Nothing
Analysing Diazinon impact on the freshwater crustacean Gammarus pulex using GUTS-RED-proper"
In GUTS: Fast Calculation of the Likelihood of a Stochastic Survival Model
rm(list = ls())
do.calc <- FALSE # if TRUE, all calculations are conducted. if FALSE, calculations are omitted and the vignette output is built from pre-calculated data.
do.save <- FALSE # if TRUE, calculation parts will be saved to disk. This works only correctly, if building from source. Therefore, if you are not building the vignette from source: do.save <- FALSE
if (do.calc == FALSE) message("For performance reasons, this vignette builds from pre-calculated data.\n\n To run all calculations, set 'do.calc <- TRUE' in the vignette's first code chunk. \n Building the vignette will take a while.")
knitr::opts_chunk$set(
collapse = TRUE,
comment = "#>",
fig.align = "center",
dev = "png",
dpi=150, fig.height=7, fig.width=7,
dev.args = list(),
out.width = "90%"
)
op <- par(no.readonly = TRUE)
Summary
The GUTS-package (Albert et al., 2016) implements the individual tolerance model GUTS-RED-IT, the stochastic death model GUTS-RED-SD and the GUTS-RED-proper model, which combines the GUTS-RED-IT and the GUTS-RED-SD model (Jager et al., 2011). We demonstrate a Bayesian model calibration of the proper model on the case study of the freshwater crustacean Gammarus pulex being exposed to Diazinon in three pulsed toxicity tests. This vignette follows the description in Albert et al. (2016), but uses a log-logistic threshold distribution, a slightly different calibration procedure and results analysis. The experiment data is provided with the GUTS-package.
Prepare
Load the GUTS-package
library(GUTS)
packageVersion("GUTS")
Load the Diazinon data set
data(diazinon)
str(diazinon)
Set up the guts object
Setting up a GUTS-Proper-object requires for each toxicity test
- the exposure profile containing the measured concentration
C at each concentration measurement time Ct
- the survival data consisting of the number of survived organisms
y at each abundance measurement time yt
- the GUTS-model type
model = "Proper"
- the tolerance threshold distribution
dist = "loglogistic"
We generate three GUTS-proper-objects; one for each of the toxicity test. The GUTS-objects are collected in a list.
guts_object <- list(
C1 = guts_setup(
C = diazinon[["C1"]], Ct = diazinon[["Ct1"]],
y = diazinon[["y1"]], yt = diazinon[["yt1"]],
model = "Proper", dist = "loglogistic"
),
C2 = guts_setup(
C = diazinon[["C2"]], Ct = diazinon[["Ct2"]],
y = diazinon[["y2"]], yt = diazinon[["yt2"]],
model = "Proper", dist = "loglogistic"
),
C3 = guts_setup(
C = diazinon[["C3"]], Ct = diazinon[["Ct3"]],
y = diazinon[["y3"]], yt = diazinon[["yt3"]],
model = "Proper", dist = "loglogistic"
)
)
Estimating parameters
library('adaptMCMC') # Function `MCMC()`, Monte Carlo Markov Chain.
Define joint log likelihood
The list of GUTS-objects is used to calculate the joint likelihood of all studies.
logposterior <- function( pars, guts_objects, isOutOfBoundsFun) {
if ( isOutOfBoundsFun(pars) ) return(-Inf)
return(
sum(sapply( guts_objects, function(obj) guts_calc_loglikelihood(obj, pars) )))
}
Define constraints on parameter values
The logposterior function is formulated with a function that defines parameter bounds.
Constraints on parameters should consider
- hard boundaries:
is.infinite(p) constraints parameters to finite valuesp < 0 confines rates and thresholds to positive values
- knowledge on numerical limitations:
p[3] > 30 confines the killing rate to realistic values. The constraint avoids an unrealistic local optimum of the optimization problem, i.e. a high killing rate simulates the effect of a low tolerance threshold, and makes the threshold estimation obsolete. p[5] <= 1 is assumed, to exclude that the mode of the log-logistic threshold distribution is 0, due to the shape parameter. Note that the mode can approach 0 if the estimated median p[4] approaches 0. Therefore, this constraint stabilises estimation of low threshold values.exp(8/p[5]) * p[4] > 1e200 avoids numerical problems when approximating the log-logistic function for unrealistically high median values p[4] and extremely low shape values p[5] that result in a threshold distribution confined at a zero threshold
- toxicological or ecological information: not used here
is_out_of_bounds_fun_Proper <- function(p) any(
is.na(p),
is.infinite(p),
p < 0,
p[3] > 30 ,
p[5] <= 1,
exp(8/p[5]) * p[4] > 1e200
)
Guess suitable initial values
Suitable initial parameter values for the MCMC algorithm are searched by optimization.
