1.1 Mobile phone data

The cell phone data that we are analyzing come from anonymized users' call records collected during 55 days (noted as D hereafter) between September and November 2009. The call records are registered by communication towers (Base Transceiver Station or BTS), identified each by its location coordinates. The area covered by each tower can be approximated by a Voronoi tessellation of the urban areas, as shown in Figure 1a for Barcelona. Each call originated or received by a user and served by a BTS is thus assigned to the corresponding BTS Voronoi area. In order to estimate the number of people in different areas per period of time, we use the following criteria: each person counts only once per hour. If a user is detected in k different positions within a certain 1-hour time period, each registered position will count as (1/k) “units of activity”. From such aggregated data, activity per zone and per hour is calculated. Consider a generic grid cell g for a day d and hour between h and h+1, the m Voronoi areas intersecting g are found and the number of mobile phone users P_g,d,h is calculated as follows:(1)where N_v,d,h is the number of users in a Voronoi cell v on day d at time h, is the area of the intersection between v and g, and A_v the area of v. The D days available in the database are then divided in four groups according to the classification explained above and the average number of mobile phone users for each day group w is computed as(2)

The number of mobile phone users per day for the two the metropolitan areas as a function of the time of day, and according to the day group, are displayed in Figure 2. The curves in Figure 2a show two peaks, one between noon and 3pm and another one between 6pm and 9pm. They also show that the number of mobile phone users is higher during weekdays than during the weekends. The same curve is obtained for Madrid with about twice the number of users with respect to Barcelona. Further details about the data pre-processing are given in Supporting Information S1 (Section Mobile phone data pre-processing, Figure S1 and Figure S2).

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Figure 2. Number of mobile phone users per day in Barcelona (a) and Madrid (c) and number of Twitter users in Barcelona (b) and Madrid (d) as a function of the time according to day group w.

From left to right: weekdays (aggregation from Monday to Thursday), Friday, Saturday and Sunday.

https://doi.org/10.1371/journal.pone.0105184.g002

In order to extract OD matrices from the cell phone calls a subset of users, with a mobility reliably recoverable, was selected. For this analysis we only consider commuting patterns in workdays. The users' home and work are identified as the Voronoi cell most frequently visited on weekdays by each user between 8 pm and 7 am (home) and between 9 am and 5 pm (work). We assume that there must be a daily travel between home and work location of each individual. Users with calls in more than 40% of the days under study at home or work are considered valid. Aggregating the complete flow over users, an OD commuting matrix is obtained containing in each element the flow of people traveling between a Voronoi cell of residence and another of work. Since the Voronoi areas do not exactly match the grid cells, a transition matrix to change the scale is employed (see Supporting Information S1 for details).

1.2 Twitter data

The dataset comprehends geolocated tweets of 27,707 users in Barcelona and 50,272 in Madrid in the time period going from September 2012 to December 2013. These users were selected because it was detected from the general data streaming with the Twitter API [45] that they have emitted at least a geolocated tweet from one of the two cities. Later, as a way to increase the quality of our database, a specific search over their most recent tweets was carried out [46]. As for the cell phone data, the number of Twitter users T_g,w,h in each grid cell g per hour h were computed for each day group w. The number of Twitter users per day for the metropolitan area of Barcelona according to the hour of the day and the day group is plotted on Figure 2b. Analogous to the mobile phone data, this figure shows two peaks, one between noon and 3pm and another one between 6pm and 9pm. It is worth noting that the mobile phone users represents on average 2% of the total population against 0.1% for the Twitter data. Furthermore, in contrast with the phone users profile curve, the Twitter users' profile curve shows that the number of users does not vary much from weekdays to weekend days. Moreover, we can observe that the number of Twitter users is higher during the second peak than during the first one.

The identification of the OD commuting matrices using Twitter is similar to the one explained for the mobile phones except for two aspects. Since the number of geolocated tweets is much lower than the equivalent in calls per user, the threshold for considering a user valid is set at 100 tweets on weekdays in all the dataset. The other difference is that since the tweets are geolocated with latitude and longitude coordinates, the assignment to the grid cells is done directly without the need of intermediate steps through the Voronoi cells. As for the phone, we keep only users working and living within the metropolitan areas.

