Abstract
This paper focuses on the stability problems in a hydropower station. To enable this study, we consider a nonlinear hydropower generation system for the load rejection transient process based on an existing hydropower station. Herein we identify four critical variables of the generation system. Then, we carry out the dynamic safety assessment based on the Fisher discriminant method. The dynamic safety level of the system is determined, and the evolution behavior in the transient process is also performed. The result demonstrates that the hydropower generation system in this study case can operate safely, which is in a good agreement with the corresponding theory and actual engineering. Thus, the framework of dynamic safety assessment aiming at transient processes will not only provide the guidance for safe operation, but also supply the design standard for hydropower stations.
1. Introduction
Safety problems in hydropower stations generally cause power supply failures, economic loss of plants, and injury of workers [1, 2]. Hydropower generation system (HGS) coupling with hydraulic-mechanical-electrical-magnetic nonlinear structures acts as a core part of a hydropower station, which is connected with the stability of the station [3–6]. Many safety accidents of the HGS occurred in the last thirty years all over the world [7–9]. For example, seventy-five persons lost their lives because of the damage of HGS in Sayano-Shushenskaya hydropower station (Russia) in 2009 [10]. An explosion accident caused by the rotor unbalance of HGS occurred in Huizhou hydropower station (China) in 2008, which resulted in enormous economic loss [11]. Therefore, it is important to assess the safety level in HGS to improve the stability of hydropower stations.
There are two operation types for the HGS including the small variation and large variation transient process. Generally, the large variation transient processes (i.e., load rejection, load increase/decrease, start-up, and shut-down) often result in unsteady operating conditions of the HGS, which may lead to the safety problems in the hydropower station. For example, the turbine flow and torque rapidly decrease during the load rejection transient process, which results in the fact that the system easily loses its control ability when system variables strongly change. Thus, we should pay more attention to the safety study of the HGS in the transient process, especially in the large variation.
Safety assessment has been extensively studied in many fields and has also obtained significant outcomes [12–15]. Conversely, the safety assessment in hydropower stations is still in the development stage. At present, this study mainly concentrates on the safety topics of flood disasters [16], sewage discharge [17], hydraulic accidents [18], and the safety of water gate [19]. For example, Ettles et al. calculated the safety margin for hydrogenerator thrust bearings [20]. Joannette studied the safety problem of the dam flood [21]. Yan et al. investigated the safety operation of the large hydroelectric generator unit [22]. Liu et al. used the fault monitoring and diagnosis system to study the dam safety [23]. However, the existing studies have not involved the safety study of HGS, which is therefore a great challenge due to its complex nonlinearity.
In light of the above consideration, this paper aims to assess the dynamic safety levels of the nonlinear HGS using the Fisher discriminant method. From the literature [24], Fisher discriminant method has the ability to identify the data with different attribute features by finding the optimal classification plane. That is, Fisher discriminant method can assess the safety levels of the system by successfully realizing the dimensionality reduction of the multidimension sample space. To date, Fisher discriminant method is widely used in many fields due to its advantage of efficient classification, as mentioned in literatures [24–26].
We have three innovations to make our paper attractive compared with the existing papers such as [27, 28]. First, few existing literatures have been proved successfully in applying the dynamic safety assessment to HGSs, especially in large fluctuation transient processes. To overcome this limitation, we focus on presenting a new framework for the dynamic safety assessment of transient HGSs by introducing the Fisher discriminant method. Second, we consider a nonlinear complex HGS that includes some typical nonlinear loops such as the elastic water hammer, the nonlinearity of generator rotor, and the self-excited oscillation. Based on this, four critical system variables are extracted to enable the dynamic safety assessment. Finally, a dynamic safety assessment analysis aiming at the presented HGS for the load rejection transient process is carried out. We show the details of the safety evolution of the HGS during the transient process. From the perspective of statistical theory, the probabilities of dynamic safety levels of the HGS for the transient process are extensively investigated.
