Contents

1 Introduction

The missMethyl package contains functions to analyse methylation data from Illumina’s HumanMethylation450 and MethylationEPIC beadchip. These arrays are a cost-effective alternative to whole genome bisulphite sequencing, and as such are widely used to profile DNA methylation. Specifically, missMethyl contains functions to perform SWAN normalisation (Maksimovic, Gordon, and Oshlack 2012),perform differential methylation analysis using RUVm (Maksimovic et al. 2015), differential variability analysis (Phipson and Oshlack 2014) and gene set enrichment analysis (Phipson, Maksimovic, and Oshlack 2016). As our lab’s research into specialised analyses of these arrays continues we anticipate that the package will be updated with new functions.

Raw data files are in IDAT format, which can be read into R using the minfi package (Aryee et al. 2014). Statistical analyses are usually performed on M-values, and \(\beta\) values are used for visualisation, both of which can be extracted from MethylSet data objects, which is a class of object created by minfi. For detecting differentially variable CpGs we recommend that the analysis is performed on M-values. All analyses described here are performed at the CpG site level.

2 Reading data into R

We will use the data in the minfiData package to demonstrate the functions in missMethyl. The example dataset has 6 samples across two slides. There are 3 cancer samples and 3 normal sample. The sample information is in the targets file. An essential column in the targets file is the Basename column which tells us where the idat files to be read in are located. The R commands to read in the data are taken from the minfi User’s Guide. For additional details on how to read the IDAT files into R, as well as information regarding quality control please refer to the minfi User’s Guide.

library(missMethyl)
library(limma)
library(minfi)
library(minfiData)
baseDir <- system.file("extdata", package = "minfiData")
targets <- read.metharray.sheet(baseDir)
## [1] "/home/biocbuild/bbs-3.15-bioc/R/library/minfiData/extdata/SampleSheet.csv"
targets[,1:9]
##   Sample_Name Sample_Well Sample_Plate Sample_Group Pool_ID person age sex
## 1    GroupA_3          H5         <NA>       GroupA    <NA>    id3  83   M
## 2    GroupA_2          D5         <NA>       GroupA    <NA>    id2  58   F
## 3    GroupB_3          C6         <NA>       GroupB    <NA>    id3  83   M
## 4    GroupB_1          F7         <NA>       GroupB    <NA>    id1  75   F
## 5    GroupA_1          G7         <NA>       GroupA    <NA>    id1  75   F
## 6    GroupB_2          H7         <NA>       GroupB    <NA>    id2  58   F
##   status
## 1 normal
## 2 normal
## 3 cancer
## 4 cancer
## 5 normal
## 6 cancer
targets[,10:12]
##    Array      Slide
## 1 R02C02 5723646052
## 2 R04C01 5723646052
## 3 R05C02 5723646052
## 4 R04C02 5723646053
## 5 R05C02 5723646053
## 6 R06C02 5723646053
##                                                                                 Basename
## 1 /home/biocbuild/bbs-3.15-bioc/R/library/minfiData/extdata/5723646052/5723646052_R02C02
## 2 /home/biocbuild/bbs-3.15-bioc/R/library/minfiData/extdata/5723646052/5723646052_R04C01
## 3 /home/biocbuild/bbs-3.15-bioc/R/library/minfiData/extdata/5723646052/5723646052_R05C02
## 4 /home/biocbuild/bbs-3.15-bioc/R/library/minfiData/extdata/5723646053/5723646053_R04C02
## 5 /home/biocbuild/bbs-3.15-bioc/R/library/minfiData/extdata/5723646053/5723646053_R05C02
## 6 /home/biocbuild/bbs-3.15-bioc/R/library/minfiData/extdata/5723646053/5723646053_R06C02
rgSet <- read.metharray.exp(targets = targets)
## Warning in readChar(con, nchars = n): truncating string with embedded nuls

## Warning in readChar(con, nchars = n): truncating string with embedded nuls

## Warning in readChar(con, nchars = n): truncating string with embedded nuls

## Warning in readChar(con, nchars = n): truncating string with embedded nuls

## Warning in readChar(con, nchars = n): truncating string with embedded nuls

## Warning in readChar(con, nchars = n): truncating string with embedded nuls

## Warning in readChar(con, nchars = n): truncating string with embedded nuls

## Warning in readChar(con, nchars = n): truncating string with embedded nuls

## Warning in readChar(con, nchars = n): truncating string with embedded nuls

## Warning in readChar(con, nchars = n): truncating string with embedded nuls

## Warning in readChar(con, nchars = n): truncating string with embedded nuls

## Warning in readChar(con, nchars = n): truncating string with embedded nuls

The data is now an RGChannelSet object and needs to be normalised and converted to a MethylSet object.

3 Subset-quantile within array normalization (SWAN)

SWAN (subset-quantile within array normalization) is a within-array normalization method for Illumina 450k & EPIC BeadChips. Technical differencs have been demonstrated to exist between the Infinium I and Infinium II assays on a single Illumina HumanMethylation array (Bibikova et al. 2011, @Dedeurwaerder2011). Using the SWAN method substantially reduces the technical variability between the assay designs whilst maintaining important biological differences. The SWAN method makes the assumption that the number of CpGs within the 50bp probe sequence reflects the underlying biology of the region being interrogated. Hence, the overall distribution of intensities of probes with the same number of CpGs in the probe body should be the same regardless of assay type. The method then uses a subset quantile normalization approach to adjust the intensities of each array (Maksimovic, Gordon, and Oshlack 2012).

SWAN can take a MethylSet, RGChannelSet or MethyLumiSet as input. It should be noted that, in order to create the normalization subset, SWAN randomly selects Infinium I and II probes that have one, two and three underlying CpGs; as such, we recommend using set.seed before to ensure that the normalized intensities will be identical, if the normalization is repeated.

The technical differences between Infinium I and II assay designs can result in aberrant \(\beta\) value distributions (Figure 1, panel “Raw”). Using SWAN corrects for the technical differences between the Infinium I and II assay designs and produces a smoother overall \(\beta\) value distribution (Figure 1, panel “SWAN”).

mSet <- preprocessRaw(rgSet)
mSetSw <- SWAN(mSet,verbose=TRUE)
## [SWAN] Preparing normalization subset
## 450k
## [SWAN] Normalizing methylated channel
## [SWAN] Normalizing array 1 of 6
## [SWAN] Normalizing array 2 of 6
## [SWAN] Normalizing array 3 of 6
## [SWAN] Normalizing array 4 of 6
## [SWAN] Normalizing array 5 of 6
## [SWAN] Normalizing array 6 of 6
## [SWAN] Normalizing unmethylated channel
## [SWAN] Normalizing array 1 of 6
## [SWAN] Normalizing array 2 of 6
## [SWAN] Normalizing array 3 of 6
## [SWAN] Normalizing array 4 of 6
## [SWAN] Normalizing array 5 of 6
## [SWAN] Normalizing array 6 of 6
par(mfrow=c(1,2), cex=1.25)
densityByProbeType(mSet[,1], main = "Raw")
densityByProbeType(mSetSw[,1], main = "SWAN")
Beta value dustributions. Density distributions of beta values before and after using SWAN.

Figure 1: Beta value dustributions
Density distributions of beta values before and after using SWAN.

