Airports and flight routes.

The data on airports and flight routes among them were obtained from two open databases, namely OurAirports [42] and OpenFlights [43]. For the airports, we have the information of their name, trigram IATA code, and location, specifying the exact spatial coordinates, the city and country that they belong to. This information will be used for analysis at both the individual airport (metropolitan area) and country level (see also Sec Population and economic indicator). For the flight routes, we have the information on the airlines providing the service between a pair of airports, with codeshare included. Codeshare is a common aviation practice in which two or more airlines share the same flight by allowing passengers to book tickets on one airline’s flight, which is operated by another airline. Using the exact spatial coordinates of the airports, we also derive the geodesic distance between a pair of airports as the proxy of their flight route length.

Within the scope of this analysis, we only consider the commercial flights and the corresponding airports. Subject to the availability of data, we only study the flight routes that operated in 2014. While we are aware that this choice may not necessarily reflect the most recent state of the global air network, we believe that outcomes of the analysis should not be significantly altered upon inspection of the airports’ total passenger volume (at least until before the COVID-19 pandemic, see Sec Passenger volume below). Furthermore, it should be emphasised that the focus of this study is the relationship between the global flight network structure and the air travel demand. Therefore, as long as the corresponding datasets are temporally consistent, we argue that the results are practically valid and relevant in the present context.

Passenger volume.

In this study, we choose to analyse the top 50 airports (see Table 1) based on the 2014 total passenger volume (including both enplaning and deplaning passengers) reported by the Airports Council International (ACI) [44]. Together, these 50 airports account for about 36% of worldwide air passengers in 2014. The list of 50 busiest airports by passenger traffic has been largely consistent with a steady rate of traffic increment among the airports and minimal changes in their rankings between 2014 and 2019 (before the COVID-19 pandemic), with 92% (46/50) of the airports that were in the top 50 in 2014 remaining so in 2019. For this reason, we believe that an analysis that focuses on this group of airports would yield similar results between 2014 and 2019, and that the results, although for 2014, are still highly relevant to the recent time.

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Table 1. List of 50 busiest airports by passenger traffic in 2014.

https://doi.org/10.1371/journal.pone.0299897.t001

Population and economic indicator.

Apart from the global flight network and passenger volume at individual airports, we also incorporate socio-economic variables of population and economic output in the analysis. As mentioned earlier, we analyse the data at two levels, the metropolitan area (corresponding to the individual airports) and country level. The data was obtained from various public sources, including the International Monetary Fund [45] and the Brookings Institution [46], both at the metropolitan and country level. For the economic indicator, we use the gross domestic product (GDP) at the country level, and the gross metropolitan product (GMP) at the metropolitan level. To be consistent with the flight network data, the population and GDP/GMP data was also obtained for the year 2014. The select 50 airports are located in 46 different metropolitan areas in 25 countries (see Fig 1) across 4 continents. These 25 countries accounted for almost two thirds (64.2%) of the world’s population and more than three quarters (76.1%) of the global GDP in 2014.

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Fig 1. Top 50 busiest airports by passenger traffic in 2014 and their respective countries.

The pie charts show the countries’ population (left) and GDP (right) as fraction of the entire world. The world map showing countries’ boundary was generated using GeoPandas [47].

https://doi.org/10.1371/journal.pone.0299897.g001

Network construction.

Using the data on airports and flight routes described in Sec Airports and flight routes, we construct a network of airports with the nodes representing the individual airports, and a pair of airports are connected by a link if there is a flight between them. Because of the nature of the flight from an origin to a destination airport, the constructed network is inherently a directed network. Furthermore, pre-processing of the data is also performed to ensure that the constructed network is a connected one with a path existing between any pair of nodes, i.e. every node is reachable from all other nodes. Overall, we have in total 3,360 airports and 37,461 flight links between them in this network. It should be noted that we construct a full global network of all airports for the analysis of network measures and subsequently select the 50 airports listed in Table 1 for the analysis of passenger volume.

Link attribute.

For the flight links, or network edges, we compute 7 attributes that account for the geodesic distance and the number of airlines serving the route, including both with and without codeshare. We denote these 7 attributes as W_A, W_A(NCS), W_D, W_C, W_C(NCS), W_F and W_F(NCS), respectively (see their summary in Table 2). W_A simply counts the number of airlines serving a route between two airports, without considering whether an airline operates the route as a codeshare with another airline. W_A(NCS), on the other hand, counts the number of airlines serving the route, excluding the code-sharing ones (“NCS” stands for “no codeshare”), i.e. only counting the operating carriers. W_D is simply the geodesic distance between two airports. The composite W_C (and the no codeshare version W_C(NCS)), which is the ratio between W_A (or W_A(NCS)) and W_D, represents the closeness between two airports, in the sense that more airlines operating the route or shorter distance would indicate a closer relationship between them. Conversely, W_F (and W_F(NCS)), which is the ratio between W_D and W_A (or W_A(NCS)), represents the farness between the two airports, in the same interpretation. A visualisation of the global flight network with highlights of W_A and W_D is shown in Fig 2.

