2.1 Monofractal and multifractals in urban studies

Monofractal is also termed unifractal, which represents simple self-similar structure. The simple fractal model has been widely applied to urban form and growth [13, 14, 39, 40]. A monofractal system is a self-similar hierarchy with symmetric cascade structure and single scaling process. In a monofractal object, different fractal units bear the same form and dimension value. In contrast, a multifractal system is a self-similar hierarchy with asymmetric cascade structure and multi-scaling processes. In a multifractal object, different fractal units possess different forms and different local fractal dimension values. Where the spatial structure is concerned, monofractals are treated as homogeneous fractals, while multifractals are regarded as heterogeneous fractals. A monofractal can be characterized by a single fractal parameter, while multifractals should be characterized by a series of fractal parameters. Generally, two sets of fractal parameters are employed to characterize multifractals, including global and local parameters. The global parameters include generalized correlation dimension, D_q, and mass exponent, τ(q), and the local parameters comprise singularity exponent, α(q), and local fractal dimension of the fractal subsets, f(α). In practice, spatial analysis of multifractal systems are based on multifractal parameter spectrums, including global multifractal spectrum, i.e., D_q-q spectrum, and local parameter spectrum, i.e., f(α)-α spectrum. The latter is also termed f(α) curve and represents the basic multifractal spectrum.

In the real geographical world, there are seldom monofractal phenomena. Urban form and systems of cities proved to be multifractals [26, 28, 34–37]. The monofractal method can be used to describe the basic characteristics of multifractals, but the multifractal spectrums cannot be employed to describe monofractal structure. Is a traffic network monofractal or multifractals? This can be identified by multifractal spectrums. If a traffic network is of multifractal structure, its global parameter spectrum will be an inverse S-shaped curve, and the local parameter spectrum will be a unimodal curve. On the contrary, if the traffic network is of monofractal structure, its global parameter spectrum will be a horizontal straight line, and the local parameter spectrum will be a point [41]. In the generalized correlation dimension set, there are three basic parameters, that is, capacity dimension D₀, information dimension D₁, and correlation dimension (in a narrow sense) D₂. If D₀> D₁> D₂ significantly, the global dimension spectrum will be an inverse S-shaped curve. Therefore, the inequality D₀> D₁> D₂ can display multifractal structure of a traffic network. In contrast, if D₀≈D₁≈D₂, a traffic network can be treated as monofractal structure. This is the simplest approach to distinguishing monofractal from multifractals.

2.2 Global multifractal parameters

Global parameters describe the fractal object from an overall perspective and macro level. The generalized correlation dimension D_q is based on Renyi’s entropy. It is always expressed as [3, 42, 43]: (1) where q refers to the moment order (-∞<q<∞), M_q(ε) to the Renyi’s entropy with a linear scale ε. Eq (1) suggests that multifractal parameters are actually defined by growth probability P_i(ε) and corresponding spatial scale ε. The spatial scale indicates size and shape while probability indicates chance and dimension. When measured by box-counting method, N(ε) refers to the number of nonempty boxes with linear size of ε, and P_i(ε) represents the growth probability, indicating the ratio of measurement results of fractal subset appearing in the ith box L_i(ε) to that of whole fractal copies L(ε); that is, P_i(ε) = L_i(ε) /L(ε). At a specific scale ε, the larger P_i(ε) is, the higher growth probability it has, corresponding to higher density of this fractal subset. With the intensive measure, by changing the value of q, attention can be focused on locations with high density (q→∞), or, conversely, on locations with low density (q→-∞). Another global parameter, mass exponent τ(q) can be estimated by D_q value [3, 44]: (2) which reflects the scaling property from the viewpoint of generalized mass.

