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Article

Study on the Staged Operation of a Multi-Purpose Reservoir in Flood Season and Its Effect Evaluation

1
College of Architecture and Civil Engineering, Guangxi University, Nanning 530004, China
2
Key Laboratory of Disaster Prevention and Structural Safety of the Ministry of Education, Nanning 530004, China
3
Guangxi Key Laboratories of Disaster Prevention and Engineering Safety, Nanning 530004, China
4
School of Water Conservancy and Civil Engineering, Northeast Agricultural University, Harbin 150006, China
*
Author to whom correspondence should be addressed.
Water 2021, 13(18), 2563; https://doi.org/10.3390/w13182563
Submission received: 10 August 2021 / Revised: 6 September 2021 / Accepted: 15 September 2021 / Published: 17 September 2021
(This article belongs to the Special Issue Flood and Other Hydrogeomorphological Risk Management and Analysis)

Abstract

:
A reasonable analysis of flood season staging is significant to the management of floods and the alleviation of water shortage. For this paper, the case of the Chengbi River Reservoir in China was selected for study. Based on fractal theory, the flood season is divided into several sub-seasons by using four indexes (multi-year average daily rainfall, multi-year maximum rainfall, multi-year average daily runoff, and multi-year maximum daily runoff) in this study. Also the Benefit-Risk theory is applied to evaluate the effects of staged dispatching. The results show that the flood season of the Chengbi River basin should be divided into the pre-flood season (13 April–6 June), the main flood season (7 June–9 September) and the post-flood season (10 September–31 October). After adjusting the flood limit water level for sub-season and benefit assessment, the probability of exceedance after reservoir flood season operation increases by 0.13 × 10 - 5 , the average annual expected risk is 0.2264 million RMB, and the average annual benefit increases by 0.88–1.62 million RMB. The benefits obtained far outweigh the risks, indicating the importance of staging the flood season.

1. Introduction

According to the statistics of the United Nations Environment Program, compared to the past 100 years, the global annual water resources per capita have reduced from 40,000 m3 to 6840 m3. Additionally, it is expected that by 2030, nearly 50% of the world’s population will have less than 1000 m3 of annual per capita water resources and will be in a state of severe water shortage [1]. With the development of society and growing populations, water shortages are becoming more and more prominent. However, large amounts of water have been discharged during the flood season, resulting in a huge waste of water resources. Nowadays, the use of floods has become more and more important in most areas [2]. Reservoir scheduling is an effective way to utilize flood resources and has been studied by a large number of scholars [3,4,5,6]. In most of the countries, floods have seasonal patterns of change, and it is necessary to study the flood season and stage it rationally to raise the FLWL (flood limit water level) of the reservoir appropriately. In this way, flood resources can be used to a greater degree, which is one of the important issues that needs to be studied and solved today.
There have been many studies on the seasonal patterns and staging of floods during the flood season [7,8,9,10,11,12]. Different staging methods have been used to segment the flood season, such as the probabilistic change-point analysis technique [13], the vector statistic and relative frequency method [14,15,16,17], and the fuzzy set method [18,19,20,21]. As for the selection of indicator factors for staging, most previous studies have used a single factor to stage the flood season. For example, peak flow [22] or average daily maximum flow [23] are used as a single indicator factor for flood staging studies, causing the staging results to not be mutually verified. A reasonable determination of the FLWL is the key to coordinate flood risk and reservoir benefit [24]. Therefore, many scholars have carried out extensive research on the optimization of FLWL. An FLWL model dynamic control was applied to reservoirs with indeterminate flood process lines, which effectively improved hydropower generation and flood utilization [25]. Liu et al. [26] optimized the design of staged flood limit levels, and a framework for optimal reservoir scheduling based on flood staging results was proposed [27].
In summary, most previous studies have used a single indicator factor for flood staging leading to uncertainty in the results. In addition, there is less involvement in the calculation of FLWLs for each phase and the evaluation of the benefits of the flood staging. Therefore, the objective of this study is to stage the flood season by selecting multiple indicator factors and then evaluate the benefits of the staging results. The Chengbi River reservoir is selected as the object of this study. Multi-year average daily rainfall time series, multi-year maximum rainfall time series, multi-year average daily runoff time series, and multi-year maximum daily runoff time series are used as index factors to divide flood season by fractal method. The benefit-risk theory is applied to evaluate the effects of staged dispatching.