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Fig 2. Global flight network showing the commercial flight routes among the airports.

The links with the number of airlines W_A > 10 and distance W_D > 12, 000 km are highlighted to demonstrated the attributes of the links. The world map showing countries’ boundary was generated using GeoPandas [47].

https://doi.org/10.1371/journal.pone.0299897.g002

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Table 2. Description of the 7 attributes of the links in the global flight network.

https://doi.org/10.1371/journal.pone.0299897.t002

Network measures.

After constructing the global flight network, we analyse it using different models of the network measures. These models include the 3 most commonly used network measures in the literature, namely betweenness centrality (for both nodes and edges), closeness centrality, and degree centrality. Among these measures, node betweenness centrality measures how often a node in the network lies on the shortest path between all pairs of other nodes. Similarly, edge betweenness centrality works the same way but applying to a route connecting two airports, instead of an airport itself. But given the focus of this study is on the airports, we only consider node betweenness centrality in the subsequent analysis. On the other hand, closeness centrality measures how close a node is to the centre of the network. The degree centrality counts the number of connections that a node has with others in the network.

Besides these network measures, eigenvector centrality is also often used. In this study, we will employ a variant of the eigenvector centrality, called PageRank [48], which is based on a mathematical model of random walk, or random exploration of the network, to model the interactions among the nodes. The interaction model of PageRank computes the (relative) importance of the nodes in the network by taking into account the quality of connections that each node has. Mathematically, the PageRank score of a node (airport) a in the network with N nodes is given by (1) in which k(a) is the number of connections that node a has, x(a) the PageRank score of a, the i-th neighbour of a, and β is a damping factor that is typically taken to be 0.85 [48].

Details of the 19 network measures.

Based on the 4 models of network measures described in Sec Network measures together with the attributes associated with the flight routes (see Sec Link attribute), we computed a host of different network measures (for the full network of 3,360 airports). The simplest in the lot, the degree centrality DC of an airport simly counts the number of other airports that have direct flights to and from, i.e. the number of (direct) connections that the airport has with others. The group of network measures based on the PageRank model contains 5 variants. The unweighted PageRank score treats every edge in the global flight network equally and computes the score of each node according to Eq 1. The other variants in this group further consider weightage of the routes between the airport using the number of airlines serving the routes as well as the ratio between the number of airlines and the route distance (see Table 2 for a summary of the weightage attributes). The group of network measures based on the betweenness model contains 4 variants. These measures give higher score to the airports that are more frequently included in the shortest (based on the weightage of interest) chain of routes between different pairs of origin and destination airports across the world. Similarly, the group of measures based on the closeness model consider the shortest chain of routes between the airport of interest and all other airports. Finally, we consider a group of network measures that are the product of PageRank score and betweenness centrality.

In total, we have 19 different network measures (see Table 3), and we can compute the correlation between these measures with the total passenger volume for the selected top 50 airports (see Sec Passenger volume). For each measure m, the correlation is computed as the Pearson correlation coefficient r_m, which is given by (2) in which n = 50 is the number of airports considered in the analysis, m_a the corresponding network measure for the airport a, and V_a is the total passenger volume of the airport a.

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Table 3. Description of the 19 network measures based on the different models.

Refer to Sec Link attribute for the details of weights.

https://doi.org/10.1371/journal.pone.0299897.t003

Correlation between the network measures and passenger volume.

It could be observed that the network measure of PageRank weighted by the number of airlines (PR_A) appears to be best correlated with the passenger volume (see Fig 3) with a coefficient of about 0.73. Other network measures based on the PageRank model also show considerable amount of correlation of more than 0.5 (except PR_C(NCS)) but less than 0.7. The degree centrality, which simply counts the number of connections that an airport has with others, shows an average amount of correlation of about 0.5 and generally performs poorer than the PageRank model. On the other hand, the betweenness or closeness centrality measures are poorly correlated with the passenger volume, especially when the weightage is involved. The versions of these models that perform the best are the unweighted ones, which treat every connection equally. The combined model of betweenness centrality and PageRank appear to work better than the betweenness model itself but not as good as the PageRank model alone.

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Fig 3. Correlation between different network measures and passenger volume for the 50 airports considered in this study.