As indicated above, there are three basic parameters in the set of generalized correlation dimension. In Eq (1), the common fractal parameters can be derived. For q = 0, D₀ refers to the capacity dimension; for q = 1, D₁ refers to the information dimension; for q = 2, D₂ refers to the correlation dimension [36]. The capacity dimension reflects space-filling degree, the information dimension indicates spatial uniformity, and the correlation dimension suggests spatial dependence extent. The geographical meanings of the three parameters for traffic networks can be tabulated as below (Table 1). Using capacity dimension, we can describe the development extent of a traffic network; using information dimension, we can show the spatial heterogeneity of a traffic network; using correlation dimension, we can characterize the spatial complexity of a traffic network. The correlation dimension is a measurement of spatial dependence. Spatial correlation suggests that the whole is not equal to the sum of parts, and thus there are nonlinear relationships in a system. Nonlinearity suggests complexity. In this sense, the spatial correlation dimension is a quantitative criterion of spatial complexity. However, the powerful function of multifractal analysis lies in the spectral curves, not in a single parameter. The relation between the moment order q and generalized correlation dimension gives the global multifractal spectrum, namely, D_q-q spectrum, which is an inverse S-shaped curve.

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Table 1. Geographical meanings of capacity dimension, information dimension, and correlation dimension for traffic network.

https://doi.org/10.1371/journal.pone.0246925.t001

2.3 Local multifractal parameters

Local parameters focus on the micro features of different parts and micro levels in multifractals. Given its heterogeneity, a multifractal set has many fractal subsets, and each part corresponds to a power law: (3) where ε_i refers to the corresponding linear scale of the ith box, and α(q) refers to the strength of local singularity. The scaling exponent is also termed as Lipschitz-Hölder singularity exponent, suggesting the degree of singular interval measures [3]. Different values of α correspond to different subsets of multifractals, and different regions may share the same value of α. Accordingly, the number of fractal subsets with the same α value under the linear ε_i is given by (4) where f(α) refers to the fractal dimension of the subsets with singularity strength α, named as local fractal dimension. The higher the local dimension f(α) is, the larger the number of fractal subsets with singularity α get, and vice versa. The α(q) and f(α) compose the set of local parameters of the multifractal sets. The relationship between f(α) and α forms the local parameter spectrum, i.e., the singularity spectrum of multifractals. This is a unimodal curve with an apex (α(0), f(α(0))).

There are two basic models of multifractal growth pattern in urban development. One is spatial aggregation or concentration, and the other is spatial diffusion or deconcentration [28]. The different growing types can be distinguished by the height difference of f(α), Δf = f(q→+∞)-f(q→-∞). For cities with spatial concentration growth pattern, the central regions are denser, and peripheral regions are sparser. While cities of spatial deconcentration pattern are the reverse. In Fig 1, we give a simple representation of how the different growth models of traffic networks are related to the f(α) spectrum. If the f(α) is high on the left tails and low on the right tails (Δf>0), and it slants to the left, the fractal growth is dominated by spatial deconcentration. Conversely, when Δf<0, and it slants to the right, this suggests the fractal growth of spatial concentration. These local parameters provide detailed information about local differences in the relative intensity of urban street networks.

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Fig 1. The singularity spectrums of two different multifractal growth modes: Spatial concentration and deconcentration.

(A) Spatial aggregation mode; (B) Singularity spectrum for spatial aggregation; (C) Spatial diffusion mode; (D) Singularity spectrum for spatial diffusion. Note: The squares with larger size represent network intensive areas, while the smaller squares represent network sparser areas. The local parameter f(α) curve stands for the local fractal dimension of the sets of units with the singularity exponent α.

https://doi.org/10.1371/journal.pone.0246925.g001

There are nonlinear relationships between the global parameters and local parameters. The two sets of parameters can be associated with one another by Legendre transform [44–46]. Legendre transform can be expressed as (5) (6)

The box-counting method can be employed to estimate global multifractal parameters, and the direct determination method based on normalized rescaled probability measure was used to estimate local multifractal parameters [38, 39]. Lastly, the ordinary least squares (OLS) linear regression was utilized to estimate fractal parameters to obtain practical spectrums [30].