The rest of the paper is organized as follows. In Section 2, we review a nonlinear HGS for the load rejection transient process based on an existing hydropower station. In Section 3, we introduce the research method and review the powerful statistical approach called Fisher discriminant method. Section 4 carries out the dynamic safety assessment of the above HGS. Section 5 presents a comparative analysis. Conclusions in Section 6 close this paper.
2. Nonlinear Hydropower Generation System
Hydropower generation system (HGS) as an important part in hydropower station is directly related to the safety of power grid. HGSs are complex system integrated with multiple nonlinear structures. In general, a complete nonlinear HGS is composed of seven typical structures, that is, reservoirs, penstock systems, governors, generators, hydraulic turbine, surge tanks, and draft tubes, which can be shown in Figure 1.
In fact there are two operating types for HGSs in the practical hydropower station, which are the small and large variation transient processes [29]. The small variation transient process refers to the load disturbance less than 10%; otherwise we define it as the large variation transient process [30]. Five typical large variation transients including the power on/off, the load rejection, and the sudden decrease/increase of load have attracted more attention of the researchers all over the world for their ubiquity in hydropower stations. Unexpected accidents caused by the large variation transient will result in serious consequences such as injury and economic loss.
The load rejection transient herein is a study case to further investigate the safety of HGS. As is known to all, the variable of system fluctuates dramatically because the HGS is a high coupled nonlinear system in the load rejection transient. For example, during this transient process, the flow and the torque of hydraulic turbine decrease rapidly with the close of guide vane. Meanwhile, the speed of hydraulic turbine first increases and then decreases. Figure 2 is the schematic diagram of the change laws of variables in HGS.
In this paper, we study the performance of HGS based on an existing hydropower station. Therefore, the closing law of guide vane for the load rejection transient is shown in Figure 3 [31]. It uses two-stage closure mode, and its total transient time is 30 seconds.
Based on the above consideration, we adopt the experimental data and HGS model presented in [31] to obtain the predictive data of the dynamic safety assessment. The dynamic characteristic of the HGS is described by the motion equation and continuity equation shown aswhere , , , , , , , and α are the piezometric head of penstock, the flow velocity, the displacement along penstock direction, the diameter of penstock, the water hammer wave speed, the Darcy-Weisbach resistance coefficient, the gravitational acceleration, and the angle between penstock and horizontal direction, respectively.
Based on the working mechanism of the characteristic line shown in Figure 4, (1) can be converted to the positive and negative characteristic equation, that is, where the subscript denotes the value at the arbitrary time . and are, respectively, the pressure and flow of the pipe, and they can be described as in (3). , , and are expressed as in (4).
Here, the pressure and flow in (2) are universal expressions, which can be used to calculate the pressure and flow of the hydraulic turbine, the draft tube, the spiral case, and the surge tank as the values of characteristic parameters change. These characteristic parameters include the sectional areas and , the flow velocity V, the water hammer wave speed a, and the angle between penstock and horizontal direction α. Furthermore, based on the characteristic curve of flow and speed of hydraulic turbine presented in [31], we also obtain the change law of the speed of hydraulic turbine.
3. Methodology
In this study, a universal Fisher discriminant method [24–26] is used to handle and to analyze the predictive HGS with multisample for the load rejection transient process. The basic idea of Fisher discriminant method is based on the projection theory, which successfully realizes the dimensionality reduction of the multidimension sample space and finally finds the optimal classification plane. We use the training data/samples with multiple variables that have been already sure of their safety levels to analyze the predictive data/samples. That is, we project the training data/samples onto the optimal projection plane that gets as few miss-classifications as possible. The different classification intervals are also determined in the optimal projection plane, as shown in Figure 5. Similarly, we project the predictive data/samples onto the optimal projection plane and then observe its classification interval. In doing so, the safety level of predictive data/samples will be obtained. In this paper, hence, the Fisher discriminant method is used to achieve the dynamic safety assessment of the HGS in the load rejection transient process.
The primary formula of Fisher discriminant method can be described as follows: we assume that there is a linear discriminant function for the training group . Its mean matrix and covariance matrix are, respectively, and , which can be expressed as
The objective function with respect to the linear discriminant coefficient is expressed as where and .
