Control strategy of LCL photovoltaic grid-connected inverter based on quasi-DPC

Aiming at the shortcomings of the non-fixed switching frequency and slow dynamic response of the current closed-loop control in the three-phase LCL photovoltaic grid-connected inverter system, this paper proposes a quasi-DPC method with current control in the inner loop and power control in the outer loop, which takes into account the advantages of both DPC and current control, and has the advantages of fast dynamic response, fixed switching frequency and high current sinusoidality. By building a control system simulation model in Matlab/Simul ink, the results show that the control strategy has certain feasibility.

1

Three-phase grid-connected inverter model with LCL filter

The topology of the three-phase photovoltaic grid-connected power generation system using LCL filter. The main circuit of the three-phase grid-connected inverter includes a three-phase full-bridge circuit composed of an input DC bus filter capacitor C, 6 insulated slot bipolar high-power transistor (IGBT) switches, and a third-order filter composed of filter inductors L1, L2 and filter capacitor Cf. In Figure 1, u and i are voltage and current respectively; id is the current of diode D; VT is thyristor; r1 and r2 are the internal resistance of filter inductors L1 and L2; ug is the grid voltage; subscript dc represents direct current; subscripts a, b, and c correspond to the A, B, and C phases of the inverter respectively.

Under the condition of balanced three-phase grid voltage, the three-phase state equation of the inverter is:

In the formula, subscript m = α, β; subscript k = a, b, c; udc is the DC bus voltage of the photovoltaic grid-connected inverter; idc is the DC side input current of the photovoltaic grid-connected inverter; s represents the switching function; subscript o represents the switch state of the branch is open; subscript n represents the neutral point.

According to Clarke transformation, the state equation of the three-phase grid-connected inverter in the αβ coordinate system is:

Where w is the equivalent control angular frequency of the three-phase grid-connected inverter.

2

Establishment of control strategy model for phase-connected inverter

The control principle diagram of the three-phase grid-connected inverter. The system is mainly composed of bus voltage control, current control, power control and other links. The outer loop adopts a power loop control strategy based on fuzzy PI to realize the power control of the three-phase grid-connected inverter; the inner loop adopts a repeated PR control strategy to improve the dynamic performance and stability of repeated control and realize the current control of the three-phase grid-connected inverter. Among them, p* is the active power reference value, which is obtained by multiplying the input reference voltage uref and the output of PI control; the reactive power reference value q* is set to zero; the superscript * represents the reference value.

According to the instantaneous power theory, the complex power on the grid side of the inverter can be obtained:

In the formula, ig is the current vector; ugα and ugβ are the voltage components in the αβ coordinate system; igα and igβ are the current components in the αβ coordinate system.

Power Controller Design

The output power of the photovoltaic system is a continuously changing quantity. When the external conditions such as light resources, external temperature, and dust shielding change, the output power also changes continuously, and the traditional PI control method cannot achieve the ideal control effect. The power controller in this paper adopts a control method based on fuzzy PI, and uses the Mamdani fuzzy reasoning mechanism to tune and optimize the PI controller parameters online. Figure 3 is the structure diagram of the fuzzy PI control system. In the figure, Δp/Δq is the input reference active and reactive error instructions; ku is the proportional factor; ke, ke′ are quantization factors; i*αβ is the system grid-connected current reference value under the αβ coordinate; e, e′ are the instantaneous power error and error change rate, respectively, and this controller quantizes it in the [-6, 6] interval.

The fuzzy PI controller will first obtain the fuzzy relationship between kp, ki and e, e′. kp and ki are PI controller parameters, and this controller quantifies them in the interval [-3, 3]. At the same time, e and e′ will be continuously detected during the reasoning process. Finally, the controller will adjust the PID parameters in real time according to the reasoning rules to meet the different requirements of variables e and e′ for control parameters, so that the power controller has good dynamic and static performance.