Abstract

For the operation of the supercritical once-through boiler generation units, the control of the temperature at intermediate point (IPT) is highly significant. IPT is the steam temperature at the outlet of the separator. Currently, PID control algorithms are widely adopted for the IPT control. However, PID cannot achieve the optimal performances as the units’ dynamic characteristic changes at different working points due to the severe nonlinearity. To address the problem, a new control algorithm using affine nonlinear system is adopted for a 600 MW unit in this paper. In order to establish the model of IPT via affine nonlinear system, the simplified mechanism equations on the evaporation zone and steam separator of the unit are established. Then, the feedback linearizing control law can be obtained. Full range simulations with the load varying from 100% to 30% are conducted. To verify the effectiveness of the proposed control algorithm, the performance of the new method is compared with the results of the PID control. The feed-water flow disturbances are considered in simulations of both of the two control methods. The comparison shows the new method has a better performance with a quicker response time and a smaller overshoot, which demonstrates the potential improvement for the supercritical once-through boiler generation unit control.

1. Introduction

Developing supercritical once-through boiler generation units [1] is of great importance due to the threats of global warming and severe air pollution. The supercritical units have the advantage of high power generation efficiency up to 45%. Moreover, they are able to maintain relatively high efficiency even at low loads. However, as the side effects, the system is severely nonlinear, which is difficult to control.

On the one hand, high performance is required for the IPT control, as 1°C variation of IPT could end up with fluctuations of main-steam temperature around 8°C generally. The variation of main-steam temperature has profound effects on the stability, security, and efficiency of supercritical units. Therefore, the IPT control is a key problem to all of the units. On the other hand, more and more distributed energy is integrated into the grid. Renewable energy such as solar and wind power has bad capacity of peak regulation which leads to the increasing requirement of load regulation for the traditional units. To improve the control performance, the nonlinearity must be addressed.

For nonlinear systems [2], researchers have developed many control strategies for the IPT control, such as adaptive control [3, 4], fuzzy control [5–7], neural network control [8–10], predictive control [11–13], and coordinated control [14].

In 2000, Åström and Bell established a simplified nonlinear model of the drum-boiler unit [15]. The model has been widely used; however, the unbalance between feed-water flow and coal combustion [16] could cause disturbance on steam temperature, and the model cannot be used in the situations of once-through boilers. Fuzzy controller was applied to once-through boiler [17] in 2006, and adaptive control strategy was came up with in 2007 [18] which had good effect on slowly changing system. However, it was not able to deal with the situations of sudden load change.

In [19], a fuzzy autoregressive moving average model was proposed and applications of online self-organizing fuzzy logic controller were presented to a boiler-turbine system in a power plant. However, the techniques have been applied for nonmodel-based controller design and the control rules may not be accurate enough as the plant model information is not utilized. The applications of dynamic matrix control (DMC) to a drum-type boiler-turbine system were presented in [20], but the validation of the step-response model may be unsatisfied in designing the DMC. Sode-Yome et al. proposed some methods which can be used in stability control of power system [21], and the controller was designed for ultrasupercritical once-through boiler power plant [22]. This type of power plant could be used mainly for base line power generation and this technique may not be suitable for the power plants with frequent load changes.

With rapid development of nonlinear control theory and affine nonlinear system [23–26], currently exact linearization theory [27] has been applied into numerous industrial applications such as nonlinear automatic control of helicopter [28] and power system [29].

In this paper, affine nonlinear system based on exact feedback linearization [30–32] is adopted on the control of IPT for supercritical units. The contents of the paper are outlined as follows. In Section 2, by establishing the model of the evaporation zone and steam separator, the appropriate model via affine nonlinear system is chosen and the exact feedback linearizing control rules are obtained. The stability analysis of the chosen nonlinear system is made and simulations on the PIT control via affine nonlinear system are conducted in Section 3. In Section 4, to verify the new method proposed in the paper, the control performances of the nonlinear optimal control and PID control are compared with the load varying from 100% to 30%. The results show the new control method is more effective comparing with the conventional PID as the conclusion is made in Section 5.