2. Methodology

2.1. Fractal Method

According to fractal theory, hydrological processes that exhibit periodic changes over a certain period of time (influenced by deterministic factors) can be considered to be self-similar [28]. The occurrence of seasonality and timing of floods can be considered to have similar mechanisms, and so the fractal theory has been used in flood staging [29]. The fractal feature is described by capacity dimension. Assuming F is a bounded subset of the d-dimensional Euclid space and N ( ε ) is the least number of closures covering F of radius ε , then the capacity dimension D b is defined as follows [30].
D b = lim ε 0 ( log N ( ε ) / log ( 1 / ε ) )
The capacity dimension is calculated as follows:
(1)
Take the sample point series x 1 , x 2 , , x n in the flood season, and determine the period length T according to the start length and step span of the sample period, then select the flood season segmentation level Y in period T to reflect its sample.
(2)
Take the time scale ε = { 1 d , 2 d , , 10 d } and count the number of periods N ( ε ) in which the sample x i exceeds the segmentation level Y. Calculate the corresponding relative time scales N T ( ε ) and relative measures N N ( ε ) from Equation (2) and Equation (3) based on T and ε , and a linear fit to ln ( ε ) and ln N N ( ε ) to find the slope b of the correlation. The capacity dimension D b is obtained from Equation (4).
N T ( ε ) = T / ε
N N ( ε ) = N ( ε ) / N T ( ε )
D b = 2 b
(3)
Change the period length T and repeat the above steps. If the D b obtained is basically equal, then T at this time is the same stage.

2.2. Risk and Benefit Analysis Methodology

2.2.1. Probability of Exceedance

Considering only the effect of flooding factors, the reservoir staging dispatch probability of exceedance calculation model is as follows.
P = P ( q Q )
where q represents a random variable. P-III (Pearson type III) curve is generally used in flood peak discharge frequency curve. Then its density function can be expressed as
f ( q ) = β α Γ ( α ) ( q a 0 ) α 1 e β ( q a 0 )
Γ ( α ) —The gamma function of α .
α , β , a 0 —Three parameters characterizing the shape, scale and location of P-III distribution. α > 0 , β > 0 .
The cumulative distribution function can be expressed as
P = P ( q Q ) = Q f ( q ) d q

2.2.2. Benefit Analysis

In the benefit analysis, the reservoir capacity should be calculated according to the actual situation. The increased capacity will not only bring direct benefits in terms of power generation and water supply, but also generate indirect economic benefits such as irrigation, farming, tourism, etc. Water supply and power generation benefits are calculated using the following formula.
W = V × η
where W is the economic benefit from water supply or electricity generation, V is the additional storage capacity after adjusting the FLWL, and η is the economic efficiency for one cubic meter of water.

3. Study Area and Data

The Chengbi River Reservoir is located in Baise City, Guangxi Province, downstream of Chengbi River, (106°21′ E–106°48′ E, and 23°50′ N–24°45′ N) (Figure 1). It is the second-largest earth-rock fill dam reservoir project in China, with a total storage capacity of 1.15 billion m3 and a normal storage level of 185 m. The engineering characteristics parameters of the reservoir are shown in Table 1. It operates under the rule of a single FLWL for the entire flood season, resulting in a low storage rate after floods and a large waste of flood resources. The average precipitation of the watershed over the years is 1560 mm, and the rainfall is unevenly distributed during the year, mostly concentrated in April to September, accounting for more than 85% of the annual rainfall. The flood season of the Chengbi River is from 13 April to 31 October with a low storage rate after flood season. The data selected in this paper are the daily precipitation and daily measured runoff from Ba Shou Station (BSS) from 1963 to 2016, and the four index factors (average daily rainfall, maximum daily rainfall, average daily runoff, and maximum daily runoff) which reflect the characteristics of the flooding period are used as the basic data of staging.

