approximated by

Figure 5.

Simplified distribution network with DG and PEVs.

ΔVPVPPVPL1Rf1+QPVQL1Xf1ΔVEVPEV+PL2Rf2QEV+QL2Xf2E26

where PPV, PEV, and PLare DG, PEV, and load active powers, respectively, and QPV, QEV, and QLare DG, PEV, and load reactive powers, respectively.

Equation (26) shows that two worst-case scenarios may occur: (i) overvoltage, when the DG generates its maximum power during light loads and (ii) undervoltage, during a peak load demand and low DG output. The integration of DGs changes the voltage profile significantly and complicates the voltage regulation. This is due to two reasons: (i) the voltage trend not descending from the substation to the feeder terminal, thereby invalidating the target point (reference) and (ii) the voltage estimation, based on local measurements, becoming inaccurate because of the stochastic power natures of RES and EVs [13]. Moreover, the stochastic power nature of EVs makes the voltage estimation inferior and aggravates the undervoltage problem. Therefore, OLTCs may suffer from wear and tear due to excessive operations. This problem worsens when feeders suffer from overvoltage due to high DG penetration, while others suffer from undervoltage during high demand, such as PEV charging. In this instance, the OLTC will have two contradicting solutions. Increasing the transformer’s secondary voltage mitigates the undervoltage problem at the expense of the system’s overvoltage and vice versa. Figure 6 shows two daily power profiles for uncontrolled1 PEV charging demand and a PV-based DG. The PEV demand is generated based on practical arrival/departure times from the Toronto Parking Authority (TPA), Toronto, Canada. Since the power profiles of commercial parking lots and PV-based DGs naturally coincide, there is a high chance that the system simultaneously suffers from overvoltage and undervoltage. A partial solution for this problem can be realized if a centralized-based controller for the OLTC exploits the system’s maximum and minimum voltages. However, this controller may not prevent the OLTC hunting problem during high PV power generation and peak EV demand, resulting in excessive tap operation.

Figure 6.

DG and PEV power profiles.

For that reason, the power electronic converters that interface DGs and PEVs should be utilized in voltage regulation. The DG can support the voltage regulation through two options: (i) absorbing reactive power and/or (ii) curtailment of active power. The first option is preferred since active power curtailment represents an energy waste. However, the capacity of the DG converter may limit the reactive power support and force the second option. To increase the reactive power support, the interfacing converter of the PEV can be employed to inject its surplus reactive power, thus reducing the DG active power curtailment [13]. A novel optimal coordinated voltage regulation scheme is presented to coordinate PEV, DG, and OLTC to achieve optimal voltage regulation and satisfy the self-objectives of each voltage control device.

3.2 OLTC centralized control

As shown in Figure 7, the OLTC is represented by a π-circuit model [14]. The taps are assumed to be at the primary side (high voltage). Subsequently, the OLTC secondary voltage and current can be calculated by

Figure 7.

Equivalent π -circuit model of OLTC.

V1tI1t=1aaYT0aV0tI0tE27

where YTis the transformer series admittance,ais the turns ratio given in (2), and tdenotes the time instant. To take the physical busses into account, (27) can be rewritten as

I0tI1t=gF+jbμ+YTa2YTaYTaYTYOLTCV0tV1tE28

where YOLTCis the OLTC Y-bus admittance matrix, which represents the OLTC admittance in the power flow equations.

The conventional OLTC controller, shown in Figure 8(a), is modified to emulate an adaptive reference by considering the system’s minimum and maximum voltages, that is, Vminsysand Vmaxsys, respectively. This modification forms the centralized OLTC controllers (COC) proposed in [13] and shown in Figure 8(b), which allows the OLTC to deal with multiple feeders with voltage problems resulted from DGs and PEVs. The COC emulates an adaptive reference because the error ΔVchanges such that Vminsysand Vmaxsysare within the standard limitsVUpperand VLower(i.e., 1.05 and 0.95 p.u.), respectively. Vminsysand Vmaxsyscan be estimated using the state estimation algorithm in [15] or attained through the central voltage control unit explained in the next subsection.

Figure 8.

The OLTC control: (a) conventional local controller and (b) centralized OLTC controller (COC).

In the case of an overvoltage, ΔVis negative, and the primary controller decreases the transformer secondary voltage (by increasing the tap position) and vice versa. During normal conditions, ΔVis zero because both Vminsysand Vmaxsysare within the standard limits; thus, the tap position remains unchanged. When both overvoltage and undervoltage occur simultaneously, the COC should be disabled to avoid hunting [16]. In the next subsection, the roles of DGs and PEVs in voltage regulation are explained to mitigate the shortcoming of the COC.

