Ethics statement

This experimental protocol was approved and authorised by the Academy of Military Medical Sciences Review Board. Dengue data comes from statistical data from the China National Notifiable Infectious Disease Reporting Information System and did not involve identifiable data. There was no request for ethical permission, according to Chinese law. Methods were carried out in accordance with the relevant institutional guidelines.

Source of data

Daily dengue fever cases and patient information from 2008 to 2016 in Guangdong Province were obtained from the China National Notifiable Infectious Disease Reporting Information System (NNDS) (http://www.chinacdc.cn/). General physicians are required to diagnose the disease according to the National Diagnostic Criteria for Dengue Fever (WS216-2008) and report new cases to the web-based NNDS within 24 hours. Using annual calendar weeks as the unit, the sum of the daily cases in a week was used to determine the number of weekly cases.

Daily meteorological data were obtained from the China Integrated Meteorological Information Sharing System (http://data.cma.cn/). Nine meteorological factors were collected, including mean temperature, maximum temperature, minimum temperature, mean atmospheric pressure, maximum atmospheric pressure, minimum atmospheric pressure, mean relative humidity, maximum wind speed, and extreme wind speed. Using annual calendar weeks as the unit, daily meteorological data were summed, and weekly averages were calculated. Population data were obtained from the Statistics Bureau of Guangdong Province (http://www.gdstats.gov.cn/).

Optimal minimum temperature selection

The minimum temperature has an important influence on the survival of mosquitoes and the epidemic of dengue[11–13]. Therefore, using the data above minimum temperature suitable for dengue fever reduces the data noise and improves the data quality of the model. Based on the Ross-Macdonald[14]and Watts[15]models, we searched for the optimal minimum temperature suitable for dengue transmission. In this model, infectious life Pⁿ/(−1nP)≥1day can be used as the minimum temperature suitable for dengue transmission, where P is the daily survival probability. 1/−1nP is the expected life, and Pⁿ is the probability of survival of infected mosquitoes after n days; n is mainly determined by the temperature, with a relationship of n = K/(T−C) [15], where K is the effective accumulated temperature(165.2 °C) needed for the incubation of dengue virus in mosquitoes and C is the minimum temperature (11.8°C)needed for the incubation of dengue viruses in mosquitoes and T is the minimum temperature required for a mosquito to survive for at least one day. Therefore, n = 165.2/(T−11.8). The daily survival probability, such as P = 0.85[16]or 0.89[17], was obtained under laboratory conditions with constant temperature, humidity, and light, whereas daily survival probability obtained under natural environments were 0.913 in French Guiana[18] and 0.918in Macao[19]. To calculate the minimum temperature suitable for the transmission of dengue fever, we selected the daily survival probability for Macao of P = 0.918, as it is adjacent to Guangdong province.

In order to explore the relationship between dengue fever and temperature, we divided the average weekly minimum temperature into 2 °C intervals of 8–10 °C, 10–12 °C, 12–14 °C, 14–16 °C, 16–18 °C, 18–20 °C, 20–22 °C, 22–24 °C, and 24–26 °C. The cumulative numbers of cases corresponding to these intervals were then calculated, and the moving smooth curve was used to determine the optimal temperature of dengue fever epidemics. For the different temperature intervals, the corresponding number of cases were 13, 54, 95, 156, 709, 955, 17,956, 17,894, and 13,298, respectively.

Correlation and interactive effects analysis of meteorological factors

Among the 282 weeks of data for 2008–2016, Spearman rank correlation was used to analyse the correlation of the meteorological factors with dengue fever epidemics occurring above the suitable temperature. Multivariate analysis of variance was used to determine interactive effects among meteorological factors. Spearman rank correlation and multivariate analysis of variance were carried out using SPSS 19.0 statistical package. P < 0.05 was considered statistically significant.

Further analysis was performed to explore if there were interactive effects among the various meteorological factors related with dengue fever epidemics, when the minimum temperature was ≥18°C. Continuous meteorological factors were converted into categorical meteorological factors according to quartiles. Multivariate analysis of variance was performed to comprehensively consider the differences in the number of cases under multiple meteorological conditions.

Prediction model based on multiple factors

The inverse cumulative normal distribution model based on meteorological factors, mosquito-vector factors, and importation factors is given as follows: (1) where c is the number of cases, N is the population size, n is the number of key meteorological factors, β₀ is the model construction constant, and β_k and X_k are the variable and variable coefficients.