4. Results

4.1. Flood Staging Results

The fractal calculation was carried out based on the runoff and rainfall data of the Chengbi River Reservoir from 1963 to 2016. When calculating the capacity dimension D b , taking into account the seasonal characteristics of the flood change pattern and its causes, the staging is generally not shorter than 30 days [31]. According to scholars [32,33], the maximum deviation of the capacity dimension of a fractal is less than 5% classified as a class. The initial length of the study is 30 d, then 10 d as a step to calculate the D b , and finally shortened to 5 d for the calculation. The results are shown in Table 2, Table 3, Table 4 and Table 5.
From Table 2, it can be seen that the maximum deviation of the D b at T = 30   d ~ 55   d is 1.96% (<5%) of the minimum capacity dimension, so it is in the same stage. When T = 60   d , it is not considered to be in the same stage as the previous time period, because the value of D b is mutated and the maximum deviation is 13.05% (>5%). Therefore, the pre-flood season can be identified as 13 April to 6 June. A sudden change in the value of the D b at time period T = 85   d , with a maximum relative error of 1.74% in the preceding time period, which can be classified as the second stage. Accordingly, the main flood season can be identified as 7 June to 25 August, and the duration of the post-flood season is from 26 August to 31 October.
Using a relative error equal to 5% as the threshold for whether or not it is the same stage, it is clear from Table 3 and Table 4 that the flood season can be divided into three phases. The flood segmentation results by using average daily maximum rainfall as an indicator factor is as follows: the pre-flood season (13 April to 6 June), the main flood season (7 June to 30 August), the post-flood season (31 August to 31 October). The flood segmentation results by using average daily maximum rainfall as an index factor is as follows: the pre-flood season (13 April to 11 June), the main flood season (12 June to 30 August), and the post-flood season (31 August to 31 October). As shown in Table 5, the flood segmentation using multi-year average daily maximum runoff can be divided into four phases, but according to the Code for Hydraulic Calculations for Water Projects, a flood should not be divided into more than three sub-flood seasons. Therefore, based on the multi-year runoff characteristics of the Chengbi River basin, combining the first and second phases into one as the pre-flood season. Then, the pre-flood season is from 13 April to 16 June, the main flood season is from 17 June to 9 September, and the post-flood season is from 10 September to 31 October.
The results of the above calculations are summarized in the Table 6. Taking into consideration and based on the principle of extending the main flood season as much as possible, the results of the phasing were revised as follows: the pre-flood season is from 13 April to 6 June, the main flood season is from 7 June to 9 September, and the post-flood season is from 10 September to 31 October.

4.2. Results of Flood Diversion Calculation

4.2.1. Control Water Level

The maximum water level obtained from the flood regulation calculation in the main flood season is used as the control water level to raise the FLWL in other stages. Flood regulation calculations for the 1000-year and 10,000-year flood process lines in the main flood season starting at 185 m. The reservoir operation policy of flood regulation is that when the reservoir inflow is less than the rated storage outflow at the FLWL (1800 m3/s), gates are used to control the outflow is equal to the incoming flow so that the water level in the reservoir could maintain the FLWL. When the reservoir inflow is greater than 1800 m3/s, the gates are fully open to discharge flow. When the reservoir water level falls back to the FLWL, the discharge is controlled by the gates to keep the water level unchanged. The change of water level in the flood regulation calculation is shown in Figure 2. Then, the highest water level in the 1000-year flood regulation calculation in the Chengbi River Reservoir during the main flood season is 187.85 m, and the highest water level in the 10,000-year flood is 189.13 m, which are used as the control levels in the flood regulation calculation during the pre-flood season and post-flood season.

4.2.2. Flood Limit Water Level

Since raising the FLWL during the main flood season is not considered, only the different starting levels for the pre-flood season and the post-flood season are trialed. The initial water level is adjusted from 185 m and trialed in steps of 0.5 m. The results are summarized in Table 7. It can be seen that the maximum water level will not exceed the control level of 187.85 m when the FLWL is between 185.0 and 187.5 during the flood regulating calculation at the 1000-year flood process line in the pre-flood season. In the 10,000-year flood process line flood adjustment calculation, when the FLWL is 185.0 to 188.0 m, the maximum water level will not exceed the control level of 189.13 m. Therefore, the FLWL of the pre-flood season is set between 185.0 and 187.5 m without reducing the flood control standard of the reservoir. Correspondingly, the FLWL in the post-flood season is set between 185.0 and 187.5 m.
To sum up, the FLWL of Chengbi River reservoir in the pre-flood season and the post-flood season can be increased to some extent. However, for the pre-flood season in April and May, it makes little sense to raise the FLWL. Firstly, it is the time when agriculture in Baise City needs a lot of water, so it becomes impractical to raise the FLWL of the reservoir by reducing the water supply. Secondly, the interval between the beginning and end of the pre-flood season is only 54 days, and the main flood season still maintains the FLWL unchanged. Based on the above considerations, only the FLWL of the post-flood season is raised.

