Understanding long-term seasonal or annual or inter-annual rainfall variability and its relationship with large-scale atmospheric variables (LSAVs) is important for water resource planning and management. In this study, rainfall forecasting models using the artificial neural network technique were developed to forecast seasonal rainfall in May–June–July (MJJ), August–September–October (ASO), November–December–January (NDJ), and February–March–April (FMA) and to determine the effects of climate change on seasonal rainfall. LSAVs, temperature, pressure, wind, precipitable water, and relative humidity at different lead times were identified as the significant predictors. To determine the impacts of climate change the predictors obtained from two general circulation models, CSIRO Mk3.6 and MPI-ESM-MR, were used with quantile mapping bias correction. Our results show that the models with the best performance for FMA and MJJ seasons are able to forecast rainfall one month in advance for these seasons and the best models for ASO and NDJ seasons are able do so two months in advance. Under the RCP4.5 scenario, a decreasing trend of MJJ rainfall and an increasing trend of ASO rainfall can be observed from 2011 to 2040. For the dry season, while NDJ rainfall decreases, FMA rainfall increases for the same period of time.

## INTRODUCTION

Rainfall is one of the most important components of the hydrological cycle since rainfall is a major source of water on earth. Rainfall varies due to interactions among the physical processes of the atmosphere–ocean–cryosphere nexus that operate on a wide range of spatial and temporal scales. This complex physics of formation and forecast is yet to be understood in its entirety (Ramirez *et al.* 2005).

The methods used for rainfall forecasting depend on the time scale, the spatial scale, and the particular application of the study. This is due to the nonlinear time series of rainfall. Many studies have been conducted to forecast rainfall using different methods such as numerical weather prediction models (Ganguly & Bras 2003; Davolio *et al.* 2008; Diomede *et al.* 2008), statistical models (Singhrattna *et al.* 2005b; Munot & Kumar 2007; Tuleya *et al.* 2007; Li & Zeng 2008; Nayagam *et al.* 2008; Zaw & Naing 2008; Singhrattna & Babel (2011)) and soft computing based methods like artificial neural network (ANN), support vector regression and fuzzy logic models (Luchetta & Manetti 2003; Guhathakurta 2006; Ghiassi & Nangoy 2009; Srivastava *et al.* 2010; Afshin *et al.* 2011; Gadgay *et al.* 2011; Shukla *et al.* 2011; Kashid & Maity 2012; Donate *et al.* 2013). The applicability of ANN models for rainfall forecasting is well documented in the literature. The analysis of dynamic phenomena such as rainfall by intelligent systems like ANN has given better results than traditional methods such as regression, as proven in recent studies (Ghosh & Mujumdar 2006; Chattopadhyay *et al.* 2010; Srivastava *et al.* 2010; Wu *et al.* 2010; El-Shafie *et al.* 2011, 2012; Golabi *et al.* 2013; Wu & Chau 2013).

However, the capability of a forecasting model is limited, due to an incomplete understanding of trends of long- and short-term rainfall as well as of the effects of external factors on rainfall. The influence of such external factors as wind velocity, sea level pressure (SLP), temperature, aerosol concentration, land use change, and the El Niño Southern Oscillation (ENSO) on local rainfall has been studied in recent times using different prediction techniques (Krishnan *et al.* 2000; Yaremchuk & Qu 2004; Ramirez *et al.* 2005; Singhrattna *et al.* 2005a, 2012; Krishnamurthy & Shakla 2007; Chansaengkrachang *et al.* 2011; Singhrattna & Babel (2011); Bridhikitti 2012; Mekanik & Imteaz 2012). The combined effects of these variables on rainfall variability are more important than the individual effects of these variables on the same.

The inherent natural variability and anthropogenic forcing create uncertain climatic conditions over the world. The fluctuations in climatic occurrences vary from inter-annual-to-decadal time scales to as long as 50 years (Deser *et al.* 2012). To interpret such a climate system, climate model projection is a big challenge due to the different sources of uncertainties (Shepherd 2014). However, in recent years, the ability of general circulation models (GCMs) to predict climatic conditions at the continental and global levels has improved. Also, GCMs can predict conditions under different possible Special Report on Emission Scenarios. In 2008, a new approach called the Coupled Model Inter-comparison Project Phase 5 (CMIP5) was constituted, in order to integrate experiment sets that can simulate climate change and climate variability (Taylor *et al.* 2012). In CMIP5, the Representative Concentration Pathways (RCPs) are based on selected scenarios from modeling work on integrated assessment modeling, climate modeling, and the analysis of impacts. Four RCPs were defined according to the total radiative forcing in the 21st century. RCP8.5 is a radiative forcing scenario that increases to 8.5 W m^{−2} towards the end of the 21st century. Two intermediate scenarios, RCP6 and RCP4.5, are the balancing pathways, under which radiative forcing does not go beyond the peak level by the 21st century. Another scenario, RCP2.6, is the lowest peak-and-decay scenario. GCMs depict climate using a three-dimensional grid over the globe, and their resolution is coarser than the resolution required in impact assessment (Salathe 2003). It cannot be properly modeled by any smaller scale physical process. Thus, their known properties must be averaged over the larger scale in a technique called parameterization which contributes to the uncertainty in GCM-based simulations of future climatic conditions (Trtanj & Houston 2014). Due to such uncertainties and biases in the output of climate models, a bias correction is often needed to make the output suitable for simulations.

