Unified constant-frequency integration control of three-phase power factor corrected rectifiers, active power filters, and grid-connected inverters

Abstract

An unified constant-frequency integration (UCI) control method based on one-cycle control employs an integrator with reset as its core component along with a few logic and linear components to control the pulse width of a three-phase recitifier, active power filter, or grid-connected inverter so that the all three phase current draw from or the current output to the utility line is sinusoidal. No multipliers and reference calculation circuitry are needed for controlling active power filters. The UCI control employs constant switching frequency and operates in continuous conduction mode (CCM). If in some cases a DSP is desired for some other purposes, the Unified Constant-frequency Control function can be realized by a low cost DSP with a high reliability, because no high speed calcutation, high speed A/D converter, and mutipliers are required.

Description

BACKGROUND OF THE INVENTION

[0002] 1. Field of the Invention

[0003] The invention relates to the field of 3-phase power factor corrected rectifiers, active power filters, and grid-connected inverters and in particular to control methods based on one-cycle control.

[0004] 2. Description of the Prior Art

[0005] The invention in this document covers vast applications spanning from power factor corrected rectifiers in front of and active power filters in parallel to electronic equipement such as computers, communication, motion control, aviation, space electronics, etc. to the grid-connected inverters for distributed power generation.

[0006] Power Factor Corrected Rectifiers

[0007] In recent years, the usage of modern electronics equipment has been widely proliferating. The electronics equipment usually have a rectifier of single-phase or three-phases in the front end. Three-phases are more desirable for high power applications. A three-phase rectifier is a device that converts three-phase sinusoIdal ac power into dc power. Traditional rectifiers draw pulsed currrent from the ac main as shown in FIG. 1, which causes significant harmonic pollution, low power factor, reduced transmition efficiency, harmful electromagnetic interference to neighborhood appliances, as well as overheating of transformers.

[0008] In order to solve these problems, many international agencies have proposed harmonic restrictions to electronic equipment. As a result, a vast number of power factor corrected (PFC) rectifers have been proposed to comply with these regulations.

[0009] A three-phase power factor corrected rectifeir is a device that converts three-phase sinusoidal ac power into dc power while the input currents are sinusoidal and unity power factor, as shown in FIG. 2. Many three-phase topologies are suitable for implementing PFC function for rectification. Usually, high frequency active switches are used in the rectifiers to realize the PFC function.

[0010] The control methods that modulate the pulse width of the switches are an important issue in the power electronics research. A third harmonic injection method was reported for a dual-boost converter with center-tapped dc-link and split output capacitors. This method achieves low current distortion. However, it is not convenient to generate the third harmonic signal tuned to the right frequency and right amplitude.

[0011] Hysteresis control and d-q transformation control were frequently used control approaches. Hysteresis control results in variable switching frequency that is difficult for EMI filter design. The d-q approach is based on digital implementation that leads to complicated systems. An analog control method with constant switching frequency modulation was reported for a particular rectifier, where several multipliers are necessary to implement the three phase current references. Due to the disadvantages of variable frequency or complexity of implementation, three-phase PFC rectifiers are not commercially practical.

[0012] Active Power Filters:

[0013] One alternative for dealing with the current harmonics generated by treaditional rectifiers is to use active power filters (APF). Considering electronic equipment with traditional rectifier as nonlinear loads to the ac main, a three-phase APF is a device that is connected in parallel to and cancels the reactive and harmonic currents from one or a group of nonlinear loads 110 so that the resulting total current drawn from the ac main is sinusoidal as shown in FIG. 3. In contrast to PFC, where a PFC unit is usually inserted in the energy pass, which processes all the power and corrects the current to unity power factor, APF provides only the harmonic and reactive power to cancel the one generated by the nonlinear loads. In this case, only a small portion of the energy is processed, which may result in overall higher energy efficiency and higher power processing capability.

[0014] Most APF control methods proposed previously need to sense the three-phase line voltages and the three-phase nonlinear load currents, and then manipulate the information from these sensors to generate three-phase current references for the APF. Since the reference currents have to reflect the load power of the nonlinear load, several multipliers are needed to scale the magnitude of the current references. A control loop is necessary to control the inverter to generate the reactive and harmonic current required by the nonlinear load. These functions are generally realized by a digital signal processing (DSP) chip with fast analog-to-digital (A/D) converters and high-speed calculations. The complex circuitry results in high cost and unreliable systems, preventing this technique from being used in practical applications.

[0015] Some approaches that sense the main line current were reported for single-phase APF and for three-phase APF. The overall circuitry is reduced. However, multipliers, input voltage sensors are still necessary. High speed DSPs are still used in three-phase systems due to the complexity of the systems.

[0016] Grid-Connected Inverters:

[0017] Distributed power generation is the trend in the future in order to promote new power generation technologies and reduce transmition costs. An effective use of natural resources and renewable resources as alternatives to fossil and nuclear energy for generation of electricity has the effect of protecting the environment. In order for the alternative energy sources to impact the energy supply in the future, they need to be connected to the utility grid. Therefore, grid-connected inverters are the key elements for the distributed power generation systems. A grid-connected inverter is a device that converts dc power to ac power of single phase or three-phase power that is injected to the utility grid. In order for an alternative energy source to be qualified as a supplier, sinusoidal current injection is required as shown in FIG. 4.

[0018] Again, control methods are crucial. In the past, d-q transformer modulation based on digital implementation was often employed for a standard six-switched bridge inverter topology. The complexity results in low reliability and high cost. In addition, short-through hazard exists in this inverter.

[0019] What is needed is a design for 3-phase power factor corrected rectifiers, active power filters, and grid-connected inverters which overcomes each of the foregoing limitations of the prior art.

BRIEF SUMMARY OF THE INVENTION

[0020] The method of the invention is an unified constant-frequency integration (UCI) control method based on one-cycle control. It employs an integrator with reset as its core component along with logic and linear components to control the pulse width of a three-phase recitifier, active power filter, or grid-connected inverter so that the all three phase current draw from or the current output to the utility line is sinusoidal. No multipliers are required, as used in many control approaches to scale the current references according to the load level. Furthermore, no reference calculation circuitry is needed for controlling active power filters.

[0021] The UCI control employs constant switching frequency and operates in continuous conduction mode (CCM) that is desirable for industry applications. This control approach is simple, general, and flexible and is applicable to many topologies with slight modification of the logic circuits, while the control core remains unchanged. Although, a DSP is not required to implement the UCI control; if in some cases a DSP is desired for other purposes, the unified constant-frequency control function may be realized by a low cost DSP with a high reliability, because no high speed calcutation, high speed A/D converter, or mutipliers are required.

[0022] The implementation of UCI control can be roughly classified into two categories: (1) vector control mode and (2) bipolar control mode. A three-phase system in the vector control mode has only two switches operating at a switching frequency at a given time, while a three-phase system in bipolar control mode has three switches operating at a switching frequency.

[0023] Power Factor Corrected Rectifiers:

[0024] The power train of a three-phase rectifier is usually a boost-derived three-phase converter. The UCI controller for PFC applications can control the power train in either the vector and bipolar control mode.

[0025] In vector control mode, the boost-derived three-phase rectifiers are categorized into two groups. One group of them can be decoupled into a series-connected dual-boost topology that features central-tapped or split do output capacitors. The other group can be decoupled into a parallel-connected dual-boost topology that features a single dc output capacitor. The dual-boost sub-topologies rotate their connection every 60° of the line cycle depending on the line voltage states: In each 60° of ac line cycle, only two switches are switched at high frequency. Therefore, the switching loss is significantly reduced. The switches operate at a current lower than the phase current, which results in reduced current ratings and conduction losses.

[0026] In bipolar control mode the input phase voltage, output dc voltage, and duty ratios of switches for some boost rectifiers are related by a general equation. Based on the one-cycle control and solutions of this general equation, which is singular and has infinite solutions, several UCI control solutions are derived below for topologies such as the standard six-switch rectifier, VIENNA rectifier and similar circuits.

[0027] The UCI control method for PFC rectifiers has demonstrated excellent performance, great simplicity, namely an order of magnitude fewer components than prior art, and unparallelled reliability.

[0028] Active Power Filters:

[0029] The UCI control approach is based on an one-cycle control and senses main currents. No multipliers nor reference calculation circuitry are required. Thus, the implementaion cirucitry is an order of magnitute simpler than previously proposed control methods. The UCI control for active power filters has serveral solutions. One solution uses a vector control mode and the need to sense the three-phase line voltage. The switching losses for vector control are reduced. The other version uses bipolar control mode that eliminates three-phase line voltage sensors.

[0030] Inverters for Alternative Energy Sources

[0031] Grid-connected inverters with sinusoidal current output are proposed. A three-phase standard bridge inverter can be decoupled in a parallel-connected dual-buck subtopology during each 60° of line cycle. Therefore, only two switches are controlled at switching frequency in order to realize sinusoidal output with unity-power-factor. By the proposed control method, the grid-connected inverter features an unity-power-factor, low current distortion, as well as low switching losses. In addition, short-through hazard is eliminated because only one of switches in each bridge arm is controlled during each 60° of line cycle.

[0032] While the method has been described for the sake of grammatical fluidity as steps, it is to be expressly understood that the claims are not to be construed as limited in any way by the construction of “means” or “steps” limitations under 35 USC 112, but to be accorded the full scope of the meaning and equivalents of the definition provided by the claims. The invention can be better visualized by turning now to the following drawings wherein like elements are referenced by like numerals.

BRIEF DESCRIPTION OF THE DRAWINGS

[0033] FIG. 1 is a schematic diagram of a prior art three-phase rectifier

[0034] FIG. 2 is a schematic diagram of a prior art power factor corrected three-phase rectifier.

[0035] FIG. 3 is a schematic diagram of a prior art active power filter.

[0036] FIG. 4 is a schematic diagram of a prior art grid-connected inverter.

[0037] FIG. 5 is a schematic diagram of a power factor correction circuit (PFC) with UCI control in vector mode according to the invention.

[0038] FIG. 6 is a schematic diagram of a power factor correction circuit (PFC) with UCI control in bipolar mode according to the invention.

[0039] FIG. 7 is a schematic diagram of an active power filter (APF) with UCI control in vector mode according to the invention.

[0040] FIG. 8 is a schematic diagram of an active power filter (APF) with UCI control in bipolar mode according to the invention.

[0041] FIG. 9 is a schematic diagram of a grid-connected inverter with UCI control in vector operation according to the invention.

[0042] FIG. 10 is a schematic diagram of a grid-connected inverter with UCI control in bipolar operation according to the invention.

[0043] FIG. 11 a is a schematic of a conventional 3-phase boost rectifier with delta-connected 3φ switches.

[0044] FIG. 11 b is a schematic of a conventional 3-phase boost rectifier with star-connected 3φ switches.

[0045] FIG. 11 c is a schematic of a conventional 3-phase standard bridge boost rectifier.

[0046] FIG. 11 d is a schematic of a conventional 3-phase standard bridge boost rectifier with a diode.

[0047] FIG. 11 e is a schematic of a conventional 3-phase boost rectifier with an inverter network.

[0048] FIG. 12 is a graph of the normalized three-phase voltage waveforms of the circuits of FIGS. 11a-11e.

[0049] FIG. 13 a is a schematic of the equivalent circuit of 3-phase boost rectifier with delta-connected switches and its corresponding parallel-connected dual-boost topology in the portion of the cycle from 0˜60°.

[0050] FIG. 13 b is a schematic of the equivalent circuit of 3-phase boost rectifier with delta-connected switches and its corresponding parallel-connected dual-boost topology in the portion of the cycle from 60°˜120°.

[0051] FIGS. 14 a -14d are schematics of the equivalent circuits for the parallel-connected dual-boost topology in all four switching states of the circuit of FIG. 13a.

[0052] FIG. 15 is a graph of the inductor voltage and current waveforms for the topology shown in FIG. 13 a under the condition dp>dn.

[0053] FIG. 16 is a schematic of the core control block of the UCI three-phase PFC controller of the invention.

[0054] FIGS. 17 a is a schematic implementation of the selection function Δ(i,θ) i=1, 2, . . . 6.

[0055] FIG. 17 b is a graph showing the operation waveforms of the circuit of FIG. 17a.

[0056] FIG. 18 is a graph of the waveforms of the control core in FIG. 16.

[0057] FIG. 19 is a block diagram for the realization of control signal for switch sib.

[0058] FIG. 20 is a schematic of a prototype three-phase boost PFC with active soft switching.

[0059] FIG. 21 is a graph of the three phase inductor current waveforms at full load with a horizontal scale at 5 ms/div; and vertical scale at 5A/div.

[0060] FIG. 22 is a graph of the waveforms of phase voltage and current at full load with a Horizontal scale at 5 ms/div. The top curve on the graph shows the input phase voltage at 100 V/div and the bottom curve on the graph shows the input phase A current, 2A/div.

[0061] FIG. 23 a is a schematic of the equivalent circuit for interval 0˜60° for the three-phase standard bridge boost rectifier of FIG. 11c.

[0062] FIG. 23 b is a schematic of the equivalent circuit for interval 0˜60° for the parallel-connected dual-boost topology of FIG. 11______.

[0063] FIG. 24 is a graph of the simulated current waveforms for three-phase standard bridge boost rectifiers shown in FIG. 11c and 11d with the UCI three-phase PFC controller of the invention.

[0064] FIG. 25 a is a schematic of a 3-phase 3-switch 3-level boost rectifier (VIENNA rectifier).

[0065] FIG. 25 b is a schematic of a 3 phase boost rectifier with ac inductors and a split dc rail.

[0066] FIG. 25 c is a schematic of a 3 phase boost rectifier with ac inductors and an asymmetric half bridge.

[0067] FIG. 25 d is a schematic of a (d). 3-phase boost rectifier with dc inductors and a split dc-rail.

[0068] FIG. 25 e is a schematic of a three-phase boost rectifier with dc inductors and an asymmetric half bridge.

[0069] FIG. 26 is a graph of the normalized three-phase voltage waveforms for the rectifiers of FIGS. 25a-25e.

[0070] FIG. 27 a is a schematic for the equivalent circuit for a VIENNA rectifier during the (−30°˜30°) interval when sa is on.

[0071] FIG. 27 b is a schematic for a series-connected dual-boost topology corresponding to FIG. 27a.

[0072] FIG. 28 is a graph of the normalized dual-boost topology input voltage Vp and Vn for interval −30°˜30° of the circuitry of FIGS. 27a and 27b.

[0073] FIGS. 29 a -29d are the equivalent circuit of the topology of FIG. 27b in four switching states.

[0074] FIG. 30 is a graph of the waveforms of the inductor voltages and currents for series-connected dual-boost topology (under condition dp<dn).

[0075] FIG. 31 is a schematic of the control block of proposed PFC controller for three-phase boost rectifier with a split dc-rail.

[0076] FIG. 32 a and 32b are graphs of the Implementation of input-selection-function Δ(θ,i) and its waveforms.

[0077] FIG. 33 is a graph of the normalized waveform for voltages vp,vn and inductor currents iLp,iLn during line cycle.

[0078] FIG. 34 is a graph of a simulated three-phase input current waveforms for VIENNA rectifier with proposed controller.

[0079] FIG. 35 is a graph of measured three-phase inductor current waveforms. The vertical scale is 5A/div and horizontal scale is 5 ms/div.

[0080] FIG. 36 is a graph of the measured phase A voltage and current waveforms. The top curve is the phase A voltage shown at 50V/div, and the bottom curve is the phase A current, show at 5A/div with a horizontal scale of 5 ms/div.

[0081] FIG. 37 is a graph of simulated current waveforms for three-phase boost rectifier in FIGS. 25b and 25c with controller of the invention. For the three-phase boost rectifier with dc inductors and a split-dc rail in FIG. 25(d), the series-connected dual-boost topology is shown in FIG. 28.

[0082] FIG. 38 is a schematic diagram of the series-connected dual-boost converter topology for the rectifier shown in FIG. 25(d).

[0083] FIG. 39 is a graph of simulated waveforms for rectifiers in FIGS. 25(d) and (e) with proposed controller of the invention.

[0084] FIG. 40 a is a schematic of a three-phase 6-switch bridge boost rectifier.

[0085] FIG. 40 b is a schematic of an average model

[0086] FIG. 41 a is a schematic of proposed 3-phase boost PFC controller.

[0087] FIG. 41 b is a graph of the operation waveforms of the circuit of FIG. 41a.

[0088] FIG. 42 is the output of a simulated three-phase inductor current waveforms with controller shown in FIG. 41a.

[0089] FIG. 43 is an illustration of sensing switching current for phase A

[0090] FIG. 44 is a schematic for the control block for six-switch boost bridge rectifier with average switching current control.

[0091] FIGS. 45 a and 45b show the simulation results for six-switch boost bridge rectifier with average switching current mode control.

[0092] FIG. 45(a) is a graph of the simulated three-phase inductor currents.

[0093] FIG. 45(b) is a graph of the operation waveforms of the control block in FIG. 4.

[0094] FIGS. 46 a and 46b are two examples of bridge boost rectifier.

[0095] FIG. 46(a) is a schematic of a 6-switch boost bridge rectifier with dc-diode.

[0096] FIG. 46(b) is a schematic of a three-level rectifier.

[0097] FIG. 47 is a graph of simulated three-phase inductor current waveforms for 6-switch bridge rectifier with dc diode and inductor current control.

[0098] FIG. 48 is a schematic of a 3-phase rectifier with reduced switch count.

[0099] FIG. 49 The schematic of control block for the 3-phase rectifier in FIG. 48.

[0100] FIG. 50 is a graph of the operation waveforms for the controller in FIG. 49.

[0101] FIG. 51 is a graph of simulated inductor current waveforms for the 3-phase rectifier in FIG. 49 with proposed UCI PWM controller.

[0102] FIGS. 52 a and 52b are schematics for an equivalent circuit for the 3-phase rectifier with reduced switch count in FIG. 48.

[0103] FIGS. 53 a and 53b show a 3-phase VIENNA rectifier in FIG. 53a and its average model in FIG. 53b.

[0104] FIGS. 54 a and 54b are schematics of proposed 3-phase PFC controller for VIENNA rectifier by sensing inductor current in FIG. 54a and its operation waveform FIG. 54b.

[0105] FIG. 55 is a graph of a simulated inductor current waveforms for VIENNA rectifier with proposed controller in FIGS. 54a and 54b

[0106] FIG. 56 is a schematic illustration of switching current sensing for VIENNA rectifier.

[0107] FIG. 57 is a schematic of 3-PFC controller for VIENNA rectifier with peak switching current mode control.

[0108] FIGS. 58 a and 58 b show the simulation results for 3-PFC for VIENNA rectifier with switching peak current control.

[0109] FIG. 58 a is a graph of the operation waveforms of the controller.

[0110] FIG. 58 b is a graph of the simulated inductor current waveforms.

[0111] FIG. 59 is a schematic of control block for 3-PFC VIENNA rectifier with average switching current mode control.

[0112] FIGS. 60 a and 60b are graphs of simulated waveforms for 3-phase VIENNA rectifier with average switching current mode control.

[0113] FIG. 60 a shows the operation of control block.

[0114] FIG. 60 b shows the simulated inductor current.

[0115] FIGS. 61 a and 61b show a comparison between the general topology for UCI controlled 3-phase PFC and APF.

[0116] FIG. 61 a is a general diagram of the UCI controlled 3-phase PFC.

[0117] FIG. 61 b is a general diagram of the UCI controlled 3-phase APF.

[0118] FIG. 62 is a schematic of three-phase APF with standard six-switch bridge converter and bipolar operated UCI controller.

[0119] FIG. 63 is an implementation of equation 38 with integrator with reset.

[0120] FIG. 64 is a graph of the simulation results for active power filter with proposed controller in FIG. 62.

[0121] FIG. 65 is a schematic of three-phase APF diagram based on 3-phase bridge with reduced switch count.

[0122] FIG. 66 is a graph of the simulation results for three-phase APF in FIG. 65.

[0123] FIG. 67 is a schematic of three-phase APF with half-bridge configuration

[0124] FIG. 68 is a graph of three-phase voltage waveforms.

