2.1. Existing data-driven network construction methods

2.1.2. Influence Model

The Influence Model, discussed in Pan et al. (Reference Dong, Cebrian, Kim, Fowler and Pentland2012), models the interaction among entities as a generally coupled Hidden Markov Model, in which the state of each entity at any given time point is determined by the state of all entities at the previous time point. The model is defined such that the entities—in our case, the building occupants—are in one of a set number of states at any given time point, which ultimately leads them to produce a signal. This has a direct corollary in our problem setting: these abstracted states can be viewed as our occupant activity states and the signals as the plug load energy signatures. A graphical representation of the Influence Model is shown in Figure 1. The authors use Expectation Maximization to estimate the parameters of the model by directly using the states, making our mapping from energy to states necessary for this model. One of the key parameters that is learned is the matrix R—the “influence matrix”—which can be interpreted as an adjacency matrix in a network. Past work has shown that the Influence Model can be used for both physical systems (e.g., a power grid network) as well as social systems (e.g., influence among people conversing) (Pan et al., Reference Dong, Cebrian, Kim, Fowler and Pentland2012). We implemented the Influence Model using the MATLAB package available through Pan et al. (Reference Dong, Cebrian, Kim, Fowler and Pentland2012).

Figure 1. Graphical representation of the Influence Model. The model estimates the strength of the arrows between any two time steps using Expectation Maximization, and these strengths form the basis for the inferred network.

2.2. The Interaction Model

The Interaction Model (depicted on example data from a single day in Figure 2) begins by abstracting the time series plug load data (Figure 2a) into states of activities (Figure 2b), as discussed in Appendix A (originally introduced in Sonta et al. (Reference Sonta, Simmons and Jain2018)). We note that different activity states suggest different uses of the building, and we interpret these states as localized use of the building’s space. A benefit of this localized approach is that the spatial and temporal granularity of the data allows one to ascribe patterns of activities and space use to each individual. Leveraging the information embedded in this use of space, the model identifies times when office workers have opportunities for social interaction with other office workers in the building (Figure 2c). These opportunities are aggregated using the Jaccard index to form the inferred socio-organizational network (Figure 2d).

Figure 2. Demonstration of Interaction Model steps applied to data from a single day. (a) Raw plug load energy values collected through sensors. (b) Activity states (low, medium, and high energy) resulting from the clustering of the energy data using a variational Bayesian Gaussian Mixture Model. (c) Opportunities for social interaction, where a black value of 1 indicates interaction opportunity. (d) Resulting network (after 365 days of analysis), shown both as an adjacency matrix heatmap and as a graph visualization.

We assume that in a high-energy activity state, occupants are likely to be fully utilizing their equipment at their workstations and are less likely to be moving around the building. At a medium- or low-energy activity state, the equipment has entered a power-saving mode or turned off altogether, which in a modern workspace we assume indicates that occupants are more likely to be away from their workstations with higher opportunity for interacting with the people around them. These assumptions are based on our previous validation work, which shows that the activity states can be used as reliable occupancy sensors (Sonta et al., Reference Sonta, Simmons and Jain2018). We leverage this detail in the data by defining an opportunity for social interaction between two occupants to occur when those two occupants have both transitioned from the high-energy activity state to either a medium- or low-energy activity state. We limit these opportunities for interaction such that they only occur after the first transition to the high-energy state (i.e., the occupant first arriving at their workstation for the day) and before the last transition to the low-energy state (i.e., the occupant leaving for the day). Between these two temporal bounds that bookend the workday, we count the number of times throughout the day that any two occupants have the opportunity to interact. This counting of overlaps in opportunities for interactions forms the weightings of ties among occupants. Formally, we weight the entries A_i,j and A_j,i (the tie strength between occupant i and occupant j) as the Jaccard similarity coefficient of the overlap in opportunities for interaction between occupants i and j. This network inference definition creates an undirected network. We note that previous work on estimating social networks on the urban scale has also made use of the general notion of “interaction opportunity” as defined by physical co-presence in an urban setting (Shen et al., Reference Shen, Karimi, Law and Zhong2019).