According to the Köppen–Geiger climate classification, Thailand has a tropical climate with three classes: tropical monsoon, tropical savannah, and tropical rainforest (Rubel & Kottek 2010). The country suffers climate extremes; where, on the one hand, it experienced a drought in 2010 and on the other, a devastating flood occurred in 2011 due to unexpected heavy rainfall, mismanagement of reservoir operations, and inadequate drainage capacities. Hirabayashi *et al.* (2013) has stated that ongoing climate change may cause an increase in the occurrence of such massive floods. On the other hand, as per the future projections, the frequency of extreme droughts is increased (Hunukumbura & Tachikawa 2012). Such anomalous events create different problems among the economic sectors of the country. It was estimated that economic loss due to the 2011 flood was US$45.7 billion (AON Corporation 2012). Thus, improving the management and planning of water resources has become a necessity. The forecasting models developed in the late 1990s for the Chao Phraya River Basin were mainly focused on real time and event-based simulation. Seasonal rainfall forecast was still missing. Singhrattna *et al.* (2005b) developed a rainfall forecast model for Thailand's summer monsoon using linear regression and non-parametric techniques. Singhrattna & Babel (2011) determined the effects of climate change on summer monsoon rainfall in the Ping River Basin by incorporating large-scale atmospheric variables (LSAVs) and developing the modified k-nearest neighbor (k-nn) model. Long-term prediction using traditional statistical methods is difficult (Kumarasiri & Sonnadara 2006) because rainfall dynamics are dependent on highly unpredictable physical parameters. Analysis of this kind of dynamical phenomena by an intelligent system like ANN has given better results than classical methods in the past recent years and they have become most popular in rainfall forecasting. Afshin *et al.* (2011) obtained the best performance for two-year rainfall forecasting by an ANN model for Karoon Basin, Iran. In 2010, Chattopadhyay *et al.* suggested the suitability of ANN over other methods for rainfall forecasting in other regions in the world using the sea surface temperature (SST) anomaly (Chattopadhyay *et al*. 2010). The ANN model gave good results for the forecast of the monthly August rainfall from ocean–atmospheric indices in India with the use of fuzzy c-mean clustering (Srivastava *et al.* 2010). This approach was suggested to apply for forecasting rainfall of any period in regions where rainfall is significantly related to climate indices. There was better performance of rainfall forecasting on a yearly and monthly basis in Alexandria, Egypt using ANN than multi-layer regression (MLR) model (El-Shafie *et al.* 2011). Silva & Mendes (2015) stated that the ANN technique provides more ability to predict the present climate when compared to the MLR technique for CMIP5 data. Therefore, in the current study, the ANN technique was developed to forecast seasonal rainfall using LSAVs. Then, the developed model was incorporated with the projected LSAVs obtained from the GCMs of CMIP5 to determine the effects of climate change on rainfall in the Ping River Basin, Thailand.

## STUDY AREA

^{2}). The Ping River Basin (Figure 1), lying between 15 °45′–19 °45′N latitudes and 98 °05′–100 °09′E longitudes is a sub-basin of the Chao Phraya River Basin. It covers an area of 33,896 km

^{2}(i.e., 22% of the Chao Phraya River Basin's area). The Ping River is 740 km long and originates from the Pee Pan Nam mountain range in Chiang Mai Province. The basin's elevation varies from 2,500 to 500 m above mean sea level. About two-thirds of the land area (i.e., 24,200 km

^{2}) is covered with forests, and the irrigated area is estimated to be around 8,020 km

^{2}. Rice is the most commonly grown crop here. The sources of water for irrigation are the Ping River and several reservoirs in the basin. The largest multi-purpose dam in this basin, the Bhumibol Dam, has a maximum storage capacity of 13,462 million m

^{3}. It receives an average annual inflow of 5,900 million m

^{3}from the Ping River Basin.

## DATA COLLECTION

### Rainfall data

Daily rainfall data were obtained from the Thailand Meteorological Department (TMD) and the Royal Irrigation Department (RID) of Thailand. Thirty rainfall stations were selected for the study by considering the data availability of each station: only those stations which had less than 5% incomplete data were selected (Figure 1). The total daily rainfall series in each station consists of the data from 1/1/1970 to 31/12/2012. The average rainfall over the basin was calculated using the Theissen polygon method (Punma & Lal 1992). The total of daily rainfall for each three months (MJJ, ASO, NDJ, FMA) is calculated to find the seasonal rainfall over the basin.

### LSAV data

*et al.*2005a, 2012; Singhrattna & Babel 2011). A correlation map is an online analysis provided by the Physical Sciences Division in the Earth System Research Laboratory (ESRL) of the National Centers for Environmental Prediction (NCEP) under the National Oceanic Atmospheric Administration (NOAA) (ESRL 2013). Based on a seasonal time scale, four LSAVs, surface air temperature (SAT), SLP, surface zonal wind (SXW), and surface meridian wind (SYW) were identified for each season of rainfall, i.e., MJJ, ASO, NDJ, and FMA (Singhrattna

*et al.*2012) and were used in a rainfall forecasting model by Singhrattna & Babel (2011). In this study, these identified variables, along with an additional three variables, precipitable water (PW), relative humidity (RH), and SST were used with several lead times, ranging from 4 to 15 months prior to the start of the season. The predictors were identified over different regions (Figure 3) that are located close to the study basin, such as the South China Sea, and the Indian and Pacific Oceans. It was assumed that the same regions of LSAVs will be affected in the future as well. The data for the monthly observed LSAVs from 1948 to 2013 were obtained from the analysis data of NCEP/NOAA (http://www.esrl.noaa.gov/psd/cgi-bin/data/timeseries/timeseries1.pl).

