Deconvolution on pseudobulk RNA expression data
Let’s first load a small simulated pseudo-bulk PBMC expression
profiles using data from the Stephenson et al, where the hidden
cell-type specific expression profile is also known. We can obtain this
toy dataset with the following command
data_path <- "./"
if(!file.exists(file.path(data_path, "pbmc.rds"))){
download.file("https://github.com/cozygene/Unico/raw/main/vignettes/pbmc.rds", file.path(data_path,"pbmc.rds"))
}
sim.data = readRDS(file.path(data_path,"pbmc.rds"))
We use the Unico function to fit the Unico model. In
this simple simulation, we ignore covariates that could affect the
expression profile at cell-type level (C1) and tissue-level (C2). Once
we have all the necessary model parameters, we can ask Unico to
explicitly infer the hidden cell-types by genes by samples 3D tensor
with function tensor.
unico.res = list()
#parameter learning
unico.res$params.hat <- Unico(sim.data$X, sim.data$W, C1 = NULL, C2 = NULL, parallel = TRUE)
#tensor
unico.res$Z.hat = tensor(sim.data$X, W = sim.data$W, C1 = NULL, C2 = NULL,
unico.res$params.hat, parallel = FALSE)
To evaluate the performance of Unico, we now check per gene, at
cell-type resolution, what is the correlation between our inferred
tensor and the ground truth cell-type-level profiles across all samples.
We repeat this process for all genes.
# evaluate tensor performance on features with variation
unico.res$Z.corrs = calc_Z_corrs(Z.true = sim.data$Z.scale,
Z.hat = unico.res$Z.hat,
eval.feature.source = sim.data$variable.feature.source)
colMedians(unico.res$Z.corrs)
The median correlation (across all genes) for each of the cell types
are: 0.86, 0.77, 0.79, 0.58, 0.66 for CD4 T cells, NK cells, CD8 T
cells, Monocytes, B cells respectively.
To visualize the result, we randomly pick a gene (in the top 25% low
entropy quantile) and visualize the estimated and the ground truth
expression level at an arbitrary cell type (e.g. third most
abundant)
low.gene = sample(rownames(sim.data$params$entropies[sim.data$params$entropies < quantile(sim.data$params$entropies, 0.25), ,drop= F]), 1)
plot(sim.data$Z[3,low.gene, ], unico.res$Z.hat[3,low.gene, ]) + title (low.gene)
Cell-type level differential methylation analysis
Unico also offers association testing at cell-type resolution. Let’s
look at two publicly available bulk methylation datasets collected on
whole blood. Instead of looking at close to 450k CpG sites genmone-wide,
in this tutorial, we have selected a subset of just 3000 arbitrary CpG
sites spread across the autosomes. In addition, we collected covariates
reported by the original author and computed 20 components that are
expected to capture technical variation in the data. These components
were constructed by calculating the first 20 principal components from a
set of 10,000 control probes that are not expected to capture biological
variation but only technical variability in an approach similar to the
one suggested by Lehne et al. Since we did not use the raw IDAT files,
we considered 10,000 sites with the lowest variance in the data as
control probes. You can obtain a pre-processed version with the
following command.
data_path <- "./"
if(!file.exists(file.path(data_path, "liu.rds"))){
download.file("https://github.com/cozygene/Unico/raw/main/vignettes/liu.rds", file.path(data_path,"liu.rds"))
}
if(!file.exists(file.path(data_path, "hannum.rds"))){
download.file("https://github.com/cozygene/Unico/raw/main/vignettes/hannum.rds", file.path(data_path,"hannum.rds"))
}
liu = readRDS(file.path(data_path,"liu.rds"))
hannum = readRDS(file.path(data_path,"hannum.rds"))
We similarly use the Unico function to fit the model on
Liu et al.’s data. Unlike in the gene expression simulation, we provide
additional covariates that could affect the observed methylation
profile. Specifically, we set cell-type level covariates C1
to age, sex, disease status and smoking status, and tissue-level
covariates C2 to technical variation components. Once we have all the
necessary model parameters, we can ask Unico to perform parametric
association testing under the assumption that methylation levels are
normally distributed.