1.3 Census data

The Spanish census survey of 2011 included a question referring to the municipality of work of each interviewed individual. This survey has been conducted among one fifth of the population. This information, along with the municipality of the household where the interview was carried out, allows for the definition of OD flow matrices at the municipal level [44]. For privacy reasons, flows with a number of commuters lower than 10 have been removed. The metropolitan area of Barcelona is composed of 36 municipalities, while the one of Madrid contains 27 municipalities. In addition to the flows, we have obtained the GIS files with the border of each municipality from the census office. This information is used to map the OD matrices from Twitter or the cell phone data to this more coarse-grained spatial scale to compare mobility patterns across datasets.

1.4 Ethics statement

This work includes the use of users' geolocated information. Since we are interested only in statistical features and not in individual traits of users, all the data have been anonymized and aggregated before the analysis that has been performed in accordance with all local data protection laws. Twitter and Census data are obtained from public sources as explained above. The cell phone data is proprietary and subject to strict privacy regulations. The access to this dataset was granted after reaching a non disclosure agreement with the proprietary, who anonymized and aggregated the original data before giving access to other authors.

2.1 Spatial distribution

A first question to address is how much the human activity level is similar or not when estimated from Twitter, T, or from cell phone data P across the urban space in grid cells of 2 by 2 km. To quantify similarity, we start by depicting in Figure 3 a scatter plot composed by each pair (T_g,w,h, P_g,w,h) for every grid cell of the metropolitan area of Barcelona taking w as the weekdays (aggregation from Monday to Thursday). The hour h is set from midday to 1pm. A first visual inspection tells us that the agreement between the activity inferred from each dataset is quite good. In fact, the Pearson correlation coefficient between the two estimators of activity is of . Furthermore, the portion of activity can be depicted on two maps as in Figure 3b and c. The similarity of the areas of concentration of the activity is patent.

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Figure 3. Correlation between the spatial distribution of Twitter users and mobile phone users for the weekdays (aggregation from Monday to Thursday) and from noon to 1pm for the metropolitan area of Barcelona (l = 2 km).

(a) Scatter-plot composed by each pair (T_g,w,h, P_g,w,h), the values have been normalized (dividing by the total number of users) in order to obtain values between 0 and 1. The red line represents the perfect linear fit with slope equal to 1 and intercept equal to 0. ((b)–(c)) Spatial distribution of Twitter users (b) and mobile phone users (c). In order to facilitate the comparison of both distributions on the map, the proportion of users in each cell is shown (always bounded in the interval [0, 1]).

https://doi.org/10.1371/journal.pone.0105184.g003

More systematically, we plot in Figure 4a, the box-plots of the Pearson correlation coefficients for each day group and both case studies as observed for different hours. We obtain in average a correlation of 0.93 for Barcelona and 0.89 for Madrid. Globally, the correlation coefficients have higher value for Barcelona than for Madrid probably because the metropolitan area of Madrid is about four times larger than the one of Barcelona. It is interesting to note that the average correlation remains high even if we increase the resolution by using a value of l equal to 1 km. Indeed, we obtain in average a correlation of 0.85 for Barcelona and 0.83 for Madrid at that new scale (Figure 4b).

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Figure 4. Box-plots of the Pearson correlation coefficients obtained for different hours between T and P (from the left to the right: the weekdays (aggregation from Monday to Thursday), Friday, Saturday and Sunday).

The blue boxes represent Barcelona. The green boxes represent Madrid. (a) l = 2 km. (b) l = 1 km.

https://doi.org/10.1371/journal.pone.0105184.g004

2.2 Temporal distribution

After the spatial distribution of activity, we investigate the correlation between the temporal activity patterns as observed from each grid cell. We start by normalizing T and P such that the total number of users at a given time on a given day is equal to 1(3)(4)

This normalization allows for a direct comparison between sources with different absolute user's activity. For a given grid cell , we defined the temporal distribution of users as the concatenation of the temporal distribution of users associated with each day group. For each grid cell we obtained a temporal distribution of users represented by a vector of length 96 corresponding to the 4×24 hours.