3.3 Optimal coordinated voltage regulation

Both power electronic converters of PEVs and DGs can support the grid with reactive power to relax the OLTC. A vehicle-to-grid reactive power support (V2GQ) strategy is proposed in [13] to incorporate PEVs and DGs in voltage regulation, as shown in Figure 9. The main difference between vehicle-to-grid (V2G) strategies and the V2GQ is that the latter injects only reactive power to the grid. Thus, it preserves the battery life of PEV, that is, the highest priority of the vehicles’ owners. Nevertheless, the V2GQ cannot be flexibly employed in power management because PEVs do not export active power to the grid. V2G strategies are avoided in voltage regulation to elongate the battery life, which is considered a priority in this study. The V2GQ comprises a three-stage nonlinear programming, in which Stage (I) aims at maximizing the energy delivered to PEVs, Stage (II) minimizes the DG active power curtailment, and Stage (III) minimizes the voltage deviations. The COC is coordinated such that it acts after Stage (III) to ensure that all bus voltages are within the standard limits.

Figure 9.

PEV/DG voltage support scheme.

3.3.1 Problem formulation of stage (I)

The main objective of Stage (I) is maximizing the energy delivered to PEV owners, that is,

maxγiIPEVchiCHiEDchittE29

where EDchitis the energy delivered to the PEV connected to chargerchiCHiat PEV busiIPEV, IPEVis the set of busses with PEV charger connections, CHiis the set of chargers connected to bus i, and γis the decision variable vector. The PEV and DG voltage support depends mainly on γ, which can generally take the following form:

γ=XchitQoitPEVPoitQoitE30

where Xchitand QoitPEVare the vector of the charger decisions and PEV reactive power at busiIPEV, respectively; Poitand Qoitare the DG active and reactive powers at bus iIDG, respectively; and IDGis the set of busses with DG connections. The charging decisions are continuous, that is, X01where “0” stands for no charging and “1” stands for full charging. According to the grid operator, γcan be partially constrained. For instance, the PEV reactive powers can be set to zero, that is, QoitPEV=0,iIPEV,t, when the PEV voltage support is disregarded. Stage (I) should satisfy the power flow constraints, as given by

PGitPLit=jIbVitVjtYijcosθij+δjtδitiIb,tE31
QGitQLit=jIbVitVjtYijsinθij+δjtδitiIb,tE32

where PGitand QGitdenote the generated active and reactive powers, respectively; PLitand QLitare the active and reactive power demands, respectively; Vitand δitdenote the magnitude and angle of the voltage, respectively; Ibis the set of system busses; and Yijand θijare the magnitude and angle of the Y-bus admittance matrix, respectively.

The voltage and feeder thermal limits should also hold, and thus,

VminVitVmax,iIb,tE33

IltIlCAP,l,tE34

where Vminand Vmaxare the maximum and minimum voltage limits, that is, 0.9 and 1.1 p.u., respectively; Iltdenotes the per-unit current through linel; is the set of system lines; and IlCAPis the current carrying capacity.

Typically, two back-to-back power electronic converters are used to interface PEVs and PVs, that is, DC/DC and DC/AC converters. The DC/DC converter performs MPPT with PV-based DGs or controls the PEV charging. The DC/AC converter regulates the DC link voltage and is responsible for the reactive power support [7]. The power injected to a bus should be equal to the output power of the DG installed at that bus:

PGit=PoitQGit=Qoit,iIDG,tE35

PoitPoitMPPT,iIDG,tE36

where PoitMPPTdenotes the DG maximum power available. In both PEVs and PVs, the DC/AC converter is similar to that used with Typ. 4 wind farms. Therefore, the reactive power capability limits, defined in [17], should be used as constraints. These limits depend on the converter’s power rating and DC link voltage, as follows:

Qoit2Soit2Poit2,iIDG,tE37

Qoit+Vit2Xi2VcimaxVitXi2Poit2,iIDG,tE38

where Vcimaxrepresents the maximum converter voltage which depends on the converter DC link voltage [17, 18], Soitdenotes the DG rated power, and Xiis the total reactance of the DG filter and interfacing transformer at busi. If the DC/AC converter increases the set point for the DC link voltage to relax Constraint (38), the DC/DC converter will operate at a high duty cycle, which decreases its efficiency [19]. Hence, the reactive power support from the DC/AC converter is limited by the DC link voltage.

