pExit, param.pExit, timeDep.pExit, diff.pExit and hostCount.pExit

• pExit is the first required fundamental parameter and provides a daily probability for a host to leave the simulation (either cured, died, etc.).
• param.pExit is the list of functions needed to individually parameterize pExit (see Get started). The name of each function in the list has to match the name of the parameter it is sampling for pExit.
• timeDep.pExit allows for pExit to be dependent on the “absolute” time of the simulation, to account - for example - for seasonality or other external time-related covariates. By default, timeDep.pExit is set to FALSE.
• diff.pExit allows pExit to differ according to the current discrete state of the host. This can be useful, for example, if one state has a higher mortality rate (or better cures!) for the infection, in that case the probability to exit the simulation is higher. By default, diff.pExit is set to FALSE. Be careful, every state should give back a result for pExit.
• hostCount.pExit allows pExit to differ according to the number of hosts currently in a state. By default, hostCount.pExit is set to FALSE. To use hostCount.pExit, diff.pExit has to be set to TRUE too.

pMove, param.pMove, timeDep.pMove, diff.pMove and hostCount.pMove

• pMove is the probability (per unit of time) for a host to do move, i.e. to leave its current state (for example, leaving state “A”). It should not be confused with the probabilities extracted from the structure.matrix, which represent the probability to go to a specific location once a movement is ongoing (for example, going to “B” or “C” while coming from “A”).
• param.pMove is the list of functions needed to individually parameterize pMove (see Get started). The name of each function in the list has to match the name of the parameter it is sampling for pMove.
• timeDep.pMove allows for pMove to be dependent of the “absolute” time of the simulation, to account, for example, for seasonality or other external time related covariates. By default, timeDep.pMove is set to FALSE.
• diff.pMove allows pMove to be different according to the current discrete state of the host, to account, for example, of different traveling rates in different states. By default, diff.pMove is set to FALSE. Be careful, every state should give back a result for pMove.
• hostCount.pMove allows for pMove to differ according to the number of hosts currently in a state. By default, hostCount.pMove is set to FALSE. To use hostCount.pMove, diff.pMove has to be set to TRUE too.

nContact, param.nContact, timeDep.nContact, diff.nContact and hostCount.nContact

• nContact represents the number (expressed as a positive integer) of potentially infectious contacts an infected hosts can encounter per unit of time. At each time point, a number of contacts will be determined for each active host in the simulation. The number of contacts (i.e. the output of your function) has to be an integer and can be set to zero.
• param.nContact is the list of functions needed to individually parameterize nContact (see Get started). The name of each function in the list has to match the name of the parameter it is sampling for nContact.
• timeDep.nContact allows for nContact to be dependent on the “absolute” time of the simulation, to account - for example - for seasonality or other external time-related covariates. By default, timeDep.nContact is set to FALSE.
• diff.nContact allows for nContact to differ according to the current discrete state of the host. By default, diff.nContact is set to FALSE. Be careful, every state should give back a result for nContact.
• hostCount.nContact allows for nContact to differ according to the number of hosts currently in a state. This can be useful to adjust the number of contact to the number of potentially susceptible hosts if the infected population is close to the maximum size of the population in a state. By default, hostCount.nContact is set to FALSE. To use hostCount.nContact, diff.nContact has to be set to TRUE too.

pTrans, param.pTrans, timeDep.pTrans,diff.pTrans and hostCount.pTrans

• pTrans is the heart of the transmission process and represents the probability of transmission over time (when a contact occurs).
• param.pTrans is the list of functions needed to individually parameterize pTrans (see Get started). The name of each function in the list has to match the name of the parameter it is sampling for pTrans.
• timeDep.pTrans allows for pTrans to be dependent on the “absolute” time of the simulation, to account - for example - for seasonality or other external time-related covariates. By default, timeDep.pTrans is set to FALSE.
• diff.pTrans allows for pTrans to be different according to the current discrete state of the host. This can be used to account of different dynamics linked to external factors common within a state, such as temperature for example. By default, diff.pTrans is set to FALSE. Be careful, every state should give back a result for pTrans.
• hostCount.pTrans allows pTrans to differ according to the number of hosts currently in a state. By default, hostCount.pTrans is set to FALSE. To use hostCount.pTrans, diff.pTrans has to be set to TRUE too.

