Framework of the model

The framework of this model is as follows. First, we establish a virtual social network according to the kinship between families. Then, we start the following day iteration. We calculate the new infected individuals, new patients, new hospitalised patients and new convalescents on day d, and update the status of families and individuals. Furthermore, we search for the families that move out and those that move back into the network, and then we update the adjacent matrix of the network. Moreover, we find all the cliques in the network based on the updated adjacent matrix using the clique filtering algorithm and select the families participating in the feast in each clique according to the family's willingness to have the feast on day d. Then, we randomly determine the individuals who will be infected during the feast according to the infection status of each feast participant. The above iteration will continue until the specified deadline. Finally, the time distribution of the population is analysed. Specific steps are demonstrated in Figure 1a.

Fig. 1.

Flow chart of model design: model design framework (a) and global algorithm (b).

Premises of the model

In order to make the model more accurate as well as concise, we adopted the following premises. First, the virus spreads only among individuals in kinships who attend feast gatherings and ignores transmission through daily contact. Second, natural births and deaths in the population are ignored, and the social contact network is considered a closed network without inflow or outflow of individuals. Third, all individuals are considered susceptible to the virus, although they cannot be infected again after they have been infected the first time. Fourth, feast gatherings occur only within a clique, that is, all families in a gathering are acquainted with each other. Fifth, the health status of each patient evolves through five periods: susceptibility, incubation, contagion, hospitalisation and discharge period (recovery or death). Finally, each family is allowed to have a maximum of one dining gathering each day.

Construction of a social contact network

It is assumed that there are many families in a closed community. Each family is randomly allocated a certain number of members (from 1 to 4) based on the average family size in China [22]. Families that are related to each other by direct kinships comprise a clique that may consist of families including grandparents, uncles, aunts and father and mother, as well as families of their independent adult children.

Each family falls into one of two categories according to the marriage relationship: (1) there is a marital relationship. The married spouses live together or separately due to working in different places (they may live with their minor children or adult unmarried children). (2) There is no marriage. This relationship includes divorced persons, or unmarried single persons. The relatives of the former family type comprise husband-side relatives and wife-side relatives, which is the common node of the two cliques, thereby leading to at least a husband-side clique and a wife-side clique within the social contact network. In contrast, the relatives of the latter family type all belong to one clique. Moreover, it is assumed that 80% of families in a clique belong to the former family type and 20% of families in a clique belong to the latter family type.

Based on the above analysis, we began to establish a social network with family as the node and kinship as the connection. First, we set the total number of families in the community as 1000, and number these families from 1 to 1000. Then, according to the numbering order, we randomly select several families to form cliques, and the number of families in each clique is randomly selected from three to eight according to a uniform distribution. Based on the above operations, a data frame E can be constructed. Each row of E represents a clique, and the elements in each row represent the family number in the clique. At this time, there is no common node (family) in each clique. In order to connect these cliques to form a network, we need to build common nodes in the cliques. Since we have set that 80% of families in each clique form a common node with families in other cliques, we randomly select families in each clique according to this proportion as the common node. In this way, a symmetrical adjacent matrix S with elements only 1 and 0 can be constructed. Each row or column of S represents a clique, and element 1 (0) represents that two different cliques have at least 1 (0) common node. At the same time, we record the number of common nodes in each clique. Then, we successively replace the common nodes of each clique in E with the same number (the number of elements in E is <1000). Based on the updated E, an adjacent matrix H with only 1 or 0 elements can be established. Each row or column of H shows a family, and 1 (0) indicates whether the two families are relatives.

Moreover, in China, the husband's parents and wife's parents usually have gatherings with the couple. Accordingly, based on matrices F and E, we search the common nodes of all cliques in the network, and then select a portion of nodes that can have a feast with husband's parents and wife's parents with a probability of 0.5 (because not all husband's parents, wife's parents and the couple have a feast, we assume that the proportion of having a feast is 0.5). If it is determined that one family can establish a feast with the husband's parents and the wife's parents, then respectively randomly select one node as the parent family from the two different cliques where the family is located. Therefore, the three families also form a clique and mark it in H. For more details of the construction method of the network, refer to Appendix I.