The maximum likelihood estimation (MLE)was used for parameter estimation in the inverse cumulative normal distribution model:

The key meteorological factors correlated to dengue epidemics and the interactive meteorological factors were labelled as x₁, x₂, x₃, ……x_n, respectively. The Breteau Index is an index for evaluating the density of Aedes mosquitoes in a region, that is, the average number of containers for the breeding of Aedes larvae per 100 households. If the Breteau Index is below 5, it is safe; if it is above 20, it means that once external cases are imported, an epidemic of mosquito-borne infectious diseases may occur in this area. Dengue epidemic risk is related to the Breteau Index, which is closely related to meteorological factors. In this study, due to the lack of Breteau Index, a model of mosquito vectors [20–22]was constructed based on temperature, which waslabelled as x_n+1. This assumes that there is an optimum temperature, α2, that gives the maximum probability of vector breeding and reproduction, and hence has the maximum density. Each time the temperature deviates from α₃, the vector density is reduced by 1/α₁. Hence, for a given mean temperature, x₁, the corresponding mosquito-vector factor is as follows: (2) where α₁, α₂, and α₃ refer to the rate of vector density decay, the rational temperature value for vector breeding, and the step size of vector density decay, respectively. However, since the independent mosquito-vector factor, x_n+1, contained three unknown parameters, the simulated annealing algorithm was applied to obtain the optimal estimate of the mosquito-vector parameter set (α₁, α₂, α₃).

The observed number of new dengue fever cases per week was obs_i(i = 1,2,3,…,N), and the estimation obtained from the logit model was est_i(i = 1,2,3,…,N). Hence, the objective function of MLE, loss, which is also the R² (goodness of fit), was calculated as follows: (3)

By comparing the optimal solution with the actual observation value, the loss value corresponding to (α₁, α₂, α₃) can be obtained by using formula (3). If the loss value meets the criteria (this loss value is better than the previous loss value, or no better loss can be found after 300 repetitions), then this (α₁, α₂, α₃) is the approximate optimal solution. If it does not meet the requirements, a new (α₁, α₂, α₃) is generated by random perturbation (α₁, α₂, α₃). The above process is repeated to obtain a new loss value and to check whether it meets the requirements.

The steps for estimating the model parameters β_k were as follows:

1. Step 1: Arbitrarily specify the control parameter set P = {α₁, α₂, α₃}, then use MLE to obtain the optimal estimate of the logit model and generate the predicted value of new dengue fever cases per week that corresponds to the parameter P.
2. Step 2: Use the formula for calculating loss above to obtain the objective function value loss in the forecasted data and observed data of new dengue fever cases per week.
3. Step 3: Apply random perturbation to the control parameter set P (select 1 of the parameters randomly and add to it a random perturbation value that follows the normal distribution, keeping other parameter values unchanged) and obtain a new control parameter set P′. Calculate the value of the objective function loss′ corresponding to P′.
4. Step 4: Replace P with P′ according to the Metropolis rule: (4) where p(P→P′) indicates the probability of P′ replacing P. The temperature parameter c is a variable; during loop iteration, each time the probability selection of loss′>loss is performed, c decreases by a certain proportion (i.e., c = k × c, where k is a constant temperature drop parameter less than 1).
5. Step 5: When the number of invalid continuous perturbations is greater than the set threshold, the iteration ends. The control parameter set P prior to the last invalid perturbance becomes the estimation result for the final approximate optimal control parameter.

Due to the large number of imported cases from the Southeast Asia dengue epidemic, there was a major dengue outbreak in Guangdong in 2014. Therefore, the importation factor was added to the model, which was labelled as x_n+2 and was a binary variable, where 2014 was assigned a value of 1 and all other years were assigned a value of 0.

(5)

The goodness of fit index, R², can be used to measure the overall effect of the model's prediction. The value range is (−∞, 1) and the closer the value is to 1, the better the predictive effect of the model, and vice versa. Goodness of fit indicates a good fit between the predicted and actual values, whereas the correlation coefficient indicates a consistent trend between the predicted and actual value.

Optimal minimum temperature

The minimum temperature was determined when given the infectious life of infected mosquitoes and daily survival probability, P, of Aedes mosquitoes (Table 1). When the daily survival probability of Aedes mosquitoes was 0.850, 0.890, 0.913, and 0.918, given that the infectious life of infected mosquitoes was ≥1 day, the minimum temperatures were 27°C, 21°C, 19°C, and 18°C, respectively. As Guangdong is geographically close to Macao, these locations share similar meteorological factors and mosquito habits. Therefore, we selected 0.918 for the Aedes mosquitoes in Macaoas as the daily survival probability of Guangdong. When the infectious life of a mosquito is at least one day (i.e. 1.196), the corresponding minimum temperature is 18°C, as shown in Table 1.