After removing cells with zero temporal distribution, cells of common temporal profies were found using the ascending hierarchical clustering (AHC) method. The average linkage clustering and the Pearson correlation coefficient were taken as agglomeration method and similarity metric, respectively [47]. We have also implemented the k-means algorithm for extracting clusters but better silhouette index values were obtained with the AHC algorithm (see details in Figure S3 in Supporting Information S1). To choose the number of clusters, we used the average silhouette index [48]. For each cell g, we can compute a(g) the average dissimilarity of g (based on the Pearson correlation coefficient in our case) with all the other cells in the cluster to which g belongs. In the same way, we can compute the average dissimilarities of g to the other clusters and define b(g) as the lowest average dissimilarity among them. Using these two quantities, we compute the silhouette index s(g) defined as(5)which measures how well clustered g is. This measure is comprised between −1 for a very poor clustering quality and 1 for an appropriately clustered g. We choose the number of clusters that maximize the average silhouette index over all the grid cells .

For the mobile phone data, three clusters were found with an average silhouette index equal to 0.38 for Barcelona and to 0.43 for Madrid. The three temporal distribution patterns of mobile phone users are shown in Figure 5 for Barcelona. These three clusters can be associated with the following land uses:

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Figure 5. Temporal distribution patterns for the metropolitan area of Barcelona (l = 2 km).

(a), (c) and (e) Mobile phone activity; (b), (d) and (f) Twitter activity; (a) and (b) Business cluster; (c) and (d) Residential/leisure cluster; (e) and (f) Nightlife cluster.

https://doi.org/10.1371/journal.pone.0105184.g005

• Business: this cluster is characterized by a higher activity during the weekdays than the weekend days. In Figure 5a, we observe that the activity takes place between 6 am and 3 pm with a higher activity during the morning.
• Residential: this cluster is characterized by a higher activity during the weekend days than during the weekdays. Figure 5c shows that the activity is almost constant from 9 am during the weekend days. During the weekdays we observe two peaks, the first one between 7 am and 8 am and the second one during the evening.
• Nightlife: this cluster is characterized by a high activity during the night especially the weekend (Figure 5e).

It is remarkable to note that we obtain the same three patterns for Madrid and that these patterns are robust for different values of the scale parameter l (see details in Figure S4, S5 and S6 in Supporting Information S1).

For Twitter data, considering a number of clusters smaller than 10, silhouette index values lower than 0.1 are obtained for both case studies. These low values mean that no clusters have been detected in the data probably because the Twitter data are too noisy. A way to bypass this limitation is to check if, for both data sources, the same patterns are obtained considering the different clusters obtained with the mobile phone data. To do so the temporal distribution patterns of Twitter users associated with the three clusters obtained with the mobile phone data are computed. We note in Figure 5 that for Barcelona the temporal distribution patterns obtained with the Twitter data are very similar to those obtained with the mobile phone data. We obtain the same correlation for Madrid and for different values of the scale l (see details in Figure S4, S5 and S6 in Supporting Information S1).

2.3 Users' mobility

In this section, we study the similarity between the OD matrices extracted from Twitter and cell phone data. As it involves a change of spatial resolution needing extra attention, the comparison with the census is relegated to a coming section. We are able to infer for the metropolitan areas of Barcelona and Madrid the number of individuals living in the cell i and working in the cell j. Figure 6 shows a scattered plot with the comparison between the flows obtained in the OD matrices for links present in both networks. In order to compare the two networks, the values have been normalized by the total number of commuters.

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Figure 6. Comparison between the non-zero flows obtained with the Twitter dataset and the mobile phone dataset (the values have been normalized by the total number of commuters for both OD tables).

The points are scatter plot for each pair of grid cells. The red line represents the x = y line. (a) Barcelona. (b) Madrid. In both cases l = 2 km.

https://doi.org/10.1371/journal.pone.0105184.g006

The overall agreement is good, the Pearson correlation coefficient is around . This coefficient measures the strength of the linear relationship between the normalized flows extracted from both networks, including the zero flows (i.e. flows with zero commuters). However, a high correlation value is not sufficient to assess the goodness of fit. Since we are estimating the fraction of commuters on each link, the values obtained from Twitter and the cell phone data should be ideally not only linearly related but the same. That is, if y if the estimated fraction of mobile phone users on a connection and x the estimated Twitter users on the same link, there should be not only a linear relation, which involves a high Pearson correlation, but also y = x. It is, therefore, important to verify that the slope of the relationship is equal to one. To do so, the coefficients of determination R² are computed to measure how well the scatterplot if fitted by the curve y = x. Since there is no particular preference for any set of data as x or y, two coefficients R² can be measured, one using Twitter data as the independent variable x and another using cell phone data. Note that if the slope of the relationship is strictly equal to one the two R² must be equal to the square of the correlation coefficient, we obtain a value around R² = 0.85 for Barcelona and around 0.81 for Madrid. The slope of the best fit is in both cases very close to one.