Identification of all cliques

All cliques in the network are identified using the clique filtering algorithm proposed by Palla et al. in 2005, and the family numbers that make up each clique are recorded [Reference Palla23]. Specifically, a clique search is performed for each node on the basis of H. The specific algorithm is as follows: when searching the clique containing the m-th node in H, translate the m-th row to the first row of H. Then, adjust the order of the columns so that element 1 in this row is concentrated on the left. Additionally, translate the second, third and so on rows of H in turn according to the above method. In this way, a maximum square matrix, which is the largest global coupling network (clique) of the m-th node, with all non-diagonal elements of 1 and all diagonal elements of 0 can be formed at the upper left of H. Since the rows are translated and the columns are translated accordingly, the translated matrix H is still a symmetrical matrix. Using this algorithm, we can identify all cliques that contain the given node. The serial numbers of the identified cliques and their families are stored in a data frame R. Each row of R represents a clique, and the elements of each row represent the families within that clique. Finally, duplicate cliques and their subsets in R are deleted (see Appendix II for more details on the algorithm).

Each family has a probability P, each day, of deciding to have a feast gathering. When deciding to have a feast gathering, the first step for the family is to find all cliques in R that contain the family. The second step is the random selection of a clique. Under normal circumstances, a feast gathering is considered to exist when at least two families in a clique choose to gather. However, when the parents-in-law and their children decide to have a feast gathering, three matched families must be involved at the same time. If only two families are matched, then the feast gathering is considered unrealisable. Eventually, all families that have decided to have a feast gathering but have failed to match are allowed to select a second clique for the planned feast gathering, although they will be excluded from consideration if that matched feast gathering fails to happen. Accordingly, families that have successfully engaged in feast gatherings in a clique comprise a subset of the clique. A data frame called RR is generated each day to record all successful feast gatherings in the social contact network, with each row representing a feast gathering and each element in the row representing the families involved in the gathering (see Appendix III for more details on the algorithm).

Spread of the virus through feast gatherings

It is necessary to update the data frame RR each day because the involvement of families in feast gatherings varies daily. All members of the matched families are involved in the gathering, which is conducted in the manner shown in Figure 2a. In a general scenario, there are infected individuals (infectors) and susceptible individuals attending the same feast gathering. During the feast, susceptible individuals become infected due to contact with infectors. Assuming that there are m infectors at a feast gathering and that there is a probability q for a susceptible individual to be infected by an infector at the feast gathering, it can be determined that there is a probability 1 − (1 − q)^m for a susceptible individual to be infected at the feast gathering. For a family that decides not to have a feast gathering on a given day or that plans to do so but fails to achieve it, the probability for a susceptible individual in the family to be infected on that day is calculated in the same way as described. A data frame B is generated to record the medical history of all infected individuals, with each row representing an infected individual and each column – from left to right – representing the serial number of the infection source, family serial number, personal serial number, infection time, onset time, hospitalisation time, discharge time and outcome (recovery or death). The health status of individuals and families is presented in Figure 3.

Fig. 2.

Static characteristics and clique structure of the social contact network. Local structure of the social contact network (a). Nodes represent families, and line connections represent kinships. The globally coupled networks in orange, green and red comprise 6, 5 and 4-family cliques, respectively. White nodes represent common nodes between two different cliques, and the black line links the husband's parental family to the wife's parental family. Each family has members with different health status. Distribution of the mean node degree and its 95% confidence interval (b). The number of k-family cliques (k = 2, 3, …, 8) in the social contact network (black line) and number of feast gatherings involving n (n = 2, 3, …, 7) matched families (other colour lines, each corresponding to a different value of probability P) (c).

Fig. 3.

Health status of individuals and their families. Health status of individuals (a) and health status of families (b) are shown. In (a), infected indicates the incubation period. Infectious indicates the period from onset to hospitalisation. In (b), a susceptible family is a family in which all members are susceptible. An infected family is a family in which at least one member is infected, and no one is receiving inpatient treatment. A hospitalised family is a family in which at least one member is receiving inpatient treatment. Hospitalised families are removed from the network. A recovered family is a family in which all hospitalised members have been cured and discharged and have a willingness to re-attend feast gatherings.