pars_start_Proper <- c(0.05, 0.5, 1, 10, 5)
names(pars_start_Proper) <- c("hb", "ke", "kk", "mn", "beta")
# to avoid conflicts with boundaries of L-BFGS-B, the minimum logposteriror value is limited to -1e16
optim_fun <- function(pars, guts_objects, isOutOfBoundsFun) {
return(
max(-1e16,logposterior(pars, guts_objects, isOutOfBoundsFun) )
)
}
optim_result_Proper <- optim(pars_start_Proper, optim_fun, lower = c(1e-6, 1e-6, 1e-6, 1e-6, 1e-6), upper = c(1, 1, 30, 40, 20), method = "L-BFGS-B", control = list(trace = 0, fnscale = -1), guts_objects = guts_object, isOutOfBoundsFun = is_out_of_bounds_fun_Proper)
save(optim_result_Proper, file = file.path("..", "inst", "extdata", "vignetteGUTS-Proper-initialValues.Rdata"))
load(system.file("extdata", "vignetteGUTS-Proper-initialValues.Rdata",
package = "GUTS", mustWork = TRUE)
)
if (optim_result_Proper$convergence != 0) {
warning("Optimizing initial values has not converged. Using non-optimized initial values.")
optim_result_Proper$par <- pars_start_Proper
}
print(optim_result_Proper)
Bayesian parameter estimation
mcmc_pars_Proper <- optim_result_Proper$par
mcmc_sigma_Proper <- diag( (mcmc_pars_Proper/10)^2 + .Machine$double.eps )
mcmc_result_Proper <- MCMC(p = logposterior,
init = mcmc_pars_Proper, scale = mcmc_sigma_Proper, adapt = 20000, acc.rate = 0.4, n = 150000,
guts_objects = guts_object, isOutOfBoundsFun = is_out_of_bounds_fun_Proper
)
#exclude burnin and thin by 20
mcmc_result_Proper$samples <- mcmc_result_Proper$samples[seq(50001, 150000, by = 20),]
mcmc_result_Proper$log.p <- mcmc_result_Proper$log.p[seq(50001, 150000, by = 20)]
save(mcmc_result_Proper, file = file.path("..", "inst", "extdata", "vignetteGUTS-Proper-MCMCresults.Rdata"))
load(system.file("extdata", "vignetteGUTS-Proper-MCMCresults.Rdata",
package = "GUTS", mustWork = TRUE)
)
Show parameter estimation results
Chain and distribution plots.
The top four graphs show mixing and distribution of the parameters. The last row "LL" show mixing and distribution of the logposterior. A final plot indicates correlations among calibrated parameters.
if (all(is.finite(mcmc_result_Proper$log.p))) {
par( mfrow = c(dim(mcmc_result_Proper$samples)[2] + 1, 2) , mar = c(5,4,1,0.5))
plot(as.mcmc(cbind(mcmc_result_Proper$samples, LL = mcmc_result_Proper$log.p)), auto.layout = FALSE)
par(op)
} else {
par( mfrow = c(dim(mcmc_result_Proper$samples)[2], 2) , mar = c(5,4,1,0.5))
plot(as.mcmc(mcmc_result_Proper$samples), auto.layout = FALSE)
par(op)
}
panel.cor <- function(x, y, ...)
{
par(usr = c(0, 1, 0, 1))
txt <- as.character(format(cor(x, y), digits=2))
text(0.5, 0.5, txt, cex = max(0.1, 4 * abs(cor(x, y)) + 1))
}
pairs(mcmc_result_Proper$samples, upper.panel=panel.cor)
Estimated parameter values compared to the values.