The dispersion in the points is higher in low flow links. This can be explained by the stronger role played by the statistical fluctuations in low traffic numbers. Moreover, if we increase the resolution by using a value of l equal to 1 km, the Pearson correlation coefficient remains high with a value around 0.8 (see details in Figure S7 in Supporting Information S1). The extreme situation of these fluctuations occurs when a link is present in one network and it has zero flow in the other (missing links). On average 90% of these links have a number of commuters equal to one in the network in which they are present. This shows that the two networks are not only inferring the same mobility patterns, but that the information left outside in the cross-check corresponds to the weakest links in the system. In order to assess the relevance of the missing links, the weight distributions of these links is displayed in Figure 7 for all the networks and case studies. As a comparison line, the weight distribution of all the links are also shown in the different panels. In all cases, the missing links have flows at least one order of magnitude, sometimes two orders, lower than the strongest links in the corresponding networks. To be more precise, the strongest flow of the missing links is, depending on the case, between 25 and 464 times lower than the highest weight of all the links. Furthermore, the average weight of the missing links is between 4 and 9 times lower than that obtained over all the links. Most of the missing links are therefore negligible in the general network picture.

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Figure 7. Probability density function of the weights considering all the links (points) and the missing links (triangles).

(a) Barcelona and cell phone data. (b) Barcelona and Twitter data. (c) Madrid and cell phone data. (d) Madrid and Twitter data. In both cases l = 2 km.

https://doi.org/10.1371/journal.pone.0105184.g007

With the aim of going a little further, we analyze and compare next the distance distribution for the trips obtained from both datasets. The geographical distance along each link in the OD matrices is calculated and the number of people traveling in the links is taken into account to evaluate the travel-length distribution. Figure 8 shows these distributions for each network. Strong similarity between the two distributions can be observed in the two cities considered.

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Figure 8. Commuting distance distribution obtained with both datasets.

We only consider individuals living and working in two different grid cells. The circles represent the Twitter data and the triangles the mobile phone data. (a) Barcelona. (b) Madrid. In both cases l = 2 km.

https://doi.org/10.1371/journal.pone.0105184.g008

2.4 Census, Twitter and cell phone

As a final cross-validation, we compare the OD matrices estimated in workdays from Twitter and cell phone data to those extracted from the 2011 census in Barcelona and Madrid. The census data is at the municipal level, which implies that to be able to perform the comparative analysis the geographical scale of both Twitter and phone data must be modified. To this end, the GIS files with the border of each municipality were used, instead of the grid, to compute the OD matrices from Twitter and cell phone data. Figure 9 shows a scattered plot with the comparison between the flows obtained with the three networks. A good agreement between the three datasets is obtained with a Pearson correlation coefficient around . As mentioned previously, the correlation coefficient is not sufficient to assess the goodness of fit between the two networks. Thus, we have also computed two coefficients of determination R² for each one of the three relationships to measure how well the line x = y approximates the scatter plots. For the two first relationships, the comparison between the Twitter and the mobile phone and the comparison between the mobile phone and the census OD tables, we obtain R² values higher than 0.95. For the last relationship (Twitter vs census), two different R² values are obtained because the best fit slope of the scatter plot is not strictly equal to one (0.85). The first R² value, which measure how well the normalized flows obtained in the Twitter's OD matrix approximate the normalized flows obtained in the census's OD matrix, is equal to 0.8 and the second value, which assess the quality of the opposite relationship, is equal to 0.9. A better result is instead obtained for Madrid with a Pearson correlation coefficient around 0.99 and coefficients of determination higher than 0.97 (see details in Figure S8 in Supporting Information S1).

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Figure 9. Comparison between the non-zero flows obtained with the three datasets for the Barcelona's case study (the values have been normalized by the total number of commuters for both OD tables).

Blue points are scatter plot for each pair of municipalities. The red line represents the x = y line. (a) Twitter and mobile phone. (b) Census and mobile phone. (c) Census and Twitter.

https://doi.org/10.1371/journal.pone.0105184.g009