Closed-loop control method of double-active full-bridge direct-current converter based on DSP

文档序号:1689293 发布日期:2020-01-03 浏览:5次 中文

阅读说明:本技术 基于dsp的双有源全桥直流变换器的闭环控制方法 (Closed-loop control method of double-active full-bridge direct-current converter based on DSP ) 是由 肖华 谢晓华 颜健 陆青 沈嘉俊 于 2019-10-16 设计创作,主要内容包括:本发明公开了基于DSP的双有源全桥直流变换器的闭环控制方法,所述闭环控制方法采用基于DSP的闭环控制结构,闭环控制结构包括电流环、最优工作点查找表、全桥变换器移相计算器、软开关死区时间生成器和PWM调制器;电流环以参考电流作为前馈,经电流环修正过后的参考电流分别送入最优工作点查找表和全桥变换器移相计算器求得工作点控制参数和变量;最优工作点查找表得到的最优控制变量,全桥变换器移相计算器得到的全桥变换器相移,和软开关死区时间生成器得到的死区时间,分别送入PWM调制器,产生各桥臂开关器件的开关函数,从而实现对DAB型直流变换器的闭环控制,具有实现方式简单,闭环响应快稳定性高,功率器件损耗减小和变换器效率提升等优点。(The invention discloses a closed-loop control method of a double-active full-bridge direct-current converter based on a DSP (digital signal processor), wherein the closed-loop control method adopts a closed-loop control structure based on the DSP, and the closed-loop control structure comprises a current loop, an optimal working point lookup table, a full-bridge converter phase-shifting calculator, a soft switch dead-time generator and a PWM (pulse-width modulation) modulator; the current loop takes the reference current as feedforward, and the reference current corrected by the current loop is respectively sent to an optimal working point lookup table and a full-bridge converter phase-shifting calculator to obtain working point control parameters and variables; the optimal control variable obtained by the optimal working point lookup table, the phase shift of the full-bridge converter obtained by the full-bridge converter phase shift calculator and the dead time obtained by the soft switch dead time generator are respectively sent to the PWM modulator to generate the switching function of each bridge arm switching device, so that the closed-loop control of the DAB type direct current converter is realized.)

1. The closed-loop control method of the double-active full-bridge direct-current converter based on the DSP is characterized in that the closed-loop control method adopts a closed-loop control structure based on the DSP, and the closed-loop control structure comprises a current loop, an optimal working point lookup table, a full-bridge converter phase-shifting calculator, a soft switch dead-zone time generator and a PWM modulator;

the current loop takes the reference current as feedforward, and the reference current corrected by the current loop is respectively sent to an optimal working point lookup table and a full-bridge converter phase-shifting calculator to obtain working point control parameters and variables; the optimal control variable obtained by the optimal working point lookup table, the phase shift of the full-bridge converter obtained by the full-bridge converter phase shift calculator and the dead time obtained by the soft switch dead time generator are respectively sent to the PWM modulator to generate the switching function of each bridge arm switching device, so that the closed-loop control of the DAB type direct current converter is realized.

2. The closed-loop control method of the dual-active full-bridge dc converter according to claim 1, wherein the current loop is configured to compare a feedforward reference current with a measurement current and then perform PI adjustment to obtain a corrected value of the reference current; the reference current is determined by the ratio of the output side target power to the sampling value of the output side bus voltage; and adding a limiter in the current loop to limit the corrected value of the reference current and the corrected reference current respectively.

3. The closed-loop control method for a dual active full-bridge dc converter based on DSP according to claim 2, characterized in that the optimal operating point lookup table is obtained in advance by solving the optimized mathematical model of the DAB type dc converter by MATLAB tool.

4. The closed-loop control method of the dual-active full-bridge DC converter based on DSP as claimed in claim 3, wherein in the closed-loop control based on DSP, the optimal control variable combination corresponding to the closed-loop operating point is obtained by performing linear interpolation table look-up on the optimal operating point look-up table; the optimal control variable combination comprises switching frequency and switching phase difference between inner bridge arms of the input-output side full-bridge converter.

