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#' seqB method
#'
#' This function implements a sequential Bayesian estimation method of R0 due to Bettencourt and Riberio (PloS One, 2008).
#' See details for important implementation notes.
#'
#' The method sets a uniform prior distribution on R0 with possible values between zero and \code{kappa}, discretized to a fine grid.
#' The distribution of R0 is then updated sequentially, with one update for each new case count observation.
#' The final estimate of R0 is \code{Rhat}, the mean of the (last) posterior distribution.
#' The prior distribution is the initial belief of the distribution of R0; which in this implementation is the uninformative uniform
#' distribution with values between zero and \code{kappa}. Users can change the value of kappa only (ie. the prior distribution
#' cannot be changed from the uniform). As more case counts are observed, the influence of the prior distribution should lessen on
#' the final estimate \code{Rhat}.
#'
#' This method is based on an approximation of the SIR model, which is most valid at the beginning of an epidemic. The method assumes
#' that the mean of the serial distribution (sometimes called the serial interval) is known. The final estimate can be quite sensitive
#' to this value, so sensitivity testing is strongly recommended. Users should be careful about units of time (e.g. are counts observed
#' daily or weekly?) when implementing.
#'
#' Our code has been modified to provide an estimate even if case counts equal to zero are present in some time intervals. This is done
#' by grouping the counts over such periods of time. Without grouping, and in the presence of zero counts, no estimate can be provided.
#'
#' @param NT Vector of case counts
#' @param mu Mean of the serial distribution (needs to match case counts in time units; for example, if case counts are
#' weekly and the serial distribution has a mean of seven days, then \code{mu} should be set to one, if case
#' counts are daily and the serial distribution has a mean of seven days, then \code{mu} should be set to seven)
#' @param kappa Largest possible value of uniform prior, defaults to 20. This describes the prior belief on ranges of R0,
#' so should be set to a higher value if R0 is believed to be larger.
#'
#' @return secB returns a list containing the following components: \code{Rhat} is the estimate of R0 (the posterior mean),
#' \code{posterior} is the posterior distribution of R0 from which alternate estimates can be obtained (see examples),
#' \code{group} is an indicator variable (if \code{group=TRUE}, zero values of NT were input and grouping was done to
#' obtain \code{Rhat}), and \code{inputs} is a list of the original input variables \code{NT, gamma, kappa}. The variable
#' \code{posterior} is returned as a list made up of \code{supp} the support of the distribution and \code{pmf} the
#' probability mass function.
#'
#' @examples
#' ## ===================================================== ##
#' ## Illustrate on weekly data ##
#' ## ===================================================== ##
#'
#' NT <- c(1, 4, 10, 5, 3, 4, 19, 3, 3, 14, 4)
#' ## obtain Rhat when serial distribution has mean of five days
#' res1 <- seqB(NT=NT, mu=5/7)
#' res1$Rhat
#' ## obtain Rhat when serial distribution has mean of three days
#' res2 <- seqB(NT=NT, mu=3/7)
#' res2$Rhat
#'
#' ## ============================================================= ##
#' ## Compute posterior mode instead of posterior mean and plot ##
#' ## ============================================================= ##
#'
#' Rpost <- res1$posterior
#' loc <- which(Rpost$pmf == max(Rpost$pmf))
#' Rpost$supp[loc] # posterior mode
#' res1$Rhat # compare with posterior mean
#'
#' par(mfrow=c(2, 1), mar=c(2, 2, 1, 1))
#' plot(Rpost$supp, Rpost$pmf, col="black", type="l", xlab="", ylab="")
#' abline(h=1/(20/0.01+1), col="red")
#' abline(v=res1$Rhat, col="blue")
#' abline(v=Rpost$supp[loc], col="purple")
#' legend("topright", legend=c("prior", "posterior", "posterior mean (Rhat)", "posterior mode"), col=c("red", "black", "blue", "purple"), lty=1)
#' plot(Rpost$supp, Rpost$pmf, col="black", type="l", xlim=c(0.5, 1.5), xlab="", ylab="")
#' abline(h=1/(20/0.01+1), col="red")
#' abline(v=res1$Rhat, col="blue")
#' abline(v=Rpost$supp[loc], col="purple")
#' legend("topright", legend=c("prior", "posterior", "posterior mean (Rhat)", "posterior mode"), col=c("red", "black", "blue", "purple"), lty=1)
#'
#' ## ========================================================= ##
#' ## Compute Rhat using only the first five weeks of data ##
#' ## ========================================================= ##
#'
#' res3 <- seqB(NT=NT[1:5], mu=5/7) # serial distribution has mean of five days
#' res3$Rhat
#'
#' @export
seqB <- function(NT, mu, kappa=20) {
if (length(NT) < 2)
print("Warning: length of NT should be at least two.")
else {
if (min(NT) > 0) {
times <- 1:length(NT)
tau <- diff(times)
}
group <- FALSE
if (min(NT) == 0) {
times <- which(NT > 0)
NT <- NT[times]
tau <- diff(times)
group <- TRUE
}
R <- seq(0, kappa, 0.01)
prior0 <- rep(1, kappa / 0.01 + 1)
prior0 <- prior0 / sum(prior0)
k <- length(NT) - 1
R0.post <- matrix(0, nrow=k, ncol=length(R))
prior <- prior0
posterior <- seq(0, length(prior0))
gamma <- 1 / mu
for (i in 1:k) {
mm1 <- NT[i]
mm2 <- NT[i+1]
lambda <- tau[i] * gamma * (R - 1)
lambda <- log(mm1) + lambda
loglik <- mm2 * lambda - exp(lambda)
maxll <- max(loglik)
const <- 0
if (maxll > 700)
const <- maxll - 700
loglik <- loglik-const
posterior <- exp(loglik) * prior
posterior <- posterior / sum(posterior)
prior <- posterior
}
Rhat <- sum(R * posterior)
return(list(Rhat=Rhat, posterior=list(supp=R, pmf=posterior), group=group))
}
}
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