[0125] FIG. 69 is a diagram of vector operated UCI controller for 3-phase APF.

[0126] FIG. 70 is a schematic of logic circuit for switching drive signal Qan and Qap.

[0127] FIG. 71 is a graph of a simulation waveform for three-phase APF with proposed controller based on vector control.

[0128] FIG. 72 is a schematic of a three-phase grid-connected circuit with a standard six-switch bridge inverter.

[0129] FIG. 73 is a graph of a three-phase utility voltage waveforms.

[0130] FIG. 74 a is a schematic of an equivalent circuit for inverter in FIG. 72 during 0-60°.

[0131] FIG. 74 b is a schematic of parallel-connected dual buck topology.

[0132] FIGS. 75 a -75d are equivalent circuit for parallel-connected dual buck sub-topology.

[0133] FIG. 76 are the inductor current and voltage waveforms.

[0134] FIG. 77 is a diagram for proposed UCI controller for three-phase grid-connected inverter.

[0135] FIGS. 78 a and 78b show the waveforms for equivalent circuit model during one line cycle. FIG. 78a shows the line-line voltage and voltage Vp and Vn.

[0136] FIG. 78 b shows the average inductor currents ia=<iLa>, ib=<iLb>, ic=<iLc> and equivalent inductor currents <iLp> <iLn>.

[0137] FIG. 79 is a graph of the operation waveforms of the core section of the proposed UCI controller

[0138] FIG. 80 is a graph of the simulated inductor current waveforms for inverter in Fig. with proposed UCI controller.

[0139] The invention and its various embodiments can now be better understood by turning to the following detailed description of the preferred embodiments which are presented as illustrated examples of the invention defined in the claims. It is expressly understood that the invention as defined by the claims may be broader than the illustrated embodiments described below.

DETAILED DESCRIPTION OF THE PREFERRED EMBODIMENTS

[0140] The disclosure is organized into three parts according to the function of the circuits. In each part, various embodiments will be given for the vector control mode and the bipolar operation mode.

[0141] PFC Rectifiers:

[0142] In its simplest terms the control method of the invention is based on one cycle control to realize a three-phase PFC function given by: 1$\left[\begin{array}{c}{i}_a\\ i_b\\ i_c\end{array}\right]=\frac{1}{R_e}·\left[\begin{array}{c}{v}_a\\ v_b\\ v_c\end{array}\right]\mathrm{or}{I}_s=\frac{1}{R_e}·V_s$

[0143] where ia,ib,ic are the three-phase source currents, va,vb and vc are the three-phase source voltages and Re is the equivalent resistance by which the source is loaded; Is,Vs are matrix vectors representing the input source current and voltage.

[0144] Every converter can be described by:

V s =V o ·M (D)

[0145] where M(D) is a function of the duty cycle D, and is called the conversion matrix. Vo is the dc output voltage. This matrix is singular; thus many solutions are available. According to the invention the two equations above are combined so that the circuit realizes the function described by: 2$I_s=\frac{V_o}{R_e}·M\left(D\right)$

[0146] If an equivalent current sensing resistor, Rs is used to measure the source currents ia,ib,ic then the circuit performance can also be described by a control key equation: 3$R_s·I_s=\frac{R_s·V_o}{R_e}·M\left(D\right).$

[0147] Where 4$\frac{R_s·V_o}{R_e}$

[0148] can be expressed as Vm. Compared to the switching frequency, Vm varies at much lower frequency, therefore it may be approximated by the output of a feedback compensator which is automatically adjusted whenever 5$\frac{R_s·V_o}{R_e}$

[0149] has a discrepancy compared to a reference value. The control key equation can be used with any boost-derived converter. For each solution of the control key equation, a control implementation is available based on one-cycle control. Those implementations can be roughly classified into two categories: (1) vector control mode as shown in FIG. 5 and bipolar control mode FIG. 6.

[0150] The control circuit, generally denoted by reference numeral 10 in FIG. 5, for the vector mode is comprised of an integrator 12 having an input with a timed reset circuit 15 and an output 14 coupled to the input of an adder 16. The adder 16 has another input coupled to the input 18 of the integrator 12. The output 22 of the adder 16 is coupled to two comparators 20. The other input to comparators 20 are derived from adders 17. Adders 17 in turn have an input from doublers or fixed multipliers 19 and are cross-connected to the inputs to fixed multipliers 19. Nodes 21 coupled to the outputs of low pass filters 23 are the inputs to fixed multipliers 19 and the cross-connection to adders 17. Low pass filters 23 are in turn coupled to the outputs of multiplexer 40. The inputs to multiplexer 40 are taken from the three phase inductor currents or switching currents ia, ib and ic. The outputs of comparators 20 are coupled to clocked flip-flops 38, whose outputs are coupled to a logic circuit 42. Logic circuit 42 and multiplexer 40 are coupled to and controlled by region selection circuit 30, whose operation will be made clear below. The output of logic circuit 42 are coupled back to rectifiers 24 to switch them again in a manner described in detail below in various embodiments. The output, V0, from load 25 or rectifiers 24 is fed back to an subtractor 27 to generate the difference between a reference voltage, Vref, and V0. This difference, v(s), is coupled to a voltage loop compensator 29 and provided as the input to integrator 12.

[0151] The control circuit 10 for bipolar mode shown in FIG. 6 is comprised of an integrator 12 having an input 18 including a reset circuit. The output 14 of integrator 12 is coupled to three comparators 20. The other input to comparators 20 is provided from an input current processing circuit 31 described below. The input in turn to input current processing circuit 31 is derived from an inductor current or switching circuit 33. The outputs of comparators 20 are coupled to clocked flip-flops 38, whose outputs in turn are coupled to a logic circuit 42, again described below in various embodiments. Logic circuit 42 is coupled to and controlled by zero-crossing sensing network 35, which takes as its inputs the three phase voltage signals, Va, Vb and Vc. The remaining elements of FIG. 6 are similar to those in FIG. 5.

[0152] For vector control in FIG. 5, the control variable rotates in each 60° of line cycle. Therefore, the input voltages are sensed that are used to decouple the sensed current signals and direct the trigger signals to the correct switches. Again the detailed nature of the trigger signals and correct switches is described below for various embodiments. For bipolar control in FIG. 6, the control variables do not rotate, therefore no decoupling circuitry is required. In this case, voltage sensing may or may not be necessary.

[0153] A unified constant-frequency integration (UCI) control of the power factor corrected rectifiers 24 is thus described above based on one-cycle control. This control method employs an integrator 12 with reset as the core component to control the duty ratio of a PFC rectifier 24 to realize sinusoidal current draw from the AC source 26. Compared to previously proposed control methods, the UCI controller features a constant switching frequency, simpler circuitry, and no need for multipliers. Since the input three-phase currents, ia, ib, and ic, are controlled cycle by cycle, they match the input three-phase voltages closely, thus a unity power factor and low total harmonic distortion (THD) are achieved. Experimental and simulation results show that the PFC has excellent input current waveform demonstrated using many rectifier topologies. PFC rectifiers 24 with an UCI controller provide a cost-effective, highly reliable, and flexible solution for power quality control. Due to the simplicity and generality of the circuitry, it is very suitable for industrial production.

[0154] A digital implementation of UCI control method can be realized by programming the control key equation and the supporting logic and linear functions into a digital signal processing (DSP) chip. The details of digital implementation of the various embodiments will not be further described, but it will be immediately evident according to the teachings of the invention what digital operations must be designed or programmed into the DSP's for each embodiment based on the equations and tables given for each embodiment below. Since control key equation and the supporting logic and linear functions are very simple, a low cost DSP can be employed.

[0155] The general approach of the invention to three-phase power factor corrected rectifiers with UCI control having been introduced above, turn now to a more detailed description of an unified constant-frequency integration (UCI) controller 10 for power-factor-correction (PFC) for three-phase rectifiers. As stated the UCI controller 10 can be used for vector or bipolar operation. Vector operated UCI controller 10 is derived from parallel or series connected dual boost subtopologies. Most types of the boost-derived three-phase rectifiers 24 can be decoupled into these topologies. For rectifiers based on a parallel-connected dual boost topology, all switches are switched at low current, which results in reduced current ratings. Vector operated UCI controller 10 usually features lower switching losses because only two-high frequency switches are switched during each 60° of the line cycle. In bipolar operation, all switches are switched at high frequency independently from the line voltage states, therefore, no region selection circuit and rotation circuits are necessary, so that the cost is reduced. However, the switching losses are higher compared to that of vector operation. UCI control can be realized by sensing the inductor currents or by sensing the switching currents. A bipolar operated UCI controller 10 can be applied to several topologies such as the standard six-switch boost bridge rectifier as well as the VIENNA rectifier.

[0156] Consider now the vector operated UCI controller 10 for a three-phase rectifier 24 based on parallel-connected dual boost topology. FIGS. 11a-11e depict a family of rectifiers 24 with a parallel-connected dual-boost topology using three AC inductors & a single dc-rail. FIG. 11 a shows a conventional three-phase AC source 26 coupled through line inductance 32 into rectifier circuit 24 coupled to a tuned load 36, which rectifier circuit 24 is controlled by three-phase delta connected switches 34a. FIG. 11b shows a conventional three-phase AC source 26 coupled through line inductance 32 into rectifier circuit 24 coupled to a tuned load 36, which rectifier circuit 24 is controlled by three-phase star connected switches 34b. The three-phase H-bridge boost rectifier 24 in FIGS. 11c and 11d are similar except for an additional diode 38 in FIG. 11d. FIG. 11e is a 3-phase boost rectifier configured by switches 34e as an inverter network.

[0157] The normalized three-phase input voltage waveforms are shown in FIG. 12. During each 60° of the AC line cycle as shown in FIG. 12, all the rectifiers given in FIGS. 11a-11e can be decoupled into a parallel-connected dual-boost topology. Consider for example rectifier 24 with delta-connected 3φ switched shown in FIG. 11a. During the 60 degree region (0˜60°) of FIG. 12, switch Sca is off, while the other two switches Sab and Sbc are controlled so that the input inductor currents iLa and iLc follow the phase voltages Va and Vc respectively. The equivalent circuit can be viewed as a parallel connected dual-boost topology as shown in FIG. 13a. In the next 60° (60˜120°), switch Sbc is off, while switches Sab and Sca are controlled. The equivalent circuit along with its dual-boost topology is shown in FIG. 13b. These dual-boost topologies are equivalent for each 60° interval, while the circuit parameters of the dual-boost topology are different in each 60° interval as listed in Table I. Note there are two possibilities for the parameter combination, i.e. voltage Vp can be either Va-Vb or Vc-Vb during interval (0˜60°), and so on. The first possibility is considered here, since the second one is similar.

TABLE I
The cross-reference of the circuit parameters between the three-phase boost
rectifier shown in FIG. 11a and parallel-connected dual-boost topology.
	Vp	Vn	Lp	Ln	Lt	Tp	Tn	Dp	Dn	Dt
0˜60	Vab	Vcb	La	Lc	Lb	Sab	Sbc	Dap	Dcp	Dbn
60˜120	Vab	Vac	Lb	Lc	La	Sab	Sca	Dbn	Dcn	Dap
120˜180	Vbc	Vac	Lb	La	Lc	Sbc	Sca	Dbp	Dap	Dcn
180˜240	Vbc	Vba	Lc	La	Lb	Sbc	Sab	Dcn	Dan	Dbp
240˜300	Vca	Vba	Lc	Lb	La	Sca	Sab	Dcp	Dbp	Dan
300˜360	Vca	Vcb	La	Lb	Lc	Sca	Sbc	Dan	Dbn	Dcp

[0158] For the dual-boost topology shown in FIG. 13a, four switching states are available for the two switches Tp and Tn. The switching states and inductor voltages are shown in Table II. The equivalent circuits of the dual-boost topology in all switching states are shown in FIG. 14.

TABLE II
Switching states and inductor voltages for the
parallel-connected dual-boost topology.
State	Tp	Tn	VLp	VLn	VLt
I	ON	ON	6$V_p^{*}$	7$V_n^{*}$	8$V_t^{*}$
II	ON	OFF	9$V_p^{*}+\frac{1}{3}·E$	10$V_n^{*}-\frac{2}{3}·E$	11$V_y^{*}-\frac{1}{3}·E$
III	OFF	ON	12$V_p^{*}-\frac{2}{3}·E$	13$V_n^{*}+\frac{1}{3}·E$	14$V_t^{*}-\frac{1}{3}·E$
IV	OFF	OFF	15$V_p^{*}-\frac{1}{3}·E$	16$V_n^{*}-\frac{1}{3}·E$	17$V_t^{*}-\frac{2}{3}·E$

[0159] where 18$\left[\begin{array}{c}{V}_p^{*}\\ V_n^{*}\\ V_t^{*}\end{array}\right]=\left[\begin{array}{cc}\frac{2}{3}& -\frac{1}{3}\\ -\frac{1}{3}& \frac{2}{3}\\ \frac{1}{3}& \frac{1}{3}\end{array}\right]·\left[\begin{array}{c}{V}_p\\ V_n\end{array}\right]$

[0160] and voltage ‘E’ equals the output voltage Vo.

[0161] For a three-phase PFC with a constant switching frequency, only two switching sequences are possible, i.e. states I, II, IV (condition dp>dn) or states I, III, IV (condition dp<dn) during each switching cycle, if trailing-edge modulation is performed. The voltage and current waveforms of the inductors are shown in FIG. 15 for the first switching sequence (dp>dn).

[0162] Based on the assumption that switching frequency is much higher than the line frequency, the inductor voltage-second balance is used, which yields 19$\begin{array}{cc}\{\begin{array}{c}{V}_p^{*}·d_n+\left(V_p^{*}+\frac{1}{3}·E\right)·\left(d_p-d_n\right)+\left(V_p^{*}-\frac{1}{3}·E\right)·\left(1-d_p\right)=0\\ V_n^{*}·d_n+\left(V_n^{*}-\frac{2}{3}·E\right)·\left(d_p-d_n\right)+\left(V_n^{*}-\frac{1}{3}·E\right)·\left(1-d_p\right)=0\\ V_t^{*}·d_n+\left(V_t^{*}-\frac{1}{3}·E\right)·\left(d_p-d_n\right)+\left(V_t^{*}-\frac{2}{3}·E\right)·\left(1-d_p\right)=0\end{array}& \left(1\right)\end{array}$

[0163] The following equation is true for a symmetrical three-phase system:

V p *+V n *−V t *=0  (2)

[0164] Combination of the equation (1), (2) and further simplification yield 20$\begin{array}{cc}\left[\begin{array}{c}1-d_p\\ 1-d_n\end{array}\right]=\left[\begin{array}{cc}2& 1\\ 1& 2\end{array}\right]·\left[\begin{array}{c}\frac{V_p^{*}}{E}\\ \frac{V_n^{*}}{E}\end{array}\right]& \left(3\right)\end{array}$

[0165] It can be verified that this equation is valid for the other switching states I, III, and IV (dp<dn) as well. In the steady sate, equation 21$\frac{E}{V_{\mathrm{in}}}=\frac{1}{1-D}$

[0166] is valid for a dc-dc boost converter operated in continuous conduction mode (CCM), where voltages Vin, E are the input and output voltages for the dc-dc boost converter respectively. Similarly Equation (3) gives an inherent relationships between the duty cycle and the input, output voltage for the parallel-connected dual-boost topology. This relationship is independent of the control scheme as long as the dual-boost topology operates in CCM.

[0167] A Three-Phase UCI PFC Controller

[0168] For the unity power factor three-phase PFC, the control goal is to force the switching-cycle average of the inductor currents in each phase to follow the sinusoidal phase voltages.

V a =R e ·i a ;V b =R e ·i b ;V c =R e ·i c   (4)

[0169] where Re is the emulated resistance that reflects the load current.

[0170] This control goal can be realized by controlling the inductor currents iLp and iLn to follow the voltages Vp* and Vn* respectively. For example, during the interval (0-60°), assuming that Vp=Va−Vb and Vn=Vc−Vb, following equations are resulted: 22$\begin{array}{cc}\{\begin{array}{c}{V}_p^{*}=\frac{2}{3}·V_p-\frac{1}{3}·V_n=\frac{2}{3}·\left(V_a-V_b\right)-\frac{1}{3}·\left(V_c-V_b\right)=V_a\\ ⟨i_{\mathrm{Lp}}⟩=⟨i_{\mathrm{La}}⟩=i_a\\ V_n^{*}=\frac{2}{3}·V_n-\frac{1}{3}·V_p=\frac{2}{3}·\left(V_c-V_b\right)-\frac{1}{3}·\left(V_a-V_b\right)=V_c\\ ⟨i_{\mathrm{Ln}}⟩=⟨i_{\mathrm{Lc}}⟩=i_c\end{array}& \left(5\right)\end{array}$

[0171] Therefore, the control goal of three-phase PFC can be rewritten as 23$\begin{array}{cc}\{\begin{array}{c}{V}_p^{*}=R_e·⟨i_{\mathrm{Lp}}⟩\\ V_n^{*}=R_e·⟨i_{\mathrm{Ln}}⟩\end{array}& \left(6\right)\end{array}$

[0172] Substituting equation (6) into (3) yields 24$\begin{array}{cc}\left[\begin{array}{c}1-d_p\\ 1-d_n\end{array}\right]=\frac{R_e}{E·R_s}·R_s·\left[\begin{array}{cc}2& 1\\ 1& 2\end{array}\right]·\left[\begin{array}{c}⟨i_{\mathrm{Lp}}⟩\\ ⟨i_{\mathrm{Ln}}⟩\end{array}\right]& \left(7\right)\end{array}$

[0173] where Rs is the equivalent current sensing resistance (assuming all the current sensing resistances are equal to Rs). 25$\begin{array}{cc}\mathrm{Let}{V}_m·\frac{E·R_s}{R_e}& \left(8\right)\end{array}$

[0174] where Vm is the output of the voltage loop compensator, equation (7) can be rewritten as 26$\begin{array}{cc}{V}_m·\left[\begin{array}{c}1-d_p\\ 1-d_n\end{array}\right]=R_s·\left[\begin{array}{cc}2& 1\\ 1& 2\end{array}\right]·\left[\begin{array}{c}⟨i_{\mathrm{Lp}}⟩\\ ⟨i_{\mathrm{Ln}}⟩\end{array}\right]& \left(9\right)\end{array}$

[0175] It shows that three-phase PFC can be realized by controlling the duty ratio of switches Tp and Tn such that the linear combination of inductor currents <iLp> and <iLn> satisfy equation (9). These equations can be realized through an integrator 16 with reset and a linear network such as a clock (not shown), a comparator 20, a flip/flop 38 and adders 16. The control core circuitry needed to realize the equation (9) is shown in FIG. 16. Since the parallel-connected dual-boost topologies change their parameters such as iLp,iLn during each 60° of line cycle, an input multiplexer circuit 40 and an output logic circuit 42 are required. Overall, the control block to realize the three-phase PFC function is shown in FIG. 16.

[0176] This control block includes four functional circuits:

[0177] (1). The region selection circuit 30 functions to determine the operational region as well as the corresponding equivalent circuit at a given time. The region selection function Δ(θ,i) is defined as:

Δ(θ,i)=u(θ-(i−1)·60)−u(θ−i·60)  (10).

[0178] It can be implemented by sensing the input voltage as shown in FIG. 17a. The waveforms of selection function are shown in FIG. 17b.

[0179] (2). The input multiplexer circuit 40 functions to select the input inductor current in order to configure the <iLp> and <iLn>. For example, the equivalent current iLp can be expressed as

i Lp =|i La |·(Δ(1,θ)+Δ(6,θ))+|iLb|·(Δ(2,θ)+Δ(3,θ))++|iLc|(Δ(4,θ)+Δ(5,θ)).

[0180] (3). The core circuit also includes an adder 16, comparators 20, and an integrator 16 with reset to realize the equation (9). The time constant of integrator 16 is set to equal the switching period. The operation waveforms are shown in FIG. 18.