4.3. Risks and Benefits

The paper calculates the FLWL for the post-flood season in 0.5 m increments to obtain probability of exceedance and its increases for different starting water levels (Figure 3), and the expected risk and expected risk increases (Figure 4). When the FLWL is set at 187.5 m in the post-flood season, the maximum probability of exceedance is 2.52 × 10 5 , which is less than the reservoir calibration flood of 1 × 10 4 . Compared to the original flood level, the probability of exceedance increases by 2.34 × 10 5 . From Figure 3, it can be seen that when the FLWL is 185 m~186 m, the probability of exceedance changes very little and the trend of increasing probability of exceedance is moderate. However, when the FLWL is 186–187.5 m, the probability of exceedance tends to increase abruptly. The probability of exceedance of the average FLWL of 186 m in the post-flood season is 0.31 × 10 - 5 , which is an increase of 0.13 × 10 - 5 compared to the original level. From Figure 4, it can be seen that when the FLWL is set at 185–186 m, there is little trend in the expected risk of flood protection. However, when the FLWL is set at 186–187.5 m, the expected risk increases steeply.
The risk-benefit analysis was carried out by setting the flood level of the Chengbi River Reservoir at 186 m in the post-flood season; the average increase of beneficial capacity is 0.04 billion m3. With the information about water supply and power generation from 2019 to 2020, the increase of beneficial capacity is used for power generation or water supply was calculated. Then, the average annual increase in benefits is between 0.88 and 1.62 million RMB. The increase in expected risk of 0.0093 million RMB relative to the original level when the FLWL during the post-flood season of the reservoir is 186 m. And after taking into account the increased inundation losses of 0.2171 million RMB at that level, the sum of the average annual expected increase in risk is 0.2264 million RMB, which is much less than the expected benefit.

5. Discussion and Conclusions

Research on reservoir flood staging and FLWL is significant for improving the utilization of water resources. The study selects multi-year average daily rainfall time series, multi-year maximum rainfall time series, multi-year average daily runoff volume time series, and multi-year maximum daily runoff volume time series as index factors, and uses the fractal method to stage flood season. Finally, the effect of phased dispatching is evaluated in relation to the Benefit-risk theory. The results are as follows:
The pre-flood season of Chengbi River Reservoir is from 13 April to 6 June, the main flood season is from 7 June to 9 September, and the post-flood season is from 10 September to 31 October. Considering the irrigation water demand and flood control risk around the reservoir area, the FLWLs in each stage was finally determined to be 185 m in the pre-flood season, 185 m in the main flood season, and 185~187.5 m in the post-flood season. It is found that when the FLWL in the post-flood season is set at 186 m, the probability of exceedance after reservoir operation by stages in the flood season increases by 0.13 × 10−5, the average annual expected risk is 0.2264 million RMB. However, the average annual increase in benefits is 0.88 to 1.62 million RMB.
Compared with the research results of existing scholars [34,35,36], the present study classifies the flood season to the daily scale with improved accuracy. When the average daily rainfall was used to stage the flooding of the Chengbi River reservoir, the multi-year average series differed from the multi-year maximum series by about five days. Using daily runoff for flood staging, the maximum deviation of the multi-year average series and multi-year maximum series results is about 10 days. The difference between the calculated results of the average daily rainfall time series and the average daily runoff time series is 5 to 10 days. It suggests that the selection of different factor indicators can have an impact on flood staging.
In this study, the staging and scheduling of reservoir floods and the determination of FLWL are investigated. The innovation of the paper is that fractal methods and multiple index factors are used to divide the flood season into daily scales, which improves the staging accuracy. However, there are still some shortcomings in the study. Improvements are needed in the following areas. Firstly, in terms of flood staging, it is recommended that multiple methods of staging should be used and then mutually validated because of the uncertainty and complexity of hydrology. Secondly, the indirect benefits of tourism and aquaculture due to increased storage capacity have not been calculated because of limited information. Finally, this study is based on long-term rainfall and runoff data, but one direction of research on reservoir scheduling is to forecast the future based on short-term data [37], and how to combine long-term and short-term data needs to be studied further in the future.

Author Contributions

Conceptualization, C.M., Z.X., and G.S.; formal analysis, X.L.; funding acquisition, C.M.; methodology, Y.R.; resources, C.Z. and X.L.; writing—original draft, C.M. and C.Z.; writing—review and editing, Y.R., Z.X., and G.S. All authors have read and agreed to the published version of the manuscript.