In spatial analysis, the global multifractal spectrum can be compared to a telescope, and the local multifractal spectrum can be compared to a microscope. The different levels of a self-similar hierarchical system can be reflected by the moment order q. Where the global level is concerned, changing q value indicates changing the described levels of multifractal system; where the local level is concerned, changing q value indicates changing focused parts in the multifractal system. By changing the value of moment order q, we can rescale growth probability distribution. One of the advantages of multifractal method is that, by means of multifractal dimension spectrums, different levels of a complex network can be investigated at the macro level, and different parts can be focused at the micro level. Through the D_q-q spectrum, we can investigate different levels of a multifractal system on the whole by changing q value. On the other hand, through the f(α)-α(q) spectrum, the investigation will focus on parts at different levels of a multifractal system by changing q value. The process of rescaling probability distribution can be illustrated with a simple example of real traffic network (Fig 2).

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Fig 2. Schematic representation of rescaling probability distribution for multifractal computation based on box-counting method.

The probability distribution of traffic links is calculated over all boxes and then weighted by moment order q. Dark red boxes represent dominant structures with higher weighted probability, and dark blue boxes represent lightweight regions with lower weighted probability. (A) Partial traffic networks in Shenzhen. (B) When q = 0, all nonempty boxes are equally weighted (gray). (C) When q = 1, the nonempty boxes are weighted by real growth probability. (D)-(E) For q>0, the boxes with relative high-density measures gradually gain more importance and their contribution to the entropy will dominate. (F) For q<0, the boxes with relatively low-density measures gradually gain more importance and their contribution to the entropy will dominate.

https://doi.org/10.1371/journal.pone.0246925.g002

3.1 Study area, datasets, and methods

The general characteristics of multifractal structure of traffic network can be revealed by induction. In this work, twelve Chinese megacities are selected for case studies of traffic networks. These cities include Beijing, Tianjin, Shanghai, Nanjing, Shenzhen, Guangzhou, Chengdu, Xi’an, Wuhan, Zhengzhou, Shenyang, and Harbin. They are representative cities in typical regions and scattered all over China (Fig 3). The population size characterized by urban permanent residents is near or even greater than five million for each megacity. In these cities, human activities and urban flows are highly concentrated on street networks. Different definitions of cities may affect conclusions regarding the statistical distribution of urban activity [47]. In order to define comparable study areas for different cities so that we obtain comparable multifractal parameters, we first identify the twelve urban boundaries in a consistent way. Several algorithms have been constructed to delimit urban boundaries [48–51]. Among these algorithms, City Clustering Algorithm (CCA) has attracted great attention for its simplicity and efficiency [52, 53]. CCA can be regarded as a method of spatial cluster. In this study, City Clustering Algorithm (CCA) and head/tail break method are employed to identify urban boundaries and thus define comparable study areas, functional box-counting method is utilized to make spatial measurement for scaling analysis, and regression analysis based on the least squares methods (LSM) is used to estimate multifractal parameters.

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Fig 3. The spatial distribution of twelve megacities of China.

All of them are the most representative cities in typical regions of China, including North China (Beijing, Tianjin) drawn in red, Northeast China drawn in orange (Harbin, Shenyang), Central China drawn in brown (Zhengzhou, Wuhan), West China drawn in purple (Xi’an, Chengdu), East China drawn in blue (Shanghai, Nanjing), South China drawn in green (Shenzhen, Guangzhou).

https://doi.org/10.1371/journal.pone.0246925.g003

The data processing includes three main steps. Step 1: selecting the original data. Street network datasets in 2016 are obtained from the Chinese digital navigation map (http://geodata.pku.edu.cn), including freeways, arterials, and collectors. Using the datasets, we then derive 6.74 million street nodes by ESRI ArcGIS. Step 2: spatial clustering of street nodes. We apply the CCA to cluster contiguous nodes by using the Aggregate Points tool in ArcGIS, which is intrinsically based on a Triangulated Irregular Network (TIN) model. In this process, the aggregation distance is set as 615 meters, which is the mean length of whole TIN edges determined by head/tail breaks [54, 55]. Head/tail breaks is a classification scheme or recursive function for deriving inherent hierarchy or heterogeneity of a dataset [56, 57]. Step 3: defining urban boundaries. We fill the holes inside the clusters and select the urban envelope of the largest cluster of each city to define urban boundary (Fig 4). An urban envelope of a city is a closed boundary curve of an urban area [13, 58]. The comparable study areas of different cities can be defined by urban envelopes based on CCA.