[0181] (4). The output logic circuit 42 applies the equivalent switching control signal Qp and Qn to switches 34a-34e in the rectifier 24. The logic function varies from one type of rectifier 24 to another. The control signals for output switches 34a-34e are also functions of selection function Δ(i,θ) and control signal for switches Tp and Tn. For example, the control signal of switches Sab is given by: Qab=Qp·(Δ(1,θ)+Δ(2,θ))+Qn·(Δ(4,θ)+Δ(5,θ)); where Qab, Qp and Qn are control signals for switches Sab, Tp and Tn respectively. The implementation circuit is shown in FIG. 19.

[0182] The control algorithm for the boost PFC shown in FIG. 11a is listed in Table III. From the table, two conclusions can be drawn:

[0183] The current iLp and iLn are smaller than the phase current. Therefore, the switches Sab, Sbc, and Sca have lower current rating and lower conduction losses.

[0184] During each 60° region, only two switches Tp and Tn are operating at high frequency. Therefore, switching losses are expected to be lower.

TABLE III
The control algorithm for the 3-phase boost rectifier 24 with
delta-connected switches in FIG. 11a.
Region	Vp	Vn	iLp	iLn	iLl	Qab	Qbc	Qca
0˜60	Vab	Vcb	iLa	iLc	−iLb	Qp	Qn
60˜120	Vab	Vac	−iLb	−iLc	iLa	Qp	0	Qn
120˜180	Vbc	Vac	iLb	iLa	−iLc	0	Qp	Qn
180˜240	Vbc	Vba	−iLc	−iLa	iLb	Qn	Qp
240˜300	Vca	Vba	iLc	iLb	−iLa	Qn	0	Qp
300˜360	Vca	Vcb	−iLa	−iLb	iLe	0	Qn	Qp

[0185] Experimental Verification

[0186] A 1.5 kW prototype of the three-phase rectifier with delta-connected 3φ switches shown in FIG. 11a was built. In order to improve the efficiency and reduce switching noise, an active zero-voltage soft-switching circuit was employed. The experimental schematic is shown in FIG. 20. The parameters of the components are listed as follows: the inductors La=Lb=Lc=560 uH; the output capacitor Co=470 uF; the main switches use MTY25N60E; and the main diodes dap,dan, . . . dcn and d1 are MUR3080; the auxiliary switch is MTY8N60E; the soft-switching inductor and capacitor are Lr=10 uH and Cr=3 nF; diodes d2,d3 are MUR860. The experimental conditions are as follows: the input phase voltage is 120 Vrms; the output voltage is 475 VDC; switching frequency: 55 kHz; load resistance is 160 Ω; output power is 1.41 KW. The measured three-phase current waveforms are shown in FIG. 21. The phase A voltage and current are shown in FIG. is 22. All the waveforms are measured by Tektronix oscilloscope TDS 520. The measured THD at full load and 120 Vrms input is 6.1%, while the phase voltages have a THD of 3.9% themselves.

[0187] Analysis and Simulation of the Proposed Controller for the H-Bridge Boost Rectifier as Well as the Rest of the Family

[0188] All the members in the parallel connected dual-boost family of FIGS. 11a-11e can be controlled in a similar way. The H-bridge boost rectifier 24 shown in FIG. 11c is decoupled into the parallel-connected dual-boost topology as shown in FIG. 13a and 13b. For example, during the 0˜60° interval, switches San and Scn are controlled so that the inductor currents iLa, iLc follow the phase voltages Va,Vc respectively. The equivalent circuit for this interval and the parallel-connected dual boost topology are shown in FIG. 23. As a result, the H-bridge rectifier 24 can also be controlled by proposed controller shown in FIG. 16 with slight modification of the output logic circuit 42. The corresponding parameters are listed in the Table IV. Control algorithm is shown in Table V. The simulated current waveforms for the H-bridge rectifier are shown in FIG. 24. The simulated THD is 2.86% when the input voltage is purely sinusoidal.

[0189] The operation, the corresponding parameters, and control algorithm for rectifier shown in FIG. 11d are the same as that of the H-bridge rectifier shown in FIG. 11c in CCM operation. However, the operations are different when they get into DCM mode. The rectifier in FIG. 11c can be designed to operate always in CCM by slightly modifying output logic circuits.

[0190] The rest of the family members, the boost rectifier with star-connected switches shown in FIG. 11b and boost rectifier with inverter network shown in FIG. 11e, can also be decoupled into dual-boost topologies in each 60°. The parameter cross-references for these two rectifiers are listed in Table VI. The control algorithm can be derived in a similar way. The simulated waveforms for circuit in FIG. 11b and 11e are not listed here, since they are similar to the simulated waveforms shown in FIG. 24.

TABLE IV
The cross-reference between the H-bridge boost rectifier and the
parallel-connected dual-boost topology.
Region	Vp	Vn	Lp	Ln	Lt	Tp	Tn	Dp	Dn	Dt
0˜60	Vab	Vcb	La	Lc	Lb	San	Scn	Dap	Dcp	Dbn
60˜120	Vab	Vac	Lb	Lc	La	Sbp	Scp	Dbn	Dcn	Dap
120˜180	Vbc	Vac	Lb	La	Lc	Sbn	San	Dbp	Dap	Dcn
180˜240	Vbc	Vba	Lc	La	Lb	Scp	Sap	Dcn	Dan	Dbp
240˜300	Vca	Vba	Lc	Lb	La	Scn	Sbn	Dcp	Dbp	Dan
300˜360	Vca	Vcb	La	Lb	Lc	Sap	Sbp	Dan	Dbn	Dcp

[0191]

TABLE V
The control algorithm for the topologies shown in
FIG. 11c and 11d.
Region	iLp	iLn	iLt	Qap	Qan	Qbp	Qbn	Qcp	Qcn
0˜60	iLa	iLc	−iLb		Qp			0	Qn
60˜120	−iLb	−iLc	iLa			Qp		Qn	0
120˜180	iLb	iLa	−iLc		Qn		Qp	0	0
180˜240	−iLc	−iLa	iLb	Qn				Qp	0
240˜300	iLc	iLb	−iLa				Qn	0	Qp
300˜360	−iLa	−iLb	iLc	Qp		Qn		0	0

[0192]

TABLE VI
The cross-references between the boost rectifier in FIG. 1b, 11e and the
parallel-connected dual-boost topology.
	opology parameters for	Topology parameters for
	rectifier in FIG. 11b	rectifier in FIG. 11e
Region	Tp	Tn	Dp	Dn	Dt	Tp	Tn	Dp	Dn	Dt
0˜60	Sa	Sc	Dap	Dcp	Dbn	Sa−	Sc−	Dap	Dcp	Dbn, Db−
60˜120	Sb	Sc	Dbn	Dcn	Dap	Sb+	Sc+	Dbn	Dcn	Dap, Da+
120˜180	Sb	Sa	Dbp	Dap	Dcn	Sb−	Sa−	Dbp	Dap	Dcn, Dc−
180˜240	Sc	Sa	Dcn	Dan	Dbp	Sc+	Sa+	Dcn	Dan	Dbp, Db+
240˜300	Sc	Sb	Dcp	Dbp	Dan	Sc−	Sb−	Dcp	Dbp	Dan, Da−
300˜360	Sa	Sb	Dan	Dbn	Dcp	Sa+	Sb+	Dan	Dbn	Dcp, Dc+

[0193] The Vector Operated UCI Controller for Three-Phase Rectifier Based on Series-Connected Dual Boost Topology.

[0194] Consider now a family of three-phase rectifier with a series-connected dual-boost topology. A family of three-phase boost rectifiers with a split dc-rail is shown in FIG. 25. Normalized three-phase voltage waveforms are shown in FIG. 26. All of the rectifiers 24 depicted in FIGS. 25a-25e can be de-coupled to series-connected dual-boost topologies during each 60° of line cycle. Take the VIENNA rectifier in FIG. 25a as an example. During (−30°˜30°) from FIG. 26, the bidirection switch Sa is turned on and the other two switches Sb and Sc are controlled at high frequency so that the average inductor currents iLb, iLc follow the phase voltages Vb and Vc. The equivalent circuit as well as its series-connected dual-boost topology is shown in FIGS. 27a and b.

[0195] The waveforms of normalized voltage Vp and Vn during −30°˜30° are shown in FIG. 28. The cross-reference of topology parameters for (−30°˜330°) are listed in Table VII.

TABLE VII
The cross reference of circuit parameters between VIENNA rectifier and
series-connected dual-boost topology
Region	p	Vn	Lp	Ln	Lt	Tp	Tn	Dp	Dn
−30˜30	ca	Vab	Lc	Lb	La	Sc	Sb	Dcp	Dbn
30˜90	ac	Vcb	La	Lb	Lc	Sa	Sb	Dap	Dbn
90˜150	ab	Vbc	La	Lc	Lb	Sa	Sc	Dap	Dcn
150˜210	ba	Vac	Lb	Lc	La	Sb	Sc	Dbp	Dcn
210˜270	bc	Vca	Lb	La	Lc	Sb	Sa	Dbp	Dan
270˜330	cb	Vba	Lc	La	Lb	Sc	Sa	Dcp	Dan

[0196] For series-connected dual-boost topology in FIG. 27b, switching states of Tp and Tn have four possible combinations. The switching states and voltages across the inductors are listed in Table VIII. The equivalent circuits are shown in FIG. 29.

TABLE VIII
Switching state and the inductor voltage for
series-connected dual-boost topology.
State	Tp	Tn	VLp	VLn	VLt
I	ON	ON	27$V_p^{*}$	28$V_n^{*}$	29$V_t^{*}$
II	ON	OFF	30$V_p^{*}-\frac{1}{3}·E$	31$V_n^{*}-\frac{2}{3}·E$	32$V_y^{*}-\frac{1}{3}·E$
III	OFF	ON	33$V_p^{*}-\frac{2}{3}·E$	34$V_n^{*}-\frac{1}{3}·E$	35$V_t^{*}+\frac{1}{3}·E$
IV	OFF	OFF	36$V_p^{*}-E$	37$V_n^{*}-E$	38$V_t^{*}$

[0197] Where 39$V_p^{*}=\frac{2}{3}·V_p+\frac{1}{3}·V_n;$$V_n^{*}=\frac{1}{3}·V_p+\frac{2}{3}·V_n;$$V_t^{*}=\frac{1}{3}·\left(V_n-V_p\right).$

[0198] For constant switching frequency control, two switching sequences are possible during each switching cycle, i.e. state I, II, IV (dp<dn) or I, III, IV (dp>dn), where dp, dn are duty-ratios of switches Tp, Tn respectively. These state sequence will last a certain period of time according to the status of the input voltage and the load. For example, the switching sequence I, II, IV is kept for a certain time. The inductor waveforms for this period are shown in FIG. 30.

[0199] Assuming that the switching frequency is much higher than the line frequency, the series-connected dual-boost topology can be viewed as a dc-dc converter. Therefore, the inductor voltage-second balance method can be applied to the inductor voltage waveforms shown in FIG. 30, which yields 40$\begin{array}{cc}{V}_p^{*}·d_n+\left(V_p^{*}-\frac{1}{3}·E\right)·\left(d_p-d_n\right)+\left(V_p^{*}-E\right)·\left(1-d_p\right)=0V_n^{*}·d_n+\left(V_n^{*}-\frac{2}{3}·E\right)·\left(d_p-d_n\right)+\left(V_n^{*}-E\right)·\left(1-d_p\right)=0V_t^{*}·d_n+\left(V_t^{*}-\frac{1}{3}·E\right)·\left(d_p-d_n\right)+V_t^{*}·\left(1-d_p\right)=0& \left(11\right)\end{array}$

[0200] Simplifying equation (11) gives 41$\begin{array}{cc}\{\begin{array}{c}2·d_p+d_n=3·\left(1-\frac{V_p^{{}^{*}}}{E}\right)\\ d_p+2·d_n=3·\left(1-\frac{V_n^{{}^{*}}}{E}\right)\\ d_p-d_n=3·\frac{V_t^{{}^{*}}}{E}\end{array}& \left(12\right)\end{array}$

[0201] For a symmetrical three-phase system, the following equation is true:

V p *−V n *+V t *=0  (13)

[0202] Therefore, the equation (11) can be further simplified as 42$\begin{array}{cc}\left[\begin{array}{c}1-d_p\\ 1-d_n\end{array}\right]=\frac{1}{E}·\left[\begin{array}{cc}2& -1\\ -1& 2\end{array}\right]·\left[\begin{array}{c}{V}_p^{*}\\ V_n^{*}\end{array}\right]& \left(14\right)\end{array}$

[0203] It can be verified that this equation is also valid for the other sequence I, III and IV (dp>dn). Equation (14) gives the inherent relationship between duty cycles dp, dn and input, output of the series-connected dual-boost topologies when it operates in Continuous Conduction Mode (CCM).

[0204] UCI Three-Phase PFC Controller for Rectifier Based on Series-Connected Dual Boost Topology

[0205] For a unity power factor three-phase PFC, the control goal is to force the average inductor current in each phase to follow the sinusoidal phase voltage.

V a =R e ·i a ;V b =R e ·V c =R e·i c

[0206] where Re is the emulated resistance. This control goal can be realized by controlling the inductor currents iLp and iLn to follow the voltage Vp* and Vn* respectively. For example, during region −30°˜30°, following equations hold 43$\begin{array}{cc}\{\begin{array}{c}{V}_p^{*}=\frac{2}{3}·V_p+\frac{1}{3}·V_n=\frac{2}{3}·\left(V_c-V_a\right)+\frac{1}{3}·\left(V_a-V_b\right)=V_c\\ ⟨i_{\mathrm{Lp}}⟩=⟨i_{\mathrm{Lc}}⟩=i_c\\ V_n^{*}=\frac{1}{3}·V_p+\frac{2}{3}·V_n=\frac{1}{3}·\left(V_c-V_a\right)+\frac{2}{3}·\left(V_a-V_b\right)=-V_b\\ ⟨i_{\mathrm{Ln}}⟩=-⟨i_{\mathrm{Lb}}⟩=-i_b\end{array}& \left(15\right)\end{array}$

[0207] With the assumption that the system is symmetrical, the current <iLt> will automatically follow the voltage Vt* according to equation (3). The control goal of three-phase PFC can be rewritten as 44$\begin{array}{cc}\{\begin{array}{c}{V}_p^{*}=R_e·⟨i_{\mathrm{Lp}}⟩\\ V_n^{*}=R_e·⟨i_{\mathrm{Ln}}⟩\end{array}& \left(16\right)\end{array}$

[0208] Substituting equation (16) into (14) yields 45$\begin{array}{cc}\left[\begin{array}{c}1-d_p\\ 1-d_n\end{array}\right]=\frac{R_e}{E·R_s}·R_s·\left[\begin{array}{cc}2& -1\\ -1& 2\end{array}\right]·\left[\begin{array}{c}⟨i_{Lp}⟩\\ ⟨i_{Ln}⟩\end{array}\right]& \left(17\right)\end{array}$

[0209] where Rs is the equivalent current sensing resistance.

[0210] Set 46$\begin{array}{cc}{V}_m=\frac{E·R_s}{R_e}& \left(18\right)\end{array}$

[0211] where Vm is the output of the voltage loop compensator. Equation (17) can be rewritten as 47$\begin{array}{cc}{V}_m·\left[\begin{array}{c}1-d_p\\ 1-d_n\end{array}\right]=R_s·\left[\begin{array}{cc}2& -1\\ -1& 2\end{array}\right]·\left[\begin{array}{c}⟨i_{Lp}⟩\\ ⟨i_{Ln}⟩\end{array}\right]& \left(19\right)\end{array}$

[0212] This shows that the control of three-phase PFC can be realized by controlling the duty ratio of switches Tp and Tn so that the equation (19) is satisfied. This control core function can be realized by one integrator with reset along with a few logic components as shown in the control core block of FIG. 31. To achieve power factor correction in each line cycle, an input multiplexer and output logic circuits are needed to rotate the control core function corresponding to the input voltage Vp,Vn as shown in Table VII. Overall, the proposed control core is shown in FIG. 31, where Δ(θ,i) is the region selection function: Δ(θ,i)=u(θ−(i−1)·60+30)−u(θ−i·60+30), i=1, 2, . . . 6. This function can be realized by sensing input line-line voltage. The schematic of implementation as well as the waveforms for Δ(θ,i) are shown in FIGS. 32a and 32b.

[0213] The control algorithm for VIENNA rectifier is listed in Table IX. The predicted voltage waveforms Vp,Vn and inductor waveform for series-connected dual-boost topology during each line cycle are shown in FIG. 33.

TABLE IX
The control algorithm for VIENNA rectifier
with proposed control approach.
Region	tLp	iLn	iLt	Qa	Qb	Qc
−30˜30	iLc	−iLb	iLa	ON	Qn	Qp
30˜90	iLa	−iLb	iLc	Qp	Qn	ON
90˜150	iLa	−iLc	iLb	Qp	ON	Qn
150˜210	iLb	−iLc	iLa	ON	Qp	Qn
210˜270	iLb	−iLa	iLc	Qn	Qp	ON
270˜330	iLc	−iLa	iLb	Qn	ON	Qp

[0214] The simulated current waveforms for VIENNA rectifier with the proposed controller are shown in FIG. 34. Simulation condition is as follows: the input voltage Vg(rms)=120V; the output voltage Vo=600V; the output power is 5 KW, the input inductor L=2 mH, and the switching frequency is 10 KHz. The simulated THD is 4.7%.

[0215] Experimental Verification

[0216] A 400 watts experimental circuit of the three-phase VIENNA rectifier shown in FIG. 25a was built to prove the concept. The experimental conditions is as follows: the input voltage is 54 Vrms; the output voltage is 400V; the output power is 400 watts; the switching frequency is 55 KHz; and the input AC inductance is 560 μH. Three-phase inductor current waveforms and phase A voltage and current waveforms are shown in FIG. 35 and FIG. 36 respectively. All the waveforms were measured by Tektronics scope TDS520. Experimental results indicate that dynamic transient exists when rectifier rotates its connection from one 60° to another, which causes additional distortion. The measured THD was 8.4%, while the phase voltages have a THD of 3.9% themselves. Further studies were followed by simulation and it shows that the THD can be reduced by damping the transient with increased inductance. It was observed that the voltages across two output capacitors can be automatically balanced by the proposed controller. For the series-connected dual-boost topology shown in FIG. 37, the average inductor currents iLp and iLn are inversely proportional to the voltage across the capacitors, which is one of important features of this control approach. Therefore, the current can be automatically adjusted so that the output voltage is evenly distributed in the two output capacitors.

[0217] Extension of the PFC Controller to Other Rectifier Topologies with a Split dc Rail

[0218] The proposed controller in FIG. 31 can be extended to other topologies in the family shown in FIG. 25 with slight modification of the output logic, while the control core, the input multiplexer circuit, the region selection functions will remain unchanged. The output logic functions for the rectifiers shown in FIG. 25b and 25c are listed in Table X. The switches Sa, Sb and Sc in these two rectifiers are low frequency switches (operated at twice of the line frequency) and conduct a small portion of the phase current. Switches Tp and Tn are switching frequency switches. The control signal for these two switches are Qp and Qn. For the asymmetrical rectifier in FIG. 25c with proposed control approach, the control algorithm will be exactly same except that the time constant of integrator equals one half of the switching period, i.e. 48$\tau =\frac{T_s}{2}.$

TABLE X
The control algorithm for three-phase boost rectifier in
FIG. 25b and 25c.
Region	Degree	Qa	Qb	Qc	QTp	QTn
1	−30˜30	ON	OFF	OFF	Qp	Qn
2	30˜90	OFF	OFF	ON	Qp	Qn
3	90˜150	OFF	ON	OFF	Qp	Qn
4	150˜210	ON	OFF	OFF	Qp	Qn
5	210˜270	OFF	OFF	ON	Qp	Qn
6	270˜330	OFF	ON	OFF	Qp	Qn

[0219] Simulated waveforms for the rectifier in FIG. 25b are shown in FIG. 37. The simulation results for the rectifier in FIG. 25c is similar to FIG. 37. The simulated THD is below 5%.

