Abstract
In this study, Standardized Precipitation Index (SPI) derived from parametric and nonparametric methods using 0.25∘ gridded rainfall data from 1901 to 2013 (113 years) generated by India Meteorological Department (IMD) was compared for understanding drought conditions over the Indian region. The parametric SPI was computed using a three-parameter Gamma distribution function, whereas nonparametric SPI was computed using Gringorten, Weibull, and Hazen plotting positions, on a 4-month cumulative rainfall data of June–September (SPI-4) representing the southwest monsoon season. Nonnormality is a major concern if equal-sized intervals are drawn for interpretation, and SPI being a normalized index wherein classes are standard deviations from normal, its impact on drought assessment needs to be understood. Accordingly, in our study, normality tests were performed using the Shapiro-Wilk method on SPI derived from both parametric and nonparametric methods. The SPI showed 100% of grid cells conforming to normality in the case of nonparametric methods, whereas in the case of parametric approach it was only 80%. The remaining 20% of nonnormality in parametric SPI is spread over montane, tropical wet, and semi-arid regions of India. Furthermore, differences in the estimation of dryness are observed in the range of 1.0 to 2.5% between nonparametric and parametric SPI for the drought years considered this study. The quantile analysis on all grid cells for the drought year 2002 showed an important fact that at 0.025 quantile only 2.6% of grid cells are in the extremely dry condition as per parametric SPI, whereas in the case of nonparametric SPI it is 6.9%. For the drought year 1939 in grid cells where normality is not followed in parametric SPI, Cohen’s kappa (κ = 0.15) under extreme dryness category indicates large disagreements between parametric and nonparametric SPI. The temporal analysis of Cohen’s kappa computed for each grid cell over drought years shows that in 22.5% of cases the drought category between nonparametric and parametric SPI is not in perfect agreement. Hence, the nonparametric SPI can better categorize the drought classes, representing well the extent of dryness and normality conditions, it is highly recommended for drought assessment over India.
Similar content being viewed by others
Avoid common mistakes on your manuscript.
1 Introduction
Drought is a normal recurring natural hazard capable of impacting at times the survival of human civilizations. Thus, understanding its characteristics would greatly help in developing better plans for mitigation. Historically, droughts have been grouped under four categories: (i) meteorological, (ii) agriculture, (iii) hydrological, and (iv) socio-economic (Wilhite and Glantz 1985; AMS 2013). Among them, meteorological drought is widely studied and is considered as a precursor to all other drought occurrences. Also, due to its direct relationship with agricultural crop production (Cruz-Roa et al. 2017; Deo et al. 2017), understanding its impacts is highly recommended.
Meteorological drought as the name suggests deals with precipitation and its anomalies. In general, one may define meteorological drought as the variability of precipitation over a region to its long-term average. Owing to its region-specific relations, meteorological droughts have a variety of definitions. The American Meteorological Society (AMS) defines meteorological drought in terms of the magnitude and duration of a precipitation shortfall (AMS 2013). The India Meteorological Department (IMD) defines drought as a situation occurring in any area when the deficiency in annual rainfall is greater than 26% of the long-term average for the season. Furthermore, droughts are classified as (i) severe when the deficiency in the annual rainfall exceeds 50% of the long-term average, and (ii) moderate when the deficiency in the rainfall is between 26 and 50% (Shewale and Kumar 2005). For more recent literature and studies on meteorological droughts, the readers are referred to Golian S et al. (2015), Guhathakurta P et al. (2017), Haslinger and Blȯschl (2017), and Zhou H and Liu Y (2018).
In general, the impacts of droughts are measured using standardized indices as they provide a comprehensive understanding of its impacts in terms of severity, persistence, and spread. Some of these measures are deficiency of rainfall deviation from the normal (Shewale and Kumar 2005), China-Z index (Wu H et al. 2001), effective drought index (Byun and Wilhite 1999), rainfall deciles (Gibbs and Maher 1967), Palmer Drought Severity Index (PDSI) (Palmer WC 2006), and most popularly the Standardized Precipitation Index (SPI) (McKee et al. 1993). Even though PDSI is a popular index based on soil moisture (Briffa et al. 1994; Szinell CS et al. 1998), its sensitivity to the criteria for end times of established drought and precipitation of a month (Alley WM 1984) has become a major stumbling factor for use in operational drought assessment. However, the SPI has emerged as a more effective method for studying drought climatology (Lloyd-Hughes and Saunders 2002; Shukla S and Wood AW 2008; Hayes et al. 2011) due to its utility and flexibility. The computation of SPI requires one to choose a suitable statistical distribution that best fits the rainfall data of a location for a particular timescale to obtain precipitation probabilities which is then transforming into a standard normal variate. This makes the SPI comparable across space and time, thus providing an ability for a consistent interpretation of drought situation in a region (Farahmand A and AghaKouchak A 2015).
2 Literature review
SPI due to its computational simplicity, consistent interpretation, reliability, and adaptability to different timescales and climate conditions has been studied extensively for understanding droughts globally (Olukayode Oladipo 1985; Das S et al. 2016; Kumar R et al. 2016; Meroni et al. 2017; Elkollaly et al. 2018). Bordi I et al. (2001) analyzed the SPI time series (1948 to 1981) for drought patterns over the Mediterranean. Rodri̇guez-Puebla and Nieto (2009) analyzed the SPI over the Iberian Peninsula and were able to derive four regional regimes using empirical orthogonal functions. Sirdas and Sen (2003) characterized the drought intensity and magnitude in the Trakya region, Turkey, using the SPI. Vicente Serrano et al. (2004) observed a significant increase in the area under drought from mid to northern areas over Spain using SPI time series. Dinpashoh et al. (2004) studied droughts over Iran using regional precipitation data, factor analysis, and clustering. Pai et al. (2011) evaluated the district-wise drought climatology in India using SPI. SPI is extensively used in studies related to drought monitoring (Hayes et al. 1999; Tsakiris and Vangelis 2004), drought frequency analysis (Łabȩdzki L 2007), spatio-temporal impacts (Kumar Naresh et al. 2012), and climate change analysis (Mishra and Singh 2010; Jenkins and Warren 2015; Kostopoulou et al. 2017), thus covering various aspects that are related to droughts. Though SPI and PDSI indicate temporal changes in the proportion of area experiencing drought in Europe (Lloyd-Hughes and Saunders 2002), the latter is not comparable across the regions. Furthermore, it is not possible to extend/compute PDSI on multiple scales, thus making it infeasible to correlate with runoff and other hydrological drought parameters.