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Table 1. Mean duration of the infectious period (days) at different minimum temperature and daily survival probability.

https://doi.org/10.1371/journal.pone.0225811.t001

Based on the moving average equation of the minimum temperature interval and the cumulative number of cases, there was a temperature inflection point between the minimum temperature and number of cases at 18–20°C (Fig 1). When the minimum temperature was between 8–18°C, the number of cases only accounted for 2.01% of the total; when the minimum temperature was ≥18°C, the number of cases accounted for 97.97% of the total. We selected dengue fever cases with a minimum temperature ≥18°C for model construction.

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Fig 1. Minimum temperature range and cumulative number of cases.

The blue solid line indicates the trends in dengue at 2°C intervals of minimum temperature from 8–26°C. The dotted blue line represents the moving average curve.

https://doi.org/10.1371/journal.pone.0225811.g001

Correlation and interactive effects analysis of meteorological factors

Of the 477 weeks during the period between of 2008 to 2016, 282 weeks had minimum temperatures≥18°C, with the number of cases accounting for 97.91% of the total. Spearman rank correlation analysis showed that meteorological factors influencing dengue fever cases in these 282 weeks included mean temperature (r = 0.153, P = 0.010), maximum atmospheric pressure (r = 0.127, P = 0.033), minimum atmospheric pressure (r = 0.125, P = 0.036), mean atmospheric pressure (r = 0.124, P = 0.037), and mean relative humidity (r = −0.221, P <0.001)(Table 2). There was no correlation between rainfall and dengue based on the data from 2008 to 2014 in Guangdong, China. Regarding the lag between meteorological factors and dengue fever incidence, we constructed an ARIMA model to analyse the lag, but no lag was found (p = 0,q = 0).

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Table 2. Spearman correlation coefficients between the number of dengue fever cases and meteorological factors, and among the meteorological factors when the minimum temperature was≥18°C.

https://doi.org/10.1371/journal.pone.0225811.t002

The results in Table 3 indicate that there were interactive effects between mean temperature and minimum atmospheric pressure and mean relative humidity (P = 0.05), minimum atmospheric pressure, and mean temperature (P = 0.039). The influence of meteorological factors on dengue fever is not a simple linear model. Taking temperature as an example, temperature will affect every stage of dengue transmission. Raising temperature at suitable temperature is beneficial to increase mosquito infection rate, transmission rate, and bite rate. But when the temperature is too high or too low, the infection rate, transmission rate and bite rate will decrease. This is because temperature, humidity, air pressure, rainfall, and other meteorological factors are interdependent and closely related, that is, there is an interaction between meteorological factors. The meteorological factors with interactive effects were further combined at different levels, and the analysis showed that when mean temperature was in the 25–28°C interval, minimum atmospheric pressure wasin the 997–1002 hPa interval, and mean relative humidity wasin the 73–81% interval, the intensity of the dengue epidemic was the greatest and had the highest number of cases (17,571 cases).

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Table 3. Main effects and interactive effects of meteorological factors on dengue fever from the MANOVA.

https://doi.org/10.1371/journal.pone.0225811.t003

Prediction model of dengue

Based on the above analysis, the key meteorological factors (mean temperature, mean relative humidity, mean atmospheric pressure, maximum atmospheric pressure, and minimum atmospheric pressure), interactive effect factors (mean temperature × minimum atmospheric pressure, mean temperature × minimum atmospheric pressure × mean relative humidity), mosquito-vector factor, and importation factor were used to constructan inverse cumulative normal distribution model, which was fitted to the number of cases in 2008–2016. The MLE was used to obtain the optimal parameter estimations: β₀−β₉ were 109.2567, 1.7889, −0.0588, −0.0369, 0.2211, −0.0778, −0.0018, 0.0000, 1.6671, and 0.8962, respectively. Moreover, α₁, α₂, and α₃ were the model construction constants for the mosquito-vector factor, which were 1.6624, 27.2765, and 2.0651, respectively. β₀ was the model construction constant, β₁−β₉ were the coefficients for the key meteorological factors, interactive effect factors, mosquito-vector factor, and importation factor. The simulation results showed good fit with the actual number of cases and a goodness of fit R² = 0.72 excluding the year 2014 year (including 2014, R² = 0.9248). Using this model, we predicted the number of dengue fever cases for the first 41weeks of 2017. The predicted values showed good fit with the observed values (goodness of fit R² = 0.60, correlation coefficient = 0.8104)(Fig 2b). The onset of dengue fever is concentrated in the 38th to 42nd weeks of each year and is sporadic at other times, so the actual onset of dengue fever shows periodic outbreaks. Prediction models based on the onset of dengue fever also show intermittent outbreaks.

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Fig 2. Model construction for dengue fever cases and meteorological factors.

(a) Results of model fitting for a total of 477 weeks from 2008 to 2016. The green curve indicates logit fitting. (b) Results of model prediction for the first 41 weeks of 2017. The green curve indicates the predicted dengue cases.

https://doi.org/10.1371/journal.pone.0225811.g002