### GCM data

Different GCM data were selected by considering different aspects of the study. Singhrattna *et al.* (2012) selected GFDL-R30 out of eight GCMs for the study of Ping River Basin based on the data availability. Additionally, for the same basin, the ECHAM4/OPY3 model's data were selected due to their easy accessibility and high temporal (6 hourly) and spatial resolution among the six GCMs (Sharma *et al.* 2007). Both studies have recommended certain GCMs (ECHAM4/OPY3, CSIRO Mk2.0, HadCM3, and GFDL-R30) based on the statistical characteristics of data for studies of the Ping River Basin. Finer resolution (1.9 ° longitude and 1.9 ° latitude) data are provided by CSIRO Mk2.0 and ECHAM4 and coarser resolution (3.75 ° longitude and 2.5 ° latitude) data are provided by HadCM3 and GFDL-R30. Therefore, in this study, the two GCMs with finer resolution, namely, CSIRO Mk3.6 and MPI-ESM-MR, which are extended versions of CSIRO Mk2.0 and ECHAM4, were selected. The monthly data of large-scale atmospheric predictors from 1971 to 2040 under RCP4.5, which represents a balancing pathway of total radioactive forcing less than 4.5 Wm^{−}² in 2100, were used. The data were provided by the Earth System Grid Federation (http://pcmdi9.llnl.gov/esgfwebfe/live;jsessionid=EFC2F48B4E3C53560E8064810317B168).

## METHODOLOGY

The main aim of this study was to develop seasonal rainfall forecasting models with the use of observed LSAVs data and estimate the future rainfall using LSAVs data obtained from GCMs to analyze the effects of climate change on seasonal rainfall in the Ping River Basin. Based on the relationship between LSAVs and seasonal rainfall, LSAVs have been used as predictors for forecasting models in this study. The ANN technique was used to develop the seasonal rainfall forecasting models using observed predictors. GCMs provided projected data of LSAVs under different climate change scenarios. After bias correction of the GCM data, the developed ANN models were used to forecast seasonal rainfall until 2040. The procedures are described in the following sections.

### Selection of the most significant variables

The selection of input variables or independent variables (*x*_{1}, *x*_{2}, *x*_{3}, …, *x _{n}*) is a fundamental step in the development of data-driven models like ANN. All independent variables may not have the same level of importance, because some of them may be correlated with others or noisy or possess no predictive powers (Bowden

*et al.*2005). The importance of variable selection and selection methodologies for ANN models have been summarized by Maier & Dandy (2000), Guyon & Elisseeff (2003), Bowden

*et al.*(2005), May

*et al.*(2011), Nourani & Parhizkar (2013) and Nourani

*et al.*(2015). The most commonly used methods are variable ranking method, mutual information, Gamma test, self-organizing map, and ANN modeling. For this study, the variable ranking method was adopted. Table 1 shows that 88 potential independent variables relevant for this study were tested for each season of rainfall. The lead time was defined as the time difference in months between the last month of the forecasted season and the last month of the independent variable's season. For example, if

*SST*

_{(t−4)}is a predictor for MJJ, it means the season for

*SST*is JFM (January–February–March) and the lead time is four months. As a result, MJJ can be forecasted at the beginning of April, which is one month prior to the MJJ season.

Season of rainfall | MJJ (t), ASO (t), NDJ (t), FMA (t) |
---|---|

Independent variables (x) | SAT _{(t−a)}, SLP_{(t−a)}, SXW_{(t−a)}, SYW_{(t−a)}, PW_{(t−a)}, RH_{(t−a)}, SST_{(t−a)}, Rainfall_{(t−b)} |

Lead time of independent variable (month) | a = 4, 5, 6, 7……………, 15 |

b = 6, 9, 12, 15 |

Season of rainfall | MJJ (t), ASO (t), NDJ (t), FMA (t) |
---|---|

Independent variables (x) | SAT _{(t−a)}, SLP_{(t−a)}, SXW_{(t−a)}, SYW_{(t−a)}, PW_{(t−a)}, RH_{(t−a)}, SST_{(t−a)}, Rainfall_{(t−b)} |

Lead time of independent variable (month) | a = 4, 5, 6, 7……………, 15 |

b = 6, 9, 12, 15 |

First, the selection of independent variables (*x*) was done by correlation analysis using the variable ranking method (Guyon & Elisseeff 2003). The correlation matrices of Pearson's correlation coefficients (r) were developed for all dependent (*y*) and independent variables. The independent variables were short listed in the 85th percentile category based on an absolute correlation between that independent variable and a dependent variable when the correlation was greater than (where n is the number of data points). All the screened variables, which were in the 85th percentile category, were cross-checked between two variables for linear dependence. If the correlation between two screened variables was more than 0.75 (i.e. r > 0.75), then that variable, which indicates a smaller r value between itself and the dependent variable, was eliminated. For example, let us suppose there are three independent variables, X, Y, and Z. X and Y are strongly correlated. Among the two, if Y is also strongly correlated (r > 0.75) with Z, then Y is omitted and X and Z are selected. If neither X nor Y show a strong correlation with Z, none of them are omitted (Babel & Shinde 2011). Using this selection method, multi-colinearity was eliminated and those independent variables which were statistically most significant for the rainfall were filtered.

In this study, the independent variables include the identified LSAVs at different lead times, from 4 to 15 months. The dependent variables are seasonal rainfall in the study basin. For each season of rainfall, the most significant LSAVs with different lead times were selected, with a maximum number of 6–8 predictors out of 88 potential predictors. Then, all possible combination cases that were equal to 2^{n} − 1 (where n is the number of potential predictors) were run with different hidden neurons (i.e., 5 to 20) in one hidden layer. Subsequently, the best performing networks with the best combination cases were identified based on three indices: r and root mean square error (RMSE). The technique applied for selecting the most significant variables is called variable ranking and the model-based embedded method.

### ANN

#### The model algorithm

ANN is a data-driven approach that has the ability to forecast rainfall on different spatial and temporal scales with all types of predictors. The development of ANN consists of data division and pre-processing significant input selection (as described above), network architecture, optimization, model testing, and performance evaluation. This study adopted the ANN technique that was developed using the MATLAB Version 7.12.0 (Sirisena 2013) to select optimal combination cases of independent variables and to forecast seasonal rainfall (i.e., FMA, MJJ, ASO, and NDJ) in the Ping River Basin.