Funding

The authors are grateful for the support of the National Natural Science Foundation of China (51969004, 51979038 and 51569003), the Guangxi Natural Science Foundation of China (2017GXNSFAA198361), and the Innovation Project of Guangxi Graduate Education (YCBZ2019022).

Institutional Review Board Statement

Not applicable.

Informed Consent Statement

Not applicable.

Data Availability Statement

Some or all data, models, or code generated or used during the study are proprietary or confidential in nature and may only be provided with restrictions. We will conduct further research on this aspect in the future. The existing research data will be gradually developed in the subsequent papers, and it is only temporarily confidential at present.

Conflicts of Interest

The authors declare no conflict of interest.

References

  1. Eckstein, G.; Paisley, R.K.; Burchi, S.; Curlier, M.; Stephan, R.M. The Greening of Water Law: Managing Freshwater Resources for People and the Environment; Social Science Electronic Publishing: Rochester, NY, USA, 2010. [Google Scholar]
  2. Chang, J.; Guo, A.; Du, H.; Wang, Y. Floodwater utilization for cascade reservoirs based on dynamic control of seasonal flood control limit levels. Environ. Earth Sci. 2017, 76, 260. [Google Scholar] [CrossRef]
  3. Chao, M.; Rui, X.; Wei, H.B. Determining the limiting water level of early flood season by combining multiobjective optimization scheduling and copula joint distribution function: A case study of three gorges reservoir. Sci. Total Environ. 2020, 737, 139789. [Google Scholar]
  4. Feng, Z.; Niu, W.; Jiang, Z.; Qin, H.; Song, Z. Monthly Operation Optimization of Cascade Hydropower Reservoirs with Dynamic Programming and Latin Hypercube Sampling for Dimensionality Reduction. Water Resour. Manag. 2020, 34, 2029–2041. [Google Scholar] [CrossRef]
  5. Rani, D.; Mourato, S.; Moreira, M. A Generalized Dynamic Programming Modelling Approach for Integrated Reservoir Operation. Water Resour. Manag. 2020, 34, 1335–1351. [Google Scholar] [CrossRef]
  6. Lu, S.; Sun, H.; Sun, D.; Guo, M.; Bai, X. Assessment on reservoir flood resources utilization of Ankang Reservoir, China. Resour. Policy 2020, 68, 101745. [Google Scholar] [CrossRef]
  7. Chen, L.; Guo, S.; Yan, B.; Liu, P.; Fang, B. A new seasonal design flood method based on bivariate joint distribution of flood magnitude and date of occurrence. Int. Assoc. Sci. Hydrol. Bull. 2010, 55, 1264–1280. [Google Scholar] [CrossRef] [Green Version]
  8. Collins, M.J. River flood seasonality in the Northeast United States: Characterization and trends. Hydrol. Process. 2018, 33, 687–698. [Google Scholar] [CrossRef]
  9. Hall, J.; Blöschl, G. Spatial Patterns and Characteristics of Flood Seasonality in Europe. Hydrol. Earth Syst. Sci. Discuss. 2017, 22, 3883–3901. [Google Scholar] [CrossRef] [Green Version]
  10. Li, T.; Zhang, Y. Considering Abrupt Change in Rainfall for Flood Season Division: A Case Study of the Zhangjia Zhuang Reservoir, Based on a New Model. Water 2018, 10, 1152. [Google Scholar]
  11. Mukherjee, K.; Pal, S.; Mukhopadhyay, M. Impact of flood and seasonality on wetland changing trends in the Diara region of West Bengal, India. Spat. Inf. Res. 2018, 26, 357–367. [Google Scholar] [CrossRef]
  12. Yong, J.; Jianliang, L. Numerical Analysis and Calculation Methods; Science Press: Beijing, China, 2012. [Google Scholar]
  13. Liu, P.; Guo, S.; Xiong, L.; Chen, L. Flood season segmentation based on the probability change-point analysis technique. Int. Assoc. Sci. Hydrol. Bull. 2010, 55, 540–554. [Google Scholar] [CrossRef]
  14. Campos-Aranda, D.F. Definition of three flood seasons using directional statistics. Tecnol. Y Cienc. Del Agua 2017, 8, 155–165. [Google Scholar] [CrossRef]