5. The closed-loop control method for dual-active full-bridge DC converter based on DSP as claimed in claim 4, wherein the full-bridge converter phase shift calculator performs a first harmonic approximation to each bridge arm switching function and equivalent circuit state variable in the DAB type DC converter under multiple phase shift control to derive an analytic solution of steady-state output current DC component under multiple phase shift control; and deducing the switching phase difference of the input side and the output side of the full-bridge converter on the premise of setting the direct-current bus voltage, the direct-current component of the output current, the switching frequency and the switching phase difference between the bridge arms in the full-bridge converter at the input side and the output side through secondary analysis of the analytic solution.

6. The closed-loop control method for a dual active full-bridge DC converter based on DSP according to claim 5, wherein the soft switching dead time generator dynamically realizes the switching function dead time required for ZVS soft switching by substituting the output control variable of the closed-loop controller into a dead time analytic solution; the soft switch dead time analytic solution is obtained by carrying out mathematical modeling analysis on a steady-state equivalent circuit and a phase change equivalent circuit of the DAB type direct current converter.

7. The closed-loop control method of the dual-active full-bridge DC converter based on the DSP as claimed in claim 5, wherein the full-bridge converter phase shift calculator uses the input/output side bus voltage, the current loop output reference current and the optimal control variable obtained by the lookup of the optimal operating point lookup table as input, and in the full-bridge converter phase shift calculator, the ratio of the switching phase difference of the output side full-bridge converter bridge arm to the input side full-bridge converter bridge arm under the multiple phase shift control to the switching period is obtained by the analytic solution of the equivalent circuit model under the optimal operating point.

8. The closed-loop control method of the dual-active full-bridge dc converter based on DSP of claim 7, wherein the method of obtaining the ratio of the switching phase difference of the output side full-bridge converter leg to the input side full-bridge converter leg to the switching period is: firstly, performing first-order harmonic approximation on a switching function, then performing equivalent circuit modeling on a DAB type direct current converter, wherein the voltage of a transformer terminal can be expressed as the relation between the voltage of a direct current bus at an input/output side and a point position output switching function in a full-bridge converter, and the point position output switching function in the full-bridge converter is obtained by substituting the switching functions of all bridge arms in the converter; performing state space mathematical expression according to the equivalent circuit model, and further deducing an analytic solution of the current of the steady-state transformer;

on the other hand, the line current of the input side full-bridge converter can be expressed as the relation between the input side transformer current and a position output switching function in the full-bridge converter, a direct current component is extracted, an expression of the input side direct current line current is obtained, and then an equation of a ratio s of a switching phase difference of an output side full-bridge converter bridge arm A to the input side full-bridge converter bridge arm A to a switching period is obtained; in general, the ratio s satisfying the condition has one and only one solution; if s has multiple solutions, the closest solution near the zero is chosen.

9. The closed-loop control method of the dual-active full-bridge DC converter based on DSP as claimed in claim 6, wherein the soft switch dead time generator obtains the soft switch dead time under the given input and output side bus voltage and multiple phase shift control variables by the soft switch dead time algorithm, in the soft switch dead time algorithm, firstly, the first harmonic approximation is performed to each bridge arm switch function and equivalent circuit state variable in the DAB type DC converter under the multiple phase shift control mode, and the analytic solution of the steady state transformer current under the multiple phase shift control is deduced; equivalent circuit modeling is carried out on the phase conversion process of the direct current converter, and the equivalent circuit modeling is substituted into the current of the steady-state transformer to deduce a dead time analytic solution meeting ZVS soft switching requirements.

Technical Field

The invention relates to the field of direct current converters, in particular to a closed-loop control method of a double-active full-bridge direct current converter based on a DSP (digital signal processor).

Background

The double-Active full-Bridge (DAB type) DC converter has the advantages of electric isolation, power bidirectional transmission, high power density and the like, and is widely applied to the fields of energy storage and the like. As shown in fig. 1, the DAB dc converter is mainly composed of an input-side full-bridge converter, an output-side full-bridge converter, and a high-frequency transformer.

In the traditional multiple phase-shifting control mode of the DAB type direct current converter, two switching devices in each bridge arm of the full-bridge converter adopt complementary switching modes, and the switching phase difference between the bridge arms is 180 degrees. The magnitude and direction of the transmission power are controlled by controlling the switching phase difference between the input side full-bridge converter and the output side full-bridge converter and the switching phase difference between the bridge arms of the full-bridge transformer. The control mode can ensure that the backflow power of the converter is restrained on the premise of certain transmission power, greatly reduces the loss of power devices and improves the efficiency of the converter. However, due to the existence of a plurality of control variables, the control method greatly increases the complexity and difficulty of control.

