Data source

We collected individual-level data on 1,349 SARS-CoV-2 infections during the COVID-19 pandemic in Zhejiang Province, China, from 8 January to 23 February 2020 (see Data source in the Supplementary materials for more details). The data contain detailed information about each diagnosed case such as their personal information (age, gender, family, occupation location, the severity of infection, imported cases or not, date of symptom onset, and date of laboratory confirmation) and, more critically, their potential exposures, that is epidemiological linkage to other cases identified through contact tracing efforts. Here, we assumed that there was no re-infection (i.e. one cannot be infected by SARS-CoV-2 more than once in a relatively short period) and also no co-infection (because there is only one source case for each infected patient). The infector–infectee transmission pairs constructed the transmission networks. Edges directly connecting individuals (called nodes) formed a cluster. Each node and edge inside had heterogeneity with respect to their social features. The topological characteristics of the networks changed with time. To better understand the patterns and drivers of such heterogeneity, we analysed the network quantitatively.

Description of network features

To quantitatively describe the networks, we measured the structure of five key characteristic parameters: (a) out-degree (number of secondary cases); (b) shortest path length (number of directed steps along the shortest paths between network nodes); (c) betweenness centrality [Reference Brandes16] (how important a node is in terms of connecting other nodes [Reference Jackson17]); (d) diameter of clusters (generations of the spreading); and (e) cluster size (see Methods in Supplementary Material for more formal, detailed definitions [Reference Lau, Grenfell, Thomas, Bryan, Nelson and Lopman18–Reference Lloyd-Smith, Schreiber, Kopp and Getz21]).

The average shortest path length between nodes measures how far one node is from another and thus can be used to quantify the connectivity of a network. Typically, for a directed transmission network, the average shortest path length characterises its ability to expand and extend. Networks with a shorter average shortest path length tend to have fewer branches along the transmission chain and are also less likely to introduce a large infection generation (i.e. shorter transmission chains). Betweenness centrality measures the importance of a node in terms of connecting other nodes [Reference Jackson17], that is for disease spreading. If nodes with high betweenness centrality were removed from the network, the network would have diminished. In Figure 1, we provided four illustrative examples to demonstrate how these measures capture the presence of additional branches and longer chains in a transmission network and identify the nodes with higher reproductive potential. We could observe clusters A and D from our data, while clusters B and C were conceptual.

Figure 1. Observed clusters (A and D) and hypothetical examples (B and C) and their respective basic graphical measures. The average shortest path length represents the ability of a network to expand and extend, and the average betweenness measures the average level of contribution for disease spreading. In each cluster, we highlighted nodes and paths contributing greatly to the viral transmission, which is reflected by their high out-degree and high betweenness centrality (i.e. node importance) and longest path length (i.e. path importance). Hence, the clusters decrease in extensibility from cluster D to cluster A due to reduced branching, and the number and influence of central cases in disease transmission also decline.

We also defined superspreaders as cases with an out-degree of at least three (which is the 95% quantile of the distribution of out-degree; see Figure 4). By considering in-degree (1 or 0 in a transmission network; the source of an individual’s infection) and out-degree information, we could define singletons (isolated nodes), index cases (the source of each cluster), and terminal cases (the terminal node of each cluster). The mathematical definitions and key concepts in a network analysis such as nodes, edges, singletons, clusters, and other network quantities are described in detail in the Supplementary materials.

To perform a comparison of topological characteristics of the transmission network across time, we chose a time point to split the network into two periods. Zhejiang provincial government upgraded its infectious disease alert category to the highest level on 23 January 2020, began an officially comprehensive set of restrictions on 1 February 2020, and started reopening on 10 February. Before the governmental announcement, however, on 20 January evidence of human-to-human transmission was already confirmed and raised public awareness. Consequently, outbreaks in Wuhan and reports from news media had already triggered nationwide voluntary social distancing and personal protection before 23 January. Another key factor was Chinese New Year’s Eve on 24 January. Schools had already been on holiday for a while, and work-related social contacts were at very low levels with the majority of the population taking vacations. Therefore, we believed that before 23 January, the average contact numbers had already dropped significantly and achieved the lowest level shortly after 23 January [Reference Chong, Cheng, Zhao, Ling, Mohammad, Wang, Ying Zee, Wei, Xiong, Liu, Wang and Chen22]. Hence, we split the overall network by the declaration date (23 January) to study topological changes in the transmission network (Figure 5).