This function summarizes the calibrated parameter values
eval_MCMC <- function(sampMCMC, plot = TRUE) {
bestFit <- sampMCMC$samples[which.max(sampMCMC$log.p),]
qu <- apply(sampMCMC$samples, 2, quantile, probs = c(0.025, 0.5, 0.975))
if (plot) {
plot(seq(dim(sampMCMC$samples)[2]), bestFit, pch = 20, cex = 2, ylim = range(qu),
xaxt = "n", xlab = "Model parameter", ylab = "Parameter value")
arrows(x0 = seq(dim(sampMCMC$samples)[2]), y0 = qu[1,], y1 = qu[3,], angle = 90, length = 0.1, code = 3)
axis(side = 1, at = seq(dim(sampMCMC$samples)[2]), dimnames(sampMCMC$samples)[[2]])
}
res <- rbind(bestFit, qu)
rownames(res)[1] <- "best"
return(res)
}
Summarize the parameter values. Black dots indicate best estimates and 95% credible interval.
eval_MCMC(mcmc_result_Proper)
Forecast
The GUTS-package can be applied to forecast survival. Forecasting is demonstrated for one made-up experimental setting.
Setup guts object and forecast
Values to be specified are:
- concentrations
C
- concentration time points
Ct
- forecast time points
yt: a vector starting with 0
- the initial number of individuals
y[1] in a vector y of the same length as yt. Elements other than y[1] can be set arbitrarily. The values are ignored in forecasts.
We assume three pulsed applications exactly at time steps 0, 10 and 20. We assume that the substance would dissipate over time. Therefore, to monitor the dissipation, the concentration is measured at several time steps. The initial population size is set to 100 individuals. Projections are made for 26 time steps.
guts_obj_forecast <-
guts_setup(
C = c(60, 40, 6, 0, 0, 60, 40, 6, 0, 0, 60, 40, 6, 0),
Ct = c(0, 2.2, 4, 6, 9.9, 10, 12.2, 14, 16, 19.9, 20, 22.2, 24, 26),
y = c(100, rep(0,26)),
yt = seq(0,26),
model = "Proper", dist = "loglogistic", N = 1000, M = 10000
)
We forecast survival probabilities and damage over time for each dose concentration and each parameter set in the thinned posterior. This procedure takes into account the uncertainties in parameter estimates.
mcmc_forecasts_paras <- mcmc_result_Proper$samples
forec <- apply(mcmc_forecasts_paras, 1,
function(par) list(
guts_calc_survivalprobs(gobj = guts_obj_forecast, par = par),
guts_report_damage(gobj = guts_obj_forecast)$damage
)
)
# extract the damage matrix
damage <- sapply(forec, function(x) x[[2]])
survProb <- sapply(forec, function(x) x[[1]])
rm(forec)
# analyse damage
damage.qu <- apply(damage, 1, function(x) quantile(x, probs = c(0.025, 0.5, 0.975)))
survProb.qu <- apply(survProb, 1, function(x) quantile(x, probs = c(0.025, 0.5, 0.975)))
hazard <- (- apply(survProb, 2, diff, 1) ) / survProb[seq(2,dim(survProb)[1]),]
hazard.qu <- apply(hazard, 1, function(x) quantile(x, probs = c(0.025, 0.5, 0.975)))
save(survProb.qu, damage.qu, hazard.qu, file = file.path("..", "inst", "extdata", "vignetteGUTS-Proper-forecast.Rdata"))
load(system.file("extdata", "vignetteGUTS-Proper-forecast.Rdata",
package = "GUTS", mustWork = TRUE)
)
Analyse projections
The plots show median and 95%-CI over time of the (i) measured external concentration (red) and damage (black), (ii) survival probability and (iii) daily hazard.