The load power at a bus should be equal to the total power consumed by regular loads and PEV:

PLit=PNLit+PoitPEV,iIb,tE39
QLit=QNLit+QoitPEV,iIb,tE40

where PoitPEVis the PEV active power and PNLitand QNLitare the active and reactive powers of normal loads, respectively. The PV power profile relies mainly on solar insolation, whereas PoitPEVdepends on charging decisions Xchit, the charging power limit in kW PCHchit, and the charging efficiency ηCHchi, as given by.

PoitPEV=chiCHiXchitPCHchitηCHchiSbase,iIPEV,tE41

where Sbaseis the base power for the per-unit system in kW. The charging power limit PCHis a function of the PEV battery state of charge (SOC) and is limited by the capacity of the charger, that is, PCHPratedCharger. This function is dependent on the characteristics of the battery, which can be expressed as

PCHchit=fchitSOCchitF,iIPEV,chi,tE42

where fchitis the function that represents the characteristics of the PEV battery and SOCchitFis the reached SOC. The relationship between the energy delivered to a PEV battery and its SOC can be given by

EDchit=EBATchi×SOCchitFSOCchitI100,iIPEV,chi,tE43

where EBATchiis the battery capacity in kWh and SOCchitIdenotes the PEV initial SOC. The SOC of different PEVs are updated according to

SOCchitF=SOCchitI+XchitPCHchitΔT60EBATchi,iIPEV,chi,tE44

where ΔTis the time step to collect the system data, run the program, and implement the decisions. Similar to DGs, the injected reactive powers from the PEVs should be limited by their converter ratings and DC link voltages, as given by

QoitPEV2SoitPEV2PoitPEV2,iIPEV,tE45

QoitPEV+Vit2Xi2VcimaxVitXi2PoitPEV2,iIPEV,tE46

where SoitPEVis the rated power of the PEV converter. In addition, the final achieved SOC, that is, SOCchitF, should be limited by the SOC desired by the PEV owners SOCchitD:

SOCchitFSOCchitD,iIPEV,chi,tE47

3.3.2 Problem formulation of stage (II)

In Stage (II), the objective is to minimize the DG active power curtailment, where the final SOC reached in Stage (I), that is, SOCchitR, must be attained to ensure maximum customer satisfaction, which is the highest priority of the V2GQ technology. Therefore, this stage is subject to all of the constraints in Stage (I) except for (47), which is replaced by

SOCchitF=SOCchitR,iIPEV,chi,tE48

Thus, the objective function of Stage (II) is

maxγiIDGPoit,tE49

3.3.3 Problem formulation of stage (III)

Stage (III) aims at minimizing the voltage deviation using the DGs and PEVs to restore a feasible solution for the COC and relax the tap operation. Thus,

minγiIb1Vit2,i,tE50

Besides all the constraints in Stage (II), this problem is subject to the constraint defined in (50), in which the maximum injected powers from the DGs reached in Stage (II), that is, PoitR, should be maintained.

Poit=PoitR,iIDG,tE51

3.4 Coordination between V2GQ and COC

The charging decisions and active/reactive dispatch signals produced in Stage (III) are sent to all PEV parking lots and DGs, as shown in Figure 9. To ensure that the PEV and DG converters settle at the desired active and reactive power references, a time delayΔtconvis introduced. The converter settling time may vary from 50 to 100 ms, depending on the primary controllers of the DC/AC converter [7]. For slow automatic interactions, such as voltage regulation, the maximum communication time delay is 100 ms as per the IEC 61850 [20]. Thus, Δtconvis assumed to be 200 ms (100 ms for the converter settling time + 100 ms for the communication latency). Lastly, the COC refines the output solution from Stage (III) to ensure that both Vminsysand Vmaxsysare within the standard voltage limits. The total execution time of the coordination algorithmΔTis 5 minutes.

3.5 Real-time results

In this section, various case studies are presented to validate the robustness and effectiveness of the optimal coordinated voltage regulation algorithm. The 38-bus 12.66-kV distribution system is used as a test system, as shown in Figure 10. The system data can be found in [21]. The system is modified to accommodate two PEV parking lots and four PV-based DGs, with power ratings as given in Figure 10. The power demands of the two parking lots are extracted from data provided by the TPA for a weekday in 2013. Both parking lots are commercial, where P1 represents a lot in the vicinity of a train station and P2 is a lot located near downtown Toronto. The total number of PEVs during a day is displayed in Figure 11. Due to confidentiality, the addresses of the real parking lots are not mentioned. The central control unit receives the desired SOCs and sends the charging decisions to all vehicles in the parking lots. An OPAL real-time simulator (RTS) is used to model the visual test network using the SimPowerSystems blockset, which is available in Simulink/Matlab, and an ARTEMiS plug-in [22]. The network, PEV, and DG models are distributed between the RTS cores for performing parallel computations. The RTS is used to perform a hardware-in-the-loop (HiL) realization, where a central control unit, emulated by a host computer running GAMs, exchanges real-time data with the test network modeled in the RTS. The sampling time used to realize the HiL application is 100 μs.