Measures (such as PR_C or BC_D) that take the flight route distance into account perform worse than the unweighted ones (PR or BC) or those weighted by the number of airlines serving the route (PR_A or BC_F), suggesting insensitivity to distance in air travelling. Refer to Table 3 for the description of the network measures.

https://doi.org/10.1371/journal.pone.0299897.g003

The observed correlation pattern in Fig 3 suggests that the network measure models based on shortest path calculation such as betweenness and closeness would not agree well with the passenger traffic. At the same time, the models that place emphasis on the number of connections that a node has with others appear to capture the essential dynamics of the passenger flow within the airport network. It is also worth pointing out that network measures that take the flight route distance into account (e.g. PR_C or BC_D) perform worse than the unweighted ones or those weighted by the number of airlines serving the route, suggesting insensitivity to distance in air travelling. Similarly, if we exclude the codeshare airlines from the calculation, the network measures would also perform worse.

Comparison between airports in different regions.

After identifying the network measure of PageRank weighted by the number of airlines (PRA) that would best correlate with the passenger traffic, we can take a closer look at the comparison between the PageRank score and the passenger volume. If we colour code the airports by their respective country and region (see Fig 4), we can observe that quite a number of airports in Asia have the total passenger volume above the linear fitted line, suggesting they have more air travel demand than the network measure would predict. Conversely, most airports in Europe and North America have less air travel demand than predicted by the network measure.

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Fig 4. Comparison between total passenger volume and PageRank score weighted by the number of airlines for the 50 airports considered in this study.

For each airport, its corresponding country is labelled by the two-letter country code as defined in ISO 3166-1.

https://doi.org/10.1371/journal.pone.0299897.g004

The pattern of airports by region observed in Fig 4 also agrees with a similar analysis using the integer rank value of the airports (see Fig 5) instead of the real value of the network score and passenger volume. The result may indicate that given the flight network connections or topology, the airports in Asia tend to have more travel demand than expected, whereas travel demand in Europe and North America is less than expected given the network structure as the baseline. This could be attributed to GDP and population, which we will look at next.

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Fig 5. Comparison between ranking of airports by total passenger volume and PageRank score weighted by the number of airlines for the 50 airports considered in this study.

For each airport, its corresponding country is labelled by the two-letter country code as defined in ISO 3166-1.

https://doi.org/10.1371/journal.pone.0299897.g005

Regression at metropolitan level.

At the metropolitan level, we use the data for the metropolis corresponding to the airports of interest. In particular, for every airport, we use the population and GMP of the metropolitan area that houses the airport together with its network score (PR_A) to predict the total passenger volume of that airport (see Table 4).

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Table 4. Regression models at metropolitan level.

An “X” indicates the inclusion of the corresponding independent variable in the regression model.

https://doi.org/10.1371/journal.pone.0299897.t004

We observe that GMP or population alone would poorly predict the total passenger volume for the airport located in the respective metropolitan area, with R² value being less than 0.5. Combination of the two yields similar value of R² less than 0.5. On the other hand, network measure proves to outperform the socio-economic variables in predicting the passenger traffic. In particular, PR_A alone can significantly improve the prediction, with R² being significantly larger at more than 0.5. In the full model where we consider both the network measure and socio-economic variables, an improvement is observed when both GMP and population are added, with R² being larger at almost 0.8. Yet, the p-value for both GMP and population again indicates their statistical insignificance. This suggests that network measure would be a significant predictor of the air travel demand at the metropolitan level.

Regression at country level.

At the country level, we simply sum the value of network measure over the airports of the same country to represent the measure for the entire country. Similarly, we also sum the value of passenger volume of the same-country airports. However, we have two ways to compute the aggregate GDP and population at the country level. The first way is to perform a summation over the corresponding areas in which the airports of interest are located. For example, among the countries, Spain has 2 airports selected for this analysis, namely Madrid and Barcelona. As a result, the summed GDP for Spain would be the sum of GMP for Madrid and Barcelona metropolitan areas, and similarly for population. The second way is to use the official GDP and population for the whole country even though we only consider a few airports in that country. For example, the passenger volume for the United Kingdom is only from London’s Heathrow and Gatwick airports, but the GDP and population will be for the whole of UK. After that, we build the regression models for different combinations of the variables to predict the passenger traffic at the country level as described in Table 5 below.

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Table 5. Regression models at country level.

An “X” indicates the inclusion of the corresponding independent variable in the regression model.

https://doi.org/10.1371/journal.pone.0299897.t005

Generally, we observe that the GDP alone, both by summation of the metropolitan areas and whole country, would predict the passenger volume better than population alone. The corresponding variable as the summation of the metropolitan areas expectedly perform better than the whole country, especially in the case of population. The combination of GDP and population only shows a slight improvement in the case of whole country, even though the passenger volume is only for the selected airports, whereas the summed population exhibits unreliable fit. However, network measure alone can predict the passenger volume very well, even better than GDP and/or population (both summation of the metropolitan areas and whole country). Comparing with the corresponding results reported in Sec Regression at metropolitan level, we observe that this prediction is better at the country level, or aggregation of selected airports, than at the metropolitan level, or individual airports. And certainly, when combining network measure with GDP and population, we always observe the improvement in the prediction.