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Fig 4. The distribution of street networks in twelve representative cities.

The black line is the city boundary identified, which is smaller than the municipal area for most cities; the grey lines represent the street network.

https://doi.org/10.1371/journal.pone.0246925.g004

A network is a complicated system comprising a set of line segments (edges) and intersection points (node or vertex). Urban traffic networks consist of streets, roads, and junction points. Multifractal parameter measurement may be based on street links (edges) or street nodes (vertex). This work focuses on multifractal patterns of street links. Because street links may contain more information about local connectivity, which better reflects the network density. As a reference, we also provide the multifractal computation results generated by street nodes (S1 Appendix). The multifractal parameters of the 12 urban street networks can be estimated step by step as follows.

1. Step 1: defining the maximum box. Determine a circumscribed rectangle of urban envelope. The rectangular area is termed measure area in mathematics. The measure area can be treated as the maximum box.
2. Step 2: extracting the spatial data. Apply the functional box-counting method to the traffic networks to gain spatial data. The linear size of the largest box is regarded as ε = 1, and the corresponding nonempty box number is N(ε) = 1. The probability is P(ε) = 1. Then the box area is divided into 4 equal parts. The linear size of each part is ε = 1/2. Count the secondary level boxes, and the number of nonempty boxes is N(ε)>1. Each nonempty box corresponds to a probability P_i(ε) (i = 1,2,…, N(ε)≤4). Next, the maximum box area is divided into 16 equal parts; that is to say, each secondary level box is divided into 4 equal parts once again. The linear size of each part is ε = 1/4 this time, and the number of nonempty boxes N(ε) is counted again. Still, each nonempty box corresponds to a probability value P_i(ε) (i = 1,2,…, N(ε)≤16). The rest can be handled in the same way.
3. Step 3: calculating multifractal parameters. By the least squares regression analysis, the μ-weight method, namely, the direct determination method based on rescaled probability measure can be used to estimate local multifractal parameters (S1 Table). A weighted measure can be defined as (7) where μ(ε) denotes rescaled probability measure based on the given linear size of box ε. Then the singularity exponent α(q) and corresponding local fractal dimension f(q) can be estimated by the following formula [59, 60] (8) (9)

Then, by Legendre transform, we can obtain the corresponding global multifractal parameters, including the generalized correlation dimension D_q and mass exponent τ(q). Using Eq (6), we can convert the singularity exponent α(q) and corresponding local fractal dimension f(q) into the generalized correlation dimension D_q. Then, using Eq (1) we can convert the generalized correlation dimension D_q into the mass exponent τ(q). Alternatively, if we firstly compute the global parameter, D_q and τ(q), by means of Eqs (1) and (2), we can transform them into the local parameter, α(q) and f(q) by using Eq (6) and the discretized form of Eq (5). In this study, the scale range of spatial subdivision is set as 2⁰~2⁹. Besides, the value range from -40 to 40 is selected for q, as multifractal parameters are very close to their convergence when |q| approaches 40 (S2 Table). The multifractal parameters are calculated by the OLS linear regression (S3 Table).

3.2 Global multifractal spectrums

First of all, let’s examine whether or not the traffic networks bear multifractal properties. The simplest way is to compare the three basic fractal parameters in the generalized correlation dimension set: capacity dimension D₀, information dimension D₁, and correlation dimension D₂ (Table 2). Empirical results show that the street network bears multifractal structure in Chinese cities. Apparently, D₀>D₁>D₂ holds for all the 12 cities. The three basic multifractal parameters reveal useful information about the overall spatial coverage and dependence of urban street networks. In general, the space-filling degree, spatial equilibrium degree, and spatial dependence degree of urban street networks for each city are generally high. The D₀, D₁, and D₂ are more than 1.7. Statistical analyses show that there is a significant correlation between each fractal dimension and city size. The urban sizes have a close correlation to the fractal dimension values of street networks with an exception of Shenzhen city. If we use the urban area to measure city size, we can find a logarithmic relation such as D_q = a+bln(A), where a and b are parameters. The city of Shenzhen is still an outlier. The absolute value of the standardized prediction error of Shenzhen goes beyond 2. If Shenzhen is removed, the goodness of fit (R²) between the urban area logarithm and the fractal parameters D₀, D₁, and D₂ are 0.8789, 0.9724, and 0.9197, respectively. If Shenzhen is taken into account, the values lessen to 0.4504, 0.4710, and 0.4666. Using the urban population to replace the urban area, we have a linear relation as follows: D_q = c+dP, where c and d are parameters. Shenzhen is still an outlier. Shenzhen is special because there are many natural reserved areas such as large ecological parks throughout the city. In particular, Shenzhen can be seen as a shock city in the process of Chinese urbanization. In urban geography, shock city is regarded as the embodiment of surprising and disturbing changes in economic, social, and cultural life [61]. Shenzhen’s population growth exceeds the development of traffic network. So the D₀, D₁, and D₂ values of Shenzhen’s street network turn out to be lower relative to its city size.