4 Filter out poor quality probes

Poor quality probes can be filtered out based on the detection p-value. For this example, to retain a CpG for further analysis, we require that the detection p-value is less than 0.01 in all samples.

detP <- detectionP(rgSet)
keep <- rowSums(detP < 0.01) == ncol(rgSet)
mSetSw <- mSetSw[keep,]

5 Extracting \(\beta\) and M-values

Now that the data has been SWAN normalised we can extract \(\beta\) and M-values from the object. We prefer to add an offset to the methylated and unmethylated intensities when calculating M-values, hence we extract the methylated and unmethylated channels separately and perform our own calculation. For all subsequent analyses we use a random selection of 20000 CpGs to reduce computation time.

set.seed(10)
mset_reduced <- mSetSw[sample(1:nrow(mSetSw), 20000),]
meth <- getMeth(mset_reduced)
unmeth <- getUnmeth(mset_reduced)
Mval <- log2((meth + 100)/(unmeth + 100))
beta <- getBeta(mset_reduced)
dim(Mval)
## [1] 20000     6
par(mfrow=c(1,1))
plotMDS(Mval, labels=targets$Sample_Name, col=as.integer(factor(targets$status)))
legend("topleft",legend=c("Cancer","Normal"),pch=16,cex=1.2,col=1:2)
MDS plot. A multi-dimensional scaling (MDS) plot of cancer and normal samples.

Figure 2: MDS plot
A multi-dimensional scaling (MDS) plot of cancer and normal samples.

An MDS plot (Figure 2) is a good sanity check to make sure samples cluster together according to the main factor of interest, in this case, cancer and normal.

6 Testing for differential methylation using limma

To test for differential methylation we use the limma package (Smyth 2005), which employs an empirical Bayes framework based on Guassian model theory. First we need to set up the design matrix. There are a number of ways to do this, the most straightforward is directly from the targets file. There are a number of variables, with the status column indicating cancer/normal samples. From the person column of the targets file, we see that the cancer/normal samples are matched, with 3 individuals each contributing both a cancer and normal sample. Since the limma model framework can handle any experimental design which can be summarised by a design matrix, we can take into account the paired nature of the data in the analysis. For more complicated experimental designs, please refer to the limma User’s Guide.

group <- factor(targets$status,levels=c("normal","cancer"))
id <- factor(targets$person)
design <- model.matrix(~id + group)
design
##   (Intercept) idid2 idid3 groupcancer
## 1           1     0     1           0
## 2           1     1     0           0
## 3           1     0     1           1
## 4           1     0     0           1
## 5           1     0     0           0
## 6           1     1     0           1
## attr(,"assign")
## [1] 0 1 1 2
## attr(,"contrasts")
## attr(,"contrasts")$id
## [1] "contr.treatment"
## 
## attr(,"contrasts")$group
## [1] "contr.treatment"

Now we can test for differential methylation using the lmFit and eBayes functions from limma. As input data we use the matrix of M-values.

fit.reduced <- lmFit(Mval,design)
fit.reduced <- eBayes(fit.reduced, robust=TRUE)

The numbers of hyper-methylated (1) and hypo-methylated (-1) can be displayed using the decideTests function in limma and the top 10 differentially methylated CpGs for cancer versus normal extracted using topTable.

summary(decideTests(fit.reduced))
##        (Intercept) idid2 idid3 groupcancer
## Down          6967     0   117         589
## NotSig        3348 20000 19878       18938
## Up            9685     0     5         473
top<-topTable(fit.reduced,coef=4)
top
##               logFC    AveExpr        t      P.Value  adj.P.Val        B
## cg16969623 4.742565 -1.3204047 18.31931 5.103885e-06 0.02964104 4.436929
## cg24115221 4.254567 -0.4385152 16.35067 9.270086e-06 0.02964104 4.045795
## cg13692446 4.352444  0.2914579 15.64897 1.166356e-05 0.02964104 3.885023
## cg11334818 4.034745  0.9316454 15.33152 1.298319e-05 0.02964104 3.808085
## cg10341556 4.983097 -1.5837089 15.39833 1.376711e-05 0.02964104 3.753400
## cg17815252 3.688425 -2.3665568 14.67515 1.631705e-05 0.02964104 3.640037
## cg24331301 3.840967 -1.4279686 14.46660 1.758216e-05 0.02964104 3.583971
## cg26976732 3.840728 -0.9378972 14.38568 1.810412e-05 0.02964104 3.561851
## cg26328335 3.725002  0.3428019 14.18624 1.947077e-05 0.02964104 3.506453
## cg22196952 4.129116 -2.2957234 13.99646 2.104425e-05 0.02964104 3.445952

Note that since we performed our analysis on M-values, the logFC and AveExpr columns are computed on the M-value scale. For interpretability and visualisation we can look at the \(\beta\) values. The \(\beta\) values for the top 4 differentially methylated CpGs shown in Figure 3.

cpgs <- rownames(top)
par(mfrow=c(2,2))
for(i in 1:4){
stripchart(beta[rownames(beta)==cpgs[i],]~design[,4],method="jitter",
group.names=c("Normal","Cancer"),pch=16,cex=1.5,col=c(4,2),ylab="Beta values",
vertical=TRUE,cex.axis=1.5,cex.lab=1.5)
title(cpgs[i],cex.main=1.5)
}
Top DM CpGs. The beta values for the top 4 differentially methylated CpGs.

Figure 3: Top DM CpGs
The beta values for the top 4 differentially methylated CpGs.

7 Removing unwanted variation when testing for differential methylation

Like other platforms, 450k array studies are subject to unwanted technical variation such as batch effects and other, often unknown, sources of variation. The adverse effects of unwanted variation have been extensively documented in gene expression array studies and have been shown to be able to both reduce power to detect true differences and to increase the number of false discoveries. As such, when it is apparent that data is significantly affected by unwanted variation, it is advisable to perform an adjustment to mitigate its effects.

missMethyl provides a limma inspired interface to functions from the CRAN package ruv, which enable the removal of unwanted variation when performing a differential methylation analysis (Maksimovic et al. 2015).

RUVfit uses the RUV-inverse method by default, as this does not require the user to specify a \(k\) parameter. The ridged version of RUV-inverse is also available by setting method = rinv. The RUV-2 and RUV-4 functions can also be used by setting method = ruv2 or method = ruv4, respectively, and specifying an appropriate value for k (number of components of unwanted variation to remove) where \(0 \leq k < no. samples\).

All of the methods rely on negative control features to accurately estimate the components of unwanted variation. Negative control features are probes/genes/etc. that are known a priori to not truly be associated with the biological factor of interest, but are affected by unwanted variation. For example, in a microarray gene expression study, these could be house-keeping genes or a set of spike-in controls. Negative control features are extensively discussed in Gagnon-Bartsch and Speed (2012) and Gagnon-Bartsch et al. (2013). Once the unwanted factors are accurately estimated from the data, they are adjusted for in the linear model that describes the differential analysis.

If the negative control features are not known a priori, they can be identified empirically. This can be achieved via a 2-stage approach, RUVm. Stage 1 involves performing a differential methylation analysis using RUV-inverse (by default) and the 613 Illumina negative controls (INCs) as negative control features. This will produce a list of CpGs ranked by p-value according to their level of association with the factor of interest. This list can then be used to identify a set of empirical control probes (ECPs), which will capture more of the unwanted variation than using the INCs alone. ECPs are selected by designating a proportion of the CpGs least associated with the factor of interest as negative control features; this can be done based on either an FDR cut-off or by taking a fixed percentage of probes from the bottom of the ranked list. Stage 2 involves performing a second differential methylation analysis on the original data using RUV-inverse (by default) and the ECPs. For simplicity, we are ignoring the paired nature of the cancer and normal samples in this example.