The available data can be split into two groups for training and testing. Past research has concluded that the best trained models are not always good at testing due to over-training (ASCE 2000; Luk *et al.* 2000; Hung *et al.* 2009; Mekanik & Imteaz 2012). Cross validation is a highly recommended technique for training a network. Basically, the training dataset is used to calibrate the weights of the network while the cross validation dataset monitors the progress of the training process. In addition, the testing dataset is used for the final evaluation of the model's performance as well. The dataset for cross validation is not a part of the training dataset. Therefore, in this study, the available dataset of years 1970 to 2007 was divided into three groups, 70%, 15%, and 15% for training, cross validation, and testing, respectively, using random indices.

*Amp (i)*

*=*

*(Upper Bound – Lower Bound)/(Max(i) – Min(i))*and

*Offset (i)*

*=*

*Upper Bound*

*−*

*Amp(i)*

*×*

*Max(i)*.

*Max(i)*and

*Min(i)*are maximum and minimum values of the input data. The upper and lower bounds are 1 and 0, respectively.

Basically, the network's architecture determines the way information flows through the network. The main goal here is to find a simple network with the best performance. Optimal network geometry or the number of hidden nodes and layers and connection weights is determined by trial and error. The feed forward neural network (FFN) has at least three layers: namely, the input layer, the hidden layer, and the output layer. The input layer consists of all possible independent variables. The nonlinear transformation is done from the input layer to the hidden layer. Then, the output of the hidden layers transfers to the output layer. In this study, FFN, having one hidden layer, was trained with 5 to 20 neurons. Network training or learning is a process of parameter estimation aimed at optimizing connection weights. The Levenberg–Marquardt (LM) optimization function was used to train the network and to update the weights and biases accordingly. LM optimization is a supervised learning algorithm, and it is the fastest back propagation algorithm known for minimizing the mean square error (MSE) of a network (Toth *et al.* 2000). Several hydrological applications have utilized supervised training (ASCE 2000); however, it must be noted that this algorithm is sensitive to initial conditions. Small random weight values were assigned for every node like processing elements due to the absence of prior knowledge about initial conditions. The upper and lower bounds of the random weights varied from 0 to 0.5.

#### The model's evaluation

The model's evaluation can be done by statistical and graphical methods. Both testing and training performances in this study were evaluated using the following indices (here *X* and *Y* are observed and simulated data, respectively).

### Determination of the effects of climate change on seasonal rainfall

#### Bias correction of GCM data

*et al.*2007; Piani

*et al.*2010; Acharya

*et al.*2012; Johnson & Sharma 2012; Teutschbein & Seibert 2012; Thrasher

*et al.*2012). Many bias correction methods have been applied for rainfall and temperature correction on different time scales. In this study, we adopted a bias correction method called quantile mapping. Historical data and GCM data were fitted by a two-parameter Gamma distribution, as shown in Equation (5). Then, the cumulative distribution (Equation (6)) of monthly GCM data was mapped to the cumulative distribution of historical data (Equation (7)). Two parameters of Gamma distribution, i.e., shape (

*α*) and scale (

*β*), for a given dataset, are defined as mean = and variance = .

All hydrological parameters, temperature, pressure, humidity, and PW, which were simulated by two GCMs, CSIRO Mk3.6 and MPI-ESM-MR, were bias corrected by fitting the Gamma distribution. Even though temperature is found to fit best with normal (Gaussian) distribution (Thom 1954; Schoenau & Kehrig 1990), it was fitted to Gamma distribution in this study. Mean and standard deviation (SD) of two distributions are equal in the raw GCM and observed data. When the shape parameter (*α*) in a gamma distribution is large, the distribution tends to become normal. The data of 1971 to 2000 was taken as the base period to calculate the required distribution parameters (*α* and *β*).

To evaluate the bias correction method, seasonal rainfall during the base period was simulated using two approaches: one, with raw GCM data and another, with bias corrected GCM data. The overall performance of both approaches was evaluated by mean, RMSE, and SD.

#### Rainfall forecasting under climate change scenarios

The calibrated and tested models of seasonal rainfall forecasting were applied to assess the impact of future climate changes on seasonal rainfall. Bias corrected GCM data for LSAVs from CSIRO Mk3.6 and MPI-ESM-MR were used for long-lead rainfall forecasting in the Ping River Basin during 2011–2040.

#### Trend analysis of forecasted rainfall

Trend analysis was performed to identify any significant changes in a climatic variable over a long time period. Mann–Kendall (Kendall 1975) and Sen's slope (Sen 1968) were the non-parametric test methods used to analyze the trends in climatic data.

*Mann Kendall test*. This test measures a monotonic relationship between each value of the time series and the remaining values in a sequential order. In the Mann–Kendall test, the null hypothesis H

_{0}is a series

*x*

_{1}, …,

*x*

_{n}that comes from a population where random variables are independent and identically distributed. The alternative hypothesis H

_{1}of a two-sided test is that the distributions of and are not identical for all i, j ≤ n with i ≠ j. The test statistics

*Z*, where, The two-tailed test at different significance level is denoted as α = 0.1, 0.05, 0.01, and 0.001. At a certain probability level H

_{0}is rejected in favor of H

_{1}if the absolute value of Z equals or exceeds Z

_{α/2}. In this study, the significant level (α) was selected to be 0.05.

## RESULTS AND DISCUSSION

### Selected combination cases and model networks

The most significant ‘*n*’ number of variables under the 85th percentile category was obtained using the variable ranking method. It was found that the dominant predictors for all the seasons were pressure, temperature, and wind. ASO and FMA rainfall are also correlated to RH and PW (Table 2).