source.ids = colnames(liu$W)
n = ncol(liu$X)
m = nrow(liu$X)
k = ncol(liu$W)
unico.liu = list()
unico.liu$params.hat = Unico(X = liu$X, W = liu$W,
C1 = liu$cov[, c("age", "sex", "disease","smoking")],
C2 = liu$ctrl_pcs)
unico.liu$params.hat = association_parametric(X = liu$X, unico.liu$params.hat)
Now, perform similar model fitting and association testing on an
independent data set (Hannum et.al.).
unico.hannum = list()
unico.hannum$params.hat = Unico(X = hannum$X, W = hannum$W,
C1 = hannum$cov[, c("age", "sex", "ethnicity")],
C2 = cbind(hannum$ctrl_pcs, hannum$cov[,"plate", drop = F]))
unico.hannum$params.hat = association_parametric(X = hannum$X, unico.hannum$params.hat)
Unico reports both the marginal test (T-test) on the effect size of
each covariate at cell type resolution as well as a joint test (partial
F-test) that evaluates the joint effects of each of the covariate on the
mixture profile. Let’s first look at the reported marginal association
testing results:
liu.marg.pvals = unico.liu$params.hat$parametric$gammas_hat_pvals[, paste0(source.ids, ".age")]
hannum.marg.pvals = unico.hannum$params.hat$parametric$gammas_hat_pvals[, paste0(source.ids, ".age")]
print(sum(liu.marg.pvals < 0.05/(m*k)))
print(hannum.marg.pvals[liu.marg.pvals < 0.05/(m*k)])
Using Liu et al.’s data as discovery, we have 4 CpG-cell-type pairs
crossing the Bonferroni adjustment (on both number of CpG sites and
number of cell types under test). All of which are replicated in our
validation data set (Hannum et al.).
qq_age_g = plot_qq(pvals_mat = liu.marg.pvals,
labels = source.ids,
ggarrange.nrow = 1, ggarrange.ncol = k,
alpha = 0.5, text.size = 20,
title = "Parametric association testing (age) at cell-type resolution")
qq_age_g
We now check the reported joint association testing results:
liu.joint.pvals = unico.liu$params.hat$parametric$gammas_hat_pvals.joint[, "age"]
hannum.joint.pvals = unico.hannum$params.hat$parametric$gammas_hat_pvals.joint[, "age"]
print(sum(liu.joint.pvals < 0.05/m))
print(sum(hannum.joint.pvals[liu.joint.pvals < 0.05/m] < (0.05/sum(liu.joint.pvals < 0.05/m))))
Using Liu et al.’s data as discovery, and Hannum et al.’s data as
validation set. We have 159 out of 206 discovery replicated.
Calibration of asymptotically-derived p-values under null
To evaluate whether Unico’s asymptotically-derived p-values are well
calibrated under the null, we can shuffle the covariates of interest,
refit the model and ask for cell-type level association in this permuted
data set. We will use age as our running example. Since we now
arbitrarily assigned age to each sample, irrespective to his or her true
biological age, it is expected that his or her methylation profile
reflects no signal with respect to our assigned age, and thus we should
obtain close to 0 detection.
C1.shuffle = hannum$cov[, c("age", "sex", "ethnicity")]
C1.shuffle[, "age"] = hannum$cov[sample(1:nrow(hannum$cov)), "age"]
unico.hannum.shuffle = list()
unico.hannum.shuffle$params.hat = Unico(X = hannum$X, W = hannum$W,
C1 = C1.shuffle,
C2 = cbind(hannum$ctrl_pcs, hannum$cov[,"plate", drop = F]))
unico.hannum.shuffle$params.hat = association_asymptotic(X = hannum$X, unico.hannum.shuffle$params.hat)
unico.marg.pvals.asym.calib = unico.hannum.shuffle$params.hat$asymptotic$gammas_hat_pvals[, paste0(source.ids, ".age")]
Indeed, under the null, we see the quantile-quantile plots fall along
the diagonal
qq_calib_g = plot_qq(pvals_mat = unico.marg.pvals.asym.calib,
labels = source.ids,
ggarrange.nrow = 1, ggarrange.ncol = k,
alpha = 0.5, text.size = 20,
title = "Calibration of asymptotic association testing")
qq_calib_g