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Table 2. Basic fractal parameters of street network for 12 Chinese cities.

https://doi.org/10.1371/journal.pone.0246925.t002

Further, we check the generalized correlation dimension spectrums. The spectral lines of D_q changing over q are all inverse S-shaped curves (Fig 5). In generalized correlation dimension spectrums, the macrostructure of street networks in twelve cities shows both similarities and differences. First, all these traffic networks of cities have formed multifractal structure. All the D_q spectrums take on a similar inverse S shape. The value of D_q exceeds the Euclidean dimension of the embedding space d_E = 2 when q<0, which is abnormal. In theory, based on box-counting methods, the multifractal dimension values should come between topological dimension d_T = 0 and embedding dimension d_E = 2. Second, the development of traffic networks in the central areas of different cities is similar, but there are significant differences in the suburbs from city to city. The right tails of D_q curves and convergence values of q>0 are very close to each other for most cities. This indicates that the street networks in central areas tend to develop a similar structure among cities. In particular, the D_q curves of Beijing and Shanghai are higher in the right tails, showing the more compact structure of street networks in central areas. On the contrary, the left tails of D_q curves exhibit larger gaps, suggesting more dissimilarities among cities are mainly observed in urban fringe and sparse areas.

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Fig 5. The generalized correlation dimension spectrums of street networks of 12 Chinese cities.

The D_q curve of Beijing appears in both (A) and (B) as a reference. They are monotonic decreasing functions of q, indicating multifractal property. The right tails of D_q curves and convergence values of q>0 are very close to each other for most cities. While the left tails of D_q curves exhibit wider gaps. This means that the development of traffic networks in the central areas of different cities is similar, but there are significant differences in the suburbs from city to city.

https://doi.org/10.1371/journal.pone.0246925.g005

3.3 Local multifractal spectrums

Local fractal parameters and multifractal spectrums bring the local and micro features into focus. As for the singularity exponents α(q), the scaling relationships maintain well at different levels with q changes (Table 3). The shape of α(q) curve is similar to the D_q spectrum, taking on an inverse S-shaped curve. But it changes more steeply. According to Eq (8), the spectrum of singularity exponent α(q) is the increment curve of the mass exponent τ(q) over moment order q. When the moment order q tends to be positive or negative infinity, the singularity exponent gradually approaches the generalized correlation dimension. In this sense, for the extreme conditions, the α(q) spectrum gives similar information to the D_q spectrum. Where central areas are concerned, the α(q) spectral lines are similar. While for the urban fringe and sparse areas, there are distinct differences of α(q) spectrums among cities (Fig 6). However, the α(q) spectrums give a critical point of moment order: q = -2. If q<-2, the singularity exponent shows no significant change over q for all the urban traffic networks. This suggests that, for lower levels and small elements of a traffic network, the hierarchy with cascade structure has not been developed in the study period. Thus, different lower levels of a traffic network have no significant difference.

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Fig 6. The singularity exponent spectrums of street networks for different cities.