Statistical analysis

Arithmetic means and proportions were used for count/ordinal and binary variables, respectively. We used cluster-based bootstrapping [Reference Efron and Tibshirani23] to estimate the uncertainty of statistics and conduct hypothesis tests. In particular, we performed 1000 iterations of re-sampling from clusters (i.e. sub-networks that are separated from one another) with replacement to create bootstrapped samples. These samples were then disjointly rejoined to create a pseudo-network sample, and the quantity of interest was calculated for each of these samples. We tested the difference between ordinal variables with Student’s $ t $ -test and $ {\chi}^2 $ test and binary variables with two proportion $ z $ -test [Reference Casella and Berger24]. To control the false discovery rate in multiple testing, the Benjamini–Hochberg procedure [Reference Benjamini and Hochberg25] was used to adjust the $ p $ -values. Nonparametric bootstrap percentiles are used to obtain the 95% confidence interval of each quantity. The 95% confidence interval is then estimated by the 2.5 and 97.5 percentiles of the 100 results.

Agent-based transmission network model

Informed by the observed data, we generated a pseudo-transmission network to comprehensively study the heterogeneous dynamics of the spreading of this COVID-19 outbreak. We assumed that the transmission network is built upon a pre-generated weighted social connection network. Edges, representing social connections between individuals, were weighted based on the types of connections: household, geographical, and random social connections. We fixed the structure of the network, only allowing the weight of edges to vary to represent the changing pattern of social connections. Social contacts between individuals were sampled upon the pre-generated social connection network and infectious contacts occurred through these social contacts. We implemented the susceptible-exposed–infectious-removed (SEIR) model, which subdivides individuals into four transition states: susceptible, exposed, infectious, and removed [Reference Held, Hens, O’Neill and Wallinga26], to characterise the transmission dynamics of COVID-19. Moreover, we categorised patients into 14 age intervals with a 5-year length to construct a time-varying age-specific contact pattern based on the contact matrix between age groups from surveys conducted in Shanghai [Reference Zhang, Litvinova, Liang, Wang, Wang, Zhao, Wu, Merler, Viboud, Vespignani, Ajelli and Yu11].

There are multiple steps for generating the network, which is summarised and labelled in Figure 2, along with key parameters described in Table S1 in the Supplementary Material. In detail, we first generated a social connection network with the following procedures:

1. a. We generated 20,000 nodes (the observed number of close contacts related to 1,349 confirmed cases is approximately 18,000) and distributed them into different families with an average size of 2.95 (see Figure S10 in the Supplementary Material). Each family member was assigned to one of 14 age groups based on the observed distribution of those same 14 age groups in real families of equal size. For individuals residing alone, we randomly assigned their age distribution using the census age distribution in Zhejiang (see Figure S11 in the Supplementary Material, [Reference Tongjiju and DiaochaZongdui27]).