2. Modeling and Controller Design via Affine Nonlinear Systems

2.1. Model of the Evaporation Zone and Steam-Separator

In order to simplify boiler model [33], the following hypothesis is given. The unit is divided into the evaporation zone, steam separator, overheated zone, steam pipeline, and turbine. No heat conductions and exchanges exist along the pipe, and the steam has heat-absorbing uniformity. The same heat pipes with the uniform diameter and thickness are used. The radial intensity of heat transferring around the pipe is uniform. The steam in the pipe flows with a constant speed along the pipe. Here is a list of all physical parameters used in this paper::medium enthalpy at the outlet of the economizer (kJ/kg);:steam pressure at the outlet of the economizer (MPa);:feed-water flow at the outlet of the economizer (kg/s);:steam pressure at the outlet of the evaporation zone (MPa);:steam temperature at the outlet of the evaporation zone (K);:steam density at the outlet of the evaporation zone (kg/m³);:metal mass of the evaporation zone (kg);:steam flow at the outlet of the evaporation zone (kg/s);:internal energy of steam at the outlet of the evaporation zone (kJ/kg);:metal temperature at the outlet of the evaporation zone (K);:specific heat capacity of the metal in evaporation zone (kJ/(kg·K));:steam enthalpy at the outlet of the evaporation zone (kJ/kg);:average steam density in evaporation zone (kg/m³);:heat which the steam transfers to the metal pipe in evaporation zone (kJ/s);:heat which the metal pipe transfers to the steam in evaporation zone (kJ/s);:length (m) and volume () of the evaporation zone;:metal mess of the steam separator (kg);:inner surface area of the steam separator (m²);:steam temperature at the outlet of the separator (K);:volume of the separator ();:metal temperature at the outlet of the separator (K);:steam flow at the outlet of the separator (kg/s);:steam density at the outlet of the separator (kg/m³);:specific heat capacity of the separator's metal (kJ/(kg·K));:steam enthalpy at the outlet of the separator (kJ/kg);:steam pressure at the outlet of the separator (MPa);:heat which the steam transfers to the metal pipe in separator (kJ/s);:specific heat capacity under constant pressure in pipe (constant);:average specific heat capacity of the steam in heat-transfer zone (kJ/(kg·K));:coal-fired value (kg/s);:the steam temperature difference between input and output of the economizer (K).

By establishing the differential equations for the supercritical once-through boiler generation units, the model of the evaporation zone and the steam-separator can be acquired [34, 35].

2.1.1. Modeling of the Steam Separator

If there is no other source which transfers heat to the separator, the following equations can be written as As , the equation is simplified as

2.1.2. Modeling of the Evaporation Zone

It is assumed that the steam and the liquid medium are thoroughly mixed without any pressure loss. Therefore, the differential equations are presented as Due to , the result is simplified as As , the equation can be further simplified as where , is considerd as a constant.

Meanwhile, the steam evaporated equation is given as The steam momentum equation is The derivative of (7) is Therefore, the system's state equation is obtained as The affine nonlinear system [36] can be defined as where the state vector about (9) is , the control vectors are and , and the vectors , , and can be written as

2.2. Exact Feedback Linearizing Controller Design

The nonlinear system is difficult to solve as the model from (9) includes five independent variables. To simplify the model of IPT, only the variables and equations which are related to IPT are chosen while others are ignored. The simplified model is expressed in the general form of affine nonlinear system (10). The chosen equations can be written as Due to definition of (10), the state vector is , the output vector is , the control vector is , and the vectors , are Therefore, the chosen model (12) could be considered as a single-input and single-output system. The controller based on exact feedback linearization can be designed through the following steps.

2.2.1. Calculation of Relative Degree and Coordinate Transformation

In order to obtain the relative degree, the LIE derivative should be calculated.

Firstly, the LIE derivative is figured out as Assuming that from (15) is satisfied, therefore the relation degree is .

Secondly the coordinate transformation can be written as where is the referenced steam enthalpy at the outlet of the separator and also named as the referenced intermediate point enthalpy in this paper ( = = 2666.89 kJ/kg).

Finally, a new linear system after coordinate transformation and exact feedback linearization is derived as where is named as the optimal control vector of the linear system. The linear system is , which is a completely controllable Brunovsky linear system.

2.2.2. Design of Control Law

Using the optimal control law [37], can be written as where . Assuming that , is the solution of the following Riccati equation: where the Brunovsky standard coefficient matrices and are is a positive definite or semidefinite symmetric matrix. Assuming that , the solution of (19) is derived as Therefore, the optimal control vector from (18) can be written as As the relationship between linearity and nonlinearity is , the exact feedback linearizing control law can be obtained as

3. Simulation on Control of IPT via Affine Nonlinear System

To verify the validation of the law (23) for supercritical units, the stability analysis and simulations of the proposed algorithms are necessary and essential.