3 Motivation
Parametric methods of computing SPI are a widely adopted approach wherein the rainfall time series is fit to a statistical distribution and transformed into a standard normal variate. Several distributions such as Cohen’s kappa, Log-normal, Weibull, Gamma, etc., have been used for generating SPI in the literature. These studies point out that the choice of distribution that best fits the rainfall data is critical in SPI computation (Farahmand A and AghaKouchak A 2015). It is observed in Kumar Naresh et al. (2009) that SPI is overestimated in some of the regions over India. Also, it is made quite evident that no single distribution fits the rainfall time series of different regions. However, the methods developed by Hosking and Wallis (1997) using the concept of regional rainfall were found to provide a better estimation of distribution parameters for computing SPI. Also, the parameter estimation using L-moments provided a better characterization of droughts using SPI over the Indian region (Kumar Naresh et al. 2012). Although, SPI is a widely used drought index, its reliability is based on two important computational issues: (i) length of time series data, and (ii) the type of probability distribution that fits a given data (Mishra and Singh 2010). The assumption of prior distribution in the computation of SPI limits its capability in interpreting droughts for various rainfall regimes and in particular when examining drought patterns that are of short duration. Therefore, alternative methods are sought after for computing the SPI.
In recent literature, probability plotting position techniques for computing SPI has generated quite an amount of interest in drought studies (Soláková T et al. 2014; Farahmand A and AghaKouchak A 2015). Being parameter-free, these methods are now being widely employed in drought assessment (Huang S et al. 2015; Chu 2018) and forecasting (Ma et al. 2018). This motivated us to employ these methods generally termed as nonparametric for computing SPI over the Indian region. Also, it became a matter of interest to compare its strengths and weakness with parametric approaches of computing SPI for assessing the drought conditions over India.
Accordingly, in this paper, we develop nonparametric SPI over the Indian region using methodology presented in Section 4 on the study area and dataset discussed in Section 5. An assessment of severity and extent of dryness using parametric and nonparametric SPI is carried out for the drought years given in Shewale and Kumar (2005). Our results are presented in Section 6, followed by a discussion in Section 7 and conclusions in Section 8.
4 The methodology
The SPI was first developed at Colorado State University by McKee et al. (1993) using a two-parameter Gamma distribution. Later, Farahmand A and AghaKouchak A (2015) proposed a generalized framework for deriving the nonparametric SPI. This study is novel in the sense that nonnormality issues in parametric SPI and its impact on drought assessment are being studied for the first time over the Indian region. Furthermore, an objective comparison is presented between parametric and nonparametric SPI through quantiles and statistical tests.
This section is organized as follows: In Section 4.1, we present the data model; the procedures for computing SPI in Section 4.2; statistical methods for comparing SPI time series in Section 4.3.
4.1 The data model
Let Qk,l(p,q) denote the daily gridded rainfall data over the Indian region, where k ∈{1,2,…,113} is an index representing years from 1901 to 2013, l ∈{1,…,366} is the day number of the year if it is leap; otherwise, l ∈{1,…,365}, p ∈{1,2,…,129}, q ∈{1,2,…,135} are the indices for latitude {6.5∘,6.75∘,…,38.5∘} and longitude {66.5∘,66.75∘,…,100∘} respectively.
The monthly rainfall data Rk,m(p,q) is obtained from Qk,l(p,q) as:
where m ∈{1,2,…,12} is the index which represents months from {January,…,December}, d denotes the start day number of the month, it takes values as d ∈{1,32,61,…,335} if year is leap otherwise d ∈{1,32,60,…,334}. The variable t denotes number of days in a month and takes values as t ∈{31,28,…,31} for non-leap year and t ∈{31,29,…,31} for leap year.
The total southwest monsoon season rainfall Xk(p,q) occurs between June and September months of an year is represented by:
and the mean seasonal rainfall is obtained as:
where L denotes length of the time series which in the present case is 113 years.
4.1.1 A toy example
As an example, for the year 2008 and March month, the variables k, m, t, r take values 108, 3, 31, and 61, respectively, and Eq. (1) can be written as:
The total seasonal rainfall Xk(p,q) for grid cells p, q representing southwest monsoon from June to September months for the year 2008, i.e., (k = 2008 − 1900 = 108) and m = {6,7,8,9} is obtained as X108(p,q) = {R108,6(p,q) + R108,7(p,q) + R108,8(p,q) + R108,9(p,q)}
4.2 SPI computation
Parametric techniques of estimating SPI involve identifying a candidate probability distribution that fits a given rainfall time series. Though there are many probability distributions such as Gamma, Gumbel, Logistic, Log-logistic, Lognormal, Normal, and Weibull distributions employed in computing standardized precipitation indices (Stagge et al. 2015), the two-parameter Gamma function and Pearson type III distribution are the ones that are widely used in drought assessment studies.
The probability density function(fP) of Pearson type III distribution for the rainfall series X is written as:
where α represents the shape of rainfall distribution, ψ denotes the scale parameter, and ξ denotes the threshold parameter which is equal to the minimum value of rainfall series X. If μ, σ, and γ denote the mean, standard deviation, and skewness of rainfall X, then α,ψ,ξ parameters of the three-parameter Gamma function can be computed as \(\alpha =\frac {4}{\gamma ^{2}}\), \(\psi =\frac {1}{2\alpha \lvert \gamma \rvert }\), and \(\xi =\mu -\frac {2\sigma }{\gamma }\) provided γ≠ 0. The Γ(α) denotes the Gamma function which is a factorial on (α − 1), i.e., (α − 1)!.
The cumulative probability distribution of Pearson III (FP) is written as:
where \(G(\alpha ,\frac {x-\xi }{\beta })\) is computed as \((\alpha -1)!e^{-x}{\sum }_{k=0}^{\alpha -1}\frac {x^{k}}{k!}\) and is known as an incomplete Gamma function.
To obtain the above parameters, we employ the method of linearized moments (L-moments), which is more robust to outliers. The L-moments (Hosking 1990) are linearized functions of probability weighted moments (PWM) (Greenwood et al. 1979). Using rational approximation the PELPE3 (parameter estimation via L-moments for the Pearson type III distribution) computes the three parameters of the Gamma distribution. Furthermore, the CDFPE3 (Cumulative Distribution Function for Pearson Type III distribution) computes the cumulative probability of an observed precipitation event using the parameters obtained from PELPE3. For more details on the above methods, readers are referred to Hosking (1990).
The nonparametric methods of computing SPI involve obtaining the marginal probabilities of precipitation by calculating the cumulative frequencies through empirical plotting positions. These methods are parameter-free approaches found suitable in the assessment of drought (Cancelliere A et al. 2006; Hao and AghaKouchak 2014; Soláková T et al. 2014; Farahmand A and AghaKouchak A 2015; Ghamghami et al. 2017). There are several nonparametric plotting positions formulae (Hazen 1914; Weibull 1939; Gringorten 1963) to obtain the parametric free distribution models for a given rainfall series. These methods are widely employed in a variety of drought-related applications (Rad et al. 2017; Zhou H and Liu Y 2018; Vazifehkhah et al. 2019).
To compute the nonparametric cumulative distribution functions for the rainfall times series(Xk) of a given grid cell p, q Xk = {x1,x2,…,x113}, we first obtain the ordered statistics for a given grid cell by arranging the rainfall data in the ascending order. We then obtain the rank m for each precipitation value x from the ordered series. The cumulative distribution function (CDF) for a given precipitation value is obtained as \(\frac {m-a}{n+1-2a}\) where n is the total number of years in the time series which is 113 in our case, a is a parameter which takes values 0.5, 0.44, 0 in the case of Hazen, Gringorten, and Weibull plotting positions methods respectively.