pExit

For pExit, we choose a probability that depends on the location where the host currently resides. Each location (state) has to be present, as shown in this example:

p_Exit_fct  <- function(t,current.in){
  if(current.in=="A"){return(0.02)}
  if(current.in=="B"){return(0.05)}
  if(current.in=="C"){return(0.1)}
}

This function indicates that if the host is in state “A”, it has 2% chance to exit, 5% if in state “B” and 10% if in state “C”. Remember that pExit, like the other core functions, has to be function of t, even if t is not used. Since pExit is dependent on the location, diff.pExit=TRUE. However, there is no use of the “absolute” time of the simulation nor individual-based parameters, hence timeDep.pExit=FALSE and param.pExit=NA.

pMove

We choose a constant value for pMove, namely 0.1, i.e. an infected host has 10% chance to leave its state (here a location) for each unit of time.

p_Move_fct  <- function(t){return(0.1)}

Remember that pMove, like the other core functions, has to be a function of t, even if t is not used. Since pMove is not dependent on the location, diff.pMove=FALSE. Similarly, there is no use of the “absolute” time of the simulation nor individual-based parameters, hence timeDep.pMove=FALSE and param.pMove=NA.

nContact

For nContact, we choose a constant function that will draw a value in a normal distribution of mean 0.5 and sd 1, round it, and take its absolute value.

n_contact_fct = function(t){abs(round(rnorm(1, 0.5, 1), 0))}

The distribution of nContact looks as follows:

At each time and for each infected host, nContact will be drawn anew. Remember that nContact, like the other core functions has to be function of t, even if t is not used. Since nContact is constant here, there is no use of the “absolute” time of the simulation, the location of the host, nor individual-based parameters. So param.nContact=NA, timeDep.nContact=FALSE and diff.nContact=FALSE.

pTrans

We choose pTrans in the form of a threshold function: before a certain amount of time since initial infection, the host does not transmit (incubation time, which we call t_incub), and after that time, it will transmit with a certain (constant) probability (which we call p_max). This function is dependent of the time since the host’s infection t.

p_Trans_fct <- function(t, p_max, t_incub){
  if(t < t_incub){p=0}
  if(t >= t_incub){p=p_max}
  return(p)
}

Because each host is different (slightly different biotic and abiotic factors), you can expect each host to exhibit differences in the dynamics of infection, and hence the probability of transmission over time. Thus, t_incub and p_max will be sampled for each host individually according to a certain distribution. t_incub will be sampled from a normal distribution of \(mean\) = 7 and \(sd\) = 1, while p_max will be sampled from a beta distribution with shape parameters \(\alpha\) = 5 and \(\beta\) = 2:

t_incub_fct <- function(x){rnorm(x, mean=7, sd=1)}
p_max_fct <- function(x){rbeta(x, shape1=5, shape2=2)}

Note that here t_incub and p_max are functions of x and not t (they are not core functions but individual-based parameters), and x enters the function as the number of draws to make.

Taken together, the profile for pTrans for a subset of 200 individuals in the population will look as follows:

pTrans is not dependent of the “absolute” time of the simulation nor it is dependent of the hosts location, hence timeDep.pTrans=FALSE and diff.pTrans=FALSE. However, since we make use of individual-based parameters, we have to provide a param.pTrans as a list of functions. The name of each element within this list should have the same name that the core function (here pTrans) uses as argument, e.g.:

t_incub_fct <- function(x){rnorm(x,mean = 7,sd=1)}
p_max_fct <- function(x){rbeta(x,shape1 = 5,shape2=2)}

param_pTrans = list(p_max=p_max_fct,t_incub=t_incub_fct)

Running

Once nosoiSim is set up, you can run the simulation (here the “seed” ensures that you will get the same results as in this tutorial).

library(nosoi)

#Transition matrix
transition.matrix <- matrix(c(0,0.2,0.4,0.5,0,0.6,0.5,0.8,0),nrow = 3, ncol = 3,dimnames=list(c("A","B","C"),c("A","B","C")))

#pExit
p_Exit_fct  <- function(t,current.in){
  if(current.in=="A"){return(0.02)}
  if(current.in=="B"){return(0.05)}
  if(current.in=="C"){return(0.1)}
}

#pMove
p_Move_fct  <- function(t){return(0.1)}

#nContact
n_contact_fct = function(t){abs(round(rnorm(1, 0.5, 1), 0))}

#pTrans
proba <- function(t,p_max,t_incub){
  if(t <= t_incub){p=0}
  if(t >= t_incub){p=p_max}
  return(p)
}

t_incub_fct <- function(x){rnorm(x,mean = 5,sd=1)}
p_max_fct <- function(x){rbeta(x,shape1 = 5,shape2=2)}

param_pTrans = list(p_max=p_max_fct,t_incub=t_incub_fct)