# get M-values for ALL probes
meth <- getMeth(mSet)
unmeth <- getUnmeth(mSet)
M <- log2((meth + 100)/(unmeth + 100))
# setup the factor of interest
grp <- factor(targets$status, labels=c(0,1))
# extract Illumina negative control data
INCs <- getINCs(rgSet)
head(INCs)
##          5723646052_R02C02 5723646052_R04C01 5723646052_R05C02
## 13792480        -0.3299654        -1.0955482        -0.5266103
## 69649505        -1.0354488        -1.4943396        -1.0067050
## 34772371        -1.1286422        -0.2995603        -0.8192636
## 28715352        -0.5553373        -0.7599489        -0.7186973
## 74737439        -1.1169178        -0.8656399        -0.6429681
## 33730459        -0.7714684        -0.5622424        -0.7724825
##          5723646053_R04C02 5723646053_R05C02 5723646053_R06C02
## 13792480        -0.6374299         -1.116598        -0.4332793
## 69649505        -0.8854881         -1.586679        -0.9217329
## 34772371        -0.6895514         -1.161155        -0.6186795
## 28715352        -1.7903619         -1.348105        -1.0067259
## 74737439        -0.8872082         -1.064986        -0.9841833
## 33730459        -1.5623138         -2.079184        -1.0445246
# add negative control data to M-values
Mc <- rbind(M,INCs)
# create vector marking negative controls in data matrix
ctl1 <- rownames(Mc) %in% rownames(INCs)
table(ctl1)
## ctl1
##  FALSE   TRUE 
## 485512    613
rfit1 <- RUVfit(Y = Mc, X = grp, ctl = ctl1) # Stage 1 analysis
rfit2 <- RUVadj(Y = Mc, fit = rfit1)

Now that we have performed an initial differential methylation analysis to rank the CpGs with respect to their association with the factor of interest, we can designate the CpGs that are least associated with the factor of interest based on FDR-adjusted p-value as ECPs.

top1 <- topRUV(rfit2, num=Inf, p.BH = 1)
head(top1)
##                     F.p     F.p.BH       p_X1.1  p.BH_X1.1    b_X1.1     sigma2
## cg04743961 3.516091e-07 0.01017357 3.516091e-07 0.01017357 -4.838190 0.10749571
## cg07155336 3.583107e-07 0.01017357 3.583107e-07 0.01017357 -5.887409 0.16002329
## cg20925841 3.730375e-07 0.01017357 3.730375e-07 0.01017357 -4.790211 0.10714494
## cg03607359 4.721205e-07 0.01017357 4.721205e-07 0.01017357 -4.394397 0.09636129
## cg10566121 5.238865e-07 0.01017357 5.238865e-07 0.01017357 -4.787914 0.11780108
## cg07655636 6.080091e-07 0.01017357 6.080091e-07 0.01017357 -4.571758 0.11201883
##            var.b_X1.1 fit.ctl        mean
## cg04743961 0.07729156   FALSE -2.31731496
## cg07155336 0.11505994   FALSE -1.27676413
## cg20925841 0.07703935   FALSE -0.87168892
## cg03607359 0.06928569   FALSE -2.19187147
## cg10566121 0.08470133   FALSE  0.03138961
## cg07655636 0.08054378   FALSE -1.29294851
ctl2 <- rownames(M) %in% rownames(top1[top1$p.BH_X1.1 > 0.5,])
table(ctl2)
## ctl2
##  FALSE   TRUE 
## 172540 312972

We can then use the ECPs to perform a second differential methylation with RUV-inverse, which is adjusted for the unwanted variation estimated from the data.

# Perform RUV adjustment and fit
rfit3 <- RUVfit(Y = M, X = grp, ctl = ctl2) # Stage 2 analysis
rfit4 <- RUVadj(Y = M, fit = rfit3)
# Look at table of top results
topRUV(rfit4)
##              F.p F.p.BH p_X1.1 p.BH_X1.1    b_X1.1    sigma2 var.b_X1.1 fit.ctl
## cg07155336 1e-24  1e-24  1e-24     1e-24 -5.769286 0.1668414  0.1349771   FALSE
## cg06463958 1e-24  1e-24  1e-24     1e-24 -5.733093 0.1668414  0.1349771   FALSE
## cg00024472 1e-24  1e-24  1e-24     1e-24 -5.662959 0.1668414  0.1349771   FALSE
## cg02040433 1e-24  1e-24  1e-24     1e-24 -5.651399 0.1668414  0.1349771   FALSE
## cg13355248 1e-24  1e-24  1e-24     1e-24 -5.595396 0.1668414  0.1349771   FALSE
## cg02467990 1e-24  1e-24  1e-24     1e-24 -5.592707 0.1668414  0.1349771   FALSE
## cg00817367 1e-24  1e-24  1e-24     1e-24 -5.527501 0.1668414  0.1349771   FALSE
## cg11396157 1e-24  1e-24  1e-24     1e-24 -5.487992 0.1668414  0.1349771   FALSE
## cg16306898 1e-24  1e-24  1e-24     1e-24 -5.466780 0.1668414  0.1349771   FALSE
## cg03735888 1e-24  1e-24  1e-24     1e-24 -5.396242 0.1668414  0.1349771   FALSE
##                  mean
## cg07155336 -1.2767641
## cg06463958  0.2776252
## cg00024472 -2.4445762
## cg02040433 -1.2918259
## cg13355248 -0.8483387
## cg02467990 -0.4154370
## cg00817367 -0.2911294
## cg11396157 -1.3800170
## cg16306898 -2.1469768
## cg03735888 -1.1527557

7.1 Alternative approach for RUVm stage 1

If the number of samples in your experiment is greater than the number of Illumina negative controls on the array platform used - 613 for 450k, 411 for EPIC - stage 1 of RUVm will not work. In such cases, we recommend performing a standard limma analysis in stage 1.

# setup design matrix
des <- model.matrix(~grp)
des
##   (Intercept) grp1
## 1           1    1
## 2           1    1
## 3           1    0
## 4           1    0
## 5           1    1
## 6           1    0
## attr(,"assign")
## [1] 0 1
## attr(,"contrasts")
## attr(,"contrasts")$grp
## [1] "contr.treatment"
# limma differential methylation analysis
lfit1 <- lmFit(M, design=des)
lfit2 <- eBayes(lfit1) # Stage 1 analysis
# Look at table of top results
topTable(lfit2)
## Removing intercept from test coefficients
##                logFC   AveExpr         t      P.Value   adj.P.Val        B
## cg07155336 -6.037439 -1.276764 -19.22210 1.175108e-07 0.005755968 7.635736
## cg04743961 -4.887986 -2.317315 -19.21709 1.177367e-07 0.005755968 7.634494
## cg03607359 -4.393946 -2.191871 -18.07007 1.852304e-07 0.005755968 7.334032
## cg13272280 -4.559707 -2.099665 -17.25531 2.599766e-07 0.005755968 7.099628
## cg22263007 -4.438420 -1.010994 -17.12384 2.749857e-07 0.005755968 7.060036
## cg03556069 -5.456754 -1.811718 -17.00720 2.891269e-07 0.005755968 7.024476
## cg08443814 -4.597347 -2.062275 -16.80835 3.151706e-07 0.005755968 6.962907
## cg18672939 -5.159383 -0.705992 -16.65643 3.368597e-07 0.005755968 6.915046
## cg24385334 -4.157473 -1.943370 -16.59313 3.463909e-07 0.005755968 6.894890
## cg18044663 -4.426118 -1.197724 -16.57851 3.486357e-07 0.005755968 6.890216