Accordingly, the CDF of Gringorten, Weibull and Hazen plotting positions FG, FW, and FH respectively is computed as:
4.2.1 A toy example
For example, let the rainfall data be X = {100,150,50,500,350,70}, the ordered series would be {50,70,100,150,350,500}, and the rank of each element of X would be {3,4,1,6,5,2}, respectively. The CDF for the first element in X, i.e., 100 using Gringorten, Weibull, and Hazen plotting is obtained as \(F_{G}(100)=\frac {3-0.44}{6+0.12}=0.418\), \(F_{W}(100)=\frac {3}{6+1}=0.429\), and \(F_{H}(100)=\frac {3-0.5}{6}=0.417\). Likewise, the CDF for other elements in X can be obtained.
4.2.2 Obtaining SPI from cumulative distribution function
The rainfall being a random event takes a value zero on most of the occasions; hence, its probability mass function defined as number of zeroes in the time series (P0) is one of its important characteristics. The final cumulative probability for each rainfall occurrence is obtained as F(.)(x) = P0 + (1 − P0)F(.)(x|x > 0), where F(.)(x|x > 0) is the cumulative probability strictly for non-zero rainfall occurrences of x in X as F(.) is not defined for x = 0. The probability of zero P0 is computed as P0 = N0/n, where N0 is the number of observations with zeros in the rainfall data X having total number of records n.
We then obtain the SPI of X for a grid cell p, q, by fitting a inverse standard normal distribution ζ (zeta) to the CDFs FP,FG,FW,FH; i.e.:
The approximation given in Abramowitz (1974) is used to obtain ζ:
where c0 = 2.515517, c1 = 0.802583, d1 = 1.432788, d2 = 0.189269, d3 = 0.001308:
where F(.) denotes the cumulative distribution function of parametric FP and nonparametric FG,FW,FH methods respectively.
4.3 Statistical methods for comparison of SPI time series
The SPI is a measure similar to standard deviation as it represents how much an event is above or below the mean. The cumulative probability of a SPI time series is a function of given rainfall events. McKee et al. (1993) categorized SPI into groups such that each of them is well separated by 0.5 standard deviation intervals which are well suited for variables that are normally distributed. Assuming the normality of SPI, we adopted a similar approach and arranged the drought classes as follows:
wherein S(.) represent parametric SPI (SP) and nonparamteric SPI (SG,SW,SH).
However, since the assumption of normality is especially critical when constructing reference intervals for variables (Royston 1991), there is a strong case to study the effects on drought interpretation due to nonnormality in SPI.
The Q-Q plot is a graphical method for matching the quantiles of a given data values to standard normal (Field A 2013). The normality tests such as Shapiro-Wilk (Shapiro and Wilk 1965) are supplementary to visual methods which is better than many other normality tests (Razali NM and Wah YB 2011). The Shapiro-Wilk test is based on the correlation between data and corresponding normal scores and is better than the Shapiro-Francia (Shapiro SS and Francia RS 1972) test for the platykurtic sample, whereas, for leptokurtic samples, the Shapiro-Francia test is found to be better. Accordingly, in the present study based on the sample being tested is leptokurtic or platykurtic, the normality test is performed by either Shapiro-Francia or Shapiro-Wilk method. In terms of climatology if the SPI time series is leptokurtic, then it implies that the given distribution is not normal and has tails on both sides. Also, it means that extreme values are present in the data as outliers which may impact certain assumptions made in the interpretation of droughts.
Cohen’s kappa is a widely employed measure for assessing the inter-rater reliability between two sets of observations. This statistic is introduced in remote sensing applications by Congalton et al. (1983) and is a recommended measure in thematic accuracy analysis. It is a coefficient of agreement between classification and verification. Cohen’s kappa accuracy is determined from the error matrix which gives information on the number of correctly classified along with the errors of commission and omission.
In the present study, parametric SPI (SP) and nonparametric SPI (SG) are considered as two raters of a given drought event whose agreements are assessed by first constructing the confusion matrix which gives the agreements or disagreement across different drought classes wet (WT), normal (NN), moderate (MD), severe (SD), and extreme (ED). Cohen’s kappa statistic (κ) as given by Hudsoll and Ramm (1987) and Congalton RG and Green K (2009) is computed:
wherein, n is the number of observations; po and pc denote the total and chance agreements respectively between the two raters SP and SG. The po is the number of grid cells that show the same drought category for parametric or nonparametric SPI. A higher value of po indicates better agreement between SP and SG on the underlying drought condition. On the other hand, pc is a measure of disagreement between the drought labels generated from SP, SG for each of the grid cells. The higher the value of pc compared with po, the stronger is the disagreement between two raters SP and SG on the drought assessment. The κ value thus obtained is interpreted as (see Viera and Garrett (2005)):
4.3.1 Toy example
Let:
denote the confusion matrix pertaining to drought class moderate (MD), severe (SD), and extreme dryness (ED) categories obtained from the SPI values SP, SG. The diagonal elements of M, i.e., {53,48,90}, denote the number of grid cells that are in agreement between SP and SG when rating the drought situation as MD, SD, or ED. The total actual agreement po = {53 + 48 + 90} = 191. The row and column totals are {83,65,122} and {65,94,111} respectively. The total observations n = {83 + 65 + 122} = 270. The chance agreement is computed as \(p_{c}=\{\frac {65\times 83}{270},\frac {94\times 65}{270},\frac {111\times 122}{270}\}=\{19.98 + 22.63 + 50.16\}=92.77\).
We now obtain \(\kappa =\frac {191-92.77}{270-92.77}=\frac {98.23}{177.23}=0.55\) which according to Eq. 13 denotes moderate agreement between the two raters SP and SG.
5 Study area and dataset
The present study area is the region extending from 6.5∘ north to 38.5∘ north in latitude, and from 66.5∘ east to 100∘ east in longitude covering India. We have utilized the new high spatial resolution (0.25 × 0.25 degree) daily gridded rainfall dataset (Pai DS et al. 2014) over the Indian region comprising of 135 × 129 grid points in longitude and latitude directions with a time span of 113 years from 1901 to 2013. This dataset obtained from the India Meteorological Department (IMD) has total grid cells of 4642 representing the landmass of India.
At first, the daily rainfall data were summed over the month to get the monthly rainfall data using Eq. 1. The total season precipitation is the sum of monthly rainfall data from June to September and is obtained using Eq. 2. The above 4-month period represents the southwest monsoon season, which is the prime rain occurring period over India. This dataset is further utilized for computing parametric and nonparametric SPI in the present study using Eq. 5 to Eq. 8. The years 1901, 1904, 1905, 1911, 1918, 1920, 1941, 1951, 1965, 1966, 1968, 1972, 1974, 1979, 1982, 1987, and 2002 are considered for analysis of all India drought based on two criteria: (i) when deficiency of area weighted rainfall having normal of 88 cm exceeds 10%, and (ii) area under drought is more than 20% of the total area corresponding to plains (Shewale and Kumar 2005). So, in our study, we propose to compare the efficacy of parametric and nonparametric SPI (SP,SG,SW,SH) in assessing actual drought situation over India.