Season of rainfall | |||
---|---|---|---|

FMA | MJJ | ASO | NDJ |

SYW_{(t−8)} | SYW_{(t−12)} | SLP_{(t−8)} | SXW_{(t−6)} |

SYW_{(t−4)} | SXW_{(t−4)} | SLP_{(t−13)} | SYW_{(t−12)} |

PW_{(t−4)} | SST_{(t−4)} | SLP_{(t−10)} | SYW_{(t−11)} |

SLP_{(t−6)} | SYW_{(t−10)} | RH_{(t−5)} | SST_{(t−4)} |

SLP_{(t−12)} | SAT_{(t−12)} | SYW_{(t−9)} | SXW_{(t−5)} |

SXW_{(t−14)} | SLP_{(t−5)} | SAT_{(t−12)} | SAT_{(t−8)} |

SST_{(t−5)} | | | SYW_{(t−10)} |

| | | PW_{(t−8)} |

Season of rainfall | |||
---|---|---|---|

FMA | MJJ | ASO | NDJ |

SYW_{(t−8)} | SYW_{(t−12)} | SLP_{(t−8)} | SXW_{(t−6)} |

SYW_{(t−4)} | SXW_{(t−4)} | SLP_{(t−13)} | SYW_{(t−12)} |

PW_{(t−4)} | SST_{(t−4)} | SLP_{(t−10)} | SYW_{(t−11)} |

SLP_{(t−6)} | SYW_{(t−10)} | RH_{(t−5)} | SST_{(t−4)} |

SLP_{(t−12)} | SAT_{(t−12)} | SYW_{(t−9)} | SXW_{(t−5)} |

SXW_{(t−14)} | SLP_{(t−5)} | SAT_{(t−12)} | SAT_{(t−8)} |

SST_{(t−5)} | | | SYW_{(t−10)} |

| | | PW_{(t−8)} |

The ANN technique was employed to develop a forecast model for each season. At the first stage, a trial and error method was used to select the best combination of input variables and the best network architecture. The best networks and their respective best variable combinations were selected according to the performance criteria: r and RMSE among 2^{n} − 1 combination cases of ‘*n*’ input variables. Then, the best network was checked for a testing with ‘out of sample dataset’ (2008–2012). The best network architectures and corresponding combination cases for each ^{n}C_{r} (where n is the total number of variables, and r is the number of variables used for each combination case) have been summarized for the case of ASO rainfall forecast in Table 3. The selected networks for further study are in bold letters. Following the same procedure, the selected networks and predictors for each season of rainfall were obtained and summarized in Table 4. The proposed models for MJJ and FMA are able to forecast one month prior to each season and the models for ASO and NDJ are able to do so two months prior to each season according to the lag time of the best predictors.

Training | Testing | |||||
---|---|---|---|---|---|---|

^{n}C_{r} | Input variables | Hidd. N. | RMSE/mm | r | RMSE/mm | r |

1 | SLP_{(t−8)} | 5 | 67 | 0.51 | 37 | 0.68 |

2 | SLP_{(t−8)}SYW_{(t−9)} | 13 | 52 | 0.74 | 59 | 0.80 |

3 | SLP_{(t−8)}SLP_{(t−13)}RH_{(t−5)} | 9 | 50 | 0.77 | 70 | 0.80 |

4 | SLP_{(t−8)}SLP_{(t−13)}RH_{(t−5)}SYW_{(t−9)} | 7 | 41 | 0.75 | 38 | 0.75 |

5 | SLP_{(t−8)}SLP_{(t−13)}SLP_{(t−10)}RH_{(t−5)}SYW_{(t−9)} | 9 | 32 | 0.86 | 68 | 0.83 |

6 | SLP_{(t−8)}SLP_{(t−13)}SLP_{(t−10)}RH_{(t−5)}SYW_{(t−9)}SAT_{(t−12)} | 14 | 58 | 0.71 | 64 | 0.77 |

Training | Testing | |||||
---|---|---|---|---|---|---|

^{n}C_{r} | Input variables | Hidd. N. | RMSE/mm | r | RMSE/mm | r |

1 | SLP_{(t−8)} | 5 | 67 | 0.51 | 37 | 0.68 |

2 | SLP_{(t−8)}SYW_{(t−9)} | 13 | 52 | 0.74 | 59 | 0.80 |

3 | SLP_{(t−8)}SLP_{(t−13)}RH_{(t−5)} | 9 | 50 | 0.77 | 70 | 0.80 |

4 | SLP_{(t−8)}SLP_{(t−13)}RH_{(t−5)}SYW_{(t−9)} | 7 | 41 | 0.75 | 38 | 0.75 |

5 | SLP_{(t−8)}SLP_{(t−13)}SLP_{(t−10)}RH_{(t−5)}SYW_{(t−9)} | 9 | 32 | 0.86 | 68 | 0.83 |

6 | SLP_{(t−8)}SLP_{(t−13)}SLP_{(t−10)}RH_{(t−5)}SYW_{(t−9)}SAT_{(t−12)} | 14 | 58 | 0.71 | 64 | 0.77 |

Season of rainfall | Network architecture (in-hidden-out) | Selected combination case |
---|---|---|

FMA | 5–20–1 | SYW_{(t−8)}PW_{(t−4)}SLP_{(t−6)}SLP_{(t−12)}SXW_{(t−14)} |

MJJ | 4–19–1 | SYW_{(t−12)}SXW_{(t−4)}SYW_{(t−10)}SAT_{(t−12)} |

ASO | 5–9–1 | SLP_{(t−8)}SLP_{(t−13)}SLP_{(t−10)}RH_{(t−5)}SYW_{(t−9)} |

NDJ | 4–8–1 | SXW_{(t−6)}SYW_{(t−11)}SXW_{(t−5)}SYW_{(t−10)} |

Season of rainfall | Network architecture (in-hidden-out) | Selected combination case |
---|---|---|