The results of this can then be used to define ECPs for stage 2, as in the previous example.

topl1 <- topTable(lfit2, num=Inf)
## Removing intercept from test coefficients
head(topl1)
##                logFC   AveExpr         t      P.Value   adj.P.Val        B
## cg07155336 -6.037439 -1.276764 -19.22210 1.175108e-07 0.005755968 7.635736
## cg04743961 -4.887986 -2.317315 -19.21709 1.177367e-07 0.005755968 7.634494
## cg03607359 -4.393946 -2.191871 -18.07007 1.852304e-07 0.005755968 7.334032
## cg13272280 -4.559707 -2.099665 -17.25531 2.599766e-07 0.005755968 7.099628
## cg22263007 -4.438420 -1.010994 -17.12384 2.749857e-07 0.005755968 7.060036
## cg03556069 -5.456754 -1.811718 -17.00720 2.891269e-07 0.005755968 7.024476
ctl3 <- rownames(M) %in% rownames(topl1[topl1$adj.P.Val > 0.5,])
table(ctl3)
## ctl3
##  FALSE   TRUE 
## 199150 286362

We can then use the ECPs to perform a second differential methylation with RUV-inverse as before.

# Perform RUV adjustment and fit
rfit5 <- RUVfit(Y = M, X = grp, ctl = ctl3) # Stage 2 analysis
rfit6 <- RUVadj(Y = M, fit = rfit5)
# Look at table of top results
topRUV(rfit6)
##              F.p F.p.BH p_X1.1 p.BH_X1.1    b_X1.1    sigma2 var.b_X1.1 fit.ctl
## cg06463958 1e-24  1e-24  1e-24     1e-24 -5.910598 0.1667397  0.1170589   FALSE
## cg07155336 1e-24  1e-24  1e-24     1e-24 -5.909549 0.1667397  0.1170589   FALSE
## cg02467990 1e-24  1e-24  1e-24     1e-24 -5.841079 0.1667397  0.1170589   FALSE
## cg00024472 1e-24  1e-24  1e-24     1e-24 -5.823529 0.1667397  0.1170589   FALSE
## cg01893212 1e-24  1e-24  1e-24     1e-24 -5.699627 0.1667397  0.1170589   FALSE
## cg11396157 1e-24  1e-24  1e-24     1e-24 -5.699331 0.1667397  0.1170589   FALSE
## cg13355248 1e-24  1e-24  1e-24     1e-24 -5.658606 0.1667397  0.1170589   FALSE
## cg00817367 1e-24  1e-24  1e-24     1e-24 -5.649284 0.1667397  0.1170589   FALSE
## cg16306898 1e-24  1e-24  1e-24     1e-24 -5.610118 0.1667397  0.1170589   FALSE
## cg16556906 1e-24  1e-24  1e-24     1e-24 -5.567659 0.1667397  0.1170589   FALSE
##                   mean
## cg06463958  0.27762518
## cg07155336 -1.27676413
## cg02467990 -0.41543703
## cg00024472 -2.44457624
## cg01893212 -0.08273355
## cg11396157 -1.38001701
## cg13355248 -0.84833866
## cg00817367 -0.29112939
## cg16306898 -2.14697683
## cg16556906 -0.96821744

7.2 Visualising the effect of RUVm adjustment

To visualise the effect that the RUVm adjustment is having on the data, using an MDS plot for example, the getAdj function can be used to extract the adjusted values from the RUVm fit object produced by RUVfit. NOTE: The adjusted values should only be used for visualisations - it is NOT recommended that they are used in any downstream analysis.

Madj <- getAdj(M, rfit5) # get adjusted values

The MDS plots below show how the relationship between the samples changes with and without RUVm adjustment. RUVm reduces the distance between the samples in each group by removing unwanted variation. It can be useful to examine this type of plot when trying to decide on the best set of ECPs or to help select the optimal value of \(k\), if using RUV-4 or RUV-2.

par(mfrow=c(1,2))
plotMDS(M, labels=targets$Sample_Name, col=as.integer(factor(targets$status)),
        main="Unadjusted", gene.selection = "common")
legend("right",legend=c("Cancer","Normal"),pch=16,cex=1,col=1:2)
plotMDS(Madj, labels=targets$Sample_Name, col=as.integer(factor(targets$status)),
        main="Adjusted: RUV-inverse", gene.selection = "common")
## Warning in plotMDS.default(Madj, labels = targets$Sample_Name, col =
## as.integer(factor(targets$status)), : dimension 2 is degenerate or all zero
legend("topright",legend=c("Cancer","Normal"),pch=16,cex=1,col=1:2)
RUVm adjusted data. An MDS plot of cancer and normal data, before and after RUVm adjustment.

Figure 4: RUVm adjusted data
An MDS plot of cancer and normal data, before and after RUVm adjustment.

To illustrate how the getAdj function can be used to help select an appropriate value for \(k\), we will run the second stage of the RUVm analysis using RUV-4 with two different \(k\) values.

# Use RUV-4 in stage 2 of RUVm with k=1 and k=2
rfit7 <- RUVfit(Y = M, X = grp, ctl = ctl3,
                method = "ruv4", k=1) # Stage 2 with RUV-4, k=1
rfit9 <- RUVfit(Y = M, X = grp, ctl = ctl3,
                method = "ruv4", k=2) # Stage 2 with RUV-4, k=2
# get adjusted values
Madj1 <- getAdj(M, rfit7)
Madj2 <- getAdj(M, rfit9)

The following MDS plots show how the relationship between the samples changes from the unadjusted data to data adjusted with RUV-inverse and RUV-4 with two different \(k\) values. For this small dataset, RUV-inverse appears to be removing far too much variation as we can see the samples in each group are completely overlapping. Using RUV-4 and choosing a smaller value for \(k\) produces more sensible results.

par(mfrow=c(2,2))
plotMDS(M, labels=targets$Sample_Name, col=as.integer(factor(targets$status)),
        main="Unadjusted", gene.selection = "common")
legend("top",legend=c("Cancer","Normal"),pch=16,cex=1,col=1:2)
plotMDS(Madj, labels=targets$Sample_Name, col=as.integer(factor(targets$status)),
        main="Adjusted: RUV-inverse", gene.selection = "common")
## Warning in plotMDS.default(Madj, labels = targets$Sample_Name, col =
## as.integer(factor(targets$status)), : dimension 2 is degenerate or all zero
legend("topright",legend=c("Cancer","Normal"),pch=16,cex=1,col=1:2)
plotMDS(Madj1, labels=targets$Sample_Name, col=as.integer(factor(targets$status)),
        main="Adjusted: RUV-4, k=1", gene.selection = "common")
legend("bottom",legend=c("Cancer","Normal"),pch=16,cex=1,col=1:2)
plotMDS(Madj2, labels=targets$Sample_Name, col=as.integer(factor(targets$status)),
        main="Adjusted: RUV-4, k=2", gene.selection = "common")
legend("bottomright",legend=c("Cancer","Normal"),pch=16,cex=1,col=1:2)
Effect of different adjustment methods and parameters. MDS plots of cancer and normal data before an after adjustment with RUV-inverse and RUV-4 with different k values.