For a given individual, his or her participation in a feast gathering may be during the susceptibility period, incubation period, contagion period (from onset to admission) or discharge period after recovery. Patients do not attend feast gatherings when hospitalised or dead. The reason why some patients attend feast gatherings despite illness symptoms is that they mistakenly consider their symptoms to reflect a common respiratory disease and fail to give those symptoms sufficient attention. When a new infected person is generated, a new row is added below the last row of B to record the medical information of the new infected person. With the epidemic spread, the number of B rows is increasing. The parameters of the model are shown in Table 1.

Table 1.

Model parameters

CI, confidence interval; COVID-19, coronavirus disease.

Moreover, when at least one patient in the family is hospitalised or dies of illness, other members of the same family will no longer attend any feast gathering out of ethical considerations; therefore, the family is removed from the social contact network. When all patients in a family have been cured and discharged, the family returns to the social contact network and continues to attend feast gatherings. Because the health status of individuals and that of families in the network may change on a daily basis, it is necessary to generate a data frame F to record the health status, with each row representing a family, the first element of each row representing the status of the family (1 means ‘removed’, and 0 means ‘not removed’), and subsequent elements representing the health status of family members (numbers 1–6 represent the susceptibility period, incubation period, contagion period, treatment period, death and recovery, respectively). According to the family status recorded in the data frame F, it is possible to find the sequential numbers of families that are removed from and are added back into the social contact network each day while updating the adjacent matrix H and clique data frame R. Based on the personal status recorded in F, it is possible to find the susceptible individuals, recovered individuals and infectors attending the same feast gathering. When the model end time T is reached, the iteration ends. The infection time, onset time, hospitalisation time and discharge time of infected individuals, as well as the daily numbers of families with different status, are statistically analysed on the basis of B. The results are presented as a diagram showing the temporal distribution of the pandemic situation (see Fig. 1b and Appendix IV for more details on the global algorithm).

S, E, I, H and R represent the number of susceptible, exposed (incubation period), infectious, hospitalised and recovered individuals, respectively. Their variations on day d are expressed by the following formula:

(1)$$\eqalign{& \Delta S( d) = {-}\sum\limits_i^n {S_i( d) \cdot Bernoulli[ 1-{( 1-q) }^{I_i( d) }] } \cr & \Delta E( d) = \sum\limits_i^n {S_i( d) \cdot Bernoulli[ 1-{( 1-q) }^{I_i( d) }] -\sum\limits_i^n {\delta E_i( d) } } \cr & \Delta I( d) = \sum\limits_i^n {\delta E_i( d) } -\sum\limits_i^n {\varphi I_i( d) } \cr & \Delta H( d) = \sum\limits_i^n {\varphi I_i( d) } -\sum\limits_i^n {( \gamma + \mu ) H_i( d) } \cr & \Delta R( d) = \sum\limits_i^n {\gamma H_i( d) } } $$

In formula (1), ΔS(d) = S(d) − S(d − 1) (1 ≤ d ≤ T), i represents the i-th feast, n represents the total number of feasts on day d, δ represents the probability that the infected person in the incubation period is transformed into a patient per day, φ represents the probability that the patient is transferred to the hospital per day, γ represents the probability that the hospitalised patient recovers per day and μ represents the probability that the hospitalised patient dies per day.

Sensitivity analysis

Partial rank correlation coefficients (PRCCs) and Latin hypercube sampling (LHS) were used to conduct the sensitivity analyses. PRCC–LHS is an efficient and reliable sampling-based sensitivity analysis method that provides a measure of monotonicity between a set of parameters and the model output after removing the linear effects of all parameters except for the parameter of interest [Reference Marino24]. Each parameter interval was divided into N smaller and equal intervals, and one sample was selected randomly from each interval [Reference Marino24, Reference McKay25]. A standard coefficient denoting the correlation between the parameter and model output was calculated. All analyses were conducted using MATLAB R2019a software (MathWorks, Natick, Massachusetts, USA).