6 Results
Utilizing the dataset discussed in Section 5 and implementing the methods in Section 4 over the study area, we obtain the parametric (SP) and nonparametric (SG,SW,SH) SPI. In order to understand the effectiveness of these techniques in detecting drought situation, we undertake the following investigations. In Section 6.1, a comparative study on the extent of skewness in SP,SG,SW,SH is done. A study on the extent of nonnormality in SPI is presented in Section 6.2. Analysis of the percentage area under dryness estimated by the parametric and nonparametric SPI is carried out in Section 6.3. A quantitative analysis on the SPI using quantiles is presented in Section 6.4 followed by spatial and temporal agreements in drought classes obtained from SP and SG discussed in Section 6.5 and Section 6.6.
6.1 Skewness in SPI-1 and SPI-4 time series (1901–2013)
The SPI-1 time series comprise SPI values for each month computed from monthly rainfall data for years 1901 to 2013. On the other hand, the SPI-4 time series comprise of SPI values computed from June to September cumulative rainfall data for each year from 1901 to 2013. Skewness is a measure to assess whether a given time series follow normal distribution. In general, drought classes are derived in steps of 0.5 deviation toward the left half of the normal distribution which has no skewness (McKee et al. 1993). Therefore, in the present context, the presence of skewness in the SPI time series may result in an erroneous interpretation of drought situation. Accordingly, we compute the left skewness in parametric and nonparametric SPI-1, SPI-4 time series, and choose grid cells that have skewness less than − 0.5. Furthermore, we compute the percentage left skewness (Delta) Δ (see Table 1) as:
where δ represents:
C is the total number of grid cells (4642) covering the Indian region and S(.) is the SPI, p ∈{1,2,…,129}, q ∈{1,2,…,135} are the indices for latitude {6.5∘,6.75∘,…,38.5∘} and longitude {66.5∘,66.75∘,…,100∘} respectively. In the above computation, only those grid cells that fall within the Indian region are considered.
From Table 1, it is evident that the nonparametric SPI (SG,SH,SW) for SPI-1 and SPI-4 time series has no skewness, whereas the percentage left skewness in parametric SPI-4 (ΔP) shows 6.3% when compared with lower percentages in August (3.4%) and September (4%) months. However, the percentage left skewness in parametric SPI-4 (ΔP) in June (5.1%) and July (5.9%) are comparatively higher than August and September months. Therefore, any drought interpretation and assessment using SPI-4 (June–September) and SPI-1 (June and July) of parametric SPI are subjected to some anomalies.
6.2 Analysis on extent of nonnormality in SPI
To understand the nonnormality in SPI time series, Q-Q plot method discussed in Section 4.3 is obtained for the grid cell (12,49) corresponding to latitude 18.5∘ and longitude 72.75∘. A plot of the standard normal and empirical quantiles of both SP and SG is plotted and shown in Fig. 1a and b. In Fig. 1a, the lower and upper regions show deviations from normal for the parametric SPI (SP), whereas Fig. 1b shows no such deviations in SG. It is observed that the deviations in SP are more evident in the lower region as shown in Fig. 1a, which may lead to incorrect assessment of drought situation when using parametric SPI SP.
The normality map obtained for SP and SG time series (1901–2013) using the Shapiro-Wilk test is shown in Fig.2a–b. Figure 2a clearly shows that all grid cells for nonparametric SPI are normal, whereas in some grid cells parametric SPI is not normal (see Fig. 2b). Out of 4642 total grid cells, 3731 are found to be normal in SP and 911 did not follow normality. The percentage of nonnormality corresponding to SP is shown in Table 2. The parametric SPI (SP) for SPI-4 (June–September) has the highest nonnormality of 19.6%. The month of July has 17.2%, whereas June–September SPI has nonnormality in 15.3% of grid cells. The August month parametric SPI (SP) has a nonnormality of 14.3% which is lowest when compared with all the months. This result is consistent with skewness measured on the parametric SPI (SP) in Section 6.1. However, no such anomalies were seen in the nonparametric SPI (SG). Hence, the nonparametric SPI can provide an unbiased assessment of the underlying drought situation.
6.3 Analysis on percentage area under dryness in SPI-4 time series
The percentage area under dryness measure provides an insight into the geographical spread and extent of drought severity as perceived from the SPI time series. Using the SPI classification scheme (McKee et al. 1993) given in Eq. 11, we compute the percentage area under dryness Θ (theta) as:
where
and C is the total number of grid cells (4642), p ∈{1,2,…,129}, q ∈{1,2,…,135} are the indices for latitude {6.5∘,6.75∘,…,38.5∘} and longitude {66.5∘,66.75∘,…,100∘} respectively. In the above computation, only those grid cells that fall within the Indian region are considered.
The values of Θ for drought years 1901, 1904, 1905, 1911, 1918, 1920, 1941, 1951, 1965, 1966, 1968, 1972, 1974, 1979, 1982, 1987, and 2002 given in Shewale and Kumar (2005) for parametric and nonparametric SPI-4 time series are shown in Table 3. The 1918 drought year was more pronounced due to the impact of El Niño and had area weighted rainfall deficiency from normal (80 cm) also known as the Indian Summer Monsoon Rainfall (ISMR) around − 24.9%. This is very well captured by the percentage area under dryness nonparametric SPI ΘG measure showing 52.5% in 1918 which is one of the worst year affected by drought as per the Table 3. Also, it is more clear that from the percentage area under drought over India nonparametric SPI ΘG given in Table 3 the dryness is more pronounced in the year 2002 as well.
The measure ΘG −ΘP clearly shows that ΘG exceeds ΘP in all the 22 drought years considered in this study. Also, on average ΘG exceeds ΘP by around 1.6%, minimum being 1% in drought years 1911,1941, and 1974 and a maximum of 2.5% in the year 2002. As the response to dryness is similar in all nonparametric methods (SG,SH,SW), for all further investigations in this paper our comparisons will be only with nonparametric SPI (SG) and parametric SPI (SP).
6.4 Quantitative analysis of SPI-4 time series
To understand whether SG is a better index than SP, a quantitative analysis using quantiles is carried out in this section. For the drought year 2002, SP, SG is obtained for all grid cells and quantiles are computed for the intervals 0,0.025,0.25,0.5,0.75,0.975, and 1.0. These results are tabulated in Tables 4 and 5. In Table 4, quantiles of SP and SG time series are presented for those grid cells where SP is not following normality. Out of 4642 grid cells covering India, 911 grid cells in SP do not follow normality. From Table 4, we can see that the quantiles 0 and 0.025 the SPI values correspond to extreme dryness (ED) category as per both SP and SG. However, the total of grid cells in ED category as per SP is only 23, i.e., 2.5%, whereas SG is 63 grid cells, i.e., 6.9%. SG shows a higher percentage of grid cells (4.4%) in the ED category compared with SP. At 0.25 quantile, both SP and SG agree on the grid cells being under severe dryness (SD); however, SP shows 3% more under this category than SG. One possible reason could be SP underestimating extreme dryness grid cells as belonging to the severe dryness category. At 0.5 quantile around the SP value is − 0.96 which is near normal category whereas SG shows − 1.27 which represents moderate dryness. The SP values show near normal in 25.1% of grid cells but as per SG, 24.9% of grid cells are under the moderate dryness category. The remaining quantiles from 0.75 to 1.0, the SP and SG agree on the drought category and the percentage of grid cells under that category.