Taking triple phase shift control as an example, given input and output side dc bus voltages, under the condition of a constant switching frequency, there are up to three control variables, including a switching phase difference between input side full-bridge converter arms, a switching phase difference between output side full-bridge converter arms, and a switching phase difference between input and output side full-bridge converters. In the conventional multiple phase-shifting control method, it is very difficult to find an optimal set of control variables, so as to further reduce the power device loss and improve the converter efficiency. In the closed-loop controller, how to design the closed-loop controller structure to control the controlled variables to approach the optimal controlled variable combination is also difficult to realize.

On the other hand, in the multiple phase shift control system, ZVS soft switching of the switching device is generally difficult to achieve due to the presence of a plurality of control variables. This results in a significant increase in the switching losses of the power device. This on the one hand reduces the efficiency of the converter and on the other hand it increases the temperature rise of the power device considerably. If the temperature rise exceeds the power device threshold, this can lead to reduced device lifetime or damage. At present, the popular method is to design a fixed dead time of a switching function to ensure that ZVS soft switching can still be realized when the worst working point is close to. However, this results in the body diode of the switching device being turned on for too long at the remaining operating points, thereby increasing unnecessary diode conduction losses and reducing the overall efficiency of the converter. How to dynamically find out the optimal switch function dead time corresponding to each working point is very difficult, so that ZVS soft switching can be ensured, and the conduction time of a switch device body diode can be reduced.

Disclosure of Invention

The invention aims to: the invention aims to provide a closed-loop control method of a double-active full-bridge direct-current converter based on a DSP (digital signal processor), which has the advantages of simple implementation mode, fast closed-loop response, high stability, reduced power device loss, improved converter efficiency and the like.

The technical scheme of the invention is as follows:

the closed-loop control method of the double-active full-bridge direct-current converter based on the DSP comprises the steps that the double-active full-bridge direct-current converter, namely a DAB type direct-current converter comprises an input side full-bridge converter, an output side full-bridge converter and a high-frequency transformer connected with the full-bridge converters on two sides, the closed-loop control method adopts a closed-loop control structure based on the DSP, and the closed-loop control structure comprises a current loop, an optimal working point lookup table, a full-bridge converter phase-shifting calculator, a soft switch dead-time generator and a PWM modulator;

the current loop takes the reference current as feedforward, and the reference current corrected by the current loop is respectively sent to an optimal working point lookup table and a full-bridge converter phase-shifting calculator to obtain working point control parameters and variables; the optimal control variable obtained by the optimal working point lookup table, the phase shift of the full-bridge converter obtained by the full-bridge converter phase shift calculator and the dead time obtained by the soft switch dead time generator are respectively sent to the PWM modulator to generate the switching function of each bridge arm switching device, so that the closed-loop control of the DAB type direct current converter is realized.

Preferably, the current loop compares the feedforward reference current with the measurement current and then takes the comparison result as a corrected value of the reference current after PI regulation; the reference current is determined by the ratio of the output side target power to the sampling value of the output side bus voltage; and adding a limiter in the current loop to limit the corrected value of the reference current and the corrected reference current respectively.

Preferably, the optimal operating point lookup table is obtained in advance by solving the optimal mathematical model of the DAB type dc converter by an MATLAB tool.

Preferably, in closed-loop control based on the DSP, linear interpolation table look-up is carried out on the optimal working point look-up table to obtain the optimal control variable combination corresponding to the closed-loop working point; the optimal control variable combination comprises switching frequency and switching phase difference between inner bridge arms of the input-output side full-bridge converter.

Preferably, the full-bridge converter phase shift calculator performs first-order harmonic approximation on each bridge arm switching function and equivalent circuit state variable in the DAB type direct current converter in a multiple phase shift control mode, and deduces an analytic solution of a steady-state output current direct current component under multiple phase shift control; and deducing the switching phase difference of the input side and the output side of the full-bridge converter on the premise of setting the direct-current bus voltage, the direct-current component of the output current, the switching frequency and the switching phase difference between the bridge arms in the full-bridge converter at the input side and the output side through secondary analysis of the analytic solution.