Figure 5: Effect of different adjustment methods and parameters
MDS plots of cancer and normal data before an after adjustment with RUV-inverse and RUV-4 with different k values.

More information about the various RUV methods can be found at http://www-personal.umich.edu/~johanngb/ruv/, including links to all relevant publications. Further examples of RUV analyses, with code, can be found at https://github.com/johanngb/ruv-useR2018. The tutorials demonstrate how the various plotting functions available in the ruv package (which are not covered in this vignette) can be used to select sensible parameters and assess if the adjustment is “helping” your analysis.

8 Testing for differential variability (DiffVar)

8.1 Methylation data

Rather than testing for differences in mean methylation, we may be interested in testing for differences between group variances. For example, it has been hypothesised that highly variable CpGs in cancer are important for tumour progression (Hansen et al. 2011). Hence we may be interested in CpG sites that are consistently methylated in the normal samples, but variably methylated in the cancer samples.

In general we recommend at least 10 samples in each group for accurate variance estimation, however for the purpose of this vignette we perform the analysis on 3 vs 3. In this example, we are interested in testing for differential variability in the cancer versus normal group.

An important note on the coef parameter: please always explicitly state which columns of design matrix correspond to the groups that you are interested in testing for differential variability. The default setting for coef is to include all columns of the design matrix when calculating the Levene residuals, which is not suitable for when there are additional variables that need to be taken into account in the linear model. To avoid misspecification of the model, it is best to explicitly state the coef parameter. The additional nuisance or confounding variables will still be taken into account in the linear modelling step, however we find that including them when calculating Levene residuals often removes all the (possibly interesting) variation in the data.

When the design matrix includes an intercept term, the coef parameter must include both the intercept and groups of interest. Consider the design matrix that was used when performing the limma analysis:

design
##   (Intercept) idid2 idid3 groupcancer
## 1           1     0     1           0
## 2           1     1     0           0
## 3           1     0     1           1
## 4           1     0     0           1
## 5           1     0     0           0
## 6           1     1     0           1
## attr(,"assign")
## [1] 0 1 1 2
## attr(,"contrasts")
## attr(,"contrasts")$id
## [1] "contr.treatment"
## 
## attr(,"contrasts")$group
## [1] "contr.treatment"

The first column of the design matrix is the intercept term, and the fourth column tells us which samples are cancer and normal samples. The 2nd and 3rd columns correspond to the ID parameter, which is not interesting in terms of finding differentially variable CpGs, but may be important to include in the linear model. Hence for this example we would specify coef = c(1,4) in the call to varFit.

For methylation data, the varFit function will take either a matrix of M-values, \(\beta\) values or a MethylSet object as input. If \(\beta\) values are supplied, a logit transformation is performed. Note that as a default, varFit uses the robust setting in the limma framework, which requires the use of the statmod package.

fitvar <- varFit(Mval, design = design, coef = c(1,4))

The numbers of hyper-variable (1) and hypo-variable (-1) genes in cancer vs normal can be obtained using decideTests. In the cancer vs normal context, we would expect to see more variability in methylation in cancer compared to normal (i.e. hyper-variable).

summary(decideTests(fitvar))
##        (Intercept) idid2 idid3 groupcancer
## Down             0     3     1           0
## NotSig       19735 19996 19992       19991
## Up             265     1     7           9
topDV <- topVar(fitvar, coef=4)
topDV
##            SampleVar LogVarRatio DiffLevene        t      P.Value Adj.P.Value
## cg13516820  5.655938    3.430946   2.879133 5.421279 5.951601e-08 0.001190320
## cg22091297  6.114050    4.040779   2.806703 4.842465 1.287170e-06 0.007461497
## cg14267725  8.235053    4.327289   2.864090 4.837709 1.318322e-06 0.007461497
## cg26744375  6.166232    2.687510   2.487741 4.812991 1.492299e-06 0.007461497
## cg23071808  5.516404    3.362872   2.638585 4.672655 2.982975e-06 0.010743792
## cg24879782  4.755737    3.859502   2.717716 4.656723 3.223138e-06 0.010743792
## cg15174834  4.875825    3.824230   2.628820 4.433304 9.304676e-06 0.026584790
## cg09912667  4.199307    5.066491   2.773138 4.384165 1.167279e-05 0.029181966
## cg09028204  5.188900    2.955333   2.403254 4.328539 1.504660e-05 0.033436891
## cg17969902  4.845701    3.683594   2.489746 4.091855 4.287744e-05 0.085754878

An alternate parameterisation of the design matrix that does not include an intercept term can also be used (i.e. a cell means model), and specific contrasts tested with contrasts.varFit. Here we specify the design matrix such that the first two columns correspond to the normal and cancer groups, respectively. Note that we now specify coef=c(1,2).

design2 <- model.matrix(~0+group+id)
fitvar.contr <- varFit(Mval, design=design2, coef=c(1,2))
contr <- makeContrasts(groupcancer-groupnormal,levels=colnames(design2))
fitvar.contr <- contrasts.varFit(fitvar.contr,contrasts=contr)

The results are identical to before.

summary(decideTests(fitvar.contr))
##        groupcancer - groupnormal
## Down                           0
## NotSig                     19991
## Up                             9
topVar(fitvar.contr,coef=1)
##            SampleVar LogVarRatio DiffLevene        t      P.Value Adj.P.Value
## cg13516820  5.655938    3.430946   2.879133 5.421279 5.951601e-08 0.001190320
## cg22091297  6.114050    4.040779   2.806703 4.842465 1.287170e-06 0.007461497
## cg14267725  8.235053    4.327289   2.864090 4.837709 1.318322e-06 0.007461497
## cg26744375  6.166232    2.687510   2.487741 4.812991 1.492299e-06 0.007461497
## cg23071808  5.516404    3.362872   2.638585 4.672655 2.982975e-06 0.010743792
## cg24879782  4.755737    3.859502   2.717716 4.656723 3.223138e-06 0.010743792
## cg15174834  4.875825    3.824230   2.628820 4.433304 9.304676e-06 0.026584790
## cg09912667  4.199307    5.066491   2.773138 4.384165 1.167279e-05 0.029181966
## cg09028204  5.188900    2.955333   2.403254 4.328539 1.504660e-05 0.033436891
## cg17969902  4.845701    3.683594   2.489746 4.091855 4.287744e-05 0.085754878

The \(\beta\) values for the top 4 differentially variable CpGs can be seen in Figure 6.

cpgsDV <- rownames(topDV)
par(mfrow=c(2,2))
for(i in 1:4){
stripchart(beta[rownames(beta)==cpgsDV[i],]~design[,4],method="jitter",
group.names=c("Normal","Cancer"),pch=16,cex=1.5,col=c(4,2),ylab="Beta values",
vertical=TRUE,cex.axis=1.5,cex.lab=1.5)
title(cpgsDV[i],cex.main=1.5)
}
Top DV CpGs. The beta values for the top 4 differentially variable CpGs.

Figure 6: Top DV CpGs
The beta values for the top 4 differentially variable CpGs.