[0220] Applying the analytic approach above relating to PFC controllers based on series-connected dual boost topologies yields the control equation (20). 49$\begin{array}{cc}\left[\begin{array}{c}{V}_m·\left(1-D_p\right)\\ V_m·\left(1-D_n\right)\end{array}\right]=R_s·\left[\begin{array}{cc}2& -1\\ -1& 2\end{array}\right]·\left[\begin{array}{c}⟨i_{Lp}⟩\\ ⟨i_{Ln}⟩\end{array}\right]& \left(20\right)\end{array}$

[0221] Equation (20) is exactly the same as the equation (19). Therefore, the proposed controller is also applicable for the topologies shown in FIG. 25(d). However, since dc inductors are the same as the equivalent inductors Lp and Ln, the input multiplexer circuit is eliminated. The algorithm for these two topologies is shown in Table XI below.

[0222] The duty-ratio calculation equation for the asymmetrical rectifier in FIG. 25(e) is the same as that of FIG. 25(d), except that the time constant of integrator equals one half of the switching period, i.e. 50$\tau =\frac{T_s}{2}.$

[0223] Simulated current waveforms for the rectifier of FIG. 25(d) is shown in FIG. 37. The simulated inductor waveforms of FIG. 25(e) are similar to that of FIG. 37. The simulation condition is as follows: the input voltage Vg(rms)=120V; the output voltage Vo=600V; the output power is 5 KW, the input inductor L=5 mH, the switching frequency is 10 KHz. The simulated THD is below 5%.

TABLE XI
The control algorithm for three-phase boost rectifier in FIGS. 25(d)
and FIG. 25(e).
Region	iLp	iLn	Qa	Qb	Qc	QTp	QTn
−30˜30	iLp	iLn	ON	OFF	OFF	QP	Qn
30˜90	iLp	iLn	OFF	OFF	ON	Qp	Qn
90˜150	iLp	iLn	OFF	ON	OFF	Qp	Qn
150˜210	iLp	iLn	ON	OFF	OFF	Qp	Qn
210˜270	iLp	iLn	OFF	OFF	ON	Qp	Qn
270˜330	iLp	iLn	OFF	ON	OFF	Qp	Qn

[0224] Bipolar Operated UCI Controller for 3-Phase PFC

[0225] Standard Three-Phase Six-Switch Bridge Rectifier with Bipolar Operated UCI Control

[0226] General Relationship Between Duty Ratios of Switches and Input Phase Voltage

[0227] A six-switch standard bridge boost rectifier is shown in FIG. 40(a). If the converter operates in continuous conduction mode (CCM), the average voltages at the node A, B, C refer to node N are given by: 51$\begin{array}{cc}\{\begin{array}{c}{V}_{AN}=\left(1-D_{an}\right)·E\\ V_{BN}=\left(1-D_{bn}\right)·E\\ V_{CN}=\left(1-D_{cn}\right)·E\end{array}& \left(21\right)\end{array}$

[0228] where Dan, Dbn,Dcn are the duty ratios for switches San,Sbn,Scn. The switch in each bridge arm is controlled complementary; i.e. the duty ratios for switch Sap,Sbp,Scp are 1−Dan;1−Dbn;1−Dcn respectively.

[0229] The equivalent average model for rectifier in FIG. 40(a) is shown in FIG. 40(b). The average vector voltages at nodes A, B, C refer to the neutral point “O” equal the phase vector voltages minus the voltage across the inductors La,Lb,Lc which is given by 52$\begin{array}{cc}\{\begin{array}{c}{\stackrel{.}{V}}_{AO}={\stackrel{.}{V}}_a-jwL·{\stackrel{.}{i}}_{La}\\ {\stackrel{.}{V}}_{BO}={\stackrel{.}{V}}_b-jwL·{\stackrel{.}{i}}_{Lb}\\ {\stackrel{.}{V}}_{CO}={\stackrel{.}{V}}_c-jwL·{\stackrel{.}{i}}_{Lc}\end{array}& \left(22\right)\end{array}$

[0230] where L is inductance of input inductor and w is line angular frequency. The items {right arrow over (i)}La,{right arrow over (i)}Lb,{right arrow over (i)}Lc are inductor current vectors. The inductances La,Lb,Lc are very small, since they are switching frequency inductors. For a 60 Hz utility system, the voltages across the inductances jwL·{right arrow over (i)}La are very small comparing with the phase voltages, thus can be neglected. Therefore, the equation (22) can be approximately simplified as 53$\begin{array}{cc}\{\begin{array}{c}{\stackrel{.}{V}}_{AO}\approx {\stackrel{.}{V}}_a\\ {\stackrel{.}{V}}_{BO}\approx {\stackrel{.}{V}}_b\\ {\stackrel{.}{V}}_{CO}\approx {\stackrel{.}{V}}_c\end{array}\Rightarrow \{\begin{array}{c}{V}_{AO}\approx V_a\\ V_{BO}\approx V_b\\ V_{CO}\approx V_c\end{array}& \left(23\right)\end{array}$

[0231] For three-phase system, we have

Va+Vb+Vc=0  (24)

[0232] Then we get

V AO +V BO +V CO =0  (25)

[0233] The voltages at nodes A, B, C refer to neutral point are given by 54$\begin{array}{cc}\{\begin{array}{c}{V}_{AO}=V_{AN}+V_{NO}\\ V_{BO}=V_{BN}+V_{NO}\\ V_{CO}=V_{CN}+V_{NO}\end{array}& \left(26\right)\end{array}$

[0234] Combination of equation (25) and (26) yields 55$\begin{array}{cc}{V}_{NO}=-\frac{1}{3}·\left(V_{AN}+V_{BN}+V_{CN}\right)& \left(27\right)\end{array}$

[0235] Substituting equation (27) and (23) into (26) results in 56$\begin{array}{cc}\{\begin{array}{c}{V}_{AO}=V_{AN}+V_{NO}=V_{AN}-\frac{1}{3}·\left(V_{AN}+V_{BN}+V_{CN}\right)\approx V_a\\ V_{BO}=V_{BN}+V_{NO}=V_{BN}-\frac{1}{3}·\left(V_{AN}+V_{BN}+V_{CN}\right)\approx V_b\\ V_{CO}=V_{CN}+V_{NO}=V_{CN}-\frac{1}{3}·\left(V_{AN}+V_{BN}+V_{CN}\right)\approx V_c\end{array}& \left(28\right)\end{array}$

[0236] Combination of equation (21) and (28) yields the relationship between duty ratio Dan,Dbn,Dcn and voltage Va,Vb,Vc which is as follows: 57$\begin{array}{cc}\left[\begin{array}{ccc}-\frac{2}{3}& \frac{1}{3}& \frac{1}{3}\\ \frac{1}{3}& -\frac{2}{3}& \frac{1}{3}\\ \frac{1}{3}& \frac{1}{3}& -\frac{2}{3}\end{array}\right]·\left[\begin{array}{c}{d}_{an}\\ d_{bn}\\ d_{cn}\end{array}\right]=\frac{1}{E}·\left[\begin{array}{c}{V}_a\\ V_b\\ V_c\end{array}\right]& \left(29\right)\end{array}$

[0237] The equation illustrates the inherent relationship between average duty ratio of switches and the line voltage under CCM condition.

[0238] Proposed Bipolar UCI Controller

[0239] Since the matrix of equation (29) is singular, equation (29) has no unique solution. With constrain of unity power-factor correction, many solutions are available. One possible solution for equation (29) is as follows: 58$\begin{array}{cc}\{\begin{array}{c}{d}_{an}=K_1+K_2·\frac{V_a}{E}\\ d_{bn}=K_1+K_2·\frac{V_b}{E}\\ d_{cn}=K_1+K_2·\frac{V_c}{E}\end{array}& \left(30\right)\end{array}$

[0240] Substituting above equation into (29) results in:

[0241] Parameter K2=−1 and K1 can be any number. Because duty ratio should be less than unity and greater than zero, we have the following limitation: 59$\begin{array}{cc}0\le d_{an}=K_1-\frac{V_a}{E}\le 1& \left(31\right)\end{array}$

[0242] Define 60$\begin{array}{cc}M=\frac{E}{\sqrt{2}·V_i}.& \left(32\right)\end{array}$

[0243] The range of K1 is limited by 61$\begin{array}{cc}\frac{1}{M}\le K_1\le 1-\frac{1}{M}& \left(33\right)\end{array}$

[0244] The equation (30) can be rewritten as 62$\begin{array}{cc}\{\begin{array}{c}\frac{V_a}{E·K_1}=1-\frac{d_{an}}{K_1}\\ \frac{V_b}{E·K_1}=1-\frac{d_{bn}}{K_1}\\ \frac{V_c}{E·K_1}=1-\frac{d_{cn}}{K_1}\end{array}& \left(34\right)\end{array}$

[0245] For three-phase rectifier with unity-power-factor, we assume 63$\begin{array}{cc}\{\begin{array}{c}{V}_a=R_e·i_a\\ V_a=R_e·i_a\\ V_a=R_e·i_a\end{array}& \left(35\right)\end{array}$

[0246] where Re is emulated resistance.

[0247] Combination of above equation and (34) yields: 64$\begin{array}{cc}\{\begin{array}{c}\frac{R_e}{E·K_1·R_S}·R_S·i_a=1-\frac{d_{an}}{K_1}\\ \frac{R_e}{E·K_1·R_S}·R_S·i_b=1-\frac{d_{bn}}{K_1}\\ \frac{R_e}{E·K_1·R_S}·R_S·i_c=1-\frac{d_{cn}}{K_1}\end{array}& \left(36\right)\end{array}$

[0248] where parameter Rs is the equivalent current sensing resistor.

[0249] Define 65$\begin{array}{cc}{V}_m=\frac{E·R_s·K_1}{R_e}& \left(37\right)\end{array}$

[0250] where Vm is the output of voltage compensator.

[0251] The equation (36) can be simplified as 66$\begin{array}{cc}\{\begin{array}{c}{R}_s·i_a=V_m-V_m\frac{D_{\mathrm{an}}}{K_1}\\ R_s·i_b=V_m-V_m\frac{D_{\mathrm{bn}}}{K_1}\\ R_s·i_c=V_m-V_m\frac{D_{\mathrm{cn}}}{K_1}\end{array}& \left(38\right)\end{array}$

[0252] Replacing the ia.ib,ic with peak, average inductor current or switching current results in two different control approaches.

[0253] Proposed UCI PWM Controller by Sensing Inductor Currents

[0254] (a). Schematic.

[0255] Replacing the ia,ib,ic in equation (38) with peak or average inductor current, we get the control key equation. 67$\begin{array}{cc}\{\begin{array}{c}{R}_s·i_{\mathrm{Lapk}}=V_m-V_m\frac{D_{\mathrm{an}}}{K_1}\\ R_s·i_{\mathrm{Lbpk}}=V_m-V_m\frac{D_{\mathrm{bn}}}{K_1}\\ R_s·i_{\mathrm{Lcpk}}=V_m-V_m\frac{D_{\mathrm{cn}}}{K_1}\end{array}\mathrm{or}\{\begin{array}{c}{R}_s·⟨i_{\mathrm{La}}⟩=V_m-V_m\frac{D_{\mathrm{an}}}{K_1}\\ R_s·⟨i_{\mathrm{Lb}}⟩=V_m-V_m\frac{D_{\mathrm{bn}}}{K_1}\\ R_s·⟨i_{\mathrm{Lc}}⟩=V_m-V_m\frac{D_{\mathrm{cn}}}{K_1}\end{array}& \left(39\right)\end{array}$

[0256] The above equation can be implemented with an integrator with reset as shown in FIG. 41(a). The operation waveforms are shown in FIG. 41(b); where Qap,Qan . . . Qcn are drive signal for switches Sap,San . . . Scn respectively. The time constant of the integrator is set to be τ=K1·TS; where TS is switching period. For instance, K1 may be chosen as 0.5. In that case, the carrier 68$V_m-V_m·\frac{t}{K_1·T_s}=V_m·\left(1-2·\frac{t}{T_s}\right)$

[0257] is symmetric to the x axis.

[0258] The schematic for the proposed 3-phase PFC controller is shown in FIG. 41(a). By controlling the duty ratio to follow the relationship shown in (39), three-phase PFC can be implemented. The 3-phase PFC controller in FIG. 41a is composed of 3 flip-flops and one integrator with reset as well as some linear components. No voltage sensors and multipliers are required. In order to prevent the short circuit, dead time for complementary switches such as San,Sap need to be considered.

[0259] (b) PSPICE Simulation Verification.

[0260] In order to verify the idea, a PSPICE simulation was conducted. The simulation conditions are as follows: Input phase voltage 120 Vrms, Output voltage E=500 v; L=3 mH, f=10 KHz, P=5 KW. The conversion ration 69$M=\frac{V_o}{\sqrt{2}·V_{\mathrm{grms}}}=2.946.$

[0261] The parameter K1 is limited in the range of (0.339,0.660) according to equation (33). In this simulation, parameter K1=0.4. The simulation results for the 3-phase bridge rectifier in FIG. 41(a) with proposed controller are given in FIG. 42. The measured total harmonic distortion (THD) is below 5%. Simulation results verified the theoretical analysis.

[0262] Proposed UCI PWM controller for 6-switch bridge rectifier by sensing switching current

[0263] Recall the equation (39) and considering the phase A, we have 70$V_m·\left(1-\frac{D_{\mathrm{an}}}{K_1}\right)=R_s·⟨i_{\mathrm{La}}⟩$

[0264] For 3-phase rectifier with unity power-factor, we assume the input inductor current follows the input phase voltage. By setting K1=0.5, the above equation can be rewritten as 71$\&AutoLeftMatch;\{\begin{array}{c}{V}_m·\left(1-2·D_{\mathrm{an}}\right)=R_s·⟨i_{\mathrm{La}}⟩;D_{\mathrm{ap}}=1-D_{\mathrm{an}}{V}_a>0;⟨i_{\mathrm{La}}⟩>0\\ V_m·\left(2·D_{\mathrm{an}}-1\right)=V_m·\left(1-2·D_{\mathrm{ap}}\right)=R_s·\left(-⟨i_{\mathrm{La}}⟩\right);D_{\mathrm{ap}}=1-D_{\mathrm{an}}{V}_a\le 0;⟨i_{\mathrm{La}}⟩\le 0\end{array}$

[0265] The above equation can be simplified as 72$\begin{array}{cc}\{\begin{array}{c}{V}_m·\left(1-2·D_a\right)=R_s·\&LeftBracketingBar;⟨i_{\mathrm{La}}⟩\&RightBracketingBar;\\ D_{\mathrm{an}}=\{\begin{array}{cc}{D}_a;& V_a>0\\ 1-D_a;& V_a\le 0\end{array}{D}_{\mathrm{ap}}=\{\begin{array}{cc}1-D_a;& V_a>0\\ D_a;& V_a\le 0\end{array}\end{array}& \left(40\right)\end{array}$

[0266] Assuming input current is positive, i.e, Va>0;ia>0, when switch San is on, the inductor current flows into switch San. When switch San is off, the inductor current flows through diode Dap. In this case, switch Sap can be turned on at zero voltage condition. Therefore, San is “active” switch and Sap is inactive switch. Likewise, under the condition Va≦0;ia≦0, San is “inactive” switch and Sap is “active” switch. In each switching cycle, there is only one “active” switch is controller in each bridge arm. The loss for “inactive” switch is very small due to the zero-voltage turn-on condition.

[0267] If the converter operates in CCM, the inductor current can be expressed with duty ratio and switching current. The relationship between the switching current and inductor current for phase A is illustrated in FIG. 43; where <iSapn> is equivalent average switching current for switches Sap and San.

[0268] The inductor current is a function of switching current and duty ratio, which is given by 73$\begin{array}{cc}\{\begin{array}{c}{V}_a>0;⟨i_{\mathrm{La}}⟩·D_{\mathrm{an}}=⟨i_{\mathrm{San}}⟩\\ V_a\le 0;\left(-⟨i_{\mathrm{La}}⟩\right)·D_{\mathrm{ap}}=⟨i_{\mathrm{Sap}}⟩\end{array}& \left(41\right)\end{array}$

[0269] Combination of the above equation and equation (40) yields

|<iLa>|·Da=<iSapn>  (42)

[0270] where <isapn> is equivalent average switching current as shown in Fig.

[0271] Combination of Equation (42); (40) and Equation (39) Yields 74$\begin{array}{cc}\{\begin{array}{c}{R}_s·⟨i_{\mathrm{Sapn}}⟩=V_m·\left(1-2·D_a\right)·D_a\\ R_s·⟨i_{\mathrm{Sbpn}}⟩=V_m·\left(1-2·D_b\right)·D_b\\ R_s·⟨i_{\mathrm{Scpn}}⟩=V_m·\left(1-2·D_c\right)·D_c\end{array}& \left(43\right)\end{array}$

[0272] This equation shows that the three-phase PFC for the 6-switch boost bridge rectifier can be implemented by sensing switching current. The schematic of control block is shown in FIG. 44; where Qa has the duty ratio Da. The simulation results are shown in FIG. 45. The simulation condition is same as that described above. The measured THD is below 5%.

[0273] Other Variations of Bridge Boost Rectifier with Proposed Controller

[0274] The proposed controller is applicable to other variations of the bridge topology. Two examples are shown in FIGS. 46a and 46b. One is 6-switch bridge rectifier with dc-diode; the other is three-level boost rectifier. The proposed controller can be applied to these two topologies without any changes. Although the relationship between the duty ratio and input voltage in equation (29) is not completely satisfied in FIG. 46(a), the proposed controller still can guarantee good input current waveforms. The simulation results for the rectifier in FIG. 46(a) with proposed controller by sensing inductor current is given in FIG. 47. The measured THD at 4 KW output is 1.3% and 15% at the 300W. Although THD is slight higher comparing with the topology in FIG. ______, the performance can still meet the IEC 1000-3-2 standard. Further more, because the dc diode prevents the short through in bridge, the reliability is higher. The three-level bridge rectifier in FIG. 46(b) is suitable for high power and high voltage applications because the voltage stress of each switch is half of the output voltage. The simulation results for three-level rectifier is similar to that of the 6-switch rectifier in FIG. ______ and simulation results are not included here.

[0275] 3-Phase Bridge Rectifier with Reduced Switch Count and Bipolar Operated UCI Control

[0276] The 3-phase rectifier topology with reduced switch count is shown in FIG. 48. With similar approximation in 0, the relationship shown in equation (28) still exists for the topology in Fig. Rewritten equation (28) yields: 75$\begin{array}{cc}\{\begin{array}{c}{V}_a\approx V_{\mathrm{AN}}-\frac{1}{3}·\left(V_{\mathrm{AN}}+V_{\mathrm{BN}}+V_{\mathrm{CN}}\right)\\ V_b\approx V_{\mathrm{BN}}-\frac{1}{3}·\left(V_{\mathrm{AN}}+V_{\mathrm{BN}}+V_{\mathrm{CN}}\right)\\ V_c\approx V_{\mathrm{CN}}+V_{\mathrm{NO}}=V_{\mathrm{CN}}-\frac{1}{3}·\left(V_{\mathrm{AN}}+V_{\mathrm{BN}}+V_{\mathrm{CN}}\right)\end{array}& \left(44\right)\end{array}$

[0277] For three-phase system, we have Va+Vb+Vc=0; therefore, the above equation can be simplified as 76$\begin{array}{cc}\left[\begin{array}{c}{V}_a\\ V_b\end{array}\right]=\left[\begin{array}{ccc}\frac{2}{3}& -\frac{1}{3}& -\frac{1}{3}\\ -\frac{1}{3}& \frac{2}{3}& -\frac{1}{3}\end{array}\right]·\left[\begin{array}{c}{V}_{\mathrm{AN}}\\ V_{\mathrm{BN}}\\ V_{\mathrm{CN}}\end{array}\right]& \left(45\right)\end{array}$

[0278] For the rectifier in FIG. the average voltage at node A, B, C referring node N are given by 77$\begin{array}{cc}\{\begin{array}{c}{V}_{\mathrm{AN}}=\left(1-D_{\mathrm{an}}\right)·E\\ V_{\mathrm{BN}}=\left(1-D_{\mathrm{bn}}\right)·E\\ V_{\mathrm{CN}}=\frac{E}{2}\end{array}& \left(46\right)\end{array}$

[0279] Where Dan,Dbn are duty ratios for switches San,Sbn respectively; the duty ratios of switches Sap,Sbp are the complementary of duty ratio Dan,Dbn, i.e. Dap=1−Dan;Dbp=1−Dbn.

