Long-term Individual discrepancy
The long-term individual discrepancy for the \(k\)th model is \[\begin{equation*}
\mathbf{\gamma}_k\sim{}N(0,C_{\gamma})
\end{equation*}\] with \[\begin{equation*}
C_{\gamma} = \Pi_{\gamma} P_{\gamma} \Pi_{\gamma},
\end{equation*}\] where \(P_{\gamma}\) is a correlation matrix and
\(\Pi_{\gamma}=\text{diag}(\pi_{\gamma,1},\ldots,\pi_{\gamma,4})\).
We put a uniform distribution on all correlation matrices, \[\begin{equation*}
P_{\gamma} \sim{}LKJ(1),
\end{equation*}\] and \[\begin{equation*}
\pi_{\gamma,i}^2 \sim{}\text{gamma}(1,1).
\end{equation*}\] This prior gives more weight around zero but
has an expectation of 1.
xs <- seq(0,5,0.001)
plot(xs,dgamma(xs,1,1),xlab=expression(pi[gamma,i]^2),ylab="density",type="l")
The difference between two simulators, \[\begin{equation*}
\gamma_{k,i} - \gamma_{l,i} \sim{}N(0,2\pi_{\gamma,i}^2),
\end{equation*}\] for \(k\neq{}l\). The standard deviation of the
difference of two models is
pis <- rgamma(1e5,1,1)
plot(density(sqrt(2 * pis)),xlab="Standard deviation",ylab="Density",main="")
and the distribution of the absolute difference is
xs <- seq(0,5,length.out=1000)
plot(xs,2*colMeans(sapply(xs, function(x){dnorm(x,0,sqrt(2*pis))})),
type="l",axes=T,ylab="density",xlab="Difference of two models")
We do not expect the models to differ by much than one order of
magnitude and therefore we used this prior.
Short-term Individual discrepancy
The short-term individual discrepancy for the \(k\)th model follows an auto-regressive
process, \[\begin{equation*}
\mathbf{z}_{k}^{(t)}\sim{}N(R_{k}\mathbf{z}_{k}^{(t-1)},\Lambda_{k})
\end{equation*}\] with \(R_{k}=\text{diag}(r_{k,1},\ldots,r_{k,4})\)
\[\begin{equation*}
\Lambda_{k} = \Pi_{k} P_{k} \Pi_{k},
\end{equation*}\] where \(P_{k}\) is a correlation matrix and \(\Pi_{k}=\text{diag}(\pi_{k,1},\ldots,\pi_{k,4})\).
The distribution was \[\begin{equation}
f(P_k | \alpha, \beta) \propto \begin{cases}
\prod_{i = 1}^{N-1}\prod_{j = i+ 1}^{N}
\frac{1}{\mathrm{B}(\alpha_{\rho,i,j}, \beta_{\rho,i, j})}
s(P_{k,i,j})^{\alpha_{\rho,i, j} - 1}\left(1-s(P_{k,i,
j})\right)^{\beta_{\rho,i, j} - 1}&\text{if }P\text{ is positive
definite}\\
0 &\text{otherwise}.
\end{cases}
\end{equation}\] with \[\begin{equation}
s(\rho)=\frac{\rho+1}{2},
\end{equation}\] and hyperpriors \[\begin{equation}
\alpha_{\rho,i,j}\sim{}\text{gamma}(0.1,0.1)
\end{equation}\] and \[\begin{equation}
\beta_{\rho,i,j}\sim{}\text{gamma}(0.1,0.1).