Preferably, the soft switching dead time generator dynamically realizes the switching function dead time required by the ZVS soft switching by substituting the output control variable of the closed-loop controller into a dead time analytic solution; the soft switch dead time analytic solution is obtained by carrying out mathematical modeling analysis on a steady-state equivalent circuit and a phase change equivalent circuit of the DAB type direct current converter.

Preferably, the full-bridge converter phase-shift calculator takes the input and output side bus voltage, the current loop output reference current and the optimal control variable obtained by the lookup of the optimal working point lookup table as input, and in the full-bridge converter phase-shift calculator, the ratio of the switching phase difference of the output side full-bridge converter bridge arm to the input side full-bridge converter bridge arm under the multiple phase-shift control to the switching period is obtained through the analytic solution of the equivalent circuit model under the optimal working point.

Preferably, the method for obtaining the ratio of the switching phase difference of the output-side full-bridge converter bridge arm to the input-side full-bridge converter bridge arm in the switching period is as follows: firstly, performing first-order harmonic approximation on a switching function, then performing equivalent circuit modeling on a DAB type direct current converter, wherein the voltage of a transformer terminal can be expressed as the relation between the voltage of a direct current bus at an input/output side and a point position output switching function in a full-bridge converter, and the point position output switching function in the full-bridge converter is obtained by substituting the switching functions of all bridge arms in the converter; performing state space mathematical expression according to the equivalent circuit model, and further deducing an analytic solution of the current of the steady-state transformer;

on the other hand, the line current of the input side full-bridge converter can be expressed as the relation between the input side transformer current and a position output switching function in the full-bridge converter, a direct current component is extracted, an expression of the input side direct current line current is obtained, and then an equation of a ratio s of a switching phase difference of an output side full-bridge converter bridge arm A to the input side full-bridge converter bridge arm A to a switching period is obtained; in general, the ratio s satisfying the condition has one and only one solution; if s has multiple solutions, the closest solution near the zero is chosen.

Preferably, the soft switch dead time generator obtains the soft switch dead time under the given input and output side bus voltage and multiple phase shift control variables through a soft switch dead time algorithm, in the soft switch dead time algorithm, firstly, the first-order harmonic approximation is carried out on each bridge arm switch function and equivalent circuit state variable in the DAB type direct current converter under the multiple phase shift control mode, and the analytic solution of the steady state transformer current under the multiple phase shift control is deduced; equivalent circuit modeling is carried out on the phase conversion process of the direct current converter, and the equivalent circuit modeling is substituted into the current of the steady-state transformer to deduce a dead time analytic solution meeting ZVS soft switching requirements.

The invention has the advantages that:

the closed-loop control method of the double-active full-bridge direct-current converter based on the DSP adopts a current loop and takes reference current as feedforward, and the reference current modified by the current loop is respectively sent to an optimal working point look-up table and a full-bridge converter phase-shift calculator to obtain working point control parameters and variables; the optimal control variable obtained by the optimal working point lookup table, the phase shift of the full-bridge converter obtained by the full-bridge converter phase shift calculator and the dead time obtained by the soft switch dead time generator are respectively sent to the PWM modulator to generate the switching function of each bridge arm switching device, so that the closed-loop control of the DAB type direct current converter is realized.

Drawings

The invention is further described with reference to the following figures and examples:

FIG. 1 is a schematic diagram of a dual active full bridge DC converter;

fig. 2 is a switching function curve of an upper switch in each bridge arm of the dual-active full-bridge dc converter and a position output switching function curve in the full-bridge converter;

fig. 3 is a schematic diagram of a closed loop control architecture based on a DSP.

Fig. 4 is a circuit equivalent model of a dual-active full-bridge dc converter.

Detailed Description

As shown in fig. 1, the dual-active full-bridge dc converter, i.e., the DAB type dc converter, includes an input-side full-bridge converter, an output-side full-bridge converter, and a high-frequency transformer connecting the two-side full-bridge converters.

In the multiple phase-shift control mode, the upper and lower switches in each bridge arm of the full-bridge converter adopt complementary switch modes, and the duty ratio is 50%. The switching function of the upper switch in each arm is shown in fig. 2, with reference to the upper switch in arm a of the input-side full-bridge converter. Wherein d is1The switching phase difference of a bridge arm B to a bridge arm A in the input side full-bridge converter is obtained; s is the switching phase difference of the output side full-bridge converter bridge arm A to the input side full-bridge converter bridge arm A; d2The switching phase difference of the bridge arm B of the full-bridge converter on the output side to the bridge arm A is shown.