[0280] Substitution of the equation (46) into equation (45) yields 78$\begin{array}{cc}\left[\begin{array}{c}1-2·D_{\mathrm{an}}\\ 1-2·D_{\mathrm{bn}}\end{array}\right]=\frac{2}{E}·\left[\begin{array}{c}2·V_a+V_b\\ V_a+2·V_b\end{array}\right]& \left(47\right)\end{array}$

[0281] For 3-phase PFC with unity power factor, we have 79$\begin{array}{cc}\{\begin{array}{c}{V}_a=R_e·i_a\\ V_b=R_e·i_b\end{array}& \left(48\right)\end{array}$

[0282] where Re is the emulated resistance.

[0283] The equation (47) can be simplified as: 80$\begin{array}{cc}{V}_m·\left[\begin{array}{c}1-2·D_{\mathrm{an}}\\ 1-2·D_{\mathrm{bn}}\end{array}\right]=R_s·\left[\begin{array}{cc}2& 1\\ 1& 2\end{array}\right]·\left[\begin{array}{c}{i}_a\\ i_b\end{array}\right]& \left(49\right)\end{array}$

[0284] where 81$\begin{array}{cc}{V}_m=\frac{E·R_s}{2·R_e}& \left(50\right)\end{array}$

[0285] The parameter Vm is the output of the voltage error compensator.

[0286] Replace the ia,ib with peak or average inductor current results in the control key equation 82$\begin{array}{cc}{V}_m·\left[\begin{array}{c}1-2·D_{\mathrm{an}}\\ 1-2·D_{\mathrm{bn}}\end{array}\right]=R_s·\left[\begin{array}{cc}2& 1\\ 1& 2\end{array}\right]·\left[\begin{array}{c}⟨i_{\mathrm{La}}⟩\\ ⟨i_{\mathrm{Lb}}⟩\end{array}\right]\mathrm{or}{V}_m·\left[\begin{array}{c}1-2·D_{\mathrm{an}}\\ 1-2·D_{\mathrm{bn}}\end{array}\right]=R_s·\left[\begin{array}{cc}2& 1\\ 1& 2\end{array}\right]·\left[\begin{array}{c}{i}_{\mathrm{Lapk}}\\ i_{\mathrm{Lbpk}}\end{array}\right]& \left(51\right)\end{array}$

[0287] The duty ratio of above equation can be solved with integrator with resets. The schematic is shown in FIG. 49 and operation waveforms are shown in FIG. 50.

[0288] Simulated inductor current waveforms are shown in FIG. 51. The simulation conditions are as follows: Input phase voltage 120 Vrms, Output voltage E=600 v; L=3 mH, f=10 KHz, P=6 KW. The measured total harmonic distortion (THD) is 3.2%.

[0289] The topology shown in FIG. 48 can be seen as a combination of two single-phase rectifiers with half bridge as shown in FIGS. 52a and 52b. The input voltage for single-phase PFC is line-line voltage such as Vab, Vbc. The input inductor currents follow the phase voltage Va or Vb. By applying inductor voltage-second balance method, we can get the same control key equation as shown in (51). The advantage of this rectifier is less switches and inductor counts. The disadvantage is that the high voltage stress of the switch. The output voltage is more than twice of the line-line voltage, i.e 83$\frac{E}{2}\ge V_{\mathrm{ab}}=\sqrt{3}·\sqrt{2}·V_{\mathrm{grms}}·\sin \left(\mathrm{wt}\right).$

[0290] The voltage stress of the switch that equals E is higher comparing with the 6-switch bridge rectifier. Furthermore, the current flowing into the output capacitor has twice line frequency ripple; which results in larger capacitance. Nevertheless, it is a low cost option for 3-phase PFC.

[0291] VIENNA Rectifier with Bipolar Operated UCI Control.

[0292] One of the promising 3-phase rectifiers is VIENNA rectifier. The schematic and its average model are shown in FIG. 53b. The average vector voltage at nodes A, B, C refer to the neutral point “O” equal the phase vector voltages minus the voltage across the inductors La,Lb,Lc which is given by 84$\&AutoLeftMatch;\{\begin{array}{c}{\stackrel{.}{V}}_{\mathrm{AO}}={\stackrel{.}{V}}_a-\mathrm{jwL}·i_{\mathrm{La}}\\ {\stackrel{.}{V}}_{\mathrm{BO}}={\stackrel{.}{V}}_b-\mathrm{jwL}·i_{\mathrm{Lb}}\\ {\stackrel{.}{V}}_{\mathrm{CO}}={\stackrel{.}{V}}_c-\mathrm{jwL}·i_{\mathrm{Lc}}\end{array}$

[0293] Following the similar procedure above, the following approximation still exists: 85$\begin{array}{cc}\{\begin{array}{c}{V}_a\approx V_{\mathrm{AN}}-\frac{1}{3}·\left(V_{\mathrm{AN}}+V_{\mathrm{BN}}+V_{\mathrm{CN}}\right)\\ V_b\approx V_{\mathrm{BN}}-\frac{1}{3}·\left(V_{\mathrm{AN}}+V_{\mathrm{BN}}+V_{\mathrm{CN}}\right)\\ V_c\approx V_{\mathrm{CN}}+V_{\mathrm{NO}}=V_{\mathrm{CN}}-\frac{1}{3}·\left(V_{\mathrm{AN}}+V_{\mathrm{BN}}+V_{\mathrm{CN}}\right)\end{array}i.e\left[\begin{array}{ccc}\frac{2}{3}& -\frac{1}{3}& -\frac{1}{3}\\ -\frac{1}{3}& \frac{2}{3}& -\frac{1}{3}\\ -\frac{1}{3}& -\frac{1}{3}& \frac{2}{3}\end{array}\right]·\left[\begin{array}{c}{V}_{\mathrm{AN}}\\ V_{\mathrm{BN}}\\ V_{\mathrm{CN}}\end{array}\right]=\left[\begin{array}{c}{V}_a\\ V_b\\ V_c\end{array}\right]& \left(52\right)\end{array}$

[0294] For the VIENNA rectifier, if the converter operates in CCM, the average node voltages VAN,VBN,VCN are given by 86$\{\begin{array}{c}{V}_{\mathrm{AN}}=\left(1-D_a\right)·\frac{E}{2}\\ V_{\mathrm{BN}}=\left(1-D_b\right)·\frac{E}{2}\mathrm{when}{i}_a\ge 0\\ V_{\mathrm{CN}}=\left(1-D_c\right)·\frac{E}{2}\end{array}\{\begin{array}{c}{V}_{\mathrm{AN}}=\left(1-D_a\right)·\left(-\frac{E}{2}\right)\\ V_{\mathrm{BN}}=\left(1-D_b\right)·\left(-\frac{E}{2}\right)\mathrm{when}{i}_a<0\\ V_{\mathrm{CN}}=\left(1-D_c\right)·\left(-\frac{E}{2}\right)\end{array}$

[0295] Simplification yields 87$\begin{array}{cc}\{\begin{array}{c}{V}_{\mathrm{AN}}=\left(1-D_a\right)·\frac{E}{2}·\mathrm{sign}\left(i_a\right)\\ V_{\mathrm{BN}}=\left(1-D_b\right)·\frac{E}{2}·\mathrm{sign}\left(i_b\right)\\ V_{\mathrm{CN}}=\left(1-D_c\right)·\frac{E}{2}·\mathrm{sign}\left(i_c\right)\end{array}& \left(53\right)\end{array}$

[0296] where sign(ia),sign(ib)., etc depends on the polarity of inductor currents. For example, 88$\begin{array}{cc}\mathrm{sign}\left(i_a\right)=\{\begin{array}{cc}1& i_a\ge 0\\ -1& i_a<0\end{array}& \left(54\right)\end{array}$

[0297] Substitution equation (53) into equation (52) yields 89$\begin{array}{cc}\left[\begin{array}{ccc}\frac{2}{3}& -\frac{1}{3}& -\frac{1}{3}\\ -\frac{1}{3}& \frac{2}{3}& -\frac{1}{3}\\ -\frac{1}{3}& -\frac{1}{3}& \frac{2}{3}\end{array}\right]·\left[\begin{array}{c}\left(1-D_a\right)·\mathrm{sign}\left(i_a\right)\\ \left(1-D_b\right)·\mathrm{sign}\left(i_b\right)\\ \left(1-D_c\right)·\mathrm{sign}\left(i_c\right)\end{array}\right]=\frac{2}{E}·\left[\begin{array}{c}{V}_a\\ V_b\\ V_c\end{array}\right]& \left(55\right)\end{array}$

[0298] Equation (55) shows the inherent relationship between duty ratios and input phase voltage in CCM condition. Because the matrix is singular, there is no unique solution for equation (55).

[0299] For three-phase rectifier with unity-power-factor, we have 90$\begin{array}{cc}\{\begin{array}{c}{V}_a=R_e·i_a\\ V_b=R_e·i_b\\ V_c=R_e·i_c\end{array}& \left(56\right)\end{array}$

[0300] where Re is the emulated resistance.

[0301] Substitution of the above equation into (55) and simplification yield 91$\begin{array}{cc}\left[\begin{array}{ccc}\frac{2}{3}& -\frac{1}{3}& -\frac{1}{3}\\ -\frac{1}{3}& \frac{2}{3}& -\frac{1}{3}\\ -\frac{1}{3}& -\frac{1}{3}& \frac{2}{3}\end{array}\right]·\left[\begin{array}{c}\left(1-D_a\right)·\mathrm{sign}\left(i_a\right)\\ \left(1-D_b\right)·\mathrm{sign}\left(i_b\right)\\ \left(1-D_c\right)·\mathrm{sign}\left(i_c\right)\end{array}\right]=\frac{R_s}{V_m}·\left[\begin{array}{c}{i}_a\\ i_b\\ i_c\end{array}\right]& \left(57\right)\end{array}$

[0302] where Rs is the equivalent current sensing resistor and Vm is the output of the voltage error compensator. 92$\begin{array}{cc}{V}_m=\frac{E·R_s}{2·R_e}& \left(58\right)\end{array}$

[0303] There are infinite solutions for equation (57). One simple solution is 93$\begin{array}{cc}\{\begin{array}{c}{V}_m·\left(1-D_a\right)·\mathrm{sign}\left(i_a\right)=K_1+K_2·i_a\\ V_m·\left(1-D_b\right)·\mathrm{sign}\left(i_b\right)=K_1+K_2·i_b\\ V_m·\left(1-D_c\right)·\mathrm{sign}\left(i_c\right)=K_1+K_2·i_c\end{array}& \left(59\right)\end{array}$

[0304] where K1,K2 are constant.

[0305] The K1,K2 can be solved by substituting the above equation in equation (57) which results in

[0306] K1 can be any real number. The parameter K2satisfies the following 94$\begin{array}{cc}\left[\begin{array}{ccc}\frac{2}{3}& -\frac{1}{3}& -\frac{1}{3}\\ -\frac{1}{3}& \frac{2}{3}& -\frac{1}{3}\\ -\frac{1}{3}& -\frac{1}{3}& \frac{2}{3}\end{array}\right]·K_2·\left[\begin{array}{c}{i}_a\\ i_b\\ i_c\end{array}\right]=R_s·\left[\begin{array}{c}{i}_a\\ i_b\\ i_c\end{array}\right]& \left(60\right)\end{array}$

[0307] For 3-phase system, we have ia+ib+ic=0.

[0308] Combination of the above two equations yields

[0309] K2=Rs

[0310] Select K1=0;K2=Rs. The equation (59) can be rewritten by 95$\begin{array}{cc}\{\begin{array}{c}{V}_m·\left(1-D_a\right)·\mathrm{sign}\left(i_a\right)=R_s·i_a\\ V_m·\left(1-D_b\right)·\mathrm{sign}\left(i_b\right)=R_s·i_b\\ V_m·\left(1-D_c\right)·\mathrm{sign}\left(i_c\right)=R_s·i_c\end{array}\Rightarrow \{\begin{array}{c}{V}_m·\left(1-D_a\right)=R_s·\&LeftBracketingBar;i_a\&RightBracketingBar;\\ V_m·\left(1-D_b\right)=R_s·\&LeftBracketingBar;i_b\&RightBracketingBar;\\ V_m·\left(1-D_c\right)=R_s·\&LeftBracketingBar;i_c\&RightBracketingBar;\end{array}& \left(61\right)\end{array}$

[0311] This is control key equation for VIENNA rectifier. The 3-phase rectifier with unity-power-factor can be achieved by realizing the equation (61). The implementation can be achieved by sensing inductor current and switching current.

[0312] Proposed UCI Controller for VIENNA Rectifier by Sensing Inductor Current

[0313] Replacement of the ia,ib,ic with peak or average inductor current results in the control key equation: 96$\begin{array}{cc}\{\begin{array}{c}{V}_m·\left(1-D_a\right)=R_s·\&LeftBracketingBar;i_{\mathrm{Lapk}}\&RightBracketingBar;\\ V_m·\left(1-D_b\right)=R_s·\&LeftBracketingBar;i_{\mathrm{Lbpk}}\&RightBracketingBar;\\ V_m·\left(1-D_c\right)=R_s·\&LeftBracketingBar;i_{\mathrm{Lcpk}}\&RightBracketingBar;\end{array}\mathrm{or}\{\begin{array}{c}{V}_m·\left(1-D_a\right)=R_s·\&LeftBracketingBar;⟨i_{\mathrm{La}}⟩\&RightBracketingBar;\\ V_m·\left(1-D_b\right)=R_s·\&LeftBracketingBar;⟨i_{\mathrm{La}}⟩\&RightBracketingBar;\\ V_m·\left(1-D_c\right)=R_s·\&LeftBracketingBar;⟨i_{\mathrm{La}}⟩\&RightBracketingBar;\end{array}& \left(62\right)\end{array}$

[0314] The above equation can be realized with integrator with reset. The proposed controller as well as its operation waveforms are shown in FIGS. ; where the integration time constant equals the switching period, i.e. τ=Ts.

[0315] PSPICE simulation results for the VIENNA rectifier with proposed controller in Figs. (a) are shown in FIG. Simulation conditions are as follows: Input phase voltage 120 Vrms, Output voltage E=600 v; L=3 mH, f=10 KHz, P=4.2 KW. The measured THD is 1.2%.

[0316] Proposed UCI Controller for VIENNA Rectifier by Sensing Switching Currents.

[0317] The VIENNA rectifier with unity-power-factor can also be implemented by sensing switching current which is easier and more cost effective comparing with the one that sensing the inductor currents. The relationship between switching current and inductor current is illustrated in FIG. 56.

[0318] When the inductor La operates in CCM, the relationship between the inductor current and switching current is given by

i Sapk =i Lapk   (63)

<iSa=Da·<iLa>  (64)

[0319] Replace the inductor peak current with switching current in equation (62) yields 97$\begin{array}{cc}\{\begin{array}{c}{V}_m·\left(1-D_a\right)=R_s·\&LeftBracketingBar;i_{\mathrm{Sapk}}\&RightBracketingBar;\\ V_m·\left(1-D_b\right)=R_s·\&LeftBracketingBar;i_{\mathrm{Sbpk}}\&RightBracketingBar;\\ V_m·\left(1-D_c\right)=R_s·\&LeftBracketingBar;i_{\mathrm{Scpk}}\&RightBracketingBar;\end{array}& \left(65\right)\end{array}$

[0320] Equation (65) shows that 3-PFC for VIENNA rectifier can be realized by sensing switching current. The schematic is shown in FIG. 57. Simulation results are shown in FIGS. 58a and 58b. The simulation condition is the same as that discussed above. The measured THD is 2%.

[0321] The control based on switching peak current is sensitive to noise. Therefore, sensing average switching current is more desirable. Replace the average inductor current in equation (62) with average switching current in equation (64) yields 98$\begin{array}{cc}\{\begin{array}{c}{V}_m·\left(1-D_a\right)·D_a=R_s·\&LeftBracketingBar;⟨i_{\mathrm{Sa}}⟩\&RightBracketingBar;\\ V_m·\left(1-D_b\right)·D_b=R_s·\&LeftBracketingBar;⟨i_{\mathrm{Sb}}⟩\&RightBracketingBar;\\ V_m·\left(1-D_c\right)·D_c=R_s·\&LeftBracketingBar;⟨i_{\mathrm{Sc}}⟩\&RightBracketingBar;\end{array}& \left(66\right)\end{array}$

[0322] The item Vm1·(1-Da)·Da can be realized with two integrators with reset. The schematic of control block for VIENNA rectifier based on average switching current mode control is shown in FIG. 59 and simulation results are shown in FIG. 60.

[0323] The simulation conditions are: the input voltage is 120 Vrms, the output voltage is 600V; the switching frequency is 10 KHz, the power is 6 KW; and the measured THD is 0.3%.

[0324] Observation

[0325] A three-phase UCI PFC controller is developed based on one-cycle control in this document. It can be implemented with vector or bipolar operation. Vector operated UCI controller is suitable for rectifiers with parallel-connected dual-boost topologies and with series-connected dual-boost topologies. The proposed UCI controller contains an integrator with reset, a linear combinator, a clock, two comparators, two flip/flops, along with a few logic circuit to realize constant-frequency PFC control in all three phases. The control cores for parallel connected dual boost and series connected dual boost are identical except for a sign in the linear combinator. No multipliers are necessary. The circuit is simple and general that is applicable for most boost-derived rectifiers. With this control strategy, only two switches in a three-phase rectifier are operating at high switching frequency during each 60° of line cycle, thus low switching losses are resulted. For three-phase rectifiers based on parallel-connected dual boost topologies, the conduction losses are minimized and the switch current rating is reduced since only a small portion of input current flows into the switches Tp and Tn. All findings are supported by simulation and/or experiments.

[0326] For the bipolar operated UCI controller, three topologies of rectifiers are investigated. For all the three topologies, the general equations to describe the inherent relationship between input phase voltage and switch duty ratios are derived. Based on one of the solutions for this equation, the Bipolar operated 3-phase UCI PFC controller is proposed. The proposed controller employs constant frequency modulation that is very desirable for industrial applications. It is composed of one or two integrators with reset along with several comparators and flip/flops. No multipliers are required. In most case, the bipolar operated UCI controller can be implemented by sensing inductor currents or switching currents. The theoretical analysis is verified by simulation.

[0327] The proposed UCI controller provides a high performance and low cost solution for realizing three-phase power factor correction. The logic circuit may be implemented by a programmable logic circuit. This controller provides a cost-effective integrated circuit solution to realize PFC for most boost-derived rectifiers.

[0328] Active Power Filters:

[0329] In its simplest terms the control method of the invention is based on one cycle control to realize an APF function given by: 99$I_s=\frac{1}{R_e}·V_s$

[0330] where Is is the source current matrix, Vs is the source voltage matrix and Re the equivalent resistance by which the source is loaded. Since

Is=IL+IP

[0331] where the current IP is current matrix generated by the APF will automatically cancel the reactive component of the nonlinear load current IL.

[0332] Every converter can be described by:

V s =V 0 ·M (D)

[0333] where M(D) is a function of the duty cycle D, and is called the conversion matrix. V0 is the dc rail voltage. Again according to the invention the two equations above are combined so that the circuit realizes the performance described by: 100$I_s=\frac{V_o}{R_e}·M\left(D\right)$

[0334] If an equivalent current sensing resistor, Rs, is used to measure the source current, Is, then the circuit performance can also be described by a control key equation: 101$R_s·I_s=R_s·\left(I_L+I_P\right)=\frac{R_s·V_o}{R_e}·M\left(D\right)$

[0335] Where 102$\frac{R_s·V_o}{R_e}$

[0336] can be expressed as Vm. Compared to the switching frequency, Vm varies at much lower frequency, therefore it may be approximated by the output of the feedback compensator which is automatically adjusted whenever 103$\frac{R_s·V_o}{R_e}$

[0337] has a discrepancy comparing to a reference value. The key control equation can be used with any boost-derived converter. For each solution, a control implementation is available based on one-cycle control. Those implementations can be roughly classified into two categories: (1) vector control as shown in FIG. 7 and (2) bipolar control as shown in FIG. 8.