In Table 5 where the grid cells are normal in both SP and SG, at the quantiles 0 and 0.025, 2.5% of the grid cells in SP show extreme dryness, whereas 9.71% in SG belong to this category. SG shows higher percentages of grid cells up to 7.2% are in extreme dryness than SP. On the other hand, in the quantiles from 0.5 to 1.0, both SP and SG agree on the drought category and the percentage of grid cells in this category.
From Tables 4 and 5, one can see SG can detect a higher percentage of grid cells being under extreme dryness category than SP. The drought conditions in grid cells that do not follow normality in SP are underestimated as severe dryness in place of extreme dryness and near normal instead of moderate dryness when compared with SG. Even in grid cells where SP follows normality, the underestimation of drought situation can be evidenced from Table 5.
6.5 Spatial analysis on agreements in drought classes
To understand the spatial agreement among drought classes corresponding to SP and SG, a confusion matrix is constructed for the drought year 2002 and tabulated in Table 6. Table 6 clearly shows substantial disagreement in the number of pixels supposed to be in severe dryness (SD) class. Out of 667 grid cells in SD class, 133 (19.9%) grid cells are misclassified as belonging to the ED class. Likewise, around 7% of grid cells are misidentified as moderate dryness (MD). Also, the ED cases, around 83 (12.3%) grid cells are incorrectly labeled as SD. One can see the gross incorrect estimation of dryness by parametric SPI (SP) over nonparametric SPI (SG). The spatial drought maps for all grid cells obtained from SP and SG for drought years 1982 and 2002 over the Indian region is shown in Figs. 3 and 4 respectively. The map clearly shows the spatial differences wherein underestimation of drought situation is more conspicuous in SP compared with SG. To see whether the normality of SPI is a reason for the overestimation of drought, confusion matrices were constructed for grids cells that show normality in both SP and SG (see Table 7) and those that do not follow normality (see Table 8). In the case of grid cells that are normal in both SP and SG (see Table 7), around 124 (20.5%) grid cells are estimated as ED and 39 (6.5%) as MD instead of SD. Also, around 55 (9.9%) grid cells in the ED category are misrepresented as SD. In contrast where the grid cells are not following normality (see Table 8) in SP, around 13.84% is estimated as ED and 12.3% as MD instead of SD. Interestingly, around 22.9% of grid cells are incorrectly labeled as SD instead of ED when the normality condition is met in SG but not in SP. Clearly, in the case where there is nonnormality in parametric SPI (SP), an increase in misrepresentation of grid cells up to 3% as extreme dryness category instead of severe dryness. Therefore, there is now strong evidence of drought underestimation in grid cells where SP and does not follow normality.
The spatial maps of drought classes derived from parametric SPI (SP) and nonparametric SPI (SG) for all grid cells are shown in Figs. 3 and 4.
To understand the degree of agreement among drought classes derived from SP and SG, Cohen’s kappa is computed using Eq. 12 as given in Section 4.3 for drought years considered in this study. The results are tabulated in Tables 9 and 10. Table 9 shows Cohen’s kappa (κ) for grid cells which are normal in SG and do not follow normality in SP. In Table 9, for the year 1939, κ is found to be 0.15 which means the two raters SP and SG have a slight agreement. The κ for years 2000,1913,2002,1911, and 1905 was found to be 0.21,0.36,0.38,0.42, and 0.44 respectively which is fair agreement as per Cohen’s kappa classification given in Eq. 13. From Table 9, one can observe the disagreements between SP and SG are higher in the ED category. Table 10 shows Cohen’s kappa (κ) for the grid cells where both SP and SG are normal. From Table 10, we observe the Cohen’s kappa (κ) ranges from 0.71 to 0.99 which according to Eq. 13 indicates a substantial to perfect agreement among drought classes.
6.6 Temporal analysis on agreements in drought classes
To understand the temporal disagreement, Cohen’s kappa is computed for each grid cell using SP and SG for drought years considered in this study. The results are tabulated in Table 11. From Table 11, one can see that in 95 grid cells there is only a slight agreement in the drought categories derived from SP and SG. In 307, i.e., 6.6% of grid cells, SP and SG have fair agreement on the drought situation, whereas in 642 grid cells. i.e., 13.8% there is moderate agreement. There is substantial to almost perfect agreement between SP and SG in 1480 and 2118 grid cells, i.e., 31.9% and 45.6% respectively. A spatial map of Cohen’s kappa is shown in Fig. 5. In the Montane climate regions which are characterized by high rainfall variability, the agreement between SP and SG varies from slight to a moderate agreement, whereas in the tropical wet region, most of the grid cells show fair agreement between SP and SG. Even in the semi-arid and arid regions, the agreement between SP and SG ranges from slight agreement to moderate agreement. Therefore, one may conclude that in regions of high rainfall variability the agreements are low between SP and SG during the drought years.
Therefore, there is clear evidence from the present work that parametric SPI deviates from normality in some of the grid cells which might have led to an underestimation of the drought situation. Also, in regions of high rainfall variability SP and SG, the agreements are not almost perfect. Moreover, there is an underestimation of the drought situation by SP compared with SG. Therefore, assessment on dryness by SP may be erroneous especially in the grid cells where normality conditions are not met and in regions where there is a high degree of rainfall variability.
7 Discussion
The parametric SPI is a widely adopted measure to assess drought situation across the globe. This popularity is basically due to simplicity in its computation, and adaptability to different time scales and climate regions. The computation of parametric SPI requires a probability distribution function that fits the rainfall time series data (Lloyd-Hughes and Saunders 2002; Stagge et al. 2015). Several choices of distributions have been suggested in the literature for computing SPI from rainfall time series of different parts of the world (Livada and Assimakopoulos 2007; Zhang et al. 2009). However, it is now understood that whatever the chosen probability density function, SPI values will remain sensitive in the tail regions of the distribution (Farahmand A and AghaKouchak A 2015). That means, the fitted function upon transformation to standard normal, shows some residual skewness, i.e., non-conformity in the tail regions. This may distort SPI values and may affect drought interpretation. Also, studies in Kumar Naresh et al. (2009) and Kumar Naresh et al. (2012) pointed out that the SPI is sensitive to the choice of distribution; and in regions of high rainfall variability, it underestimates or overestimates the drought situation over India. On the other hand, nonparametric methods are found to be more flexible as there is no need to specify the probability distribution function (Hao et al. 2014) for computing the SPI. In the literature, Weibull and Gringorten formulae are the most extensively used nonparametric methods (Soláková T et al. 2014). When these techniques are applied to the computation of SPI, the time series did not show any marked difference with respect to the number of pixels deviating from the normality. Moreover, the effects of extrapolation normally encountered in nonparametric methods are not seen in our interpretation of SPI (Soláková T et al. 2014).