FMA | 5–20–1 | SYW_{(t−8)}PW_{(t−4)}SLP_{(t−6)}SLP_{(t−12)}SXW_{(t−14)} |

MJJ | 4–19–1 | SYW_{(t−12)}SXW_{(t−4)}SYW_{(t−10)}SAT_{(t−12)} |

ASO | 5–9–1 | SLP_{(t−8)}SLP_{(t−13)}SLP_{(t−10)}RH_{(t−5)}SYW_{(t−9)} |

NDJ | 4–8–1 | SXW_{(t−6)}SYW_{(t−11)}SXW_{(t−5)}SYW_{(t−10)} |

### The model's testing with ‘out of sample dataset’

### Evaluation of bias correction during the base period (1971–2000)

The monthly LSAVs from GCM data are not accurate when simulating rainfall at the basin level. During the period of 1971–2000, it was observed that CSIRO Mk3.6 and MPI-ESM-MR over- or under-predicted mean monthly temperature, humidity, PW, pressure, and wind. Thus, the direct application of GCM outputs of LSAVs is the cause of uncertainty when forecasting seasonal rainfall. In addition, uncertainty is also introduced by the ANN model itself. Wind (i.e., SXW and SYW) is a vector. The quantile mapping bias correction method was not applicable in this study because it cannot correct for the direction of the wind. Therefore, wind bias correction was not done; instead, raw GCM data were directly applied to the ANN model.

The performance of the bias correction method applied to both GCM datasets was evaluated by mean, SD, and RMSE with respect to the observed data during 1971–2000 (Table 5). When compared to the raw GCM data, the monthly mean and SDs of all corrected variables were found to be closer to deduced values for field observations. The highest RMSE of PW and RH lies between 4.3 and 2.5 after bias correction. Based on the statistical parameters, both bias corrected GCMs’ data can be used for future rainfall projections in the study area.

Raw | Corrected | ||||||
---|---|---|---|---|---|---|---|

Season | Statistics | Variable | Observed | CSIRO Mk3.6 | MPI-ESM-MR | CSIRO Mk3.6 | MPI-ESM-MR |

FMA season | Mean | PW (kg/m^{2}) | 42.9 | 46.2 | 44.2 | 42.9 | 42.9 |

SLP (mbar) | 1,012.9 | 1,013.2 | 1,012.5 | 1,012.9 | 1,013.0 | ||

SD | PW (kg/m^{2}) | 5.8 | 12.6 | 10.9 | 5.8 | 5.8 | |

SLP (mbar) | 1.1 | 1.3 | 1.4 | 1.0 | 1.0 | ||

RMSE | PW (kg/m^{2}) | 9.0 | 7.2 | 4.3 | 4.0 | ||

SLP (mbar) | 1.4 | 1.5 | 1.2 | 1.1 | |||

MJJ season | Mean | SAT (°C) | 21.3 | 25.0 | 23.2 | 21.3 | 21.3 |

SD | 2.3 | 5.4 | 4.2 | 2.4 | 2.4 | ||

RMSE | 4.3 | 4.6 | 1.2 | 1.1 | |||

ASO season | Mean | SLP (mbar) | 1,010.1 | 1,007.4 | 1,010.5 | 1,010.1 | 1,010.1 |

RH (%) | 77.0 | 83.5 | 79.0 | 77.0 | 77.0 | ||

SD | SLP (mbar) | 3.0 | 4.8 | 4.2 | 3.0 | 3.0 | |

RH (%) | 5.0 | 4.2 | 5.8 | 5.0 | 4.9 | ||

RMSE | SLP (mbar) | 3.0 | 2.8 | 1.4 | 1.3 | ||

RH (%) | 7.2 | 3.8 | 2.5 | 2.6 |

Raw | Corrected | ||||||
---|---|---|---|---|---|---|---|

Season | Statistics | Variable | Observed | CSIRO Mk3.6 | MPI-ESM-MR | CSIRO Mk3.6 | MPI-ESM-MR |

FMA season | Mean | PW (kg/m^{2}) | 42.9 | 46.2 | 44.2 | 42.9 | 42.9 |

SLP (mbar) | 1,012.9 | 1,013.2 | 1,012.5 | 1,012.9 | 1,013.0 | ||

SD | PW (kg/m^{2}) | 5.8 | 12.6 | 10.9 | 5.8 | 5.8 | |

SLP (mbar) | 1.1 | 1.3 | 1.4 | 1.0 | 1.0 | ||

RMSE | PW (kg/m^{2}) | 9.0 | 7.2 | 4.3 | 4.0 | ||

SLP (mbar) | 1.4 | 1.5 | 1.2 | 1.1 | |||

MJJ season | Mean | SAT (°C) | 21.3 | 25.0 | 23.2 | 21.3 | 21.3 |

SD | 2.3 | 5.4 | 4.2 | 2.4 | 2.4 | ||

RMSE | 4.3 | 4.6 | 1.2 | 1.1 | |||

ASO season | Mean | SLP (mbar) | 1,010.1 | 1,007.4 | 1,010.5 | 1,010.1 | 1,010.1 |

RH (%) | 77.0 | 83.5 | 79.0 | 77.0 | 77.0 | ||

SD | SLP (mbar) | 3.0 | 4.8 | 4.2 | 3.0 | 3.0 | |

RH (%) | 5.0 | 4.2 | 5.8 | 5.0 | 4.9 | ||

RMSE | SLP (mbar) | 3.0 | 2.8 | 1.4 | 1.3 | ||

RH (%) | 7.2 | 3.8 | 2.5 | 2.6 |

The proposed ANN models were evaluated using raw GCM and corrected GCM data under the RCP4.5 scenario during the base period (1971–2000). The model performance in terms of the statistical parameters (i.e., mean, SD, and RMSE) is given in Table 6. It is clear that the model's performance is better when the simulation incorporates observed variables than when it incorporates GCM data. The simulation of wet seasonal rainfall using MPI-ESM-MR inputs shows better performance than CSIRO Mk3.6 inputs. On the other hand, the simulation of dry season rainfall is more accurate when using CSIRO Mk3.6 inputs rather than MPI-ESM-MR data.