[0338] The control circuit 10 for vector control in FIG. 7 is comprised of an integrator 12 having an input with a reset circuit having its output 14 coupled to the input of an adder 16. The adder 16 has another input that is coupled to the input 18 of the integrator 12. The output 22 of the adder 16 is coupled to two comparators 20.

[0339] The control circuit 10 for bipolar control in FIG. 8 is comprised of an integrator 12 having an input with a reset circuit having its output 14 coupled to the input of an adder 16. The adder 16 has another input that is coupled to the input 18 of the integrator 12. The output 22 of the adder 16 is coupled to three comparators 20.

[0340] For vector control in FIG. 7, the control variable rotates in each 60° of line cycle, therefore, the input voltages are sensed that is used to decouple the sensed current signals and direct the trigger signals to the correct switches. For bipolar control in FIG. 8, the control variables do not rotates, therefore no decoupling circuitry is required. In this case, voltage sensing may or may not be necessary.

[0341] An unified constant-frequency integration (UCI) control of the active power filter is thus described above based on one-cycle control. This control method employs an integrator 12 with reset as the core component to control the duty ratio of an active power filter to realize net sinusoidal current draw from the ac source 26. Compared to previously proposed control methods, the UCI controller 10 features simpler circuitry, no need for multipliers, no need for generating current references that reflect the reactive and harmonic portion of the load current, and no need to sense the load current. Since the input current compensation is performed cycle by cycle, the compensated net current matches the input voltage closely, thus a unity power factor and low total harmonic distortion are achieved. Furthermore, since voltage across the energy storage capacitor 28 is kept constant in the steady state, minimum current is generated by the APF to realize harmonic current cancellation.

[0342] Active power filters with UCI control can also damp the transient due to sudden changes in the load current. Experimental and simulation result shows that the APF has excellent harmonic filtering capability demonstrated using many different nonlinear loads 110. This control method is applicable to most other APF topologies which are parallel connected in the AC side. Active power filters with UCI controller provide a cost-effective, highly reliable, and flexible solution for power quality control. Since the active power filter only processes the reactive and harmonic current, power losses and component rating should be lower compared to active power factor correcting methods. Due to the simplicity of the circuitry, it is very suitable for industrial production. For many existing nonlinear loads 110, unity power factor can be achieved by plugging an active filter to the AC inlet.

[0343] Digital implementation of UCI control method can be realized by programming the control key equation and the supporting logic and linear functions into a DSP chip. Since control key equation and the supporting logic and linear functions are very simple, a low cost DSP can be employed.

[0344] Besides Power Factor Correction (PFC), another solution to reduce the current harmonics in a traditional rectifier is to using Active Power Filters (APF). Shunt APF is a frequently used topology, which connects a three-phase converter in parallel to nonlinear load and cancels the reactive and harmonic currents from a group of nonlinear loads so that the resulting total current drawn from the ac main is sinusoidal. Because APF needs to generate just enough reactive and harmonic current to compensate the nonlinear loads in the line, only a fraction of the total power is processed by APF, which results in overall higher efficiency and power process capability. For high power applications, three-phase active power filter is preferred because nonlinear load draws large current from three-phase ac mains. In this part, the application of UCI controller for three-phase APF is discussed. It is found that the UCI controller for three-phase APF is similar to that in three-phase PFC applications. One of major differences is that in APF, the three-phase power stage need to be four-quadrant operated for proper operation. The other difference between PFC and APF applications is that the UCI controller for APF senses the ac main currents that are the sum of nonlinear load current and APF current. With the proposed UCI controller, the load current does not needed to be sensed or evaluated. No special and complicated computations are required for generating harmonic current reference. Furthermore, no multiplier and input voltage sensors are required. The controller is comprised of one integrator with reset, some comparators and flip-flops. Therefore, a simple analog solution is provided. The proposed controller for APF can be realized with vector or bipolar operation.

[0345] General Diagram for UCI Controlled Three-Phase APF

[0346] FIGS. 61 a and 61b show the general diagram for 3-phase PFC and APF with UCI control. For 3-phase PFC, the controller senses the input phase current or input inductor current and force the input current follow input phase voltage. The topology in power stage transfers the input power to load and this topology doesn't need to process bi-direction power flow. Therefore, the input current may go to Discontinuous Conduction Mode (DCM). In contrast, in three-phase APF circuits, the controller senses the input phase currents that are the sum of load current and APF input current. The APF power stage only deals with the reactive power, so there is no load at the output of APF. At the unity-power-factor condition, the output voltage of APF v, is constant. Because the converters in power stage of APF have to process reactive power, four-quadrant operated converter is required. In other words, the three-phase converter should handle bi-direction energy flow and it is operated in Continuous Conduction Mode (CCM) in any load condition. Except that, the APF controller will be similar to that of three-phase PFC.

[0347] Three-Phase APF with Bipolar Operated UCI Controller

[0348] Three-Phase APF with Standard Bridge Converter

[0349] FIG. 62 shows a schematic of typical three-phase APF employing a three-phase standard 6-switch bridge converter, where ic is phase C input current; iLc is APF inductor current and ioc is nonlinear load current.

[0350] The analysis in this section is based on following assumption:

[0351] Constant frequency modulation is performed.

[0352] Because the APF requires energy can flow bi-direction between input and output DC capacitor, the driver signals to switches in each arm are set to be complementary. For example, the duty ratios for switches San,Sap are Dan and 1−Dan respectively. In this case, the converter always operates in Continuous

[0353] Conduction Mode (CCM).

[0354] Three-phase system is symmetrical.

[0355] Switching frequency is much higher than line frequency.

[0356] The converter is operated in Continuous Conduction Mode (CCM).

[0357] Since switching frequency is much higher than line frequency (50 or 60Hz), the average node voltage for node A, B, C in FIG. 62 refer to the most negative rail of bridge “N” can be written as 104$\begin{array}{cc}\{\begin{array}{c}{V}_{\mathrm{AN}}=\left(1-D_{\mathrm{an}}\right)·E\\ V_{\mathrm{BN}}=\left(1-D_{\mathrm{bn}}\right)·E\\ V_{\mathrm{CN}}=\left(1-D_{\mathrm{cn}}\right)·E\end{array}& \left(67\right)\end{array}$

[0358] where Dan,Dbn,Dcn are the duty ratios for switches San,Sbn,Scn and the duty ratios of Sap,Sbp,Sbp are 1−Dan,1−Dbn,1−Dcn respectively.

[0359] The average vector voltage at nodes A, B, C refer to the neutral point “O” equal the phase vector voltages minus the voltage across the inductors La,Lb,Lc which is given by 105$\begin{array}{cc}\{\begin{array}{c}{\stackrel{.}{V}}_{\mathrm{AO}}={\stackrel{.}{V}}_a-jwL·{\stackrel{.}{i}}_{\mathrm{La}}\\ {\stackrel{.}{V}}_{\mathrm{BO}}={\stackrel{.}{V}}_b-jwL·{\stackrel{.}{i}}_{\mathrm{Lb}}\\ {\stackrel{.}{V}}_{\mathrm{CO}}={\stackrel{.}{V}}_c-jwL·{\stackrel{.}{i}}_{\mathrm{Lc}}\end{array}& \left(68\right)\end{array}$

[0360] where L is inductance of APF and w is line angular frequency. {right arrow over (i)}La,{right arrow over (i)}Lb,{right arrow over (i)}Lc are vector inductor currents flowing through the inductor La,Lb,Lc. Because these inductors are operating in high frequency and the inductance La,Lb,Lc are very small. For 60 Hz utility system, the voltages across the inductors La,Lb,Lc such as jwL·{right arrow over (i)}La can be neglected comparing with line phase voltage. Therefore, the equation (68) can be approximately equal to 106$\begin{array}{cc}\{\begin{array}{c}{\stackrel{.}{V}}_{\mathrm{AO}}\approx {\stackrel{.}{V}}_a\\ {\stackrel{.}{V}}_{\mathrm{BO}}\approx {\stackrel{.}{V}}_b\\ {\stackrel{.}{V}}_{\mathrm{CO}}\approx {\stackrel{.}{V}}_c\end{array}& \left(69\right)\end{array}$

[0361] Follow the similar derivation shown in above, the inherent relationship between duty ratios and three-phase voltages is given by 107$\begin{array}{cc}\left[\begin{array}{ccc}-\frac{2}{3}& \frac{1}{3}& \frac{1}{3}\\ \frac{1}{3}& -\frac{2}{3}& \frac{1}{3}\\ \frac{1}{3}& \frac{1}{3}& -\frac{2}{3}\end{array}\right]·\left[\begin{array}{c}{d}_{\mathrm{an}}\\ d_{\mathrm{bn}}\\ d_{\mathrm{cn}}\end{array}\right]=\frac{1}{E}·\left[\begin{array}{c}{V}_a\\ V_b\\ V_c\end{array}\right]& \left(70\right)\end{array}$

[0362] Comparing with 3-phase PFC with standard six-switch bridge rectifier, the relationships between duty ratios and phase voltage are identical. Therefore, by following the similar derivation shown above, the control key equation of APF can be derived as 108$\begin{array}{cc}\{\begin{array}{c}{R}_s·i_a=V_m-V_m·\frac{D_{\mathrm{an}}}{K_1}\\ R_s·i_b=V_m-V_m·\frac{D_{\mathrm{bn}}}{K_1}\\ R_s·i_c=V_m-V_m·\frac{D_{\mathrm{cn}}}{K_1}\end{array}& \left(71\right)\end{array}$

[0363] where Vm is the output of the APF voltage compensator, K1 is a selected constant. 109$\begin{array}{cc}\frac{1}{M}\le K_1\le 1-\frac{1}{M}& \left(72\right)\end{array}$

[0364] where M is conversion ratio 110$\begin{array}{cc}M=\frac{E}{\sqrt{2}·V_i}.& \left(13\right)\end{array}$

[0365] Currents ia,ib,ic are input phase current. For three-phase nonlinear load 1 10 with 3 phase APF, the input phase currents are sum of input nonlinear load current and three-phase inductor current of APF as shown in FIG. 62. Therefore, the equation (71) can be rewritten as: 111$\begin{array}{cc}\{\begin{array}{c}{R}_S·i_a=R_S·\left(i_{\mathrm{La}}+i_{\mathrm{oa}}\right)=V_m-V_m\frac{D_{\mathrm{an}}}{K_1}\\ R_S·i_b=R_S·\left(i_{\mathrm{Lb}}+i_{\mathrm{ob}}\right)=V_m-V_m\frac{D_{\mathrm{bn}}}{K_1}\\ R_S·i_c=R_S·\left(i_{\mathrm{Lc}}+i_{\mathrm{oc}}\right)=V_m-V_m\frac{D_{\mathrm{cn}}}{K_1}\end{array}& \left(74\right)\end{array}$

[0366] The above equation indicates the inherent relationship between the input phase current, duty ratios of switches and voltage compensator output under unity-power-factor condition. This control key equation is similar to that of three-phase PFC with UCI controller. The only difference lies that the APF sense the sum of the load current and converter input current. The UCI controller for PFC senses the converter input current only. Similar to UCI controlled PFC with standard six-switch boost rectifier, the APF can also be be implemented with an integrator with reset as shown in the control box of FIG. 62. The overall schematic of three-phase APF with proposed control approach is shown in FIG. 62; where Qap,Qan . . . Qcn are controller signal for switches Sap,San . . . Scn respectively. In FIG. 62, the time constant of the integrator is set to be τ=K1·Ts; where Ts is switching period. The operation waveforms are illustrated in FIG. 63. By controlling the duty ratio to follow the relationship shown in equation 74, three-phase APF can be achieved.

[0367] FIG. 62 shows that three-phase APF can be achieved with three flip-flops and one integrator with reset as well as some linear components. No voltage sensors and multipliers are required. In order to prevent the short circuit, dead time for complementary switches such as San,Sap need to be considered.

[0368] In order to verify the idea, PSPICE simulation results are given in FIG. 64. The PSPICE simulation conditions are as follows: Input voltage 120 Vrms, Output voltage E=500 v; L=3 mH, f=10 KHz, P=1.5 KW. The conversion ration 112$M=\frac{V_o}{\sqrt{2}·V_{\mathrm{grms}}}=2946.$

[0369] The parameter K1 is limited in the range of (0.339,0.660) according to the equation (72). In this simulation, parameter K1=0.4.

[0370] Other Variation of Three-Phase APF with Bipolar Operated UCI Controller

[0371] The above discussion shows that the APF with unity-power-factor can be implemented with a standard bride. Several variations of three-phase APF are possible and are listed here. FIG. 65 shows a three-phase APF with reduced switch count and center tapped output capacitor.

[0372] The control key equation for APF in FIG. 65 is as follows: 113$\begin{array}{cc}{V}_m·\left[\begin{array}{c}1-2·D_{\mathrm{an}}\\ 1-2·D_{\mathrm{bn}}\end{array}\right]=R_s·\left[\begin{array}{cc}2& 1\\ 1& 2\end{array}\right]·\left[\begin{array}{c}{i}_a\\ i_b\end{array}\right]=R_s·\left[\begin{array}{cc}2& 1\\ 1& 2\end{array}\right]·\left[\begin{array}{c}{i}_{\mathrm{La}}+i_{\mathrm{oa}}\\ i_{\mathrm{Lb}}+i_{\mathrm{ob}}\end{array}\right]& \left(75\right)\end{array}$

[0373] where the control key equation and control block is similar to that of UCI controller for PFC applications except the sum of the load currents ioa,iob and inductor currents iLa,iLb are sensed.

[0374] The simulation results are shown in FIG. 65. Simulation condition is as follows: Input voltage 120 Vrms, Output voltage E=700 v; L=3 mH, f=10 KHz, P=5 KW. Although this topology saves two switches comparing with the APF in FIG. 62, the switching voltage stress is increased.

[0375] Another example is three-phase half bridge topology as shown in FIG. 67. Comparing with the schematic in FIG. 62, there are two differences.

[0376] A neutral line is required with three-phase half-bridge APF configuration.

[0377] The integrator time constant must be set to be half of switching period.

[0378] One advantage of this topology lies in that the switch voltage stress is one half of the total output voltage, which is lower than that of standard bridge rectifier configuration. Because three-phase is symmetric system, the average current flows into the center of output capacitor during each line cycle is zero. The neutral line can be eliminated. This will result in the same configuration as FIG. 62.

[0379] Three-Phase APF with Vector Operated UCI Controller

[0380] One of the advantages for bipolar operated UCI controller is that no voltage reference is sensed. The controller is simple and robust. However, during each switching cycle, all the six switches are controlled. In fact, three duty ratios are generated. Only three switches will suffer high switching losses. The complementary switches are usually turned on under zero-voltage condition. Therefore, three switches are hard-switch turned on and switching losses is expected to be higher. Employing vector operated UCI controller can reduce the switching losses.

[0381] As shown in last section, equation (75) displays the inherent relationship between duty ratio and voltage sources. There are infinite solutions for equation (29). Different solution will result in different control approach. If we set one duty ratio of switch to be zero or one, the other two duty ratios can be solved through equation (29). The resulted solution will generate one control approach with less switching losses because less high switching frequency switches will be controlled during each switching cycle. Therefore, switching losses can be reduced. This is the basic concept of the vector operated UCI controller for APF applications.

[0382] Three-phase voltage waveforms are shown in FIG. 68. Consider the 0˜60° of three-phase system shown in FIG. 68, by setting Dbn=1, i.e. switch Sbn are turned on during the whole 60° region. Substituting Dbn=1 into general equation (75), the following relationship is obtained. 114$\begin{array}{cc}\{\begin{array}{c}1-D_{\mathrm{an}}=\frac{V_c}{E}+\frac{2·V_a}{E}\\ D_{\mathrm{bn}}=1\\ 1-D_{\mathrm{cn}}=\frac{2·V_c}{E}+\frac{V_a}{E}\end{array}& \left(76\right)\end{array}$

[0383] We assume unity-power-factor can be achieved with active power filter, i.e. 115$\begin{array}{cc}\{\begin{array}{c}{V}_a=R_e·i_a\\ V_b=R_e·i_b\\ V_c=R_e·i_c\end{array}.& \left(77\right)\end{array}$

[0384] Substituting equation (77) into (76) yields: 116$\begin{array}{cc}\{\begin{array}{c}1-D_{\mathrm{an}}=\frac{R_e}{E·R_S}·\left(2·R_S·i_a+R_S·i_c\right)\\ 1-D_{\mathrm{cn}}=\frac{R_e}{E·R_S}·\left(2·R_S·i_c+R_S·i_a\right)\end{array}& \left(78\right)\end{array}$

[0385] Again, by setting 117$V_m=\frac{E·R_S}{R_e},$

[0386] the above equation can be simplified as 118$\begin{array}{cc}\left[\begin{array}{c}{V}_m-V_m·D_{\mathrm{an}}\\ V_m-V_m·D_{\mathrm{cn}}\end{array}\right]=R_S·\left[\begin{array}{cc}2& 1\\ 1& 2\end{array}\right]·\left[\begin{array}{c}{i}_a\\ i_c\end{array}\right]& \left(79\right)\end{array}$

[0387] By controlling the duty ratio Dan,Dcn to satisfy the above equation, we can control the current ia,ic to follow the phase voltage Va,Vc respectively. Unity-power-factor can be achieved.

[0388] With this approach, during each switching cycle, only four switches (two hard switches and two soft-switches) are controlled. Switching losses are expected to be one-third lower than the previous proposed 3-phase active power filter. During the next 60°, we set Dan=0 and switch Sap is ON instead. Input current ib,ic are needed to sense and controlled. Overall, the equation (79) can be rewritten as 119$\begin{array}{cc}{V}_m·\left[\begin{array}{c}1-d_p\\ 1-d_n\end{array}\right]=R_s·\left[\begin{array}{cc}2& 1\\ 1& 2\end{array}\right]·\left[\begin{array}{c}⟨i_{\mathrm{Lp}}⟩\\ ⟨i_{Ln}⟩\end{array}\right]& \left(80\right)\end{array}$

[0389] where dp,dn,<iLp>,<iLn> are varied from one 60° region to another. For example, during 0˜60°, dp=dan; dn=dcn, <iLp>=ia;<iLn>=ic.

[0390] Based on equation (80), a vector operated UCI controller for APF is resulted. The above equation can also be solved with an integrator with reset. The diagram is shown in the core section of FIG. 69. Overall, the control block for three-phase APF with this method is shown in FIG. 69.

[0391] This control block includes four sections:

[0392] The control block in FIG. 69 contains four sections:

[0393] (1) Region selection circuit that is same as that of 3-phase PFC with vector operated UCI control.

[0394] Input multiplex circuit which is used to select the input inductor current in order to configure the <iLp> and <iLn>. The input current is the sum of APF input inductor current and load current. In addition, the <iLp> and <iLn> are functions of input currents and selection function Δ(i,θ). The equivalent currents <iLp> and <iLn> during each 60° are listed in Table XII.

[0395] (2) Control core-duty cycle calculator: including an adder, two comparators and an integrator with reset as well as two flip-flops. It is used to realize the equation (80). The integration time constant of integrator is set to be exactly equal the switching period.

[0396] (3) Output logic circuit, which applies the equivalent switching control signal Qp and Qn to switches. The control signals are listed in Table XII. The circuit implementation for switching driving signal is shown in FIG. 70, where Qan and Qap are driving signal for switches San and Sap respectively. The switches in each bridge arm such as San,Sap are controlled complementarily. Therefore, there is always a path for inductor current to flow either into the output or input. Comparing with 3-phase PFC, the output logic circuit guarantee that the converter can handle bi-direction power flow.