# Starting the simulation ------------------------------------

set.seed(846)
SimulationSingle <- nosoiSim(type="single", popStructure="discrete",
                             length.sim=300, max.infected=300, init.individuals=1, init.structure="A", 
                             
                             structure.matrix=transition.matrix,
                             
                             pExit = p_Exit_fct,
                             param.pExit=NA,
                             timeDep.pExit=FALSE,
                             diff.pExit=TRUE,
                             
                             pMove = p_Move_fct,
                             param.pMove=NA,
                             timeDep.pMove=FALSE,
                             diff.pMove=FALSE,
                             
                             nContact=n_contact_fct,
                             param.nContact=NA,
                             timeDep.nContact=FALSE,
                             diff.nContact=FALSE,
                             
                             pTrans = proba,
                             param.pTrans = list(p_max=p_max_fct,t_incub=t_incub_fct),
                             timeDep.pTrans=FALSE,
                             diff.pTrans=FALSE,
                             
                             prefix.host="H",
                             print.progress=FALSE,
                             print.step=10)
#> Starting the simulation
#> Initializing ... running ...
#> done. 
#> The simulation has run for 36 units of time and a total of 307 hosts have been infected.

Once the simulation has finished, it reports the number of time units for which the simulation has run (36), and the maximum number of infected hosts (307). Note that the simulation has stopped here before reaching length.sim as it has crossed the max.infected threshold set at 300.

pExit.B

For pExit.B, we choose a value that depends on the “absolute” time of the simulation, for example cyclic climatic conditions (temperature). In that case, the function’s arguments should be t and prestime (the “absolute” time of the simulation), in that order:

p_Exit_fctB  <- function(t,prestime){(sin(prestime/(2*pi*10))+1)/16} #for a periodic function

The values of pExit.B across the “absolute time” of the simulation will be the following:

Since pExit.B is dependent of the simulation’s time, do not forget to set timeDep.pExit.B to TRUE. Since there are no individual-based parameters nor is there influence of the host’s location, we set param.pExit.B=NA and diff.pExit.B=NA.

pMove.B

We will assume here that the hosts B do not move. pMove.B will then be set to NA.

p_Move_fct.B  <- NA

Since pMove.B is not dependent on the location, diff.pMove.B=FALSE. Similarly, there is no use of the “absolute” time of the simulation nor individual-based parameters, so param.pMove.B=NA, and timeDep.pMove.B=FALSE.

nContact.B

For nContact.B, we choose a constant function that will sample a value out of a provided list of probabilities:

n_contact_fct.B = function(t){sample(c(0,1,2),1,prob=c(0.6,0.3,0.1))}

The distribution of nContact.B looks as follows:

At each time and for each infected host, nContact.B will be drawn anew. Remember that nContact.B, like the other core functions has to be function of t, even if t is not used. Since nContact.B is constant here, there is no use of the “absolute” time of the simulation, the host’s location, nor individual-based parameters. Hence, param.nContact.B=NA, timeDep.nContact.B=FALSE and diff.nContact.B=FALSE.

pTrans.B

We choose pTrans.B in the form of a Gaussian function. It will reach its maximum value at a certain time point (mean) after initial infection and will subsequently decrease until it reaches 0:

p_Trans_fct.B <- function(t, max.time){
  dnorm(t, mean=max.time, sd=2)*5
}

Because each host is different (slightly different biotic and abiotic factors), you can expect each host to exhibit differences in the dynamics of infection, and hence the probability of transmission over time. Thus, max.time will be sampled for each host individually according to a certain distribution. max.time will be sampled from a normal distribution of parameters \(mean\) = 5 and \(sd\) = 1:

max.time_fct <- function(x){rnorm(x,mean = 5,sd=1)}

Note again that here max.time is a function of x and not t (not a core function but individual-based parameters), and x enters the function as the number of draws to make.