  15. Cunderlik, J.M.; Ouarda, T.B.M.J.; Bobée, B. On the objective identification of flood seasons. Water Resour. Res. 2004, 40, 1520. [Google Scholar] [CrossRef] [Green Version]
  16. Chen, L.; Pan, Z.; Liu, W. Flood season staging and Its rationality verification of Longtan Hydropower Station. WATER POWER 2019, 45, 17–21. [Google Scholar]
  17. Bo, H.; Dong, X.; Deng, X. Study on flood season staging method of Three Gorges reservoir. Yellow River 2011, 33, 43–44. [Google Scholar]
  18. Beurton, S.; Thieken, A.H. Seasonality of floods in Germany. Int. Assoc. Entific Hydrol. Bull. 2009, 54, 62–76. [Google Scholar] [CrossRef]
  19. Shu, Z.; Liu, J.; Dong, X. Study on extreme value distribution of precipitation by stages in flood season based on fuzzy set analysis. J. Hydroeletric Eng. 2017, 36, 55–64. [Google Scholar]
  20. Jia, M.; Mu, X. Application of fuzzy set analysis method in reservoir flood season staging. J. Water Resour. Water Eng. 2015, 26, 178–181. [Google Scholar]
  21. Li, X.; Zhou, Y.; Wang, Y. Discussion on the limited water level of Xiaolangdi Reservoir by stages based on fuzzy set analysis method. In Proceedings of the New Development of International Roller Compacted Concrete Dam Technology and High Quality Construction Management of Reservoir Dam–2019 Academic Annual Meeting of China Association of Dam Engineering, Kunming, China, 11–12 November 2019. [Google Scholar]
  22. Ma, R.; Song, L.; Xia, L. Dynamic control of flood limit water level of Baise reservoir based on design flood hydrograph method. Hydropower Energy Sci. 2017, 35, 38–41+34. [Google Scholar]
  23. Zhang, D.; Zhao, L.; Xu, X. Flood Stage of Large-scale Water Conservancy Project in Mountainous Area of South China Based on Fractal Theory. Water Resour. Power 2019, 37, 46–49. [Google Scholar]
  24. Eum, H.-I.; Simonovic, S.P. Integrated Reservoir Management System for Adaptation to Climate Change: The Nakdong River Basin in Korea. Water Resour. Manag. 2010, 24, 3397–3417. [Google Scholar] [CrossRef]
  25. Xiang, L.; Guo, S.; Pan, L.; Chen, G. Dynamic control of flood limited water level for reservoir operation by considering inflow uncertainty. J. Hydrol. 2010, 391, 124–132. [Google Scholar]
  26. Liu, P.; Li, L.; Guo, S.; Xiong, L.; Zhang, W.; Zhang, J.; Xu, C.Y. Optimal design of seasonal flood limited water levels and its application for the Three Gorges Reservoir. J. Hydrol. 2015, 527, 1045–1053. [Google Scholar] [CrossRef]
  27. Jiang, H.; Yu, Z.; Mo, C. Reservoir Flood Season Segmentation and Optimal Operation of Flood-Limiting Water Levels. J. Hydrol. Eng. 2014, 20, 05014035. [Google Scholar] [CrossRef]
  28. Tian, F.; Yuan, X.; Wang, X.; Geng, Q. Review on disaster prevention fractal theory of nonlinear dynamic system in rivers (networks) at home and abroad. J. Hydraul. Eng. 2018, 49, 926–936. [Google Scholar]
  29. Li, J.; Li, R.; Li, J.; Xie, K.; Miao, Y. Separating reservoir flood season into sub-seasons based on fractal theory. Desalination Water Treat. 2018, 125, 310–318. [Google Scholar] [CrossRef]
  30. Fang, C.; Guo, S.; Duan, Y.; Duong, D. Two new approaches to dividing flood sub-seasons in flood season using the fractal theory. Chin. Sci. Bull. 2010, 55, 105–110. [Google Scholar] [CrossRef]
  31. MWR. Regulation for Calculating Design Flood of Water Resources and Hydropower Projects (SL 2006); China Water & Power Press: Beijing, China, 2006. [Google Scholar]
  32. Liu, Z.; Yan, A.; Wu, X. Flood staging based on fractal dimension. Yellow River 2010, 32, 49–51. [Google Scholar]
  33. Qian, J.; Zheng, M. Research on the Classification of Seasonal Flood Periods. China Rural. Water Hydropower 2012, 1, 89–90+94. [Google Scholar]
  34. Ma, R. Risk Analysis Methods and Applications for Earth and Rock Dams; Science Press: Beijing, China, 2004. [Google Scholar]
  35. Wei, W.; Mo, C.; Liu, L.; Jiang, Q.; Sun, G.; Jiang, H. Application of Watershed Rainfall Fractal Theory in Reservoir Flood Season Staging. Yellow River 2014, 36, 39–41. [Google Scholar]