\end{equation}\] Sampling from this prior
cor_pri_st <- stan_model(model_code = " functions{
real priors_cor_hierarchical_beta(matrix ind_st_cor, int N, matrix M){
real log_prior = 0;
for (i in 1:(N-1)){
for (j in (i+1):N){
log_prior += beta_lpdf(0.5*(ind_st_cor[i, j] + 1)| M[i, j], M[j, i] );
}
}
return log_prior;
}
}
data {
vector[4] cor_p;
}
parameters {
matrix <lower=0>[5,5] beta_pars;
corr_matrix[5] rho[4];
}
model {
for (i in 1:4){
for (j in (i+1):5){
beta_pars[i,j] ~ gamma(cor_p[1],cor_p[2]);
beta_pars[j,i] ~ gamma(cor_p[3],cor_p[4]);
}
}
for(i in 1:4){
target += priors_cor_hierarchical_beta(rho[i],5,beta_pars);
diagonal(beta_pars) ~ std_normal();
}
}
")
fit_cor <- sampling(cor_pri_st,data=list(cor_p=0.1 * c(1,1,1,1)),chains=4)
ex.fit <- extract(fit_cor)
def.par <- par(no.readonly=TRUE) #Old pars to reset afterwards
par(mfrow=c(2,2))
plot(density(ex.fit$beta_pars[,1,2]),xlab=expression(alpha[rho]),main="")
plot(density(log(ex.fit$beta_pars[,1,2]/ex.fit$beta_pars[,2,1])),main="",
xlab="Expected log odds")
plot(density(ex.fit$rho[,1,1,2]),xlab=expression(rho),main="")
xs <- seq(-1,1,length.out=100)
lines(xs,dbeta((xs+1)/2,2,2)/2,col="red")
plot(density(apply(ex.fit$rho[,,1,2],1,var)),xlim=c(0,0.35),main="",
xlab=expression(var(rho)))
par(def.par)
The above plot shows the different aspects of the emergent
distribution of this prior. The top left plot shows the marginal
distribution of parameter of the beta distribution with the top right
shows the log odds of the expectation of the beta distribution. The
bottom left plot shows the marginal distribution of \(\rho_{k,i,i}\), with the red curve being
the distribution that gives a uniform distribution over all correlation
matrices. We gave slightly more weight to correlation matrices that are
less correlated. The bottom right plot shows the variance of \(\rho_{k,i,i}\) over \(k\). The variance of a uniform distribution
between -1 and 1 is \(1/3\) and the
variance of the marginal distribution of uniform correlation parameters
is \(1/5\). We allowed the prior to be
fairly uninformative over this space, as we were unsure how \(\rho_{k,i,i}\) and \(\rho_{l,i,i}\) related to one another,
however, we do believe they may be similar and therefore we increased
our beliefs around 0.
The \(i\)th diagonal element of
\(\Pi_k\), \(\pi_{k,i}\), was \[\begin{equation}
\ln(\pi_{k,i}^2)\sim{}N(\mu_{\pi,i},\sigma_{\pi,i}^2),
\end{equation}\] with zeros on the off diagonals. The hyperpriors
were \[\begin{equation}
\mu_{\pi,i}\sim{}N(-3,1^2)
\end{equation}\] and \[\begin{equation}
\sigma_{\pi,i}^2\sim{}\text{inv-gamma}(8,4).
\end{equation}\] Sampling from this leads to
st_mod1 <- stan_model(model_code = "data {
vector[4] gam_p;
}
parameters {
vector [5] log_sha_st_var[4];
vector[5] gamma_mean;
vector<lower=0> [5] gamma_var;
}
model {
gamma_mean ~ normal(gam_p[1],gam_p[2]);
gamma_var ~ inv_gamma(gam_p[3],gam_p[4]);
for (i in 1:4){
log_sha_st_var[i] ~ normal(gamma_mean,sqrt(gamma_var));
}
}
generated quantities{
vector[5] sha_st_var[4];
for (i in 1:4){
sha_st_var[i] = exp(log_sha_st_var[i]);
}
}
")
test.fit_norm <- sampling(st_mod1,data=list(gam_p=c(-3,1,8,4)),chains=4)
ex.fit <- extract(test.fit_norm)
def.par <- par(no.readonly=TRUE) #old pars
par(mfrow=c(2,2))
plot(density(ex.fit$gamma_mean[,1]),main="",xlab=expression(mu[pi]))
plot(density(ex.fit$gamma_var[,1]),xlim=c(0,1),main="",xlab=expression(sigma[pi]^2))
plot(density(ex.fit$sha_st_var[,1,1]),xlim=c(0,1),main="",xlab=expression(pi["k,i"]^2))
plot(density(apply(ex.fit$sha_st_var[,,1],1,var)),xlim=c(0,0.2),
xlab=expression(var(pi["k,i"]^2)) ,main="")
par(def.par)
The top left plot shows the marginal distribution of \(\mu_{\pi,i}\) and the top right plot being
\(\sigma^2_{\pi,i}\). The bottom left
plot shows the prior distribution of \(pi_{k,i}^2\). For the same reason that
describes the variance of the random walk on the truth, we felt that
\(\sigma^2_{\pi,i}\) should not be
larger than 0.2. For a similar reason to the correlation parameters, the
variance of \(\sigma^2_{\pi,i}\) will
also be small.
For the auto regressive parameter, \(r_{k,i}\), we set a boundary avoiding prior
\[\begin{equation*}
\frac{r_{k,i} + 1}{2} \sim{}\text{beta}(2,2).
\end{equation*}\]
hist(rbeta(1e5,2,2)*2 - 1,probability = T,xlab=expression(r["k,i"]),main="")