Taken together, the profile for pTrans for a subset of 200 individuals in the population will look as follow:

Since pTrans.B is not dependent on the “absolute” time of the simulation, timeDep.pTrans.B=FALSE. However, since we make use of individual-based parameters, we have to provide a param.pTrans as a list of functions. The name of each element of the list should have the same name as the core function (here pTrans.B) uses as argument, as shown here:

max.time_fct <- function(x){rnorm(x,mean = 5,sd=1)}

param_pTrans.B = list(max.time=max.time_fct)

Running

Once nosoiSim is set up, you can run the simulation (here the “seed” ensures that you will get the same results as in this tutorial).

library(nosoi)

#Transition matrix
transition.matrix <- matrix(c(0,0.2,0.4,0.5,0,0.6,0.5,0.8,0),nrow = 3, ncol = 3,dimnames=list(c("A","B","C"),c("A","B","C")))

#Host A -----------------------------------

#pExit
p_Exit_fct  <- function(t,current.in){
  if(current.in=="A"){return(0.02)}
  if(current.in=="B"){return(0.05)}
  if(current.in=="C"){return(0.1)}
}

#pMove
p_Move_fct  <- function(t){return(0.1)}

#nContact
n_contact_fct = function(t){abs(round(rnorm(1, 0.5, 1), 0))}

#pTrans
proba <- function(t,p_max,t_incub){
  if(t <= t_incub){p=0}
  if(t >= t_incub){p=p_max}
  return(p)
}

t_incub_fct <- function(x){rnorm(x,mean = 5,sd=1)}
p_max_fct <- function(x){rbeta(x,shape1 = 5,shape2=2)}

param_pTrans = list(p_max=p_max_fct,t_incub=t_incub_fct)

#Host B -----------------------------------

#pExit
p_Exit_fct.B  <- function(t,prestime){(sin(prestime/(2*pi*10))+1)/16}

#pMove
p_Move_fct.B  <- NA

#nContact
n_contact_fct.B = function(t){sample(c(0,1,2),1,prob=c(0.6,0.3,0.1))}

#pTrans
p_Trans_fct.B <- function(t, max.time){
  dnorm(t, mean=max.time, sd=2)*5
}

max.time_fct <- function(x){rnorm(x,mean = 5,sd=1)}

param_pTrans.B = list(max.time=max.time_fct)

# Starting the simulation ------------------------------------

set.seed(60)
SimulationDual <- nosoiSim(type="dual", popStructure="discrete",
                           length.sim=300, 
                           max.infected.A=100,
                           max.infected.B=200,
                           init.individuals.A=1,
                           init.individuals.B=0,
                           init.structure.A="A",
                           init.structure.B=NA,
                           structure.matrix.A=transition.matrix,
                           structure.matrix.B=transition.matrix,
                           
                           pExit.A = p_Exit_fct,
                           param.pExit.A=NA,
                           timeDep.pExit.A=FALSE,
                           diff.pExit.A=TRUE,
                           
                           pMove.A = p_Move_fct,
                           param.pMove.A=NA,
                           timeDep.pMove.A=FALSE,
                           diff.pMove.A=FALSE,
                           
                           nContact.A=n_contact_fct,
                           param.nContact.A=NA,
                           timeDep.nContact.A=FALSE,
                           diff.nContact.A=FALSE,
                           
                           pTrans.A = proba,
                           param.pTrans.A = list(p_max=p_max_fct,t_incub=t_incub_fct),
                           timeDep.pTrans.A=FALSE,
                           diff.pTrans.A=FALSE,
                           prefix.host.A="H",
                           
                           pExit.B = p_Exit_fct.B,
                           param.pExit.B=NA,
                           timeDep.pExit.B=TRUE,
                           diff.pExit.B=FALSE,
                           
                           pMove.B = p_Move_fct.B,
                           param.pMove.B=NA,
                           timeDep.pMove.B=FALSE,
                           diff.pMove.B=FALSE,
                           
                           nContact.B=n_contact_fct.B,
                           param.nContact.B=NA,
                           timeDep.nContact.B=FALSE,
                           diff.nContact.B=FALSE,
                           
                           pTrans.B = p_Trans_fct.B,
                           param.pTrans.B = param_pTrans.B,
                           timeDep.pTrans.B=FALSE,
                           diff.pTrans.B=FALSE,
                           prefix.host.B="V",
                           
                           print.progress=FALSE)
#> Starting the simulation
#> Initializing ... running ...
#> done. 
#> The simulation has run for 34 units of time and a total of 106 (A) and 129 (B) hosts have been infected.

Once the simulation has finished, it reports the number of time units for which the simulation has run (34), and the maximum number of infected hosts A (106) and hosts B (129). Note that the simulation has stopped here before reaching length.sim as it has crossed the max.infected.A threshold set at 100.