  36. Huang, Z.; Jiang, H.; Mo, C. Countermeasures for Problems existing in operation regulation of Chengbihe Reservoir. Guangxi Water Resour. Hydropower Eng. 2013, 2, 89–92. [Google Scholar]
  37. Ramaswamy, V.; Saleh, F. Ensemble Based Forecasting and Optimization Framework to Optimize Releases from Water Supply Reservoirs for Flood Control. Water Resour. Manag. 2020, 34, 989–1004. [Google Scholar] [CrossRef]
Figure 1. Location of the Chengbi River Reservoir.
Figure 1. Location of the Chengbi River Reservoir.
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Figure 2. Variation of water level in flood regulation calculation of characteristic floods.
Figure 2. Variation of water level in flood regulation calculation of characteristic floods.
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Figure 3. Probability of exceedance and increases in the post-flood season.
Figure 3. Probability of exceedance and increases in the post-flood season.
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Figure 4. Expected risk and expected risk increases at different water levels.
Figure 4. Expected risk and expected risk increases at different water levels.
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Table 1. Engineering characteristics of the Chengbi River Reservoir.
Table 1. Engineering characteristics of the Chengbi River Reservoir.
NameEngineering FeaturesValueNameEngineering FeaturesValue
Reservoir and Damwater level (P = 0.1%)188.17 mHydrometeorsummer mean temperature28.7 °C
water level (P = 0.01%)189.30 mmulti-year average runoff37.8 m3/s
water surface area39.1 km2flood peak flow (P = 0.1%)6460 m3/s
dead water level167.00 mflood peak flow (P = 0.01%)7980 m3/s
total storage1150 hm3Spillwaycrest level of the spillway176.00 m
dead storage380 hm3crest level of the gates185.70 m
crest level of dam190.40 mWidth of spillway4 × 12 m
height of dam70.40 mflood discharge capacity (P = 0.1%)3040 m3/s
crest length425.00 mflood discharge capacity (P = 0.01%)3580 m3/s
Table 2. Staging results of multi-year average daily rainfall.
Table 2. Staging results of multi-year average daily rainfall.
StagesDuration T (d)Threshold Levels (mm)Staged PeriodSlope bDbRelative Error (%)
The first stage306513 April–12 May0.5471.453
407113 April–22 May0.5751.4251.96
507513 April–1 June0.5691.4311.96
557413 April–6 June0.5631.4371.96
607513 April–11 June0.3891.61113.05
The second stage301137 June–6 July0.4991.501
401057 June–16 July0.4931.5070.40
501007 June–26 July0.5091.4911.07
601017 June–5 August0.491.511.27
701047 June–15 August0.4831.5171.74
80987 June–25 August0.4891.5111.74
85977 June–30 August0.3421.65811.2
The third stage306526 August–24 September0.5291.471
406426 August–4 October0.5191.4810.68
506526 August–14 October0.5231.4770.68
606226 August–24 October0.5231.4770.68
676226 August–31 October0.5011.4990.68
Table 3. Staging results of multi-year maximum daily rainfall.
Table 3. Staging results of multi-year maximum daily rainfall.
StagesDuration T (d)Threshold Levels (mm)Staged PeriodSlope bDbRelative Error (%)
The first stage306513 April–12 May0.5681.432
407113 April–22 May0.5751.4250.49
507513 April–1 June0.5681.4320.49
557413 April–6 June0.5621.4380.91
607513 April–11 June0.4891.5116.04
The second stage301137 June–6 July0.5801.42
401047 June–16 July0.5811.4190.85
501007 June–26 July0.5691.4310.85
601007 June–5 August0.5611.4391.41
701037 June–15 August0.5851.4151.70
80987 June–25 August0.5851.4151.70
85977 June–30 August0.5711.4291.70
90967 June–4 September0.4691.5318.20
The third stage306131 August–29 September0.4231.577
405831 August–9 October0.4611.5392.47
506231 August–19 October0.4531.5472.47
626031 August–31 October0.4731.5273.27
Table 4. Staging results of multi-year average daily runoff.