2. b. Next, to assign geographic locations to each individual, we randomly sampled a coordinate from a uniform distribution within a square region. Each node in the network could interact with several other nodes, and these interactions were dependent on their respective locations. To be more specific, let $ {c}_{base} $ be the age-specific contact matrix in Shanghai before the outbreak and the $ \left(i,j\right) $ element represented the contact number of the $ {i}^{th} $ age group with the $ {j}^{th} $ age group. The sum of the $ {i}^{th} $ row of the contact matrix was noted as $ {n}_i $ , which represented the average number of contacts per day of a person in the $ {i}^{th} $ age group. Here, $ {n}_i $ should be less than the number of connections (i.e. the number of acquaintances that one can have), and thus, the $ {i}^{th} $ node was assumed to have a connection with $ {\gamma}_1{n}_i $ acquaintances. We also normalised the rows of $ {c}_{base} $ to get the probability of contact of the $ {i}^{th} $ age group with the $ {j}^{th} $ age group, denoted as $ {p}_{i,j} $ . Accordingly, for an individual in the $ {i}^{th} $ age group, we randomly connected him/her to $ {\gamma}_1{n}_{i,j} $ other nodes among the $ {\gamma}_1{\gamma}_2{n}_{i,j} $ closest nodes of the $ {j}^{th} $ age group, where $ ({n}_{i,1},\dots, {n}_{i,14} $ ) were sampled from the multinomial distribution with a total number $ {n}_i $ and incident rate $ {p}_i=\left({p}_{i,1},\dots, {p}_{i,14}\right) $ . Here, $ {\gamma}_1 $ and $ {\gamma}_2 $ represented the inflation factor to reflect the randomness of the connection. To facilitate contacts from a larger number of acquaintances and allow for relatively long-distance interactions, we set the parameters $ {\gamma}_1 $ and $ {\gamma}_2 $ to be equal to 2. Results of a sensitivity analysis indicated that different combinations of parameters (the values of $ {\gamma}_1 $ and $ {\gamma}_2 $ ranging from 1.5 to 3) have little impact on the general structure of the simulated transmission networks, but a small effect on the total number of infections and the proportion of household transmission. This is because the choice of parameters affects the likelihood of long-distance transmissions and infections outside families.

3. c. To reflect the small-world property of the social network [Reference Jackson17], we allowed each node to connect with an average of 1 other node at random [Reference Block, Hoffman, Raabe, Dowd, Rahal, Kashyap and Mills4].

4. d. We assigned a weight measure to characterise the importance of different connections [Reference Block, Hoffman, Raabe, Dowd, Rahal, Kashyap and Mills4, Reference Nishi, Dewey, Endo, Neman, Iwamoto, Ni, Tsugawa, Iosifidis, Smith and Young6]. Interventions may impact the transmission network by reducing some contact types (e.g. co-workers under the order of working from home) but risking other types (e.g. household members). We modelled with varied weights of network edges. Typically, weights of size 3.716, 0.5, and 0.5 would be taken for household connection, geographical connection, and random connection, respectively. We raised the weight of the household to 5.041 during the period with the highest-level alert, which ensures that the fraction of contacts at home is 50% during the early outbreak and 79% during that period, based on the contact survey in Shanghai [Reference Zhang, Litvinova, Liang, Wang, Wang, Zhao, Wu, Merler, Viboud, Vespignani, Ajelli and Yu11]. Combining all the undirected connections above with their weights, we could get a weighted social connection network where each individual connects to their acquaintances, that is the probability of an occurrence of contact is then calculated using a softmax transformation:

(1) $$ P\left(\mathrm{node}\;g\;\mathrm{contacts}\ \mathrm{node}\;k\right)=\frac{\exp \left({w}_{gk}\right)}{\sum \limits_{j\in {N}_g}\exp \left({w}_{gj}\right)} $$

where $ {N}_g $ denotes the neighbours of a random node $ g $ and $ {w}_{gk} $ represents the weight between two random nodes $ g $ and $ k $ .

Figure 2. Mechanism of the network generation. The procedures for simulations are marked with a to k, respectively.

Based on the pre-specified weighted social network, we simulated the dynamic transmission network with the following procedures (Figure 2):

1. e. First, we randomly sampled and inserted 445 nodes among the social network (which is the reported number of imported cases in the epidemic data of Zhejiang) as the index cases into the transmission network, following the same rate of introduction as the observed imported cases (as shown in the Supplementary Material, Figure S8(b)). As soon as an index case is put into the transmission network, it transfers to the infectious state.

2. f. To reflect the contact patterns that vary by time and age, we considered that the daily contact matrix would initially decrease following the start of the outbreak and gradually return to its previous level once the outbreak was brought under control. The previous and outbreak daily contact matrices were based on the evidence of another study conducted in Shanghai, China [Reference Zhang, Litvinova, Liang, Wang, Wang, Zhao, Wu, Merler, Viboud, Vespignani, Ajelli and Yu11]. The interventions were applied progressively such that the decline occurred from 10 January, when people began to return home for the Spring Festival, to 23 January, when the provincial government declared a highest-level response. The suppression of social contacts lasted for around one month, until 10 February (the day of the reopening in Zhejiang Province). This was subsequently followed by an increase of up to 50% of the baseline after a month. The details of the construction of the daily contact matrix $ {c}^{(d)} $ are given in the Supplementary material.