par(mfrow = c(3,1), mar = c(0.5,4,0.5,0.5), oma = c(2.5,0,0,0), las = 1, cex = 1)
plot(guts_obj_forecast$Ct, guts_obj_forecast$C,
xlim = range(guts_obj_forecast$yt),
ylim = range(c(guts_obj_forecast$C, damage.qu)),
xlab = "", ylab = "exposure dose",
pch = 20, cex = 2, lwd = 2, col = "red",
type = "b", xaxt = "n"
)
damage.ti <- seq(0, max(guts_obj_forecast$yt),
length.out = dim(damage.qu)[2])
lines(damage.ti, damage.qu[2,], type = "l", ylim = range(damage.qu), xlab = "time", ylab = "damage D", lwd = 2)
lines(damage.ti, damage.qu[1,], lty = 2, lwd = 2)
lines(damage.ti, damage.qu[3,], lty = 2, lwd = 2)
legend("topright", legend = c("external", "proj. internal", " (damage)"), fill = c("red", "black", NA), border = c("red", "black", NA), cex = 0.8, bty = "n")
prob.ti <- seq(0, max(guts_obj_forecast$yt))
plot(prob.ti, survProb.qu[2,],
ylim = range(survProb.qu),
xlab = "", ylab = "proj. survival", xaxt = "n",
pch = 20, cex = 2)
arrows(prob.ti[-1], survProb.qu[1,-1], prob.ti[-1], survProb.qu[3,-1], angle = 90, code = 3, length = 0.1, lwd = 2)
plot(prob.ti[-1] - 0.5, hazard.qu[2,],
xlim = range(prob.ti), ylim = range(hazard.qu),
xlab = "", ylab = "proj. daily hazard", pch = 20, cex = 2,
col = "blue")
arrows(prob.ti[-1] - 0.5, hazard.qu[1,], prob.ti[-1] - 0.5, hazard.qu[3,], angle = 90, code = 3, length = 0.1, col = "blue", lwd = 2)
mtext(text = "time", side = 1, line = 1.4, outer = TRUE)
The time series demonstrates an accumulative effect: The second and third exposure pulse exert a higher hazard than the first exposure pulse due to accumulating damage.
Literature
Albert, C., Vogel, S., and Ashauer, R. (2016). Computationally efficient implementation of a novel algorithm for the General Unified Threshold Model of Survival (GUTS). PLOS Computational Biology, 12(6), e1004978. doi: 10.1371/journal.pcbi.1004978.
Jager, T., Albert, C., Preuss, T., and Ashauer, R. (2011). General Unified Threshold Model of Survival - a toxicokinetic toxicodynamic framework for ecotoxicology. Environmental Science & Technology, 45(7), 2529--2540, doi: 10.1021/es103092a.
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rm(list = ls()) do.calc <- FALSE # if TRUE, all calculations are conducted. if FALSE, calculations are omitted and the vignette output is built from pre-calculated data. do.save <- FALSE # if TRUE, calculation parts will be saved to disk. This works only correctly, if building from source. Therefore, if you are not building the vignette from source: do.save <- FALSE if (do.calc == FALSE) message("For performance reasons, this vignette builds from pre-calculated data.\n\n To run all calculations, set 'do.calc <- TRUE' in the vignette's first code chunk. \n Building the vignette will take a while.") knitr::opts_chunk$set( collapse = TRUE, comment = "#>", fig.align = "center", dev = "png", dpi=150, fig.height=7, fig.width=7, dev.args = list(), out.width = "90%" ) op <- par(no.readonly = TRUE)
Summary
The GUTS-package (Albert et al., 2016) implements the individual tolerance model GUTS-RED-IT, the stochastic death model GUTS-RED-SD and the GUTS-RED-proper model, which combines the GUTS-RED-IT and the GUTS-RED-SD model (Jager et al., 2011). We demonstrate a Bayesian model calibration of the proper model on the case study of the freshwater crustacean Gammarus pulex being exposed to Diazinon in three pulsed toxicity tests. This vignette follows the description in Albert et al. (2016), but uses a log-logistic threshold distribution, a slightly different calibration procedure and results analysis. The experiment data is provided with the GUTS-package.