3.1. System Stability Analysis

The enthalpy formula is difined as

The enthalpy can be obtained by using (24). Here is the list of the parameters for a 600 MW supercritical unit (boiler type: SG1913/25.40-MXXX). , = 27.8 Mpa, = 2666.8898 kJ/kg, , , , , , , , and .

With these parameters at full load, the equations are obtained as

The Lyapunov Law is used to analyze the stability of the systems (25) and (26). The model (25) can be simplified as Assuming that and (27) equals , are derived as With the assumptions , , the vector after derivative is obtained as Therefore, the coefficient matrix can be written as

At 100% load, is = 486 kg/s. The eigenvalues after introducing into (30) are , . According to the Lyapunov Law [38], if all eigenvalues of matrix have negative real parts, the system (25) is asymptotically stable under condition of (28). Therefore the system (25) is asymptotically stable at 100% load. The load is varied from 100% to 30% while keeping other parameters constant. The coefficient matrix eigenvalues at different loads are obtained and presented in Table 1.

From Table 1, it is shown that all coefficient matrix eigenvalues have negative real parts. Therefore, the nonlinear system is asymptotically stable at different loads.

3.2. Simulation with Disturbance of Feed-Water Flow

In order to reflect the real dynamic of the practical system, the feed-water flow disturbance is considered in the simulation. The structure diagram of affine nonlinear system is presented in Figure 1.

Figure 1 

Structure diagram of affine nonlinear system.

The model in Figure 1 is from (25), and the controller output is from (26). At 100% load, parameters and are introduced into the system. The performance without the feed-water flow disturbance is presented in Figure 2.

Figure 2 

Performance of affine nonlinear system on IPT at 100% load.

In Figure 2, at 100% load, the system peaks at 2765 kJ/kg which means the overshoot is 3.7%, the regulation time is 8 s, and the steady-state output is 2667.4 kJ/kg. Then the noise signal is considered as the feed-water flow disturbance and injected into the controller output . The system response is presented in Figure 3.

Figure 3 

Performance with the feed-water flow disturbance at 100% load.

As shown in Figure 3, sudden increase of the feed-water flow can lead to the decrease of the intermediate point enthalpy. The result that the enthalpy of IPT recovers rapidly after disturbance means the performances match practical operation of the 600 MW supercritical unit. Therefore, it is concluded that the model of affine nonlinear system on IPT in this paper is valid and reasonable.

3.3. Results at Different Loads

To study the affine nonlinear system further, more simulations have been conducted on IPT for the 600 MW supercritical unit at different loads (boiler type: SG1913/25.40-MXXX). While keeping other parameters constant, different loads leads to different , respectively, in Table 2. Then simulations with the same feed-water flow disturbances have been conducted after substituting into (25) and (26). The noise signal is considered as the feed-water flow disturbance and adopted into the controller output at 15 s (except 40 s at 80% load). The simulation performances at different loads are presented in Figure 4.

(a) 100%

(b) 90%

(c) 80%

(d) 70%

(e) 60%

(f) 50%

(g) 40%

(h) 30%

(a) 100%
(b) 90%
(c) 80%
(d) 70%
(e) 60%
(f) 50%
(g) 40%
(h) 30%

Figure 4 

Response of affine nonlinear system at different loads.

As shown in Figure 4(c), simulations at different loads are similar and tend to stability finally.

3.4. Results after Simulation

The results such as the overshoot , the regulation time , and the enthalpy difference are recorded into Table 2 at different loads. (: before increasing feed-water flow disturbance. : after increasing disturbance.)

The results in Table 2 show that the model of affine nonlinear system is able to reduce the enthalpy with the increase of feed-water flow. Its results matche practical conditions and can recover stability rapidly.

4. Contrast Study on IPT with PID Control

4.1. Simulation of PID Control

4.1.1. Calculation of System Transfer Function

In engineer application, PID control is used widely. To compare it with the optimal control, the PID control is applied in this paper to control of IPT. As the model via affine nonlinear system is state equation which cannot be simulated with PID controller directly, it is essential that the system transfer function should be calculated by point approximation linearization. The first equation of (12) after derivation is obtained as Both sides of (31) after integrating at can be written as where .