Table 4. Staging results of multi-year average daily runoff.
StagesDuration T (d)Threshold Levels (m3/s)Staged PeriodSlope bDbRelative Error (%)
The first stage301013 April–12 May0.1851.815
401513 April–22 May0.1831.8170.11
502413 April–1 June0.2071.7931.34
603213 April–11 June0.1841.8161.34
653613 April–16 June0.1151.8855.13
704013 April–21 June0.0471.9538.92
The second stage3010512 June–11 July0.5681.432
4010612 June–21 July0.5811.4190.92
5010912 June–31 July0.5401.4602.89
6011012 June–10 August0.5851.4153.18
7011112 June–20 August0.5571.4433.18
8010812 June–30 August0.5681.4323.18
8510712 June–4 September0.4491.5519.61
The third stage305331 August–29 September0.0971.903
404731 August–9 October0.0961.9040.05
504331 August–19 October0.1101.8900.75
623931 August–31 October0.1321.8681.93
Table 5. Staging results of multi-year maximum daily runoff.
Table 5. Staging results of multi-year maximum daily runoff.
StagesDuration T (d)Threshold Levels (m3/s)Staged PeriodSlope bDbRelative Error (%)
The first stage306013 April–12 May0.4341.566
357313 April–17 May0.4321.5680.13
408413 April–22 May0.2671.73310.66
The second stage3021618 May–16 June0.5731.427
3525818 May–21 June0.4921.5085.67
4023818 May–26 June0.4351.5659.67
The third stage3031817 June–16 July0.5231.477
4032117 June–26 July0.5281.4720.34
5030717 June–5 August0.5061.4941.49
6030717 June–15 August0.5021.4981.77
7029417 June–25 August0.5371.4632.39
8028417 June–4 September0.5041.4962.39
8528017 June–9 September0.4901.5103.20
9027517 June–14 September0.4191.5818.07
The fourth stage3016410 September–9 October0.3851.615
4016410 September–19 October0.4231.5772.41
5215910 September–31 October0.4171.5832.41
Table 6. Flood staging results for the Chengbi River Reservoir.
Table 6. Flood staging results for the Chengbi River Reservoir.
Indicator FactorsThe Pre-Flood SeasonThe Main Flood SeasonThe Post-Flood Season
Average daily rainfall13 April–6 June 7 June–25 August 26 August–31 October
Maximum rainfall13 April–6 June7 June–30 August31 August–31 October
Average daily runoff13 April–11 June12 June–30 August31 August–31 October
Maximum daily runoff13 April–16 June17 June–9 September10 September–31 October
Table 7. Operation result of each frequency and start counting water level.
Table 7. Operation result of each frequency and start counting water level.
Flood FrequencyStarting Water Level (m)The Pre-Flood SeasonThe Post-Flood Season
Maximum Storage Capacity (hm3)Maximum Water Level (m)Maximum Storage Capacity (hm3)Maximum Water Level (m)
185.0993.25186.36980.46186.04
185.51005.77186.66993.20186.36
186.01018.87186.971005.98186.67
The 1000-year flood186.51032.06187.281014.80186.88
187.01044.33187.551032.25187.28
187.51057.36187.841050.40187.69
188.01075.97188.251069.04188.1
185.01024.66187.111010.22186.77
185.51037.53187.41022.30187.05
186.01049.80187.681035.69187.36
186.51063.56187.981049.52187.67
The 10,000-year flood187.01077.86188.291063.88187.99
187.51092.72188.621078.80188.32
188.01107.96188.961094.08188.65
188.51123.33189.31105.61188.9
189.0 1121.48189.25
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Mo, C.; Zhu, C.; Ruan, Y.; Lei, X.; Xing, Z.; Sun, G. Study on the Staged Operation of a Multi-Purpose Reservoir in Flood Season and Its Effect Evaluation. Water 2021, 13, 2563. https://doi.org/10.3390/w13182563

AMA Style

Mo C, Zhu C, Ruan Y, Lei X, Xing Z, Sun G. Study on the Staged Operation of a Multi-Purpose Reservoir in Flood Season and Its Effect Evaluation. Water. 2021; 13(18):2563. https://doi.org/10.3390/w13182563

Chicago/Turabian Style

Mo, Chongxun, Can Zhu, Yuli Ruan, Xingbi Lei, Zhenxiang Xing, and Guikai Sun. 2021. "Study on the Staged Operation of a Multi-Purpose Reservoir in Flood Season and Its Effect Evaluation" Water 13, no. 18: 2563. https://doi.org/10.3390/w13182563

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