In the present study, we have computed the SPI both from parametric and nonparametric to understand which one of them would be suitable for drought interpretation. It is observed that the parametric SPI-4 showed negative skewness in 6.3% for the June to September rainfall, whereas no skewness is found in nonparametric SPI. It is observed that in 19.6% of grid cells, the parametric SPI-4 time series do not follow normality compared with 0% in nonparametric SPI-4 time series. Quantitative analysis between parametric and nonparametric SPI-4 time series revealed that parametric SPI is underestimating dryness especially in the drought year 2002; in the grid cells where parametric SPI follows normality, only 2.5% show extreme dryness, whereas nonparametric SPI shows 6.9%. Even in the case where grid cells follow normality in parametric SPI, around 2.5% are under extreme dryness as per parametric SPI, whereas 9.7% of grid cells are under ED as per nonparametric SPI. The analysis of the confusion matrix between parametric- and nonparametric-derived SPI for the 2002 drought year showed incorrect categorization of the ED category by parametric SPI. More than 22.9% of grid cells are incorrectly labeled as SD instead of ED. The Cohen’s kappa for years 2002, 1913, 2002, 1911, and 1905 was found to be under the fair agreement category. Around 19.4% of grid cells show less than chance agreement to moderate agreement between parametric SPI and nonparametric SPI. Most interestingly, the spatial map of Cohen’s kappa showed that in climate regions of high rainfall variability the parametric and nonparametric SPI may tend to show slight to a moderate agreement only.
The present study demonstrates the computation issues in parametric and nonparametric SPI and attempts to bring out differences in interpretation of the drought situation. The parametric SPI had to be used with caution when being used in regions having high rainfall variability. It is found that nonparametric SPI is a good candidate index for better interpretation and understanding meteorological droughts over India.
8 Conclusions
This paper presents an objective comparison of the SPI derived from parametric and nonparametric approaches for meteorological drought assessment. The SPI is a standardized index wherein classes are drawn based on deviations from the mean (McKee et al. 1993), its impact on assessment of drought due to nonnormality is a major concern. The crux of this paper is to evaluate the parametric and nonparametric SPI especially in the regions where normality conditions are not met and its impact on drought interpretation and categorization. Accordingly, the skewness and normality of SPI from parametric and nonparametric methods were computed and compared using June–September southwest monsoon season rainfall data from 1901 to 2013. Higher nonnormality and skewness are observed in parametric SPI, whereas nonparametric methods did not show any such deviation.
One of the ways to assess the drought situation is to measure the degree and extent of dryness represented by the SPI. Accordingly, the comparison of percentage dryness revealed that in drought nonparametric SPI has better represented the dryness compared with parametric SPI. This is commensurate with the dryness represented by the rainfall deficit in all grid cells over the Indian region. Furthermore, our study on drought years 1901, 1904, 1905, 1911, 1918, 1920, 1941, 1951, 1965, 1966, 1968, 1972, 1974, 1979, 1982, 1987, and 2002 revealed that parametric SPI tends to overestimate the level of dryness at a location as it categorizes severe dryness as extreme in the case of grid cells following normality in both SPI, whereas in grid cells where parametric SPI does not follow normality, there is an underrepresentation of extreme dryness cases as severe dryness. A comparison of Cohen’s kappa statistic for all drought years between the parametric SPI and nonparametric SPI for all drought classes revealed the disagreement between them is higher in ED class compared with other classes, and this observation is consistent in grid cells where parametric SPI does not follow normality.
This study thus concludes that the normality of SPI is an important aspect to be considered while assessing the drought situation. Furthermore, nonparametric SPI has provided an index that has zero skewness and 100% normality conditions met in all grid cells over the Indian region. Moreover, it is reported in the recent past on climate change phenomena that the reason for observation of rainfall variability is not consistent with historic patterns. Under such circumstances, the nonparametric approach of computing SPI can effectively capture the underlying drought conditions. Since the current study covers a larger geographic area characterized by high rainfall variability and longer time series, one may assume the results of this study to be stable. Furthermore, work needs to be oriented toward how the drought characteristics and frequency can be characterized using nonparametric SPI and multivariate drought indices. This would be the focus of our subsequent studies on drought over the Indian region.
References
Abramowitz M (1974) Handbook of mathematical functions, with formulas, graphs, and mathematical tables. Dover Publications, Inc., New York, NY USA
Alley WM (1984) The Palmer Drought Severity Index: limitations and assumptions. Journal of Climate and Applied Meteorology 23(7):1100–1109. https://doi.org/10.1175/1520-0450(1984)023<1100:TPDSIL>2.0.CO;2
AMS (2013) Drought - an information statement of the American Meteorological Society. https://www.ametsoc.org/ams/index.cfm/about-ams/ams-statements/statements-of-the-ams-in-force/drought/, visited on 2019-03-13
Bordi I, Frigio S, Parenti P, Speranza A, Sutera A (2001) The analysis of the Standardized Precipitation Index in the Mediterranean area: large-scale patterns. Annals of Geophysics 44:5–6. https://doi.org/10.4401/ag-3549
Briffa KR, Jones PD, Hulme M (1994) Summer moisture variability across Europe, 1892–1991: an analysis based on the Palmer Drought Severity Index. Int J Climatol 14(5):475–506. https://doi.org/10.1002/joc.3370140502
Byun HR, Wilhite DA (1999) Objective quantification of drought severity and duration. J Clim 12 (9):2747–2756. 10.1175/1520-0442(1999)012〈2747:OQODSA〉2.0.CO;2
Cancelliere A, Bonaccorso B, Di Mauro G (2006) A non parametric approach for drought forecasting through the Standardized Precipitation Index. In: M Giornata di Studio: Metodi Statistici e Matematici per le Analisi delle Serie Idrologiche. Viterbo, 26 Maggio, Roma: CNR-GNDCI 2908:135-142, ISBN/ISSN: 8888885056
Chu HJ (2018) Drought detection of regional nonparametric standardized groundwater index. Water Resour Manag 32(9):3119–3134. https://doi.org/10.1007/s11269-018-1979-4