Given a time series of activity states S_i,d (as described above), the objective of the Interaction Model is to construct the adjacency matrix A such that the entry A_i,j defines the relationship from occupant i to occupant j. We define the opportunity for interaction as undirected rather than directed and therefore A_i,j = A_j,i. Our algorithm for the Interaction Model is described here (see Algorithm 1 for pseudocode). The algorithm first computes vectors for each occupant for each day describing when that occupant has an opportunity for social interaction. This opportunity is defined as being when the occupant is in a medium-energy state or when the occupant is in a low-energy state between high- or medium-energy states (i.e., not before the start of the workday or after the end of the workday). We therefore define the vector V_i,d (for occupant i on day d) as a series of integers of length T, the number of time steps in a day. Each integer is either a zero or a one, with ones indicating the occupant has the opportunity for social interaction; zeros indicating no opportunity. For each day and each pair of occupants, we compute the Jaccard index between the two vectors V_i,d and V_j,d. This computation is repeated for each pair of occupants within a day, creating an adjacency matrix A_d associated with each day. This process is repeated for all days in the study, and the overall adjacency matrix is the average of all A₁,…,A_D. The Jaccard similarity between any two vectors V₁ and V₂ is computed as follows:

(1)$$ \mathrm{Jaccard}\left({\mathbf{V}}_1,,,{\mathbf{V}}_2\right)=\frac{\left|{\mathbf{V}}_1\cap {\mathbf{V}}_2\right|}{\left|{\mathbf{V}}_1\cup {\mathbf{V}}_2\right|}=\frac{\left|{\mathbf{V}}_1\cap {\mathbf{V}}_2\right|}{\left|{\mathbf{V}}_1\right|+\left|{\mathbf{V}}_2\right|-\left|{\mathbf{V}}_1\cap {\mathbf{V}}_{2.}\right|}. $$

Algorithm 1. Interaction Model.

We define the size of a vector and the intersection between our vectors of social opportunity as follows, based on the index of occupant x:

(2)$$ \left|\mathbf{V}\right|={\sum}_i{\mathbf{V}}^i, $$

(3)$$ \left|{\mathbf{V}}_1\cap {\mathbf{V}}_2\right|={\sum}_i{\mathbf{V}}_1^i\cdot {\mathbf{V}}_2^i. $$

The benefit of using the Jaccard index instead of simply counting the number of overlaps in opportunities for social interaction is that it discounts the situation when a single occupant is in a low- or medium-energy state throughout much of a workday. In essence, it normalizes these overlaps in opportunities for interaction based on the total number of opportunities that each occupant has in each day. An illustrative example is shown in Figure 3.

Figure 3. Jaccard similarity example. Illustrative example showing the normalizing effect of the Jaccard index computed on pairs of vectors describing opportunities for interaction.

2.3. Data collection and statistical analysis

We installed plug load energy sensors at 18 workstations in an office in Berkeley, CA. The office houses a small environmental consulting and engineering firm. Each occupant is assigned to his or her own workstation, allowing us to adopt the perspective that data ascribed to a workstation are ascribed to an individual. The sensors are Zooz smart plugs, which communicate with Z-Wave technology to a Samsung SmartThings Hub. Data were collected over 1 year (365 days) between August 2018 and August 2019. Plug load energy data were reported at 1-min intervals. We aggregate the 1-min data to 15 min, as this time scale has been shown to appropriately describe activities that impact building energy consumption as well as offer insight into social interaction (Sonta et al., Reference Sonta, Jain, Gulbinas, Moura and Taylor2017, Reference Sonta, Simmons and Jain2018). Manual inspection of the data revealed that plug load energy collection at a very rapid time scale (e.g., less than 5 min) can increase noise in the data to detrimental levels, while previous research has shown that a sparse time scale (e.g., greater than 30 min) can reduce the amount of valuable information in the data (Melfi et al., Reference Melfi, Rosenblum, Nordman and Christensen2011). Workstations typically included desktop computers and monitors, as well as some miscellaneous equipment (e.g., phone chargers, lamps, etc.). We made no alterations to the settings of the computers, such as when computers are set to sleep. This decision to minimize interventions was made to maximize extensibility of the overarching methodology to new settings.