Prepare
Load the GUTS-package
library(GUTS) packageVersion("GUTS")
Load the Diazinon data set
data(diazinon) str(diazinon)
Set up the guts object
Setting up a GUTS-Proper-object requires for each toxicity test
- the exposure profile containing the measured concentration
Cat each concentration measurement timeCt - the survival data consisting of the number of survived organisms
yat each abundance measurement timeyt - the GUTS-model type
model = "Proper" - the tolerance threshold distribution
dist = "loglogistic"
We generate three GUTS-proper-objects; one for each of the toxicity test. The GUTS-objects are collected in a list.
guts_object <- list( C1 = guts_setup( C = diazinon[["C1"]], Ct = diazinon[["Ct1"]], y = diazinon[["y1"]], yt = diazinon[["yt1"]], model = "Proper", dist = "loglogistic" ), C2 = guts_setup( C = diazinon[["C2"]], Ct = diazinon[["Ct2"]], y = diazinon[["y2"]], yt = diazinon[["yt2"]], model = "Proper", dist = "loglogistic" ), C3 = guts_setup( C = diazinon[["C3"]], Ct = diazinon[["Ct3"]], y = diazinon[["y3"]], yt = diazinon[["yt3"]], model = "Proper", dist = "loglogistic" ) )
Estimating parameters
library('adaptMCMC') # Function `MCMC()`, Monte Carlo Markov Chain.
Define joint log likelihood
The list of GUTS-objects is used to calculate the joint likelihood of all studies.
logposterior <- function( pars, guts_objects, isOutOfBoundsFun) { if ( isOutOfBoundsFun(pars) ) return(-Inf) return( sum(sapply( guts_objects, function(obj) guts_calc_loglikelihood(obj, pars) ))) }
Define constraints on parameter values
The logposterior function is formulated with a function that defines parameter bounds.
Constraints on parameters should consider
- hard boundaries:
is.infinite(p)constraints parameters to finite valuesp < 0confines rates and thresholds to positive values
- knowledge on numerical limitations:
p[3] > 30confines the killing rate to realistic values. The constraint avoids an unrealistic local optimum of the optimization problem, i.e. a high killing rate simulates the effect of a low tolerance threshold, and makes the threshold estimation obsolete.p[5] <= 1is assumed, to exclude that the mode of the log-logistic threshold distribution is 0, due to the shape parameter. Note that the mode can approach 0 if the estimated medianp[4]approaches 0. Therefore, this constraint stabilises estimation of low threshold values.exp(8/p[5]) * p[4] > 1e200avoids numerical problems when approximating the log-logistic function for unrealistically high median valuesp[4]and extremely low shape valuesp[5]that result in a threshold distribution confined at a zero threshold
- toxicological or ecological information: not used here
is_out_of_bounds_fun_Proper <- function(p) any( is.na(p), is.infinite(p), p < 0, p[3] > 30 , p[5] <= 1, exp(8/p[5]) * p[4] > 1e200 )
Guess suitable initial values
Suitable initial parameter values for the MCMC algorithm are searched by optimization.
pars_start_Proper <- c(0.05, 0.5, 1, 10, 5) names(pars_start_Proper) <- c("hb", "ke", "kk", "mn", "beta") # to avoid conflicts with boundaries of L-BFGS-B, the minimum logposteriror value is limited to -1e16 optim_fun <- function(pars, guts_objects, isOutOfBoundsFun) { return( max(-1e16,logposterior(pars, guts_objects, isOutOfBoundsFun) ) ) } optim_result_Proper <- optim(pars_start_Proper, optim_fun, lower = c(1e-6, 1e-6, 1e-6, 1e-6, 1e-6), upper = c(1, 1, 30, 40, 20), method = "L-BFGS-B", control = list(trace = 0, fnscale = -1), guts_objects = guts_object, isOutOfBoundsFun = is_out_of_bounds_fun_Proper)
save(optim_result_Proper, file = file.path("..", "inst", "extdata", "vignetteGUTS-Proper-initialValues.Rdata"))
load(system.file("extdata", "vignetteGUTS-Proper-initialValues.Rdata", package = "GUTS", mustWork = TRUE) )
if (optim_result_Proper$convergence != 0) { warning("Optimizing initial values has not converged. Using non-optimized initial values.") optim_result_Proper$par <- pars_start_Proper } print(optim_result_Proper)
Bayesian parameter estimation
mcmc_pars_Proper <- optim_result_Proper$par mcmc_sigma_Proper <- diag( (mcmc_pars_Proper/10)^2 + .Machine$double.eps ) mcmc_result_Proper <- MCMC(p = logposterior, init = mcmc_pars_Proper, scale = mcmc_sigma_Proper, adapt = 20000, acc.rate = 0.4, n = 150000, guts_objects = guts_object, isOutOfBoundsFun = is_out_of_bounds_fun_Proper ) #exclude burnin and thin by 20 mcmc_result_Proper$samples <- mcmc_result_Proper$samples[seq(50001, 150000, by = 20),] mcmc_result_Proper$log.p <- mcmc_result_Proper$log.p[seq(50001, 150000, by = 20)]
save(mcmc_result_Proper, file = file.path("..", "inst", "extdata", "vignetteGUTS-Proper-MCMCresults.Rdata"))
load(system.file("extdata", "vignetteGUTS-Proper-MCMCresults.Rdata", package = "GUTS", mustWork = TRUE) )
Show parameter estimation results
Chain and distribution plots.