8.2 RNA-Seq expression data

Testing for differential variability in expression data is straightforward if the technology is gene expression microarrays. The matrix of expression values can be supplied directly to the varFit function. For RNA-Seq data, the mean-variance relationship that occurs in count data needs to be taken into account. In order to deal with this issue, we apply a voom transformation (Law et al. 2014) to obtain observation weights, which are then used in the linear modelling step. For RNA-Seq data, the varFit function will take a DGElist object as input.

To demonstrate this, we use data from the tweeDEseqCountData package. This data is part of the International HapMap project, consisting of RNA-Seq profiles from 69 unrelated Nigerian individuals (Pickrell et al. 2010). The only covariate is gender, so we can look at differentially variable expression between males and females. We follow the code from the limma vignette to read in and process the data before testing for differential variability.

First we load up the data and extract the relevant information.

library(tweeDEseqCountData)
data(pickrell1)
counts<-exprs(pickrell1.eset)
dim(counts)
## [1] 38415    69
gender <- pickrell1.eset$gender
table(gender)
## gender
## female   male 
##     40     29
rm(pickrell1.eset)
data(genderGenes)
data(annotEnsembl63)
annot <- annotEnsembl63[,c("Symbol","Chr")]
rm(annotEnsembl63)

We now have the counts, gender of each sample and annotation (gene symbol and chromosome) for each Ensemble gene. We can form a DGElist object using the edgeR package.

library(edgeR)
y <- DGEList(counts=counts, genes=annot[rownames(counts),])

We filter out lowly expressed genes by keeping genes with at least 1 count per million reads in at least 20 samples, as well as genes that have defined annotation. Finally we perform scaling normalisation.

isexpr <- rowSums(cpm(y)>1) >= 20
hasannot <- rowSums(is.na(y$genes))==0
y <- y[isexpr & hasannot,,keep.lib.sizes=FALSE]
dim(y)
## [1] 17310    69
y <- calcNormFactors(y)

We set up the design matrix and test for differential variability.

design.hapmap <- model.matrix(~gender)
fitvar.hapmap <- varFit(y, design = design.hapmap, coef=c(1,2))
## Converting counts to log counts-per-million using voom.
fitvar.hapmap$genes <- y$genes

We can display the results of the test:

summary(decideTests(fitvar.hapmap))
##        (Intercept) gendermale
## Down             0          2
## NotSig           0      17308
## Up           17310          0
topDV.hapmap <- topVar(fitvar.hapmap,coef=ncol(design.hapmap))
topDV.hapmap
##                       Symbol Chr  SampleVar LogVarRatio DiffLevene         t
## ENSG00000213318 RP11-331F4.1  16 5.69839463   -2.562939 -0.9859943 -8.031243
## ENSG00000129824       RPS4Y1   Y 2.32497726   -2.087025 -0.4585620 -4.957005
## ENSG00000233864       TTTY15   Y 6.79004140   -2.245369 -0.6085233 -4.612934
## ENSG00000176171        BNIP3  10 0.41317384    1.199292  0.3632133  4.219404
## ENSG00000197358      BNIP3P1  14 0.39969125    1.149754  0.3353288  4.058147
## ENSG00000025039        RRAGD   6 0.91837213    1.091229  0.4926839  3.977022
## ENSG00000103671        TRIP4  15 0.07456448   -1.457139 -0.1520583 -3.911300
## ENSG00000171100         MTM1   X 0.44049558   -1.133295 -0.3334619 -3.896490
## ENSG00000149476          DAK  11 0.13289523   -1.470460 -0.1919880 -3.785893
## ENSG00000064886       CHI3L2   1 2.70234584    1.468059  0.8449434  3.782010
##                      P.Value  Adj.P.Value
## ENSG00000213318 7.238039e-12 1.252905e-07
## ENSG00000129824 3.960855e-06 3.428120e-02
## ENSG00000233864 1.496237e-05 8.633290e-02
## ENSG00000176171 6.441668e-05 2.787632e-01
## ENSG00000197358 1.147886e-04 3.973982e-01
## ENSG00000025039 1.527695e-04 4.375736e-01
## ENSG00000103671 1.921104e-04 4.375736e-01
## ENSG00000171100 2.022293e-04 4.375736e-01
## ENSG00000149476 2.956364e-04 4.425050e-01
## ENSG00000064886 2.995692e-04 4.425050e-01

The log counts per million for the top 4 differentially variable genes can be seen in Figure 7.

genesDV <- rownames(topDV.hapmap)
par(mfrow=c(2,2))
for(i in 1:4){
stripchart(cpm(y,log=TRUE)[rownames(y)==genesDV[i],]~design.hapmap[,ncol(design.hapmap)],method="jitter",
group.names=c("Female","Male"),pch=16,cex=1.5,col=c(4,2),ylab="Log counts per million",
vertical=TRUE,cex.axis=1.5,cex.lab=1.5)
title(genesDV[i],cex.main=1.5)
}
Top DV CpGs. The log counts per million for the top 4 differentially variably expressed genes.

Figure 7: Top DV CpGs
The log counts per million for the top 4 differentially variably expressed genes.

9 Gene ontology analysis

Once a differential methylation or differential variability analysis has been performed, it may be of interest to know which gene pathways are targeted by the significant CpG sites. Geeleher et al. (Geeleher et al. 2013) showed there is a severe bias when performing gene ontology analysis with methylation data. This is due to the fact that there are differing numbers of probes per gene on several different array technologies. For the Illumina Infinium HumanMethylation450 array the number of probes per gene ranges from 1 to 1299, with a median of 15 probes per gene. For the EPIC array, the range is 1 to 1487, with a median of 20 probes per gene. This means that when annotating CpG sites to genes, a gene is more likely to be identified as differentially methylated if there are many CpG sites associated with the gene. We refer to this source of bias as “probe number bias”.

One way to take into account this selection bias is to model the relationship between the number of probes per gene and the probability of being differentially methylated. This can be performed by adapting the goseq method of Young et al. (Young et al. 2010). Each gene then has a prior probability associated with it, and a modified version of a hypergeometric test can be performed, testing for over-representation of the selected genes in each gene set. The BiasedUrn package can be used to obtain p-values from the Wallenius’ noncentral hypergeometric distribution, taking into account the odds of differential methylation for each gene set. Note that the BiasedUrn package can occassionally return p-values of 0. For the gene sets where a p-value of exactly zero is outputted we perform a hypergeometric test, which ensures non-zero p-values and hence false discovery rates.

We have recently uncovered a new source of bias in gene set testing for methylation array data (Maksimovic, Oshlack, and Phipson 2020) that we refer to as “multi-gene bias”. This second source of bias arises due to the fact that around 10% of gene-annotated CpGs are annotated to more than one gene, violating assumptions of independently measured genes. This can lead to some GO categories being identified as significantly enriched as they contain genes with methylation measurements from shared CpGs. This can occur for large gene families such as the protocadherin gamma gene cluster which happen to be over-represented in the GO category “GO:0007156: homophilic cell adhesion via plasma membrane adhesion molecules”. This is now taken into account in the gene set testing functions in missMethyl.

We have developed methods for both CpG and region level analyses. The gometh function performs gene set testing on GO categories or KEGG pathways for significant CpG sites. The gsameth function is a more generalised gene set testing function which can take as input a list of user specified gene sets. Note that for gsameth, the format for the gene ids for each gene in the gene set needs to be Entrez Gene IDs. For example, the entire curated gene set list (C2) from the Broad’s Molecular Signatures Database can be specified as input. The R version of these lists can be downloaded from http://bioinf.wehi.edu.au/software/MSigDB/index.html. Both functions take a vector of significant CpG probe names as input. For a region level analysis, using the DMRcate package, for example, goregion and gsaregion can perform gene set enrichment analysis using the ranged object as input.

