I'm working on a binomial mixture model using OpenBUGS and R package R2OpenBUGS. I've successfully built simpler models, but once I add another level for imperfect detection, I consistently receive the error variable X is not defined in model or in data set. I've tried a number of different things, including changing the structure of my data and entering my data directly into OpenBUGS. I'm posting this in the hope that someone else has experience with this error, and perhaps knows why OpenBUGS is not recognizing variable X even though it is clearly defined as far as I can tell.
I've also gotten the error expected the collection operator c error pos 8 - this is not an error I've been getting previously, but I am similarly stumped.
Both the model and the data-simulation function come from Kery's Introduction to WinBUGS for Ecologists (2010). I will note that the data set here is in lieu of my own data, which is similar.
I am including the function to build the dataset as well as the model. Apologies for the length.
# Simulate data: 200 sites, 3 sampling rounds, 3 factors of the level 'trt',
# and continuous covariate 'X'
data.fn <- function(nsite = 180, nrep = 3, xmin = -1, xmax = 1, alpha.vec = c(0.01,0.2,0.4,1.1,0.01,0.2), beta0 = 1, beta1 = -1, ntrt = 3){
y <- array(dim = c(nsite, nrep)) # Array for counts
X <- sort(runif(n = nsite, min = xmin, max = xmax)) # covariate values, sorted
# Relationship expected abundance - covariate
x2 <- rep(1:ntrt, rep(60, ntrt)) # Indicator for population
trt <- factor(x2, labels = c("CT", "CM", "CC"))
Xmat <- model.matrix(~ trt*X)
lin.pred <- Xmat[,] %*% alpha.vec # Value of lin.predictor
lam <- exp(lin.pred)
# Add Poisson noise: draw N from Poisson(lambda)
N <- rpois(n = nsite, lambda = lam)
table(N) # Distribution of abundances across sites
sum(N > 0) / nsite # Empirical occupancy
totalN <- sum(N) ; totalN
# Observation process
# Relationship detection prob - covariate
p <- plogis(beta0 + beta1 * X)
# Make a 'census' (i.e., go out and count things)
for (i in 1:nrep){
y[,i] <- rbinom(n = nsite, size = N, prob = p)
}
# Return stuff
return(list(nsite = nsite, nrep = nrep, ntrt = ntrt, X = X, alpha.vec = alpha.vec, beta0 = beta0, beta1 = beta1, lam = lam, N = N, totalN = totalN, p = p, y = y, trt = trt))
}
data <- data.fn()
And here is the model:
sink("nmix1.txt")
cat("
model {
# Priors
for (i in 1:3){ # 3 treatment levels (factor)
alpha0[i] ~ dnorm(0, 0.01)
alpha1[i] ~ dnorm(0, 0.01)
}
beta0 ~ dnorm(0, 0.01)
beta1 ~ dnorm(0, 0.01)
# Likelihood
for (i in 1:180) { # 180 sites
C[i] ~ dpois(lambda[i])
log(lambda[i]) <- log.lambda[i]
log.lambda[i] <- alpha0[trt[i]] + alpha1[trt[i]]*X[i]
for (j in 1:3){ # each site sampled 3 times
y[i,j] ~ dbin(p[i,j], C[i])
lp[i,j] <- beta0 + beta1*X[i]
p[i,j] <- exp(lp[i,j])/(1+exp(lp[i,j]))
}
}
# Derived quantities
}
",fill=TRUE)
sink()
# Bundle data
trt <- data$trt
y <- data$y
X <- data$X
ntrt <- 3
# Standardise covariates
s.X <- (X - mean(X))/sd(X)
win.data <- list(C = y, trt = as.numeric(trt), X = s.X)
# Inits function
inits <- function(){ list(alpha0 = rnorm(ntrt, 0, 2),
alpha1 = rnorm(ntrt, 0, 2),
beta0 = rnorm(1,0,2), beta1 = rnorm(1,0,2))}
# Parameters to estimate
parameters <- c("alpha0", "alpha1", "beta0", "beta1")
# MCMC settings
ni <- 1200
nb <- 200
nt <- 2
nc <- 3
# Start Markov chains
out <- bugs(data = win.data, inits, parameters, "nmix1.txt", n.thin=nt,
n.chains=nc, n.burnin=nb, n.iter=ni, debug = TRUE)