The sensors occasionally report erroneous values or fail to report values. As a data cleansing step, we remove data points greater than three standard deviations away from each occupant’s mean (0.002% of data points), those less than 0 W (0.0001% of data points) and those greater than 200 W (0.4% of data points). Manual inspection of the data showed that values outside this range are most likely instances of data point corruption during the data collection process. The standard reason for missing data is that the power consumption has not varied—this is a characteristic of the Zooz sensors. This is most common when the power consumption is exactly 0, as any amount of power consumption above 0 typically has natural variation. Because data are reported at 1-min intervals and we aggregate to 15-min time steps, we fill forward missing values up to a limit of 15 min. This strategy is based on the assumption that these missing values really indicate a power consumption value of 0, but it also allows for the rare case that the power consumption is a steady positive value. If further data points are missing, it is most likely because of connectivity issues or a long period without power consumption. We fill these data points with values of 0.

We collected social and organizational data through a survey. The occupants of the building were first asked to report with whom in the building they have either a social or organizational relationship. The survey then moves on to two sections, a social weighting and an organizational weighting. The social section asks occupants to rate on a Likert scale (1–7) how closely they view their social relationship in terms of the “inclusion of the other in the self” scale (Gächter et al., Reference Gächter, Starmer and Tufano2015) (see Appendix B). The organizational component asks occupants to mark with whom they (a) share information with, (b) seek technical advice from, and (c) seek personal work-related advice from. These questions measure communication, advice, and trust, as discussed in seminal work by Krackhardt and Hanson (Reference Krackhardt and Hanson1993). The survey response rate was 83%. The survey forms a directed network—unlike the Interaction Model—but we note that the graph comparison tools we discuss below are valid for comparisons between directed and undirected networks. While interactions are best described without direction, individual views of relationships are inherently directed, and we note that this may be a limitation of the Interaction Model. Details of the survey are discussed in Appendix B.

An important component of the study is to determine the extent to which inferred socio-organizational network structures correlate with the survey socio-organizational structure. Because we define the networks in terms of an adjacency matrix, metrics that measure the correlation between two square matrices can be employed. It is well known in network analysis theory that standard ordinary least squares models are unreliable when autocorrelation is present in the data, as we expect in social network analysis (e.g., within-row and within-column data can be expected to be autocorrelated, since they refer to the same individuals’ survey responses) (Krackhardt, Reference Krackhardt1987). Therefore, we adopt the Quadratic Assignment Procedure (QAP) as a permutation test to determine the significance of correlations between two adjacency matrices. We use the Pearson product–moment correlation coefficient to measure the correlation between two matrices, with explicit disregard for the diagonals of the matrices, which we expect to all be zero, since self-loops are disregarded. This combination of the QAP permutation test and the Pearson product–moment correlation has been demonstrated in previous social network research (Henry, Reference Henry2011). The correlation for two graphs G and H is measured as follows:

(4)$$ \mathrm{cor}\left(\mathrm{G},\mathrm{H}\right)=\frac{\operatorname{cov}\left(\mathrm{G},\mathrm{H}\right)}{\sqrt{\operatorname{cov}\left(\mathrm{G},\mathrm{G}\right)\cdot \operatorname{cov}\left(\mathrm{H},\mathrm{H}\right)}}, $$

where

(5)$$ \mathrm{cov}\left(\mathrm{G},\mathrm{H}\right)=\frac{1}{{\left|\mathrm{V}\right|}^2-\left|\mathrm{V}\right|}\sum_{i\ne j}\left({\mathbf{A}}_{i,j}^{\mathrm{G}}-{\mu}_{\mathrm{G}}\right)\left({\mathbf{A}}_{i,j}^{\mathrm{H}}-{\mu}_{\mathrm{H}}\right), $$

such that i is not equal to j, where V is the set of nodes in the graph, A is the adjacency matrix, and μ is the mean edge value in the graph. The QAP permutes both the rows and columns of one of the adjacency matrices—a total of $ \left|\mathrm{V}\right|! $ possible mappings of vertices to the edges in the network. The correlation metric can be calculated between the base matrix and all possible permutations of the second matrix, creating a distribution of correlation metrics. By determining where the original correlation falls on the permuted correlation distribution, one can estimate the significance of the correlation (i.e., what fraction of correlations fall below the calculated correlation). In our results discussed above, $ \left|\mathrm{V}\right| $ is 18, causing the number of samples for the correlation statistic to be 306 (i.e., the number of possible ties among individuals, excluding self-loops).