TABLE XII
The algorithm for vector operated UCI controller for 3-phase APF.
Region
i = 1, 2, · 6	Degree	iLp	iLn	Qap	Qan	Qbp	Qbn	Qcp	Qcn
1	0˜60	ia	ic	{overscore (Q)}p	Qp	OFF	ON	{overscore (Q)}n	Qn
2	60˜120	−ib	−ic	ON	OFF	Qp	{overscore (Q)}p	Qn	{overscore (Q)}n
3	120˜180	ib	ia	{overscore (Q)}n	Qn	{overscore (Q)}p	Qp	OFF	ON
4	180˜240	−ic	−ia	Qn	{overscore (Q)}n	ON	OFF	Qp	{overscore (Q)}p
5	240˜300	ic	ib	OFF	ON	{overscore (Q)}n	Qn	{overscore (Q)}p	Qp
6	300˜360	−ia	−ib	Qp	{overscore (Q)}p	Qn	{overscore (Q)}n	ON	OFF

[0397] Table XII indicates that the proposed control approach rotates its parameters such as input current iLp at each 60° of line cycle, which is similar to vector control. Because only two duty ratios are required to generate, the APF with vector operated UCI control will have lower switching losses. However, it is gained by the increase of the complexity. For example, three-voltage are sensed to generate the region selection function.

[0398] The PSPICE simulation waveforms for the APF with this method are shown in FIG. 71. Simulation conditions are as follows: Input voltage 120 Vrms, Output voltage E=500 v; L=3 mH, f=10 KHz, P=1.5 KW. The conversion ration 120$M=\frac{V_o}{\sqrt{2}·V_{\mathrm{grms}}}=2.946.$

[0399] The nonlinear load 110 is three-phase current source load.

[0400] Observation

[0401] The APF converter connects with the nonlinear load in parallel and cancels the harmonics and reactive power so that the ac main currents are sinusoidal. In general, the APF converters are four-quadrant operated. In this part, several topologies are investigated. The UCI controller for three-phase APF applications is discussed in detail. The APF with UCI controller features the following.

[0402] No need to sense the load current waveforms.

[0403] No special and complicated computations are required for generating harmonic current reference.

[0404] Constant frequency modulation.

[0405] No multipliers are required. The controller is comprised of one integrator with reset, some comparators and flip-flops. Therefore, a complete analog solution is provided.

[0406] PSPICE simulation results verify the theoretical analysis.

[0407] Grid-Connected Inverters:

[0408] In its simplest terms the control method of the invention is based on one cycle control to realize an APF function given by: 121$I_s=\frac{1}{R_e}·V_s$

[0409] where Is is the three-phase ouput currents, Vs the three-phase voltages and Re the equivalent resistance by which the output is loaded.

[0410] Every buck-derived converter can be described by:

V s =V 0 ·M (D)

[0411] where M(D) is a function of the duty cycle D, and which is called the conversion matrix and V0 is the input dc voltage.

[0412] If an equivalent current sensing resistor, Rs, is used to measure the source current, Is, then the circuit performance can also be described by a key control equation:

R s ·I s =(K·Vs−Vm·M(D))

[0413] Combining the two equations above, we have 122$R_s·I_s=\left(K-\frac{V_m}{V_o}\right)·V_s$

[0414] So the emulated resistance Re is given by 123$R_e=\frac{1}{R_s}·\left(K-\frac{V_m}{V_0}\right)$

[0415] where K is a constant. Therefore, the current follows the input phase voltage.

[0416] Compared to the switching frequency, Vm varies at much lower frequency, therefore it may be approximated by the output of the feedback compensator which is automatically adjusted whenever it has a discrepancy comparing to a reference value. The key control equation can be used with buck-derived converters. For each solution, a control implementation is available based on one-cycle control. Those implementations can be roughly classified into two categories: (1) vector control as shown in FIG. 9 and (2) bipolar control as shown in FIG. 10.

[0417] The control circuit 10 in FIG. 9 for vector control is comprised of an integrator 12 having an input 18 with a reset circuit having its output 14 coupled to the input of two adders 16. The adders 16 have another input that is coupled to the output of constant K multipliers 39, which in turn are coupled to the region selection circuitry 30. The output 22 of the adders 16 are coupled to two comparators 20.

[0418] The control circuit 10 for bipolar control shown in FIG. 10 is comprised of an integrator 12 having an input with a reset circuit, which integrator 12 having its output 14 coupled to the input of three adders 16. The adders 16 have another input that is coupled to full wave rectifier 47, which in turn takes its input from K multipler 49. Both K multiplier 49 and zero-crossing network 35 have as their input the utility i5 AC voltage 51. The outputs 22 of adders 16 are coupled to three comparators 20.

[0419] An unified constant-frequency integration (UCI) control of the grid-connected inverters is thus described above based on one-cycle control. This control method employs an integrator 12 with reset as the core component to control the duty ratio of a grid-connected 24 inverter to realize net sinusoidal current output to the AC source 26. Compared to previously proposed control methods, the UCI controller features simpler circuitry, and no need for multipliers. Since the output current compensation is performed cycle by cycle, the compensated output currents match the three-phase AC voltages closely, thus a unity power factor and low total harmonic distortion are achieved.

[0420] Simulation result shows that the grid-connected inverter has excellent output using many different nonlinear loads. This control method is applicable to most other inverter. Grid-connected inverters with UCI controller provide a cost-effective, highly reliable, and flexible solution for alternative energy source power generation. Due to the simplicity and generality of the circuitry, it is very suitable for industrial production.

[0421] Digital implementation of the UCI control method can be realized by programming the control key equation and the supporting logic and linear functions into a DSP chip. Since control key equation and the supporting logic and linear functions are very simple, a low cost DSP can be employed.

[0422] Three-Phase Power Factor Corrected Grid-Connected Inverters for Alternative Energy Sources with UCI Control

[0423] In this part, Unified Constant-frequency Integration (UCI) control is extended to control grid-connected inverters. Distributed power generation is a trend for the future power system, because it delivers power with less loss and it facilitates the use of distributed alternative energy sources 100 such as fuel cells, winder power, solar energy, etc. In order to make use of the existing power distribution grid, many distributed power generators will be connected to the grid. Therefore, grid-connected inverters are the key elements of the power system that transfer the dc current from alternative energy sources to the grid with sinusoidal current injection. The grid-connected inverter should have the following desired features:

[0424] Low line current distortion. The inverter should inject as low harmonic as possible into utility.

[0425] High power factor. It reduces the component power rating and improves the power delivery capacity of the power generation systems.

[0426] High efficiency.

[0427] Switching frequency is desired to be higher than other kind of inverters such as inverters in motor driven system because the output filter inductors can be smaller.

[0428] A standard six-switch bridge inverter is often used as a grid-connected inverter as shown in FIG. 72. For this inverter, d-q transformation modulation based on digital implementation is often employed, which results in a complicated system. In addition, short-through hazard exists in most of the previously reported inverter systems. In this part, an investigation is conducted which shows that this inverter can be de-coupled into parallel-connected dual buck topology during each 60° of line cycle. Based on the parallel-connected dual buck topology, a UCI controller is proposed. This controller is comprised of a linear network, an integrator with reset and some logic circuit. The multiplier is eliminated in the control loop. With UCI control, the grid-connected inverter will feature unity-power-factor, low current distortion. Switching losses is also reduced because only two high frequency switches are controlled in each 60° of line cycle. Furthermore, short-through hazard is eliminated because only one of switches in each bridge arm is controlled during each 60° of line cycle.

[0429] Parallel-Connected Dual Buck Topology for Standard Six-Switch Bridge Inverter

[0430] Three-phase voltage waveforms are shown in FIG. 73. During (0˜60°) region, supposing the inductor current in FIG. 72 follows the utility phase voltage so unity-power-factor is achieved. The average current is satisfied <iLb><0 and <iLa>0;<iLc>0. The switches Sbn is turned on during this region and other two switches Sap and Scp are controlled so that the average currents <iLa> and <iLc> follows the output utility phase voltage Va and Vc respectively. Assuming the three-phase system is symmetric, the average current <iLb> automatically follows the phase voltage Vb. Therefore, unity-power-factor is achieved. The equivalent circuit and parallel-connected dual buck topology in this 60° is shown in FIG. 74. The cross-reference of the circuit parameters between the three-phase bridge inverter and parallel-connected dual buck topology are listed in Table XIII.

TABLE XIII
The cross-reference of the circuit parameters between the three-
phase bridge inverter and parallel-connected dual buck topology.*
Region	Vp	Vn	Lp	Ln	Lt	Tp	Tn	Tt	Dp	Dn
0˜60	Vab	Vcb	La	Lc	Lb	Sap	Scp	Sbn	Dan	Dcn
60˜120	Vab	Vac	Lb	Lc	La	Sbn	Scn	Sap	Dbp	Dcp
120˜180	Vbc	Vac	Lb	La	Lc	Sbp	Sap	Scn	Dbn	Dan
180˜240	Vbc	Vba	Lc	La	Lb	Scn	San	Sbp	Dcp	Dap
240˜300	Vca	Vba	Lc	Lb	La	Scp	Sbp	San	Dcn	Dbn
300˜360	Vca	Vcb	La	Lb	Lc	San	Sbn	Scp	Dap	Dbp

[0431] UCI Control of Inverters Based on Parallel-Connected Dual Buck Topology

[0432] Assuming the parallel-connected dual buck converter operates in constant switching frequency and Continuous Conduction Mode (CCM) is performed, there are only four possible states for switches Tp and Tn. The equivalent circuits for the four switching states are shown in FIGS. 75a-75d and the inductor voltage waveforms are listed in Table XIV.

TABLE XIV
Switching states and inductor voltages for
parallel-connected dual buck sub-topology.
State	Tp	Tn	VLp	VLn	VLt
I	ON	ON	124$\frac{1}{3}·E-V_p^{*}$	125$\frac{1}{3}·E-V_n^{*}$	126$\frac{2}{3}·E-V_t^{*}$
II	ON	OFF	127$\frac{2}{3}·E-V_p^{*}$	128$-V_n^{*}-\frac{1}{3}·E$	129$\frac{1}{3}·E-V_t^{*}$
III	OFF	ON	130$-\frac{1}{3}·E-V_p^{*}$	131$\frac{2}{3}·E-V_n^{*}$	132$\frac{1}{3}·E-V_t^{*}$
IV	OFF	OFF	133$-V_p^{*}$	134$-V_n^{*}$	135$-V_t^{*}$

[0433] Where 136$\begin{array}{cc}\left[\begin{array}{c}{V}_p^{*}\\ V_n^{*}\\ V_t^{*}\end{array}\right]=\left[\begin{array}{cc}\frac{2}{3}& -\frac{1}{3}\\ -\frac{1}{3}& \frac{2}{3}\\ \frac{1}{3}& \frac{1}{3}\end{array}\right]·\left[\begin{array}{c}{V}_p\\ V_n\end{array}\right]& \left(81\right)\end{array}$

[0434] During each switching cycle, only two switching sequences are possible-I, II, IV or I, III, IV. Assuming the switching sequence is I, II or IV. In otherwords, dp>dn, where dp and dn are duty cycles for switches Tp and Tn. The inductor current and voltage waveforms are shown in FIG. 76.

[0435] Supposing switching frequency is much higher than line frequency, inductor voltage-second balance method can be applied during each switching cycle, yields: 137$\&AutoLeftMatch;\begin{array}{cc}\{\begin{array}{c}\left(\frac{1}{3}·E-V_p^{*}\right)·d_n+\left(\frac{2}{3}·E-V_p^{*}\right)·\left(d_p-d_n\right)-V_p^{*}·\left(1-d_p\right)=0\\ \left(\frac{1}{3}·E-V_n^{*}\right)·d_n+\left(-\frac{1}{3}·E-V_n^{*}\right)·\left(d_p-d_n\right)-V_n^{*}·\left(1-d_p\right)=0\\ \left(\frac{2}{3}·E-V_t^{*}\right)·d_n+\left(\frac{1}{3}·E-V_t^{*}\right)·\left(d_p-d_n\right)-V_t^{*}·\left(1-d_p\right)=0\end{array}& \left(82\right)\end{array}$

[0436] For three-phase system, Vp*+Vn*−Vt*=0, therefore, (82) can be simplified as 138$\begin{array}{cc}\left[\begin{array}{c}{d}_p\\ d_n\end{array}\right]=\frac{1}{E}·\left[\begin{array}{cc}2& 1\\ 1& 2\end{array}\right]·\left[\begin{array}{c}{V}_p^{*}\\ V_n^{*}\end{array}\right]& \left(38\right)\end{array}$

[0437] The goal of three-phase inverter with unity-power-factor is to force the average inductor current in phase with the output utility line voltage, i. e. 139$\begin{array}{cc}\{\begin{array}{c}{V}_a=R_e·i_a=R_e·⟨i_{La}⟩\\ V_b=R_e·i_b=R_e·⟨i_{Lb}⟩\\ V_c=R_e·i_c=R_e·⟨i_{Lc}⟩\end{array}& \left(84\right)\end{array}$

[0438] where Re is emulated resistance

[0439] Comparing with UCI controlled rectifier, the direction of inductor in grid-connected inverter is in such a way that the inductor energy is transferred into the AC utility.

[0440] It can be demonstrated that the grid-connected inverter with unity-power-factor can be realized by controlling the inductor current iLp and iLn follows the input voltage Vp* and Vn* respectively, i.e 140$\begin{array}{cc}\{\begin{array}{c}⟨i_{\mathrm{Lp}}⟩=R_e·V_{p^{*}}\\ ⟨i_{Ln}⟩=R_e·V_{n^{*}}\end{array}& \left(85\right)\end{array}$

[0441] For example, during the region 0˜60°, we have 141$\begin{array}{cc}\{\begin{array}{c}{i}_{\mathrm{Lp}}=i_{\mathrm{La}}\\ V_p^{*}=\frac{2}{3}·V_p-\frac{1}{3}·V_n=\left(\frac{2}{3}·V_{\mathrm{ab}}\right)-\frac{1}{3}·V_{\mathrm{cb}}=V_a\\ i_{Ln}=i_{\mathrm{La}}\\ V_n^{*}=-\frac{1}{3}·V_p+\frac{2}{3}·V_n=-\frac{1}{3}·V_{ab}+\frac{2}{3}·V_{cb}=V_c\end{array}& \left(86\right)\end{array}$

[0442] The proposed control key equation for the inverter with UCI control is shown in equation 87 142$\begin{array}{cc}{R}_s·\left[\begin{array}{cc}2& 1\\ 1& 2\end{array}\right]·\left[\begin{array}{c}⟨i_{\mathrm{Lp}}⟩\\ ⟨i_{Ln}⟩\end{array}\right]=\left[\begin{array}{c}K·V_p-V_m·d_p\\ K·V_n-V_m·d_n\end{array}\right]& \left(87\right)\end{array}$

[0443] where Vm is related to the emulated resistance Re; Rs is equivalent current sensing resistance, and K is an introduced constant. The parameter Vm is almost constant during each line cycle and it is used to control the output power.

[0444] Substitution of equation (81) and (83) into equation (87), the inductor currents <iLp>,<iLn> are solved by: 143$\begin{array}{cc}\left[\begin{array}{c}⟨i_{\mathrm{Lp}}⟩\\ ⟨i_{Ln}⟩\end{array}\right]=\frac{K-\frac{V_m}{E}}{R_s}·\left[\begin{array}{c}{V}_p^{*}\\ V_n^{*}\end{array}\right]& \left(88\right)\end{array}$

[0445] Comparing equation ______ and ______ we have 144$\begin{array}{cc}{R}_e=\frac{1}{R_s}·\left(K-\frac{V_m}{E}\right)& \left(89\right)\end{array}$

[0446] The above two equations show that currents iLp and iLn are proportional to voltage Vp* and Vn* respectively. The maximum output current is limited by parameter K and the output power or current is adjusted by Vm.

[0447] The grid-connected inverter with unity-power-factor is achieved by realizing the equation ______ which can b easily implemented by one-cycle control with an integration with reset, two flip-flops and several logic circuit. The overall the control block is shown in FIG. 77, where the time constant of integrator equals switching period, i.e. τ=Ts.

[0448] This control block includes four sections:

[0449] 1) The region selection circuit. Because the parallel-connected dual buck topology rotates its parameters every 60° as shown in Table XIV, a region selection circuit is required to determine the operation region as well as the corresponding equivalent circuit. The region selection function Δ(θ,i)is defined as Δ(θ,i)=u(θ−(i−1)·60)−u(θ-i·60). The selection function I can be realized by sensing input voltage. The schematic and operation waveforms are the same as that of the UCI controller three-phase rectifiers for parallel-connected dual boost topology.

[0450] 2) Input multiplex circuit which is used to select the input inductor current in order to configure the <iLp> and <iLn> as well as the reference voltage Vp and Vn. The calculated waveforms of <iLp>,<iLn>,Vp,Vn are shown in FIGS. 78a and 78b.

[0451] 3) Core section: including an adder, a comparator and an integrator with reset. It is used to realize the equation ______. The integration time constant of integrator is set to equal the switching period. The operation waveforms are shown in FIG. 79.

[0452] 4) Output logic circuit, which applies the equivalent switching control signal Qp and Qn to switches. The control algorithm is shown in Table XV.

TABLE XV
The control algorithm for standard six-switch bridge inverter with
unity-power-factor
Region	Degree	Vp	Vn	iLp	iLn	Qap	Qan	Qbp	Qbn	Qcp	Qcn
1	0˜60	Va-Vb	Vc-Vb	iLa	iLc	Qp			ON	Qn
2	60˜120	Va-Vb	Va-Vc	−iLb	−iLc	ON			Qp		Qn
3	120˜180	Vb-Vc	Va-Vc	iLb	iLa	Qn		Qp			ON
4	180˜240	Vb-Vc	Vb-Va	−iLc	−iLa		Qn	ON			Qp
5	240˜300	Vc-Va	Vb-Va	iLc	iLb		ON	Qn		Qp
6	300˜360	Vc-Va	Vc-Vb	−iLa	−iLb		Qp		Qn	ON

[0453] The simulated current waveforms for inverter in FIG. 72 with proposed UCI controller are shown in FIG. 80. Simulation conditions are: DC supply voltage E=500 v; utility voltage 120 Vrms; inductance La=Lb=Lc=2 mH, switching frequency 10 KHz; Output power 5 KW.

[0454] The proposed UCI controller is based on CCM operated inverter. If the inverter operates in Discontinuous Conduction Mode (DCM), the assumption is not satisfied and the current distortion will occur. This can be improved by setting the switches in each bridge arm to operate in complementary mode. For example, the driving signal for switches Sap,San during region 0˜60° is Qp,{overscore (Q)}p respectively.

[0455] Observation:

[0456] In this part, a three-phase grid-connected inverter with UCI control is presented. During each 60° of line cycle, a three-phase six-switch standard bridge inverter can be de-coupled into dual buck topology. Based on these topologies, a UCI controller is proposed. With UCI control, low current distortion and unity-power-factor are achieved without using multipliers in the control loop. In is addition, switching losses are reduced since only two high frequency switches are controlled during each 600. Its simplicity and performance make it a great candidate for grid-connection inverter for distributed power generation.

[0457] Many alterations and modifications may be made by those having ordinary skill in the art without departing from the spirit and scope of the invention. Therefore, it must be understood that the illustrated embodiment has been set forth only for the purposes of example and that it should not be taken as limiting the invention as defined by the following claims. For example, notwithstanding the fact that the elements of a claim are set forth below in a certain combination, it must be expressly understood that the invention includes other combinations of fewer, more or different elements, which are disclosed in above even when not initially claimed in such combinations.

[0458] The words used in this specification to describe the invention and its various embodiments are to be understood not only in the sense of their commonly defined meanings, but to include by special definition in this specification structure, material or acts beyond the scope of the commonly defined meanings. Thus if an element can be understood in the context of this specification as including more than one meaning, then its use in a claim must be understood as being generic to all possible meanings supported by the specification and by the word itself.