NOTE ON UPDATES IN SEPTEMBER 2020: We have added new functionality to the gene set testing functions to allow the user to limit the input CpGs to specific genomic features of interest using the genomic.features argument. This is based on the annotation information in the manifest files for the 450K and EPIC arrays. Possible values are "“ALL”, “TSS200”, “TSS1500”, “Body”, “1stExon”, “3’UTR”, “5’UTR” and “ExonBnd” (only for EPIC), and any combination can be specified. In order to include the significant genes that overlap with the gene set of interest, the sig.genes parameter can be set to TRUE. This adds an additional column to the results dataframe.

9.1 CpG level analysis

To illustrate how to use gometh, consider the results from the differential methylation analysis with RUVm.

top <- topRUV(rfit4, number = Inf, p.BH = 1)
table(top$p.BH_X1.1 < 0.01)
## 
##  FALSE   TRUE 
## 424168  61344

At a 1% false discovery rate cut-off, there are more than 60,000 CpG sites differentially methylated. These CpGs are annotated to almost 10,000 genes, which means that a gene ontology analysis is unlikely to be relevant or reveal anything biologically interesting. One option for selecting CpGs in this context is to apply not only a false discovery rate cut-off, but also a \(\Delta\beta\) cut-off. However, for this dataset, taking a relatively large \(\Delta\beta\) cut-off of 0.25 still leaves more than 30000 CpGs differentially methylated, which can be annotated to more than 6000 genes.

beta <- getBeta(mSet)
# make sure that order of beta values matches orer after analysis
beta <- beta[match(rownames(top),rownames(beta)),]
beta_norm <- rowMeans(beta[,grp==0])
beta_can <- rowMeans(beta[,grp==1])
Delta_beta <- beta_can - beta_norm
sigDM <- top$p.BH_X1.1 < 0.01 & abs(Delta_beta) > 0.25
table(sigDM)
## sigDM
##  FALSE   TRUE 
## 451760  33748

Instead, we take the top 10000 CpG sites as input to gometh which can be annotated to around 2500 genes.

topCpGs<-topRUV(rfit4,number=10000)
sigCpGs <- rownames(topCpGs)
sigCpGs[1:10]
##  [1] "cg07155336" "cg06463958" "cg00024472" "cg02040433" "cg13355248"
##  [6] "cg02467990" "cg00817367" "cg11396157" "cg16306898" "cg03735888"
# Check number of genes that significant CpGs are annotated to
check <- getMappedEntrezIDs(sig.cpg = sigCpGs)
## All input CpGs are used for testing.
length(check$sig.eg)
## [1] 2490

Thegometh function takes as input a character vector of CpG names, and optionally, a character vector of all CpG sites tested. This is important to include if filtering of the CpGs has been performed prior to differential methylation analysis. If the all.cpg argument is omitted, all the CpGs on the array are used as background. To change the array type, the array.type argument can be specified as either “450K” or “EPIC”. The default is “450K”.

If the plot.bias argument is TRUE, a figure showing the relationship between the probability of differential methylation and the number of probes per gene will be displayed.

For testing of GO terms, the collection argument takes the value “GO”, which is the default setting. For KEGG pathway analysis, set collection to “KEGG”. The function topGSA shows the top enriched GO categories. The gsameth function is called for GO and KEGG pathway analysis with the appropriate inputs.

For GO testing on our example dataset:

library(IlluminaHumanMethylation450kanno.ilmn12.hg19)
gst <- gometh(sig.cpg=sigCpGs, all.cpg=rownames(top), collection="GO",
              plot.bias=TRUE)
## All input CpGs are used for testing.
Probe number bias in the cancer dataset.

Figure 8: Probe number bias in the cancer dataset

topGSA(gst, n=10)
##            ONTOLOGY                                   TERM    N   DE
## GO:0048731       BP                     system development 4281  912
## GO:0007399       BP             nervous system development 2383  608
## GO:0007275       BP     multicellular organism development 4736  965
## GO:0048699       BP                  generation of neurons 1412  404
## GO:0031226       CC intrinsic component of plasma membrane 1709  401
## GO:0048856       BP       anatomical structure development 5693 1088
## GO:0030182       BP                 neuron differentiation 1344  384
## GO:0022008       BP                           neurogenesis 1618  439
## GO:0005887       CC  integral component of plasma membrane 1628  379
## GO:0030154       BP                   cell differentiation 4099  828
##                    P.DE          FDR
## GO:0048731 1.979868e-33 4.513901e-29
## GO:0007399 4.817503e-33 5.491713e-29
## GO:0007275 1.882762e-29 1.430837e-25
## GO:0048699 5.321102e-28 3.032895e-24
## GO:0031226 2.331823e-27 1.063265e-23
## GO:0048856 4.586134e-27 1.742655e-23
## GO:0030182 3.174113e-26 1.033808e-22
## GO:0022008 4.106090e-26 1.170184e-22
## GO:0005887 1.081352e-25 2.739304e-22
## GO:0030154 1.344722e-24 3.065833e-21

Testing all GO categories (>20,000) can be a little slow. To demonstrate the genomic.features parameter, let us rather focus on KEGG pathways (~330 pathways).

gst.kegg <- gometh(sig.cpg=sigCpGs, all.cpg=rownames(top), collection="KEGG")
## All input CpGs are used for testing.
topGSA(gst.kegg, n=10)
##                                           Description   N DE         P.DE
## path:hsa04020               Calcium signaling pathway 238 75 1.257631e-08
## path:hsa04080 Neuroactive ligand-receptor interaction 356 80 2.464845e-08
## path:hsa04514                 Cell adhesion molecules 142 43 4.928605e-05
## path:hsa04970                      Salivary secretion  92 27 1.097279e-04
## path:hsa04950    Maturity onset diabetes of the young  26 12 2.853606e-04
## path:hsa04024                  cAMP signaling pathway 221 55 2.972890e-04
## path:hsa04151              PI3K-Akt signaling pathway 341 77 1.059776e-03
## path:hsa04911                       Insulin secretion  86 27 1.304738e-03
## path:hsa04974        Protein digestion and absorption 102 27 1.476606e-03
## path:hsa05217                    Basal cell carcinoma  63 22 1.543190e-03
##                        FDR
## path:hsa04020 4.276506e-06
## path:hsa04080 4.276506e-06
## path:hsa04514 5.700753e-03
## path:hsa04970 9.518898e-03
## path:hsa04950 1.719321e-02
## path:hsa04024 1.719321e-02
## path:hsa04151 5.187853e-02
## path:hsa04911 5.187853e-02
## path:hsa04974 5.187853e-02
## path:hsa05217 5.187853e-02