In the present embodiment, a closed-loop control structure based on a DSP with output-side power as a control target is shown in fig. 3. The control structure mainly comprises a current loop, an optimal working point lookup table, a full-bridge converter phase-shifting converter, a soft switch dead time generator and a PWM modulator.

In this embodiment, the current loop is designed by using a conventional structure in which a reference current is used as a feedforward, and the reference current is compared with a measurement current and then subjected to PI adjustment to be used as a correction value of the reference current. Reference current IrefFrom the output side target power PcmdAnd the sampling value V of the output side bus voltage2Is determined by the ratio of (a) to (b). And adding a limiter into the current loop to limit the corrected value of the reference current and the corrected reference current respectively, so that the controllability of the reference current of the current loop is ensured. And respectively sending the reference current corrected by the current loop into an optimal working point lookup table and a full-bridge converter phase-shifting calculator to obtain working point control parameters and variables.

In this embodiment, the optimal operating point lookup table is obtained by solving the optimal mathematical model of the DAB dc converter by using an MATLAB tool in advance. In the optimized mathematical model, the first-order harmonic approximation is carried out on the equivalent circuit state variables through the switching functions of each bridge arm in the DAB type direct current converter in the multiple phase-shifting control mode, and the analytic solution of the steady state variables is deduced. Through secondary analysis of the analytic solution, the optimal control variable combination under multiple phase-shift control is deduced on the premise of giving the direct-current bus voltage, the transmission power and the switching frequency, so that the conduction loss of the power device is minimum. In a closed-loop controller based on DSP, the adopted value V of the bus voltage on the input/output side is input1And V2And the output reference current I of the current loopcmdAnd as the input of the optimal working point lookup table, obtaining the optimal control variable combination under the optimal working point through the algorithm of linear interpolation: switching frequency f, ratio d of switching phase difference of bridge arm B to bridge arm A in input side full-bridge converter to switching period1And the ratio d of the switching phase difference of the bridge arm B of the full-bridge converter on the output side to the switching phase difference of the bridge arm A of the full-bridge converter to the switching period2. The optimal control variables are respectively sent to a full bridge transformerThe phase shifter comprises a phase shifter calculator, a soft switching dead time generator and a PWM modulator.

In this embodiment, the input and output side bus voltage, the current loop output reference current, and the optimal control variable obtained by the lookup of the optimal operating point lookup table are used as the input of the full-bridge converter phase shift calculator. In the full-bridge converter phase-shifting calculator, the ratio s of the switching phase difference of an output side full-bridge converter bridge arm A to an input side full-bridge converter bridge arm A in multiple phase-shifting control to the switching period is obtained through the analysis and solution of an equivalent circuit model under the optimal working point. The algorithm for resolving s analytically is described in detail below.

In this embodiment, to solve s analytically, first order harmonic approximation is performed on the switching functions shown in fig. 2, and each switching function can be expressed approximately as:

Figure BDA0002235555580000051

Figure BDA0002235555580000052

Figure BDA0002235555580000054

where ω is the switching angular frequency.

In the present embodiment, an equivalent circuit model is made for the DAB type dc converter shown in fig. 1. In the modeling, the following approximation is employed: each switch acts as an ideal switch and the transformer acts as an ideal transformer in series with the leakage inductance. The circuit equivalent model is shown in FIG. 4, where Vp(t) and VsAnd (t) represents terminal voltages of the input side transformer and the output side transformer respectively, and L is equivalent leakage inductance of the input side of the transformer pair. Transformer terminal voltage can be expressed as input-output side DC bus voltage and as a function of position output switch in full-bridge converterThe relationship between them is as follows:

Vp=V1Sp(t)=V1(S1A-S1B)

Vs=V2Sc(t)=V2(S2A-S2B)

substituting the expression of the switching function, the position output switching function in the full-bridge converter can be expressed as:

Figure BDA0002235555580000061

Figure BDA0002235555580000062

the equivalent circuit model is mathematically expressed in state space as follows:

Figure BDA0002235555580000063

where N is the ratio of the number of turns of the transformer output side to the input side, iLAnd (t) is the input side transformer current. Due to the unsteady dc component of the transformer current, the steady state solution of the above state space equation can be expressed as:

iL(t)=kc cos(ωt)+ks sin(ωt)

wherein

Figure BDA0002235555580000064

Figure BDA0002235555580000065

On the other hand, the line current of the input side full bridge converter can be expressed as a relation between the input side transformer current and the position output switch function in the full bridge converter as follows:

io(t)=iL(t)Sp(t)

in the above expression, extracting the dc component, an expression of the input side dc line current can be obtained:

Figure BDA0002235555580000066

by arranging the above expressions, an equation of the proportion s of the switching phase difference of the output side full-bridge converter arm a to the input side full-bridge converter arm a in the switching period can be obtained as follows:

αcos(2πs)+βsin(2πs)=γ

wherein the coefficients α, β and γ can be expressed as

α=sin(2πd1)+sin(2π(d2-d1))-sin(2πd2)

β=1-cos(2πd1)+cos(2π(d2-d1))-cos(2πd2)

Figure BDA0002235555580000071

In the present invention, it is assumed that a phase exists

Figure BDA0002235555580000072

Satisfy the requirement of

Figure BDA0002235555580000073

The equation for s can be simplified to

Figure BDA0002235555580000074

The above equations are solved analytically to obtain

Figure BDA0002235555580000075

Or

Figure BDA0002235555580000076

Wherein the phase theta satisfies

Figure BDA0002235555580000077

In general, s satisfying the condition has one and only one solution. If s has multiple solutions, the closest solution near the zero is chosen. The reason is that under the same working point, the proportion of the switching phase difference of the output side full-bridge converter arm A to the input side full-bridge converter arm A in the switching period is closer to the zero point, the smaller the amplitude of the first-order harmonic current of the transformer is, and the smaller the conduction loss of the converter is.

In this embodiment, to realize fast phase solution in DSPAnd θ, an estimated expression for arctan using lagrange difference and computer lookup as follows

Figure BDA0002235555580000079

The maximum absolute error of the estimated expression by comparison with the actual value is only 0.0037.

In this embodiment, an estimation expression of arctan is used in combination with phase

Figure BDA00022355555800000710

And theta satisfy the respective relations, the phase can be obtained

Figure BDA0002235555580000081

And an approximate analytical expression for θ:

Figure BDA0002235555580000082

Figure BDA0002235555580000083

in this embodiment, the full-bridge converter phase shift calculator obtains a ratio s of a switching phase difference of the output-side full-bridge converter arm a to the input-side full-bridge converter arm a in the multiple phase shift control to a switching period through the analysis algorithm, and sends the ratio s to the PWM modulator and the soft switching dead time generator.

In the embodiment, the soft switch dead time generator obtains the soft switch dead time dt under the condition of given input and output side bus voltage and multiple phase-shifting control variables through a specific algorithm1A,dt1B,dt2AAnd dt2BAs shown in fig. 2. Wherein dt1AAnd dt1BThe dead time of the rising edge or the falling edge of the switch of the bridge arms A and B of the input side full-bridge converter respectively, dt2AAnd dt2BThe dead time of the rising edge or the falling edge of the switch of the bridge arms A and B of the full-bridge converter at the output side is respectively. In the soft switching dead time algorithm, first-order harmonic approximation is carried out on each bridge arm switching function and equivalent circuit state variable in a DAB type direct current converter under a multiple phase-shift control mode, and an analytic solution of steady-state transformer current under multiple phase-shift control is deduced. Equivalent circuit modeling is carried out on the phase conversion process of the direct current converter, and the equivalent circuit modeling is substituted into the current of the steady-state transformer to deduce a dead time analytic solution meeting ZVS soft switching requirements.

In this embodiment, the optimal control variable obtained from the optimal operating point lookup table, the phase shift of the full-bridge converter obtained from the full-bridge converter phase shift calculator, and the dead time obtained from the soft switching dead time generator are respectively sent to the PWM modulator to generate the switching function of the switching device of each bridge arm, thereby implementing the closed-loop control of the DAB full-bridge converter.

The above embodiments are merely illustrative of the technical ideas and features of the present invention, and the purpose of the embodiments is to enable those skilled in the art to understand the contents of the present invention and implement the present invention, and not to limit the protection scope of the present invention. All modifications made according to the spirit of the main technical scheme of the invention are covered in the protection scope of the invention.

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