3. g. In day $ d $ , for a node during the infectious state, we let it contact its neighbours by the weighted social network generated above and following the age-specific contact pattern given by the contact matrix $ {c}^{(d)} $ . In detail, we randomly sampled the potential infectees with replacement from the neighbours of an infector in $ {i}^{th} $ age group on day $ d $ , using a multinomial mass with incident rate calculated from the normalised weight on the equation (1). After that, we randomly added (from its neighbours) or pruned these age-indexed contacts according to the real-time contact vector of $ {i}^{th} $ age group with different age groups, which was randomly generated from the multinomial mass with the summation of $ {i}^{th} $ row of $ {c}^{(d)} $ as the total number of contacts and the normalised $ {i}^{th} $ row of $ {c}^{(d)} $ as the incident rate. In particular, if the infector did not connect to any person in some age groups among the pre-specified social network, we repeated the above step until the corresponding real-time contact numbers also meet zero.

4. h. Infection risk may associate with age [Reference Davies, Klepac, Liu, Prem, Jit and Eggo12, Reference Tan, Ge, Martinez, Sun, Li, Westbrook, Chen, Pan, Li, Cheng, Ling, Chen, Shen and Huang13]. Thus, we assumed an age-specific susceptibility $ ({s}_j $ ) (see in the Supplementary Material, Figure S1) according to a previous study [Reference Davies, Klepac, Liu, Prem, Jit and Eggo12] and a time-dependent rate of transmissibility (T) from symptom [Reference Ge, Martinez, Sun, Chen, Zhang, Li, Sun, Chen, Pan, Li, Sun, Handel, Ling and Shen8] (i.e. transmissibility changes in infectious period and peaks at symptom onset; see Table S3 in the Supplementary Material). The probability of transmission occurring $ (\beta $ ) for a contact is the product of the common transmissibility and susceptibility based on the age of the potential infectees. If a susceptible node makes contact $ n $ times with an infectious individual on the same day, then the incident probability will be $ 1-{\left(1-\beta \right)}^n $ . After being infected, individuals will be assumed to move to the exposed stage.

5. i. Every infected node during the exposed stage had an incubation period (the duration from being exposed to symptom onset), which is sampled from a log-normal distribution with a log mean of 4.20 and a log standard deviation of 1.94 [Reference Li, Guan, Wu, Wang, Zhou, Tong, Ren, Leung, Lau, Wong, Xing, Xiang, Wu, Li, Chen, Li, Liu, Zhao, Liu, Tu, Chen, Jin, Yang, Wang, Zhou, Wang, Liu, Luo, Liu, Shao, Li, Tao, Yang, Deng, Liu, Ma, Zhang, Shi, Lam, Wu, Gao, Cowling, Yang, Leung and Feng28, Reference He, Lau, Wu, Deng, Wang, Hao, Lau, Wong, Guan, Tan, Mo, Chen, Liao, Chen, Hu, Zhang, Zhong, Wu, Zhao, Zhang, Cowling, Li and Leung29]. We also considered pre-symptomatic infectiousness; that is, infected people can spread the virus to others before the onset of symptoms [Reference He, Lau, Wu, Deng, Wang, Hao, Lau, Wong, Guan, Tan, Mo, Chen, Liao, Chen, Hu, Zhang, Zhong, Wu, Zhao, Zhang, Cowling, Li and Leung29, Reference Byrne, McEvoy, Collins, Hunt, Casey, Barber, Butler, Griffin, Lane, McAloon, O’Brien, Wall, Walsh and More30]. We assumed that the duration from exposure to becoming infectious also follows a log-normal pattern and is a random proportion of the incubation period reciprocally following a log-normal distribution with a log mean of 0.04 and a log standard deviation of 0.59. These choices of parameters were chosen to ensure that the duration of the pre-symptomatic infectious period has a mean of 1 [Reference Byrne, McEvoy, Collins, Hunt, Casey, Barber, Butler, Griffin, Lane, McAloon, O’Brien, Wall, Walsh and More30, Reference Kucharski, Klepac, Conlan, Kissler, Tang, Fry, Gog, Edmunds, Adam, Petra, Andrew, Stephen, Maria, Hannah and Julia31]. Once an individual becomes infectious, they will transfer to an infectious state. Infected patients commonly produce post-symptomatic viral shedding [Reference He, Lau, Wu, Deng, Wang, Hao, Lau, Wong, Guan, Tan, Mo, Chen, Liao, Chen, Hu, Zhang, Zhong, Wu, Zhao, Zhang, Cowling, Li and Leung29, Reference Seah, Anderson, Kang, Wang, Rao, Young, Lye and Agrawal32], so a post-symptomatic infectious period is also considered. It is the duration of infectiousness after symptom onset, which is sampled from a gamma distribution with parameters 5 and 1.4 [Reference Davies, Kucharski, Eggo, Gimma and Edmunds33]. The overall infectious period is thus 8 days.