The top four graphs show mixing and distribution of the parameters. The last row "LL" show mixing and distribution of the logposterior. A final plot indicates correlations among calibrated parameters.
if (all(is.finite(mcmc_result_Proper$log.p))) { par( mfrow = c(dim(mcmc_result_Proper$samples)[2] + 1, 2) , mar = c(5,4,1,0.5)) plot(as.mcmc(cbind(mcmc_result_Proper$samples, LL = mcmc_result_Proper$log.p)), auto.layout = FALSE) par(op) } else { par( mfrow = c(dim(mcmc_result_Proper$samples)[2], 2) , mar = c(5,4,1,0.5)) plot(as.mcmc(mcmc_result_Proper$samples), auto.layout = FALSE) par(op) } panel.cor <- function(x, y, ...) { par(usr = c(0, 1, 0, 1)) txt <- as.character(format(cor(x, y), digits=2)) text(0.5, 0.5, txt, cex = max(0.1, 4 * abs(cor(x, y)) + 1)) } pairs(mcmc_result_Proper$samples, upper.panel=panel.cor)
Estimated parameter values compared to the values.
This function summarizes the calibrated parameter values
eval_MCMC <- function(sampMCMC, plot = TRUE) { bestFit <- sampMCMC$samples[which.max(sampMCMC$log.p),] qu <- apply(sampMCMC$samples, 2, quantile, probs = c(0.025, 0.5, 0.975)) if (plot) { plot(seq(dim(sampMCMC$samples)[2]), bestFit, pch = 20, cex = 2, ylim = range(qu), xaxt = "n", xlab = "Model parameter", ylab = "Parameter value") arrows(x0 = seq(dim(sampMCMC$samples)[2]), y0 = qu[1,], y1 = qu[3,], angle = 90, length = 0.1, code = 3) axis(side = 1, at = seq(dim(sampMCMC$samples)[2]), dimnames(sampMCMC$samples)[[2]]) } res <- rbind(bestFit, qu) rownames(res)[1] <- "best" return(res) }
Summarize the parameter values. Black dots indicate best estimates and 95% credible interval.
eval_MCMC(mcmc_result_Proper)
Forecast
The GUTS-package can be applied to forecast survival. Forecasting is demonstrated for one made-up experimental setting.
Setup guts object and forecast
Values to be specified are:
- concentrations
C - concentration time points
Ct - forecast time points
yt: a vector starting with 0 - the initial number of individuals
y[1]in a vectoryof the same length asyt. Elements other thany[1]can be set arbitrarily. The values are ignored in forecasts.
We assume three pulsed applications exactly at time steps 0, 10 and 20. We assume that the substance would dissipate over time. Therefore, to monitor the dissipation, the concentration is measured at several time steps. The initial population size is set to 100 individuals. Projections are made for 26 time steps.
guts_obj_forecast <- guts_setup( C = c(60, 40, 6, 0, 0, 60, 40, 6, 0, 0, 60, 40, 6, 0), Ct = c(0, 2.2, 4, 6, 9.9, 10, 12.2, 14, 16, 19.9, 20, 22.2, 24, 26), y = c(100, rep(0,26)), yt = seq(0,26), model = "Proper", dist = "loglogistic", N = 1000, M = 10000 )
We forecast survival probabilities and damage over time for each dose concentration and each parameter set in the thinned posterior. This procedure takes into account the uncertainties in parameter estimates.