Over the course of the year, three changes happened to the organization occupying the office building, which we were made aware of through direct communication with the organization. After 61 days of data collection, one of the occupants left the organization temporarily. After 258 days, another occupant left the organization indefinitely. After 312 days, the occupant that first left the organization returned, and another third occupant left the organization indefinitely. We adapted the models we employ for network inference to account for these changes. For the Influence Model, we adjusted its mechanics to normalize for the amount of time that an occupant is part of the organization. For the occupants that were part of the organization for a fraction of the year, opportunities for interaction between that occupant and all other occupants were only considered during the times that these occupants were present. In effect, we compute a weighted average of all Jaccard similarities based on the amount of time two occupants were both a part of the organization. This reshuffling created four distinct periods of data collection and analysis that are all very similar but have slightly different organizational makeup.

For example, if all occupants are considered members during the days contained in a vector d₁ and all but one (occupant x) are considered members during the days in d₂, we compute two different adjacency matrices, following the procedure in Algorithm 1:

(6)$$ {\mathbf{A}}_1=\mathrm{Interaction}\left({\mathbf{S}}_{d\in {\mathbf{d}}_1}\right), $$

(7)$$ {\mathbf{A}}_2=\mathrm{Interaction}\left({\mathbf{S}}_{d\in {\mathbf{d}}_2}\right). $$

Next, instead of simply averaging all A matrices, we compute the overall adjacency matrix as follows:

(8)$$ \mathbf{A}=\frac{{\mathbf{A}}_1+{\mathbf{A}}_2}{\mid {\mathbf{d}}_1\mid +\mid {\mathbf{d}}_2\mid}\forall i\ne x,\forall j\ne x $$

(9)$$ \mathbf{A}=\frac{{\mathbf{A}}_1}{\mid {\mathbf{d}}_1\mid}\forall i=x,\forall j=x $$

2.4. Space syntax

The theory of space syntax (Bafna, Reference Bafna2003) suggests that the ordering of space impacts how people use space and interact with one another. Recently, researchers have suggested that spatial relationships are correlated with social behavior, such as collaborations in academic settings and “contacts” in workplaces (Sailer and McCulloh, Reference Sailer and McCulloh2012; Potter et al., Reference Potter, Smieszek and Sailer2015). Using a space syntax technique known as axial line decomposition, we constructed networks of the office space in Berkeley, CA, describing both topological distance and angular distance. The topological distance can be interpreted as the number of individual spaces that need to be traversed between workstations, and the angular distance can be interpreted as the amount of physical rotation required to reach a workstation. The space syntax procedure begins with graphically representing the physical barriers within a building in a floor plan. We adopted the axial line decomposition procedure for the spaces that include a workstation in our study. This axial line decomposition procedure begins with the drawing of straight lines that connect all relevant spaces within a building’s floor plan. We note that in certain floor plans with limited barriers, such as long open plan offices, the axial line decomposition technique may have limited ability to explain connections between spaces, though previous research has applied this technique to open plan offices (Sailer and McCulloh, Reference Sailer and McCulloh2012). The topological distance between two workstations is defined as the number of line segments that are traversed by traveling from one workstation to another, where a line segment is created whenever two of these lines intersect. The angular distance is defined as the amount of changing of direction that must take place to travel from one desk to another along these lines, where a 90° turn is counted as a value of 1. The specific axial line decomposition for the office building in Berkeley, CA, used in this study is shown in Figure 4. Leveraging the QAP test described above, we can compare these spatial networks to the inferred and survey-based socio-organizational networks.

Figure 4. Axial line decomposition using space syntax methodology. The floor plan shows the physical spatial barriers, red lines show the line segments connecting individual spaces. The detailed example for workstations 1 and 2 shows the calculation of topological and angular depths.