6. j. As long as an individual develops symptoms or is imported on day $ d $ , we assigned it a removal period (duration from symptom onset to being quarantined, reflecting the speed of case finding) according to our observed removal period, which was progressively decreased from above 19 days to below 1 day (Supplementary Material, Figure S8(a)). A node during the infectious state is assumed to transfer to the removed state after the end of the removed period. If the removal period is larger than the corresponding post-symptomatic infectious period, the infected individuals lose infectiousness before being removed or vice versa.

7. k. For each day $ d $ , we recorded the transmission pairs between infectors and infectees. Under the transmission information up to day $ d $ , we were then able to obtain a dynamic transmission network on day $ d $ . Eventually, if there are no longer any infectious nodes, the pandemic will stop. For computation considerations, we only simulated 100 days and presented the results in Figures 7 and 8.

Simulation under population densities, the intensity of social contacts, and levels of case finding

Interventions alter both the pattern of social contact and disease spreading and thereby affect the structure of resulted transmission networks. Therefore, to comprehensively explore the relationship between viral spreading and the dynamics of the resulting transmission network, it is necessary to consider interventions under various settings and intensities. Here, we considered seven scenarios of simulations with various baseline social contact patterns, social distancing intensity, and household contact tracing policy. Based on our network generation setting, we further considered the case with 50% baseline social contact frequency for simulating the outbreak in more sparsely populated areas (denoted as C(L), meaning Contact(Low), as opposite to C(H), meaning Contact(High), which represents the original case). Regarding the social distancing policy, we considered three typical types of intensity: strict lockdown (L(S), meaning Lockdown(Strict)), mild lockdown (L(M)), and no lockdown (L(N)). Compared to baseline contact, they, respectively, represent a contact frequency that drops to 12%, the ratio of contact frequency during the outbreak period (2.3 per day) to the one at the normal time (18.8 per day) in Shanghai, to 50% declination, and to nothing. Compared to a strict active case finding in Zhejiang (R(S)), we considered a relatively mild one (R(M)) with a removal period of at least three days. We also considered a household contact tracing policy (HQ) as an improvement on case finding. When one is confirmed, family members will be tested and quarantined for two weeks at the same time. If a family member is already in an exposed or infectious state, their status will be confirmed, and they will transfer to the removed state. Combining all the considerations above, we set seven scenarios and their settings of parameters are summarised in Table 1. Typically, in a real-data-based scenario (i.e. scenario 1), the Zhejiang provincial government conducted a top-level social distancing policy including quarantining household members of infected individuals and a strictly active case finding.

Table 1. Parameters’ setting for seven scenarios with various baseline contact frequency, the intensity of social distancing, and the intensity of active case finding

^a Scenario number.

^b Baseline social contact frequency.

^c The period with the highest-level alert is identical across scenarios from day 17 to day 32, 16 days in total.