Meanwhile, the linear discriminant function should meet the following discriminant law:
To obtain the final linear discriminant function, we make the objective function reach to its maximal value. That is, the objective function satisfiesBy solving (8), we can obtain the final linear discriminant function; that is,
To conclude, the overall methodology of this paper is performed in Figure 6, and the procedure of dynamic safety assessment of the HGS in the transient process is described as below:(1)Preparatory work: to enable the dynamic safety assessment, we should analyze the accident of the HGS and also obtain the training and predictive HGS data.(2)Use the Fisher discriminant method to judge the safety level of the predictive data at the transient time .(3)Update the safety level of the HGS by repeating step .(4)Understand the safety evolution process and obtain the dynamic safety level of the HGS in the transient process.
4. Dynamic Safety Assessment of HGSs
4.1. Basic Information
In this paper, the safety assessment of a nonlinear HGS is carried out on the basis of an existing hydropower station, and its basic information including the head level and hydraulic turbine is listed in Tables 1 and 2 [31]. In addition to this, the research condition of the HGS is the load rejection transient process. More specifically, the upstream reservoir and tailrace outlet are in the check flood level. In this case, the HGS discards its full load, and the transient time is 30 seconds.
4.2. Dynamic Safety Analysis
To enable this dynamic safety assessment, the training date and predictive data of the HGS for the load rejection transient process are, respectively, performed in Table 3 [32, 33] and Figure 7 [31]. Herein four critical system variables expressed by the relative values; that is, the speed of hydraulic turbine , the pressure of spiral case , the pressure of draft tube , and the pressure of surge tank are extracted to express the characteristic of the HGS. Twenty-one predictive data sets of HGS are selected along with the transient point . The safety levels of data comprised of four grades (i.e., Safety, Tolerable, Unstable, and Risk) are from the modified expert experience since there is no unified standard for the safety assessment of HGSs. The property of four safety levels of the HGS can be described as follows: (a) Safety level means that the HGS works normally. (b) Tolerable level refers to the operation of HGSs with slight vibrations/fluctuations. (c) Unstable level refers to the operation of HGSs with strong vibrations/fluctuations, which should attract the attention of maintenance. (d) Risk level reveals that the HGS cannot work before the repair or replacement.
The training data of HGS in Table 3 is acquired based on the documented experiments and theoretical modification, which can be found in [32, 33]. For the predictive data in Figure 7, it shows the change law of four critical system variables in the load rejection transient process. The predictive data comes from the HGS model presented in the literature [31]. To simplify the calculation of this paper, we use the relative value of the studied variables. The relative value is defined as the ratio between actual value and nominal value.
Based on Table 3 and Figure 7, we use the Fisher discriminant method to analyze the training data in order to classify the safety level of predictive data of the above HGS in the load rejection transient process. The dynamic safety assessment results of the HGS, including the dynamic safety level and dynamic behavior evolution, are shown in Figure 8.
Figure 8 clearly shows the dynamic change of safety level for the nonlinear HGS with the transient time . We find that a large fluctuation of the HGS is mainly concentrated in the transient time range (0, 19). That is, during this time interval, the system experiences the Unstable and Tolerable levels. Conversely, the system is in a safety state as the transient time varies from to . This implies that the HGS suffers a higher disturbance between the transient time and compared with the end stage of this transient process. In fact, it is tightly related to the sudden rejection of the system load, which results in the significant change of system variables. In addition, there are two notable points. The first is that the HGS is in a Tolerable level at the transient time . It means that the fluctuation has taken place for the HGS with the discarding of load. The second is that the HGS does not undergo the Risk level, which means that the studied nonlinear system can realize the efficient self-regulation and resists a great change of power grid.