With observed | With raw GCM inputs | With bias corrected inputs | ||||
---|---|---|---|---|---|---|

Parameter | Observed | inputs | Sim_A | Sim_B | Sim_A | Sim_B |

FMA season | ||||||

Mean (mm) | 97 | 100 | 107 | 103 | 91 | 92 |

SD (mm) | 41 | 43 | 66 | 51 | 36 | 44 |

RMSE (mm) | 28 | 76 | 72 | 61 | 68 | |

MJJ season | ||||||

Mean (mm) | 415 | 395 | 310 | 241 | 339 | 384 |

SD (mm) | 93 | 97 | 44 | 64 | 63 | 55 |

RMSE (mm) | 77 | 142 | 210 | 122 | 101 | |

ASO season | ||||||

Mean (mm) | 495 | 502 | 817 | 687 | 499 | 499 |

SD (mm) | 69 | 49 | 54 | 111 | 48 | 50 |

RMSE (mm) | 54 | 335 | 246 | 71 | 105 | |

NDJ season | ||||||

Mean (mm) | 61 | 56 | 85 | 86 | 85 | 86 |

SD (mm) | 44 | 29 | 34 | 42 | 34 | 42 |

RMSE (mm) | 41 | 53 | 62 | 53 | 62 |

With observed | With raw GCM inputs | With bias corrected inputs | ||||
---|---|---|---|---|---|---|

Parameter | Observed | inputs | Sim_A | Sim_B | Sim_A | Sim_B |

FMA season | ||||||

Mean (mm) | 97 | 100 | 107 | 103 | 91 | 92 |

SD (mm) | 41 | 43 | 66 | 51 | 36 | 44 |

RMSE (mm) | 28 | 76 | 72 | 61 | 68 | |

MJJ season | ||||||

Mean (mm) | 415 | 395 | 310 | 241 | 339 | 384 |

SD (mm) | 93 | 97 | 44 | 64 | 63 | 55 |

RMSE (mm) | 77 | 142 | 210 | 122 | 101 | |

ASO season | ||||||

Mean (mm) | 495 | 502 | 817 | 687 | 499 | 499 |

SD (mm) | 69 | 49 | 54 | 111 | 48 | 50 |

RMSE (mm) | 54 | 335 | 246 | 71 | 105 | |

NDJ season | ||||||

Mean (mm) | 61 | 56 | 85 | 86 | 85 | 86 |

SD (mm) | 44 | 29 | 34 | 42 | 34 | 42 |

RMSE (mm) | 41 | 53 | 62 | 53 | 62 |

### Effects of climate change on seasonal rainfall

With the use of projected LSAVs by GCMs and the proposed ANN models, seasonal rainfall in the Ping River Basin was forecasted until 2040. The base period data from 1971 to 2000 and the climatology period data from 2011 to 2040 were analyzed to discover the trends in observed and forecasted rainfall. Table 7 presents the results of the regression analysis, and the Mann–Kendall test, including Sen's slope. While none of the trends is significant at 95% confidence level (α = 0.05), the directions of these trends are similar in the three analyses for all the seasons.

Regression | Mann–Kendall | Sen's | At 95% of confidence level | ||
---|---|---|---|---|---|

Season | analysis | test (Z) | slope (S) | Smin | Smax |

Observed data (1971–2000) | |||||

MJJ | −1.10 | −0.46 | −1.21 | −5.469 | 3.175 |

ASO | −2.20 | −1.43 | −2.13 | −5.274 | 1.063 |

NDJ | −1.20 | −0.86 | −0.73 | −3.078 | 1.078 |

FMA | 1.25 | 0.75 | 0.76 | −1.128 | 2.795 |

CSIRO Mk3.6 (2011–2040) | |||||

MJJ | −1.10 | −0.89 | −1.16 | −3.958 | 1.127 |

ASO | 1.08 | 0.43 | 0.42 | −2.209 | 3.138 |

NDJ | −0.43 | −1.28 | −0.44 | −1.567 | 0.197 |

FMA | −1.32 | −0.93 | −1.25 | −3.340 | 0.984 |

MPI-ESM-MR (2011–2040) | |||||

MJJ | −1.80 | −1.46 | −1.88 | −4.208 | 0.448 |

ASO | 0.90 | 0.36 | 0.45 | −2.964 | 4.183 |

NDJ | −0.61 | −0.86 | −0.04 | −0.289 | 0.070 |

FMA | 0.92 | 0.86 | 1.11 | −1.323 | 3.329 |

Regression | Mann–Kendall | Sen's | At 95% of confidence level | ||
---|---|---|---|---|---|