The α(q) curve of Beijing appears in both (A) and (B) as a reference. The singularity exponent α(q) curve is a monotonic decreasing function of q. Generally, the left tails of curves exhibit distinct differences among cities.

https://doi.org/10.1371/journal.pone.0246925.g006

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Table 3. Multifractal parameters of street network for each city by OLS regression method.

https://doi.org/10.1371/journal.pone.0246925.t003

The basic character of a multifractal system is that different parts bear different fractal dimensions. The local dimension is expressed as f(q). According to Eq (7), f(q) is based on information entropy, which is based on rescaled probability distribution. Correspondingly, in terms of Eq (6), α(q) is based on cross entropy. The main spatial information from the f(α) spectrum is as follows. First, multifractal scaling property. The f(q)-q curves and f(α)- α spectrums are all unimodal curves rather than points (Figs 7 and 8). This lends more support to the judgment that all the traffic networks bear multifractal structure. Second, spatial growth patterns. The f(α) curves suggest that the development of traffic network embodies the spatial concentration trend. The f(q) spectrums take on non-symmetric shape, high on the left and low on the right (Fig 7). Besides, local singularity spectrum f(α)-α is shown as a unimodal curve, low on the left tails and high on the right tails. However, the f(α) curve slants to the left (Fig 8), implying a contradictory trend of spatial deconcentration. Third, spatial development problems. The left side of f(q) spectrums show an abnormal decrease in most cities. In theory, the standard f(q) spectrum is monotonic increasing when q<0 and monotonic decreasing when q>0 [41], as the green curves in Fig 7A. While in our practical f(q) spectrums, many curves present obvious partial mutation. This implies there are some structural disorders in sparse areas and urban fringes. In contrast, the f(q) curves of Guangzhou and Shenzhen display no mutation. Studies have found that the fractal dimension growth curve of cities in South China is different from that in North China: the former can be described by the ordinary logistic function, and the latter can be described by the quadratic logistic function [62]. Based on these facts, it can be inferred the development of cities in South China is more significantly acted by self-organization and the market economy of bottom-up evolution [35, 62].

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Fig 7. The local fractal dimension spectrums of street networks for different cities.

The f(q) curve of Beijing appears in both (A) and (B) as a reference. The local fractal dimension f(q) curve is a distinct non-symmetric shape curve, high on the left and low on the right. Besides, the f(q) spectrums of most cities show an abnormal decrease when q<-2. Guangzhou and Shenzhen are exceptions.

https://doi.org/10.1371/journal.pone.0246925.g007

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Fig 8. The local singularity spectrums of street networks for different cities.

The singularity spectrum f(α) is an asymmetric unimodal curve, low on the left tails and high on the right tails. The f(α) spectrum inclines to the left.

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The double logarithmic plots (log-log plots) for local multifractal parameter estimation can be employed to display the problem of microstructure of traffic networks. The scaling relations of local dimensions f(q) suggest disordered distribution of street links in two extreme regions: highly dense areas and very sparse areas. With the absolute value of q increases, the goodness of fit of f(q) decreases seriously, and the scattered points in the log-log plots become more and more chaotic correspondingly (Fig 9). This indicates the degradation of multifractal scaling relations. Despite this, as shown in Table 3, the scaling relations of singularity exponent α(q) remain stable as q approaches infinity. Table 4 summarizes the statistic thresholds of the moment order q based on significance level α = 0.05 of local dimensions f(q). The value of q reflects different levels of a system. The structural levels vary greatly among cities. Generally speaking, the range of q>0 is narrower than that of q<0, indicating worse fractal structure in central areas. For Beijing, the fractal relation in the sparse areas is degraded quickly (q = -4), and there are poorer levels in high-density areas. Guangzhou and Xi’an show fewer levels in dense areas as well. While Shenzhen and Zhengzhou exhibit rich levels in both sparse areas and dense areas. This suggests that, for the traffic networks in the real world, multifractal structure develops within a limited scaling range.

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Fig 9. The log-log plots for estimating the local fractal dimension f(q) of Beijing’s traffic network with changes of q.

With the absolute value of q increases, the scattered points in log-log plots become more and more disordered, and the scaling relationships are broken seriously.

https://doi.org/10.1371/journal.pone.0246925.g009

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Table 4. The statistic thresholds of the moment order q based on significance level α = 0.05.

https://doi.org/10.1371/journal.pone.0246925.t004