Congalton RG, Green K (2009) Assessing the accuracy of remotely sensed data : principles and practices. Boca Raton: CRC Press/Taylor & Francis
Congalton RG, Oderwald RG, Mead RA (1983) Assessing landsat classification accuracy using discrete multivariate analysis statistical techniques. Photogrammetric Engineering and Remote Sensing 49 (12):1671–1678
Cruz-Roa A, Olaya-Mari̇n E, Barrios M (2017) Ground and satellite based assessment of meteorological droughts: the Coello River basin case study. International Journal of Applied Earth Observation and Geoinformation 62:114–121. https://doi.org/10.1016/J.JAG.2017.06.005
Das S, Roy Choudhury M, Gandhi S, Joshi V (2016) Application of earth observation data and standardized Precipitation Index based approach for meteorological drought monitoring, assessment and orediction over Kutch, Gujarat, India. International Journal of Environment and Geoinformatics 3(2):24–37. https://doi.org/10.30897/ijegeo.306468
Deo RC, Byun HR, Adamowski JF, Begum K (2017) Application of effective drought index for quantification of meteorological drought events: a case study in Australia. Theor Appl Climatol 128 (1-2):359–379. https://doi.org/10.1007/s00704-015-1706-5
Dinpashoh Y, Fakheri-Fard A, Moghaddam M, Jahanbakhsh S, Mirnia M (2004) Selection of variables for the purpose of regionalization of Iran’s precipitation climate using multivariate methods. J Hydrol 297(1-4):109–123. https://doi.org/10.1016/J.JHYDROL.2004.04.009
Elkollaly M, Khadr M, Zeidan B (2018) Drought analysis in the Eastern Nile basin using the Standardized Precipitation Index. Environ Sci Pollut Res 25(31):30772–30786. https://doi.org/10.1007/s11356-016-8347-9
Farahmand A, AghaKouchak A (2015) A generalized framework for deriving nonparametric standardized drought indicators. Advances in Water Resources 76:140–145. https://doi.org/10.1016/J.ADVWATRES.2014.11.012
Field A (2013) Discovering statistics using IBM SPSS Statistics, 4th edn. Sage Publications Ltd
Ghamghami M, Hejabi S, Rahimi J, Bazrafshan J, Olya H (2017) Modeling a drought index using a nonparametric approach. Global NEST Journal 19(1):58–68
Gibbs WJ, Maher JV (1967) Rainfall deciles as drought indicators. Bureau of meteorology bull. 48 commonwealth of australia, Melbourne, Australia
Golian S, Mazdiyasni O, AghaKouchak A (2015) Trends in meteorological and agricultural droughts in Iran. Theoretical and Applied Climatology 119(3-4):679–688. https://doi.org/10.1007/s00704-014-1139-6
Greenwood JA, Landwehr JM, Matalas NC, Wallis JR (1979) Probability weighted moments: definition and relation to parameters of several distributions expressable in inverse form. Water Resour Res 15 (5):1049–1054. https://doi.org/10.1029/WR015i005p01049
Gringorten II (1963) A plotting rule for extreme probability paper. Journal of Geophysical Research (1896-1977) 68(3):813–814. https://doi.org/10.1029/JZ068i003p00813
Guhathakurta P, Menon P, Inkane PM, Krishnan U, Sable ST (2017) Trends and variability of meteorological drought over the districts of India using Standardized Precipitation Index. Journal of Earth System Science 126(8):120. https://doi.org/10.1007/s12040-017-0896-x
Hao Z, AghaKouchak A (2014) A nonparametric multivariate multi-index drought monitoring framework. J Hydrometeorol 15(1):89–101. https://doi.org/10.1175/JHM-D-12-0160.1
Hao Z, AghaKouchak A, Nakhjiri N, Farahmand A (2014) Global integrated drought monitoring and prediction system. Scientific Data 140001:1. https://doi.org/10.1038/sdata.2014.1
Haslinger K, Blȯschl G (2017) Space-time patterns of meteorological drought events in the European Greater Alpine region over the past 210 years. Water Resour Res 53 (11):9807–9823. https://doi.org/10.1002/2017WR020797
Hayes M, Svoboda M, Wall N, Widhalm M (2011) The Lincoln declaration on drought indices: universal meteorological drought index recommended. Bull Am Meteorol Soc 92(4):485–488
Hayes MJ, Svoboda MD, Wilhite DA, Vanyarkho OV (1999) Monitoring the 1996 drought using the standardized precipitation index. Bull Am Meteorol Soc 80(3):429–438
Hazen A (1914) Storage to be provided in impounding reservoirs for municipal water supply. Trans Am Soc Civ Eng 77:1539– 1640
Hosking JRM (1990) L-Moments: analysis and estimation of distributions using linear combinations of order statistics. Journal of the Royal Statistical Society Series B (Methodological) 52(1):105–124
Hosking JRM, Wallis JR (1997) Regional frequency analysis: an approach based on L-moments. Cambridge University Press, New York NY, USA
Huang S, Huang Q, Chang J, Zhu Y, Leng G, Xing L (2015) Drought structure based on a nonparametric multivariate standardized drought index across the Yellow River basin, China. Journal of Hydrology 530:127–136. https://doi.org/10.1016/j.jhydrol.2015.09.042
Hudsoll WD, Ramm CW (1987) Correct formulation of the kappa coefficient of agreement. Photogrammetric Engineering and Remote Sensing 53(4):421–422
Jenkins K, Warren R (2015) Quantifying the impact of climate change on drought regimes using the Standardised Precipitation Index. Theor Appl Climatol 120(1-2):41–54. https://doi.org/10.1007/s00704-014-1143-x
Kostopoulou E, Giannakopoulos C, Krapsiti D, Karali A (2017) Temporal and spatial trends of the standardized precipitation index (SPI) in Greece using observations and output from regional climate models. In: Perspectives on atmospheric sciences, Springer, Cham, pp 475–481, DOI https://doi.org/10.1007/978-3-319-35095-0_68, (to appear in print)
Kumar R, Musuuza JL, Van Loon AF, Teuling AJ, Barthel R, Ten Broek J, Mai J, Samaniego L, Attinger S (2016) Multiscale evaluation of the Standardized Precipitation Index as a groundwater drought indicator. Hydrology and Earth System Sciences 20(3):1117–1131. https://doi.org/10.5194/hess-20-1117-2016
Łabȩdzki L (2007) Estimation of local drought frequency in central Poland using the Standardized Precipitation Index SPI. Irrigation and Drainage 56(1):67–77. https://doi.org/10.1002/ird.285
Livada I, Assimakopoulos VD (2007) Spatial and temporal analysis of drought in Greece using the Standardized Precipitation Index (SPI). Theor Appl Climatol 89(3-4):143–153. https://doi.org/10.1007/s00704-005-0227-z
Lloyd-Hughes B, Saunders MA (2002) A drought climatology for Europe. Int J Climatol 22 (13):1571–1592. https://doi.org/10.1002/joc.846
Ma F, Luo L, Ye A, Duan Q (2018) Seasonal drought predictability and forecast skill in the semi-arid endorheic Heihe River basin in northwestern China. Hydrol Earth Syst Sci 22:5697–5709. https://doi.org/10.5194/hess-22-5697-2018
McKee TB, Doesken NJ, Kleist J (1993) The relationship of drought frequency and duration to time scales. In: Proceedings of the 8th Conference on Applied Climatology, American Meteorological Society, Boston, MA, USA, Anaheim, California, vol 17, pp 179–183