Moreover, we report the dynamic statistical ratios of the HGS for the four safety levels, as shown in the bar chart of Figure 8. It is demonstrated that the probabilities of Risk, Unstable, Tolerable, and Safety are, respectively, 0, 23.8%, 14.3%, and 61.9%. In other words, the HGS keeps stable for more than half the transient time; meanwhile, there is no risk. From the point of view of internal coupling mechanism, this research result reveals that the HGS can be effectively compatible with its hydraulic, mechanical, and electrical structures.
5. Comparisons
Based on the pipe water pressure testing of the studied HGS presented in [31], the measured maximum and minimum pressures in the penstock/draft pipe/surge tank meet the safety requirement of the hydropower station. This means that the studied HGS cannot suffer the failure in the load rejection transient process (i.e., the probability of Risk level is 0). Moreover, the testing result also reveals that the studied HGS operates normally for the bulk of transient time while it suffers the strong and slight fluctuations for the minor part of time. This is consistent with the probability assessment result referring to the Safety level 61.9% being more than the Tolerable level of 14.3% and Unstable level of 23.8%. However, it is a challenge to estimate the probabilities of Tolerable level and Unstable level in the pipe water pressure testing. Thus, we can conclude that the dynamic safety assessment results of this study can generally reflect the safety of the studied HGS.
6. Conclusions and Discussion
In this paper, we have presented a dynamic framework of safety assessment of HGSs in transient processes. To achieve this, we consider a nonlinear HGS for the load rejection transient process from an existing hydropower station, and the critical system variables are extracted. Then, we have assessed the safety of the HGS using the Fisher discriminant method. The dynamic safety evolution process has been studied, and the safety level has also been determined during this transient process. The result demonstrates that the nonlinear HGS studied in this paper has a better stability because it is in the Safety and Tolerable levels about the probability of 76.2% during the load rejection transient. Meanwhile, there is no Risk level for this HGS. It also reveals that the HGS achieves the perfect performance of antidisturbance and the harmonious operation of its different parts. However, the Fisher discriminant method is a linear projection approach, which may not better reflect some uncertainties existing in the HGS. Therefore, future work will explore a more rigorous evaluation method to improve the reliability of the assessment result.
To date, not many studies pay attention to assessing the safety level of the HGS in large fluctuation transient processes. To overcome this limitation, this work presents a new framework for the dynamic safety assessment of transient HGSs. This not only provides the operation guidance of HGSs, but also gives the design standard for the safe operation of hydropower stations. Furthermore, although the proposed Fisher discriminant method can realize the dimensionality reduction of the multidimension variables for the transient HGS, some drawbacks may not be ignored. For instance, the linear discriminant function (as mentioned in (9)) is generally used to classify the predictive data, which may increase classifying errors. Thus future work will concentrate on the investigation of nonlinear discriminant functions.
Nomenclature
| : | Sectional area of the upstream pipe, |
| : | Water hammer wave speed, m/s |
| : | Sectional area of the downstream pipe, |
| : | Positive characteristic line |
| : | Negative characteristic line |
| , and : | Intermediate variables |
| : | Diameter of penstock, m |
| : | Darcy-Weisbach resistance coefficient |
| : | Hydroturbine speed, rad/s |
| : | Piezometric head of penstock, m |
| : | Pressure of the penstock |
| : | Gravitational acceleration, m/ |
| : | Mechanical torque of the hydroturbine, N·m |
| : | Guide vane opening, rad |
| : | Hydroturbine flow, /s |
| : | Flow of the penstock |
| : | Transient time, s |
| : | Linear discriminant coefficient |
| : | Linear discriminant function |
| : | Flow velocity, m/s |
| : | Displacement along penstock direction, m |
| : | Angle between penstock and horizontal direction, rad |
| : | Guide vane opening, % |
| : | Hydroturbine efficiency, % |
| : | Mean matrix |
| : | Objective function |
| : | Covariance matrix |
| Subscript : | Number of training groups |
| Subscript : | Value at the arbitrary time . |
Conflicts of Interest
The authors declare that they have no conflicts of interest.
Acknowledgments
This study was supported by the National Natural Science Foundation of China (71573256) and the National Key Research and Development Plan of China (2017YFC0804408).