Figure 10.

Test network with an HiL realization.

Figure 11.

Number of vehicles in the parking lots.

3.5.1 OLTC control without PEV/DG voltage support

This section compares the responses of the conventional and COC controllers for the OLTC. The voltage support from PEVs and DGs is disabled to study their impacts of the OLTC. Figure 12(a) and (b) illustrate the response of the conventional controller for the OLTC over 24 hours. Although the OLTC does not suffer from an excessive tap operation (13 taps/day), undervoltage and overvoltage problems occur.

Figure 12.

OLTC response: (a & b) conventional control and (c & d) COC.

As expected, the overvoltage happens during the peak power generation from DGs, while the undervoltage coincides with the peak demand of PEV. The COC is enabled to mitigate these voltage violations. Figure 12(c) and (d) demonstrate that the COC can limit the voltage violations without the PEV/DG voltage support, but it suffers from a hunting problem. This problem happens when the overvoltage and undervoltage occur concurrently. In this situation, the COC should be deactivated.

3.5.2 OLTC control with PEV/DG voltage support

To address the hunting problem, presented in the previous case, the V2GQ is coordinated with the COC. Two case studies dealing with PEV/DG voltage support are carried out, as follows:

  1. DG active power curtailment, without PEV and DG reactive power supports, that is, γ=XchitPoit, where QoitPEV=0,iIPEVand Qoit=0,iIDG

  2. PEV and DG reactive power dispatch, that is, γ=XchitQoitPEVPoitQoit

Figure 13 demonstrates the performance of the coordination algorithm when the voltage support is merely achieved via the DG active power curtailment (i.e., the first case study). The coordination algorithm keeps the bus voltages within the standard limits, as shown in Figure 13(a). The hunting problem is avoided with a reasonable daily tap operation, that is, 16 taps/day; see Figure 13(b). Further, the required PEV charging demand is satisfied, as illustrated in Figure 13(c). However, 6.14% of the DG available energy is curtailed because the priority is given to supplying the PEV demand, as shown in Figure 13(d). This privilege is considered to comply with the distribution system code developed by the Ontario Energy Board [23]. It states that electric utilities should deliver the required energy to supply their loads (such as PEVs) unless there is a technical limit violation. The only solution to maximize the energy extraction is therefore to incorporate both the PEVs and DGs in the voltage support. Figure 14 illustrates the response of the coordination algorithm for the second case when PEV and DG reactive powers are employed for voltage regulation. Utilizing the full features of the V2GQ results in a proper voltage regulation using only 4 taps/day, extracting all DG power and charging all PEVs.

Figure 13.

Response of coordination algorithm, assuming DG active power curtailment.

Figure 14.

Response of coordination algorithm, activating both PEV and DG reactive power dispatch.

4. Conclusion

This chapter explained the conventional voltage regulation schemes used in smart grids with inverter-based DGs and PEVs. High penetration levels of PEVs and DGs may lead to negative impacts on the conventional voltage control devices such as tap-changing transformers and capacitor banks. The main reason behind these negative impacts is the stochastic power profiles of PEVs and renewable-based DGs that stimulate chronological overvoltage and undervoltage and make load forecasting erroneous. In the literature, there are two approaches to mitigating the voltage violations associated with DGs and PEVs: (i) centralized and (ii) distributed voltage regulation schemes. These schemes necessitate communication and, thus, may benefit from the communication infrastructure embedded within smart grids. The centralized approach employs state estimation and solves an optimization problem to dispatch DG reactive power for optimal voltage regulation. On the other hand, the distributed approach is an expert-based control or model-free approach, which coordinates a variety of voltage control devices with the goal of providing effective and nonoptimal voltage regulation with fewer communication requirements. Case studies for a centralized voltage control scheme illuminated the role of PEV and DG reactive powers in providing optimal voltage regulation with relaxed tap operation.

Notes

  • In uncontrolled charging schemes, PEVs start charging as soon as they are plugged in.

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Maher Azzouz (May 22nd 2019). Voltage Regulation in Smart Grids [Online First], IntechOpen, DOI: 10.5772/intechopen.85108. Available from:

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