[0459] The definitions of the words or elements of the following claims are, therefore, defined in this specification to include not only the combination of elements which are literally set forth, but all equivalent structure, material or acts for performing substantially the same function in substantially the same way to obtain substantially the same result. In this sense it is therefore contemplated that an equivalent substitution of two or more elements may be made for any one of the elements in the claims below or that a single element may be substituted for two or more elements in a claim. Although elements may be described above as acting in certain combinations and even initially claimed as such, it is to be expressly understood that one or more elements from a claimed combination can in some cases be excised from the combination and that the claimed combination may be directed to a subcombination or variation of a subcombination.

[0460] Insubstantial changes from the claimed subject matter as viewed by a person with ordinary skill in the art, now known or later devised, are expressly contemplated as being equivalently within the scope of the claims. Therefore, obvious substitutions now or later known to one with ordinary skill in the art are defined to be within the scope of the defined elements.

[0461] The claims are thus to be understood to include what is specifically illustrated and described above, what is conceptionally equivalent, what can be obviously substituted and also what essentially incorporates the essential idea of the invention.

Claims

1. A three phase power rectifier circuit with power factor correction characterized by three equivalent circuit inductors comprising: a source of three phases of sinusoidal power having a corresponding phase voltages and source currents, one of said three equivalent circuit inductors corresponding to each one of said three phases of sinusoidal power and having a corresponding inductor current; a plurality of rectifiers coupled in a dual boost topology; a plurality of switches coupled to said plurality of rectifiers to provide selected current paths through said plurality of rectifiers; and a control circuit for controlling said plurality of switches to provide a switching-cycle average of said inductor currents in phase with said phase voltages.

2. The three phase power circuit of claim 1 where said control circuit comprises an analog control circuit.

3. The three phase power circuit of claim 1 where said control circuit comprises a digital signal processor.

4. The three phase power circuit of claim 1 where said control circuit is arranged and configured to switch said plurality of switches to operate said plurality of rectifiers in a vector mode.

5. The three phase power circuit of claim 1 where said control circuit is arranged and configured to switch said plurality of switches to operate said plurality of rectifiers in a bipolar mode.

6. The three phase power circuit of claim 2 where said control circuit is arranged and configured to switch said plurality of switches to operate said plurality of rectifiers in a vector mode.

7. The three phase power circuit of claim 2 where said control circuit is arranged and configured to switch said plurality of switches to operate said plurality of rectifiers in a bipolar mode.

8. The three phase power circuit of claim 3 where said control circuit is arranged and configured to switch said plurality of switches to operate said plurality of rectifiers in a vector mode.

9. The three phase power circuit of claim 3 where said control circuit is arranged and configured to switch said plurality of switches to operate said plurality of rectifiers in a bipolar mode.

10. The three phase power circuit of claim 6 where said control circuit comprises: a region selection circuit to determine operational region of said three phase power circuit as a function of time in said vector mode; a multiplexer coupled to said equivalent circuit inductors to selectively switch said inductor currents under control of said region selection circuit; an analog logic circuit coupled to said multiplexer to generate a plurality of logic output switching signals which when applied to said plurality of switches will control said inductor currents so that RsIs=Vm M(D), where Is is a matrix vector comprised of said three source currents, Rs is an equivalent sensing resistance used to measure the source currents, Vm is a modulating voltage, M(D) is a conversion matrix and D is duty cycle of said source currents; and a switch-logic circuit having its inputs coupled to said analog logic circuit and being coupled to and controlled by said region selection circuit to output said logic output switching signals according to said operational region of said three phase power circuit as a function of time in said vector mode and according to said dual boost topology of said plurality of rectifiers, outputs of said switch-logic circuit being coupled to said plurality of switches.

11. The three phase power circuit of claim 10 where said an analog logic circuit comprises: an integrator having an input equal to the difference between Vm and a predetermined reference, Vref; a reset circuit coupled to said integrator to synchronously reset said integrator; an input current processing circuit coupled to said multiplexer to provide a conditioned signal from said source currents output from said multiplexer; and a plurality of comparators coupled to said input current processing circuit and to an output of said integrator to compare said conditioned signal to said output of said integrator, said pair of comparators generating said logic output switching signals.

12. The three phase power circuit of claim 5 where said control circuit comprises: a region selection circuit to determine operational region of said three phase power circuit as a function of time in said bipolar mode; an analog logic circuit coupled to said source currents to generate a plurality of logic output switching signals which when applied to said plurality of switches will control said inductor currents so that RsIs=VmM(D), where Is is a matrix vector comprised of said three source currents, Rs is an equivalent sensing resistance used to measure the source currents, Vm is a modulating voltage, M(D) is a conversion matrix, and D is duty cycle of said source currents; and a switch-logic circuit having its inputs coupled to said analog logic circuit and being coupled to and controlled by said region selection circuit to output said logic output switching signals according to said operational region of said three phase power circuit as a function of time in said vector mode and according to said dual boost topology of said plurality of rectifiers, outputs of said switch-logic circuit being coupled to said plurality of switches.

13. The three phase power circuit of claim 12 where said an analog logic circuit comprises: an integrator having an input equal to the difference between Vm and a predetermined reference, Vref; a reset circuit coupled to said integrator to synchronously reset said integrator; an input current processing circuit coupled to said source currents to provide a conditioned signal from said source currents; and a plurality of comparators coupled to said input current processing circuit and to an output of said integrator to compare said conditioned signal to said output of said integrator, said pair of comparators generating said logic output switching signals.

14. The three phase power circuit of claim 5 where said control circuit comprises: a region selection circuit to determine operational region of said three phase power circuit as a function of time in said bipolar mode; a circuit for sensing average switching current for each of said three phases of sinusoidal power; an analog logic circuit coupled to said sensed average switching current to generate a plurality of logic output switching signals which when applied to said plurality of switches will control said inductor currents so that RsIs=VmM(D), where Is is a matrix vector comprised of said three source currents, Rs is an equivalent sensing resistance used to measure the source currents, Vm is a modulating voltage, M(D) is a conversion matrix, and D is duty cycle of said source currents; and a switch-logic circuit having its inputs coupled to said analog logic circuit and being coupled to and controlled by said region selection circuit to output said logic output switching signals according to said operational region of said three phase power circuit as a function of time in said vector mode and according to said dual boost topology of said plurality of rectifiers, outputs of said switch-logic circuit being coupled to said plurality of switches.

15. The three phase power circuit of claim 5 where said control circuit comprises: a region selection circuit to determine operational region of said three phase power circuit as a function of time in said bipolar mode; a circuit for sensing peak inductor current for each of said three phases of sinusoidal power; an analog logic circuit coupled to said sensed peak inductor current to generate a plurality of logic output switching signals which when applied to said plurality of switches will control said inductor currents so that RsIr=VmM(D), where Is is a matrix vector comprised of said three source currents, Rs is an equivalent sensing resistance used to measure the source currents, Vm is a modulating voltage, M(D) is a conversion matrix, and D is duty cycle of said source currents; and a switch-logic circuit having its inputs coupled to said analog logic circuit and being coupled to and controlled by said region selection circuit to output said logic output switching signals according to said operational region of said three phase power circuit as a function of time in said vector mode and according to said dual boost topology of said plurality of rectifiers, outputs of said switch-logic circuit being coupled to said plurality of switches.

16. The three phase power circuit of claim 1 where said plurality of rectifiers are coupled in a parallel connected dual boost topology.

17. The three phase power circuit of claim 1 where said plurality of rectifiers are coupled in a series connected dual boost topology.

18. The three phase power circuit of claim 16 where said parallel connected dual boost topology is delta-connected three phase switches, star-connected three phase switches, H-bridge boost rectifiers, H-bridge boost rectifiers with a diode, or a three phase boost rectifier with an inverter network.

19. The three phase power circuit of claim 1 further comprising a three-phase nonlinear load coupled to said source of three phases of sinusoidal power so that said three phase power circuit functions as an active power filter for said three-phase nonlinear load.

20. The three phase power circuit of claim 19 where said control circuit comprises an analog control circuit.

21. The three phase power circuit of claim 19 where said control circuit comprises a digital signal processor.

22. The three phase power circuit of claim 19 where said control circuit is arranged and configured to switch said plurality of switches to operate said plurality of rectifiers in a vector mode.

23. The three phase power circuit of claim 19 where said control circuit is arranged and configured to switch said plurality of switches to operate said plurality of rectifiers in a bipolar mode.

24. The three phase power circuit of claim 20 where said control circuit is arranged and configured to switch said plurality of switches to operate said plurality of rectifiers in a vector mode.

25. The three phase power circuit of claim 20 where said control circuit is arranged and configured to switch said plurality of switches to operate said plurality of rectifiers in a bipolar mode.

26. The three phase power circuit of claim 21 where said control circuit is arranged and configured to switch said plurality of switches to operate said plurality of rectifiers in a vector mode.

27. The three phase power circuit of claim 21 where said control circuit is arranged and configured to switch said plurality of switches to operate said plurality of rectifiers in a bipolar mode.

28. The three phase power circuit of claim 25 where said control circuit comprises: a region selection circuit to determine operational region of said three phase power circuit as a function of time in said vector mode; a multiplexer coupled to said equivalent circuit inductors to selectively switch said inductor currents under control of said region selection circuit; an analog logic circuit coupled to said multiplexer to generate a plurality of logic output switching signals which when applied to said plurality of switches will control said inductor currents so that RsIs=VmM(D), where Is is a matrix vector comprised of said three source currents, Rs is an equivalent sensing resistance used to measure the source currents, Vm is a modulating voltage, M(D) is a conversion matrix and D is duty cycle of said source currents; and a switch-logic circuit having its inputs coupled to said analog logic circuit and being coupled to and controlled by said region selection circuit to output said logic output switching signals according to said operational region of said three phase power circuit as a function of time in said vector mode and according to said dual boost topology of said plurality of rectifiers, outputs of said switch-logic circuit being coupled to said plurality of switches.

29. The three phase power circuit of claim 28 where said an analog logic circuit comprises: an integrator having an input equal to the difference between Vm and a predetermined reference, Vref; a reset circuit coupled to said integrator to synchronously reset said integrator; an input current processing circuit coupled to said multiplexer to provide a conditioned signal from said source currents output from said multiplexer; and a plurality of comparators coupled to said input current processing circuit and to an output of said integrator to compare said conditioned signal to said output of said integrator, said pair of comparators generating said logic output switching signals.

30. The three phase power circuit of claim 23 where said control circuit comprises: a region selection circuit to determine operational region of said three phase power circuit as a function of time in said bipolar mode; -5 san analog logic circuit coupled to said source currents to generate a plurality of logic output switching signals which when applied to said plurality of switches will control said inductor currents so that RsIs=VmM(D), where Is is a matrix vector comprised of said three source currents, Rs is an equivalent sensing resistance used to measure the source currents, Vm is a modulating voltage, M(D) is a conversion matrix, and D is duty cycle of said source currents; and a switch-logic circuit having its inputs coupled to said analog logic circuit and being coupled to and controlled by said region selection circuit to output said logic output switching signals according to said operational region of said three phase power circuit as a function of time in said vector mode and according to said dual boost topology of said plurality of rectifiers, outputs of said switch-logic circuit being coupled to said plurality of switches.

31. The three phase power circuit of claim 30 where said an analog logic circuit comprises: an integrator having an input equal to the difference between Vm and a predetermined reference, Vref; a reset circuit coupled to said integrator to synchronously reset said integrator; an input current processing circuit coupled to said source currents to provide a conditioned signal from said source currents; and a plurality of comparators coupled to said input current processing circuit and to an output of said integrator to compare said conditioned signal to said i, output of said integrator, said pair of comparators generating said logic output switching signals.

32. The three phase power circuit of claim 23 where said control circuit comprises: a region selection circuit to determine operational region of said three phase power circuit as a function of time in said bipolar mode; a circuit for sensing average switching current for each of said three phases of sinusoidal power; an analog logic circuit coupled to said sensed average switching current to generate a plurality of logic output switching signals which when applied to said plurality of switches will control said inductor currents so that RsIs=VmM(D), where Is is a matrix vector comprised of said three source currents, Rs is an equivalent sensing resistance used to measure the source currents, Vm is a modulating voltage, M(D) is a conversion matrix, and D is duty cycle of said source currents; and a switch-logic circuit having its inputs coupled to said analog logic circuit and being coupled to and controlled by said region selection circuit to output said logic output switching signals according to said operational region of said three phase power circuit as a function of time in said vector mode and according to said dual boost topology of said plurality of rectifiers, outputs of said switch-logic circuit being coupled to said plurality of switches.

33. The three phase power circuit of claim 23 where said control circuit comprises: a region selection circuit to determine operational region of said three phase power circuit as a function of time in said bipolar mode; a circuit for sensing peak inductor current for each of said three phases of sinusoidal power; an analog logic circuit coupled to said sensed peak inductor current to generate a plurality of logic output switching signals which when applied to said plurality of switches will control said inductor currents so that RsIs=VmM(D), where Is is a matrix vector comprised of said three source currents, Rs is an ii equivalent sensing resistance used to measure the source currents, Vm is a modulating voltage, M(D) is a conversion matrix, and D is duty cycle of said source currents; and a switch-logic circuit having its inputs coupled to said analog logic circuit and being coupled to and controlled by said region selection circuit to output said logic output switching signals according to said operational region of said three phase power circuit as a function of time in said vector mode and according to said dual boost topology of said plurality of rectifiers, outputs of said switch-logic circuit being coupled to said plurality of switches.

34. The three phase power circuit of claim 19 where said plurality of rectifiers are coupled in a parallel connected dual boost topology.

35. The three phase power circuit of claim 19 where said plurality of rectifiers are coupled in a series connected dual boost topology.

36. The three phase power circuit of claim 34 where said parallel connected dual boost topology is delta-connected three phase switches, star-connected three phase switches, H-bridge boost rectifiers, H-bridge boost rectifiers with a diode, or a three phase boost rectifier with an inverter network.

37. The three phase power circuit of claim 1 wherein said source is an alternative energy source and further comprising a utility grid as a load coupled to said three phase power circuit, said plurality of switches decoupling said plurality of rectifiers during each 60° of line cycle to provide a parallel-connected dual buck converter subtopology.

38. The three phase power circuit of claim 37 where said control circuit comprises an analog control circuit.

39. The three phase power circuit of claim 37 where said control circuit comprises a digital signal processor.

40. The three phase power circuit of claim 37 where said control circuit is arranged and configured to switch said plurality of switches to operate said plurality of rectifiers in a vector mode.

41. The three phase power circuit of claim 37 where said control circuit is arranged and configured to switch said plurality of switches to operate said plurality of rectifiers in a bipolar mode.

42. The three phase power circuit of claim 38 where said control circuit is arranged and configured to switch said plurality of switches to operate said plurality of rectifiers in a vector mode.

43. The three phase power circuit of claim 38 where said control circuit is arranged and configured to switch said plurality of switches to operate said plurality of rectifiers in a bipolar mode.

44. The three phase power circuit of claim 39 where said control circuit is arranged and configured to switch said plurality of switches to operate said plurality of rectifiers in a vector mode.

45. The three phase power circuit of claim 39 where said control circuit is arranged and configured to switch said plurality of switches to operate said plurality of rectifiers in a bipolar mode.

46. The three phase power circuit of claim 43 where said control circuit comprises: a region selection circuit to determine operational region of said three phase power circuit as a function of time in said vector mode; a multiplexer coupled to said equivalent circuit inductors to selectively switch said inductor currents under control of said region selection circuit; an analog logic circuit coupled to said multiplexer to generate a plurality of logic output switching signals which when applied to said plurality of switches will control said inductor currents so that RsIs=VmM(D), where Is is a matrix vector comprised of said three source currents, Rs is an equivalent sensing resistance ii used to measure the source currents, Vm is a modulating voltage, M(D) is a conversion matrix and D is duty cycle of said source currents; and a switch-logic circuit having its inputs coupled to said analog logic circuit and being coupled to and controlled by said region selection circuit to output said logic output switching signals according to said operational region of said three phase power circuit as a function of time in said vector mode and according to said dual boost topology of said plurality of rectifiers, outputs of said switch-logic circuit being coupled to said plurality of switches.

47. The three phase power circuit of claim 46 where said an analog logic circuit comprises: an integrator having an input equal to the difference between Vm and a predetermined reference, Vref; a reset circuit coupled to said integrator to synchronously reset said integrator; an input current processing circuit coupled to said multiplexer to provide a conditioned signal from said source currents output from said multiplexer; and so a plurality of comparators coupled to said input current processing circuit and to an output of said integrator to compare said conditioned signal to said output of said integrator, said pair of comparators generating said logic output switching signals.

48. The three phase power circuit of claim 41 where said control circuit comprises: a region selection circuit to determine operational region of said three phase power circuit as a function of time in said bipolar mode; an analog logic circuit coupled to said source currents to generate a plurality of logic output switching signals which when applied to said plurality of switches will control said inductor currents so that RsIs=VmM(D), where Is is a matrix vector comprised of said three source currents, Rs is an equivalent sensing resistance used to measure the source currents, Vm is a modulating voltage, M(D) is a conversion matrix, and D is duty cycle of said source currents; and a switch-logic circuit having its inputs coupled to said analog logic circuit and being coupled to and controlled by said region selection circuit to output said logic output switching signals according to said operational region of said three phase power circuit as a function of time in said vector mode and according to said dual boost topology of said plurality of rectifiers, outputs of said switch-logic circuit being coupled to said plurality of switches.

49. The three phase power circuit of claim 48 where said an analog logic circuit comprises: an integrator having an input equal to the difference between Vm and a predetermined reference, Vref; a reset circuit coupled to said integrator to synchronously reset said integrator; an input current processing circuit coupled to said source currents to provide a conditioned signal from said source currents; and a plurality of comparators coupled to said input current processing circuit and to an output of said integrator to compare said conditioned signal to said output of said integrator, said pair of comparators generating said logic output switching signals.

50. The three phase power circuit of claim 41 where said control circuit comprises: a region selection circuit to determine operational region of said three phase power circuit as a function of time in said bipolar mode; a circuit for sensing average switching current for each of said three phases of sinusoidal power; an analog logic circuit coupled to said sensed average switching current to generate a plurality of logic output switching signals which when applied to said plurality of switches will control said inductor currents so that RsIs=(KVs−Vm) M(D), where K is a constant, Vs is a matrix vector of three phase voltages of said source, Is is a matrix vector comprised of said three source currents, Rs is an equivalent sensing resistance used to measure the source currents, Vm is a modulating voltage, M(D) is a conversion matrix, and D is duty cycle of said source currents; and a switch-logic circuit having its inputs coupled to said analog logic circuit and being coupled to and controlled by said region selection circuit to output said logic output switching signals according to said operational region of said three phase power circuit as a function of time in said vector mode and according to said dual boost topology of said plurality of rectifiers, outputs of said switch-logic circuit being coupled to said plurality of switches.

51. The three phase power circuit of claim 41 where said control circuit comprises: a region selection circuit to determine operational region of said three phase power circuit as a function of time in said bipolar mode; a circuit for sensing peak inductor current for each of said three phases of sinusoidal power; an analog logic circuit coupled to said sensed peak inductor current to generate a plurality of logic output switching signals which when applied to said plurality of switches will control said inductor currents so that RssIs=(KVs−Vm) M(D), where K is a constant, Vs is a matrix vector of three phase voltages of said source, Is is a matrix vector comprised of said three source currents, Rs is an equivalent sensing resistance used to measure the source currents, Vm is a modulating voltage, M(D) is a conversion matrix, and D is duty cycle of said source currents; and a switch-logic circuit having its inputs coupled to said analog logic circuit and being coupled to and controlled by said region selection circuit to output said logic output switching signals according to said operational region of said three phase power circuit as a function of time in said vector mode and according to said dual boost topology of said plurality of rectifiers, outputs of said switch-logic circuit being coupled to said plurality of switches.

52. The three phase power circuit of claim 47 where said plurality of rectifiers are coupled in a parallel connected dual boost topology.

53. The three phase power circuit of claim 47 where said plurality of rectifiers are coupled in a series connected dual boost topology.

54. The three phase power circuit of claim 52 where said parallel connected dual boost topology is delta-connected three phase switches, star-connected three phase switches, H-bridge boost rectifiers, H-bridge boost rectifiers with a diode, or a three phase boost rectifier with an inverter network.