Season | analysis | test (Z) | slope (S) | Smin | Smax |

Observed data (1971–2000) | |||||

MJJ | −1.10 | −0.46 | −1.21 | −5.469 | 3.175 |

ASO | −2.20 | −1.43 | −2.13 | −5.274 | 1.063 |

NDJ | −1.20 | −0.86 | −0.73 | −3.078 | 1.078 |

FMA | 1.25 | 0.75 | 0.76 | −1.128 | 2.795 |

CSIRO Mk3.6 (2011–2040) | |||||

MJJ | −1.10 | −0.89 | −1.16 | −3.958 | 1.127 |

ASO | 1.08 | 0.43 | 0.42 | −2.209 | 3.138 |

NDJ | −0.43 | −1.28 | −0.44 | −1.567 | 0.197 |

FMA | −1.32 | −0.93 | −1.25 | −3.340 | 0.984 |

MPI-ESM-MR (2011–2040) | |||||

MJJ | −1.80 | −1.46 | −1.88 | −4.208 | 0.448 |

ASO | 0.90 | 0.36 | 0.45 | −2.964 | 4.183 |

NDJ | −0.61 | −0.86 | −0.04 | −0.289 | 0.070 |

FMA | 0.92 | 0.86 | 1.11 | −1.323 | 3.329 |

During the base period (1971–2000) of the MJJ season, maximum and minimum rainfall values were recorded as 605 and 247 mm in 1978 and 1997, respectively. Rainfall anomalies varied from 2.0 to −1.8 during the base period (Figure 5(a)). From both GCMs under the RCP 4.5 scenario, it can be seen that MJJ rainfall lies below the normal level with respect to observed rainfall during the base period. According to Singhrattna & Babel (2011), under A2 and B2 scenarios, MJJ rainfall in 2011–2100 will decrease on average by 0.1 and 0.17 mm yr^{−1}, respectively. In contrast, the multi-model dataset (MMD), as reported by the IPCC (2007), indicates that an increasing trend is expected in June, July, and August over Thailand, Cambodia, Laos, Malaysia, and Indonesia. The anomalies in ASO rainfall vary from 2.5 to −1.8 (Figure 5(b)). The post-1980s ASO rainfall was below normal; however, above-normal rainfall has been observed after 2009. As a result, compared to a decreasing trend of historical rainfall, the effect of climate change on ASO rainfall in the Ping River Basin causes an increasing trend in forecasted rainfall with both GCMs considered in the study. In addition, Bhaskaran & Mitchell (1998) concluded that the beginning of the monsoon season in Thailand and nearby regions such as Laos, Cambodia, and Vietnam will tend to get delayed by 10–15 days without there being any changes in the duration of the season during the 2030–2070s under the A1B scenario of climate change. However, decreasing trends at 1.09 and 6.16 mm yr^{−1} in 2011–2100 ASO rainfall are estimated under A2 and B2 scenarios, respectively, from GFDL-R30 data (Singhrattna & Babel 2011). The NDJ rainfall anomalies vary between 2.5 and −1.3 during the base period (Figure 5(c)). As mentioned earlier, NDJ rainfall was forecasted using raw GCM data of SXW and SYW without any bias correction. It is also to be noted that the effects of climate change on NDJ rainfall cause a slower decreasing trend compared to the trend of observed rainfall. The standardized anomalies of the FMA season show almost normal conditions with both GCMs during the base period (Figure 5(d)). As compared to the base period's climatology, FMA rainfall will tend to decrease based on CSIRO Mk3.6 and increase based on MPI-ESM-MR. These findings are inconsistent with the MMD in the IPCC report (2007) that shows only increasing trends of seasonal rainfall by 7% during 2080–2099 over Thailand and Southeast Asia.

Finally, there are limitations and uncertainties inherent in the predictors, ANN model and GCM data, thus quality of forecasting was limited. It is generally accepted that ANN performs best when extrapolation is within the range of data used for calibration (Flood & Kartam 1994). Thus, rainfall can be underestimated for extreme cyclonic events. Also, this study is limited due to the lead time of SST as 4–15 months, but ENSO (index calculated from SST) effects vary from two to seven years. Therefore, model predictors could incorporate such variables to develop the ANN model. Bias in GCM data is corrected by quantile mapping which is limited in capturing extremes beyond the range of historical data.

## CONCLUSIONS

Long-term rainfall forecast is a crucial issue for several water-related sectors such as industry, agriculture, health, and transportation. In this study, the most potential predictors of LSAVs were identified using the variable ranking method. Pressure, temperature, and wind were found to be the most significant predictors among the eight identified predictors for seasonal rainfall forecast in the Ping River Basin. Seasonal rainfall over the Ping River Basin is influenced by atmospheric variables over the regions near Thailand, such as the Pacific and Indian Oceans and the South China Sea. The proposed forecasting models of MJJ and FMA rainfall were able to forecast rainfall one month in advance and the forecasting models for ASO and NDJ rainfall were able to do so two months in advance. The efficiency of the model to forecast dry season rainfall can be improved with the incorporation of local climate conditions. A bias correction method, namely quantile mapping, also can improve GCM simulations, except for the wind components. Under the RCP4.5 scenario, a decreasing trend in MJJ rainfall and an increasing trend in ASO rainfall from 2011 to 2040 have been predicted. In the same period, NDJ rainfall is predicted to decrease and FMA rainfall to increase linearly.

Moreover, the Ping River Basin will receive above-normal ASO rainfall and below-normal NDJ rainfall as compared to the rainfall in 1971–2000. The analysis results and previous studies show uncertainty in rainfall patterns in the study region and nearby areas. Given such rainfall variability in the future, adaptation measures will have to be planned for water management in order to deal with possible water crises: scarcity or excess. The study results can be coupled with a hydrological model to simulate stream flow so as to analyze the uncertainty of water availability in the basin. The operations of the Bhumibol reservoir and other water storage facilities can be managed and optimized to cope with anomalous weather events (wet or dry). With the aim of decreasing potential damage, the responsible governmental agency can set up an initial long-term plan to manage water resources and to allocate water to different users appropriately under different hydrological conditions in the basin.

## ACKNOWLEDGEMENTS

The authors would like to thank Dr Sutat Weesakul and Dr Sylvain Perret for their valuable comments. We are grateful to the Royal Thai Government and the WEM project for their financial support to the second author of the paper for her master's degree at the Asian Institute of Technology, Thailand. The authors also thank the TMD and the RID for providing rainfall data for this study. Our special thanks go to the anonymous reviewers and the editor for their valuable contributions to the manuscript.