mcmc_forecasts_paras <- mcmc_result_Proper$samples forec <- apply(mcmc_forecasts_paras, 1, function(par) list( guts_calc_survivalprobs(gobj = guts_obj_forecast, par = par), guts_report_damage(gobj = guts_obj_forecast)$damage ) )
# extract the damage matrix damage <- sapply(forec, function(x) x[[2]]) survProb <- sapply(forec, function(x) x[[1]]) rm(forec) # analyse damage damage.qu <- apply(damage, 1, function(x) quantile(x, probs = c(0.025, 0.5, 0.975))) survProb.qu <- apply(survProb, 1, function(x) quantile(x, probs = c(0.025, 0.5, 0.975))) hazard <- (- apply(survProb, 2, diff, 1) ) / survProb[seq(2,dim(survProb)[1]),] hazard.qu <- apply(hazard, 1, function(x) quantile(x, probs = c(0.025, 0.5, 0.975)))
save(survProb.qu, damage.qu, hazard.qu, file = file.path("..", "inst", "extdata", "vignetteGUTS-Proper-forecast.Rdata"))
load(system.file("extdata", "vignetteGUTS-Proper-forecast.Rdata", package = "GUTS", mustWork = TRUE) )
Analyse projections
The plots show median and 95%-CI over time of the (i) measured external concentration (red) and damage (black), (ii) survival probability and (iii) daily hazard.
par(mfrow = c(3,1), mar = c(0.5,4,0.5,0.5), oma = c(2.5,0,0,0), las = 1, cex = 1) plot(guts_obj_forecast$Ct, guts_obj_forecast$C, xlim = range(guts_obj_forecast$yt), ylim = range(c(guts_obj_forecast$C, damage.qu)), xlab = "", ylab = "exposure dose", pch = 20, cex = 2, lwd = 2, col = "red", type = "b", xaxt = "n" ) damage.ti <- seq(0, max(guts_obj_forecast$yt), length.out = dim(damage.qu)[2]) lines(damage.ti, damage.qu[2,], type = "l", ylim = range(damage.qu), xlab = "time", ylab = "damage D", lwd = 2) lines(damage.ti, damage.qu[1,], lty = 2, lwd = 2) lines(damage.ti, damage.qu[3,], lty = 2, lwd = 2) legend("topright", legend = c("external", "proj. internal", " (damage)"), fill = c("red", "black", NA), border = c("red", "black", NA), cex = 0.8, bty = "n") prob.ti <- seq(0, max(guts_obj_forecast$yt)) plot(prob.ti, survProb.qu[2,], ylim = range(survProb.qu), xlab = "", ylab = "proj. survival", xaxt = "n", pch = 20, cex = 2) arrows(prob.ti[-1], survProb.qu[1,-1], prob.ti[-1], survProb.qu[3,-1], angle = 90, code = 3, length = 0.1, lwd = 2) plot(prob.ti[-1] - 0.5, hazard.qu[2,], xlim = range(prob.ti), ylim = range(hazard.qu), xlab = "", ylab = "proj. daily hazard", pch = 20, cex = 2, col = "blue") arrows(prob.ti[-1] - 0.5, hazard.qu[1,], prob.ti[-1] - 0.5, hazard.qu[3,], angle = 90, code = 3, length = 0.1, col = "blue", lwd = 2) mtext(text = "time", side = 1, line = 1.4, outer = TRUE)
The time series demonstrates an accumulative effect: The second and third exposure pulse exert a higher hazard than the first exposure pulse due to accumulating damage.
Literature
Albert, C., Vogel, S., and Ashauer, R. (2016). Computationally efficient implementation of a novel algorithm for the General Unified Threshold Model of Survival (GUTS). PLOS Computational Biology, 12(6), e1004978. doi: 10.1371/journal.pcbi.1004978.
Jager, T., Albert, C., Preuss, T., and Ashauer, R. (2011). General Unified Threshold Model of Survival - a toxicokinetic toxicodynamic framework for ecotoxicology. Environmental Science & Technology, 45(7), 2529--2540, doi: 10.1021/es103092a.
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