Meroni M, Rembold F, Fasbender D, Vrieling A (2017) Evaluation of the Standardized Precipitation Index as an early predictor of seasonal vegetation production anomalies in the Sahel. Remote Sensing Letters 8(4):301–310. https://doi.org/10.1080/2150704X.2016.1264020
Mishra AK, Singh VP (2010) A review of drought concepts. J Hydrol 391(1-2):202–216. https://doi.org/10.1016/J.JHYDROL.2010.07.012
Kumar Naresh M, Murthy CS, Sesha Sai MVR, Roy PS (2009) On the use of Standardized Precipitation Index (SPI) for drought intensity assessment. Meteorological Applications 16(3):381–389. https://doi.org/10.1002/met.136
Kumar Naresh M, Murthy CS, Sesha Sai MVR, Roy PS (2012) Spatiotemporal analysis of meteorological drought variability in the Indian Region using Standardized Precipitation Index. Meteorological Applications 19(2):256–264. https://doi.org/10.1002/met.277
Olukayode Oladipo E (1985) A comparative performance analysis of three meteorological drought indices. J Climatol 5(6):655–664. https://doi.org/10.1002/joc.3370050607
Pai DS, Sridhar L, Guhathakurta P, Hatwar HR (2011) District-wide drought climatology of the southwest monsoon season over India based on Standardized Precipitation Index (SPI). Nat Hazards 59(3):1797–1813. https://doi.org/10.1007/s11069-011-9867-8
Pai DS, Latha S, Rajeevan M, Sreejith OP, Satbhai NS, Mukhopadhyay B (2014) Development of a new high spatial resolution (0.25 X 0.25 degree) long period (1901-2010) daily gridded rainfall data set over India and its comparison with existing data sets over the region. Mausam 65(1):1–18
Palmer WC (2006) Meteorological Drought Research Paper No. 45, 1965, 58 p. Office of Climatology. US Weather Bureau, Washington DC. https://www.fws.gov/southwest/es/documents/R2ES/LitCited/LPC_2012/Palmer_1965.pdf
Rad AM, Ghahraman B, Khalili D, Ghahremani Z, Ardakani SA (2017) Integrated meteorological and hydrological drought model: a management tool for proactive water resources planning of semi-arid regions. Adv Water Resour 107:336–353. https://doi.org/10.1016/j.advwatres.2017.07.007
Razali NM, Wah YB (2011) Power comparisons of Shapiro-Wilk, Kolmogorov-Smirnov, Lilliefors and Anderson-Darling tests. Journal of Statistical Modeling and Analytics 2(1):21–33. https://doi.org/10.1515/bile-2015-0008
Rodri̇guez-Puebla C, Nieto S (2009) Trends of precipitation over the Iberian Peninsula and the North Atlantic Oscillation under climate change conditions. Int J Climatol 30 (12):1807–1815. https://doi.org/10.1002/joc.2035
Royston P (1991) Estimating departure from normality. Stat Med 10 (8):1283–1293. https://doi.org/10.1002/sim.4780100811
Shapiro SS, Francia RS (1972) An approximate analysis of variance test for normality. Journal of the American Statistical Association 67(337):215–216. https://doi.org/10.1080/01621459.1972.10481232
Shapiro SS, Wilk MB (1965) An analysis of variance test for normality (complete samples). Biometrika 52(3/4):591–611
Shewale M, Kumar S (2005) Climatological features of drought incidences in India Meteorological Monograph (Climatology 21/2005), National Climate Centre, Indian Meteorological Department
Shukla S, Wood AW (2008) Use of a standardized runoff index for characterizing hydrologic drought. Geophysical Research Letters 35(2):L02405. https://doi.org/10.1029/2007GL032487. http://doi.wiley.com/10.1029/2007GL032487
Sirdas S, Sen Z (2003) Spatio-temporal drought analysis in the Trakya region, Turkey. Hydrol Sci J 48(5):809–820. https://doi.org/10.1623/hysj.48.5.809.51458
Soláková T, De Michele C, Vezzoli R (2014) Comparison between Parametric and Nonparametric Approaches for the Calculation of Two Drought Indices: SPI and SSI. Journal of Hydrologic Engineering 19(9):04014010. https://doi.org/10.1061/(ASCE)HE.1943-5584.0000942
Stagge JH, Tallaksen LM, Gudmundsson L, Loon Van, AF Stahl K (2015) Candidate distributions for climatological drought indices (SPI and SPEI). Int J Climatol 35(13):4027–4040. https://doi.org/10.1002/joc.4267
Szinell CS, Bussay A, Szentimrey T (1998) Drought tendencies in Hungary. International Journal of Climatology 18(13):1479–1491. https://doi.org/10.1002/(SICI)1097-0088(19981115)18:13<1479::AID-JOC325>3.0.CO;2-P
Tsakiris G, Vangelis H (2004) Towards a Drought Watch System based on Spatial SPI. Water Resour Manag 18(1):1–12. https://doi.org/10.1023/B:WARM.0000015410.47014.a4
Vazifehkhah S, Tosunoglu F, Kahya E (2019) Bivariate risk analysis of droughts using a nonparametric multivariate standardized drought index and copulas. Journal of Hydrologic Engineering 24(5):05019006. https://doi.org/10.1061/(ASCE)HE.1943-5584.0001775
Vicente Serrano SM, Gonzȧlez-Hidalgo JC, De Luis Arrillaga M, Raventȯs J (2004) Drought patterns in the Mediterranean area: the Valencia region (eastern Spain). Climate Research 26(1):5– 15
Viera AJ, Garrett JM (2005) Understanding interobserver agreement: The Kappa statistic. Fam Med 37(5):360–363
Weibull W (1939) A statistical theory of the strength of materials.Ing. Vetenskaps Akad. Handl. (Roy. Swedish Inst. Eng. Research Proc.) NR 151
Wilhite DA, Glantz MH (1985) Understanding: the drought phenomenon: the role of definitions. Water Int 10(3):111–120. https://doi.org/10.1080/02508068508686328
Wu H, Hayes MJ, Weiss A, Hu Q (2001) An evaluation of the Standardized Precipitation Index, the China-Z Index and the statistical Z-Score. International Journal of Climatology 21(6):745–758. https://doi.org/10.1002/joc.658
Zhang Q, Xu CY, Zhang Z (2009) Observed changes of drought/wetness episodes in the Pearl River basin, China, using the Standardized Precipitation Index and aridity index. Theor Appl Climatol 98 (1-2):89–99. https://doi.org/10.1007/s00704-008-0095-4
Zhou H, Liu Y (2018) Spatio-temporal pattern of meteorological droughts and its possible linkage with climate variability. International Journal of Climatology 38(4):2082–2096. https://doi.org/10.1002/joc.5319
Acknowledgments
The author would like to place on record his sincere appreciation to the handling Editor of this journal for his constructive comments which greatly improved the readability of this manuscript. Also, I wish to thank Dr. C.S Murthy of the National Remote Sensing Centre for providing the datasets.
Author information
Authors and Affiliations
Corresponding author
Additional information
Publisher’s note
Springer Nature remains neutral with regard to jurisdictional claims in published maps and institutional affiliations.
Rights and permissions
About this article
Cite this article
Mallenahalli, N.K. Comparison of parametric and nonparametric standardized precipitation index for detecting meteorological drought over the Indian region. Theor Appl Climatol 142, 219–236 (2020). https://doi.org/10.1007/s00704-020-03296-z
Received:
Accepted:
Published:
Issue Date:
DOI: https://doi.org/10.1007/s00704-020-03296-z