We can limit the input CpGs to those in the promoter regions of genes:

gst.kegg.prom <- gometh(sig.cpg=sigCpGs, all.cpg=rownames(top), 
                        collection="KEGG", genomic.features = c("TSS200",
                                                                "TSS1500",
                                                                "1stExon"))
topGSA(gst.kegg.prom, n=10)
##                                           Description   N DE         P.DE
## path:hsa04080 Neuroactive ligand-receptor interaction 356 56 1.031570e-08
## path:hsa04020               Calcium signaling pathway 238 45 4.674679e-06
## path:hsa04911                       Insulin secretion  86 19 5.064084e-04
## path:hsa04024                  cAMP signaling pathway 221 35 5.485723e-04
## path:hsa04514                 Cell adhesion molecules 142 26 6.431218e-04
## path:hsa05032                      Morphine addiction  91 20 9.769435e-04
## path:hsa05217                    Basal cell carcinoma  63 15 1.543506e-03
## path:hsa04916                           Melanogenesis 101 20 1.616541e-03
## path:hsa04727                       GABAergic synapse  89 18 2.024536e-03
## path:hsa04970                      Salivary secretion  92 16 2.320973e-03
##                        FDR
## path:hsa04080 3.579547e-06
## path:hsa04020 8.110569e-04
## path:hsa04911 4.463265e-02
## path:hsa04024 4.463265e-02
## path:hsa04514 4.463265e-02
## path:hsa05032 5.649990e-02
## path:hsa05217 7.011749e-02
## path:hsa04916 7.011749e-02
## path:hsa04727 7.805711e-02
## path:hsa04970 8.053775e-02

We can see if the results are different if we only include CpGs in gene bodies:

gst.kegg.body <- gometh(sig.cpg=sigCpGs, all.cpg=rownames(top), 
                        collection="KEGG", genomic.features = c("Body"))
topGSA(gst.kegg.body, n=10)
##                                                            Description   N DE
## path:hsa04974                         Protein digestion and absorption 102 19
## path:hsa04514                                  Cell adhesion molecules 142 26
## path:hsa04512                                 ECM-receptor interaction  88 19
## path:hsa04020                                Calcium signaling pathway 238 38
## path:hsa04640                               Hematopoietic cell lineage  92 14
## path:hsa04950                     Maturity onset diabetes of the young  26  7
## path:hsa04151                               PI3K-Akt signaling pathway 341 44
## path:hsa04550 Signaling pathways regulating pluripotency of stem cells 141 24
## path:hsa05032                                       Morphine addiction  91 18
## path:hsa00561                                  Glycerolipid metabolism  60 10
##                       P.DE        FDR
## path:hsa04974 0.0004224149 0.08281045
## path:hsa04514 0.0007314712 0.08281045
## path:hsa04512 0.0008047766 0.08281045
## path:hsa04020 0.0009545873 0.08281045
## path:hsa04640 0.0018246076 0.12662777
## path:hsa04950 0.0056866952 0.32888054
## path:hsa04151 0.0076816876 0.33636448
## path:hsa04550 0.0077548007 0.33636448
## path:hsa05032 0.0104702424 0.40368601
## path:hsa00561 0.0120172500 0.41699858

The KEGG pathways are quite different when limiting CpGs to those in gene bodies versus CpGs in promoters. To include the significant genes that overlap with each gene set, set the sig.genes parameter to TRUE.

gst.kegg.body <- gometh(sig.cpg=sigCpGs, all.cpg=rownames(top), 
                        collection="KEGG", genomic.features = c("Body"), 
                        sig.genes = TRUE)
topGSA(gst.kegg.body, n=5)
##                                    Description   N DE         P.DE        FDR
## path:hsa04974 Protein digestion and absorption 102 19 0.0004224149 0.08281045
## path:hsa04514          Cell adhesion molecules 142 26 0.0007314712 0.08281045
## path:hsa04512         ECM-receptor interaction  88 19 0.0008047766 0.08281045
## path:hsa04020        Calcium signaling pathway 238 38 0.0009545873 0.08281045
## path:hsa04640       Hematopoietic cell lineage  92 14 0.0018246076 0.12662777
##                                                                                                                                                                                                                                                 SigGenesInSet
## path:hsa04974                                                                                                   COL1A2,COL4A1,COL4A2,COL4A3,COL5A1,COL5A2,COL6A3,COL11A2,COL15A1,CPA2,COL26A1,COL22A1,ELN,COL24A1,KCNQ1,ATP1B2,SLC8A2,COL18A1,COL27A1,COL23A1
## path:hsa04514                                                                                     CDH2,CDH4,CNTNAP2,ICOS,HLA-DQA2,HLA-DQB1,HLA-F,HLA-G,ITGA4,ITGAM,MAG,NCAM1,CLDN11,CLDN18,PDCD1,PTPRM,JAM2,SDC2,JAM3,NTNG2,ITGA8,CLDN1,CD8A,NRXN1,NRXN2,CD34
## path:hsa04512                                                                                                                           COL1A2,COL4A1,COL4A2,COL4A3,COL6A3,COMP,LAMA1,FREM2,ITGA4,ITGB4,ITGB5,AGRN,LAMA2,LAMA4,GP6,RELN,TNXB,FRAS1,ITGA8,CD36
## path:hsa04020 ADCY1,ADRA1B,ADCY4,ERBB4,FGF3,FGFR2,P2RX2,FLT1,FLT4,GDNF,GRIN2A,GRIN2D,GRM5,HTR2A,ITPKB,ITPR2,ATP2A1,ATP2B2,NTRK1,NTRK2,NTRK3,PDE1A,PDGFB,PLCG2,PRKCB,RYR1,RYR2,RYR3,SLC8A2,CACNA1B,CACNA1D,PDGFD,CAMK4,CAMK2B,CACNA1I,CACNA1H,PLCZ1,CD38,FGF19
## path:hsa04640                                                                                                                                                                    CR1,CR1L,CR2,EPO,FLT3,HLA-DQA2,HLA-DQB1,ITGA4,ITGAM,CD1D,CD8A,CD34,CD36,CD38

For a more generalised version of gene set testing in methylation data where the user can specify the gene set to be tested, the function gsameth can be used. To display the top 20 pathways, topGSA can be called. gsameth can take a single gene set, or a list of gene sets. The gene identifiers in the gene set must be Entrez Gene IDs. To demonstrate gsameth, we download and use the Hallmark gene set.

hallmark <- readRDS(url("http://bioinf.wehi.edu.au/MSigDB/v7.1/Hs.h.all.v7.1.entrez.rds"))
gsa <- gsameth(sig.cpg=sigCpGs, all.cpg=rownames(top), collection=hallmark)
## All input CpGs are used for testing.
topGSA(gsa, n=10)
##                                              N DE         P.DE          FDR
## HALLMARK_EPITHELIAL_MESENCHYMAL_TRANSITION 199 62 1.502342e-07 7.511709e-06
## HALLMARK_KRAS_SIGNALING_DN                 200 47 1.590338e-04 3.975845e-03
## HALLMARK_PANCREAS_BETA_CELLS                40 14 7.578790e-04 1.263132e-02
## HALLMARK_MYOGENESIS                        200 46 1.786052e-02 2.232565e-01
## HALLMARK_APICAL_JUNCTION                   199 43 3.214465e-02 3.158505e-01
## HALLMARK_SPERMATOGENESIS                   135 25 3.790206e-02 3.158505e-01
## HALLMARK_UV_RESPONSE_DN                    144 36 9.696963e-02 6.194453e-01
## HALLMARK_HEDGEHOG_SIGNALING                 36 11 9.911125e-02 6.194453e-01
## HALLMARK_KRAS_SIGNALING_UP                 198 34 1.258178e-01 6.989880e-01
## HALLMARK_NOTCH_SIGNALING                    32  9 1.416309e-01 7.081546e-01

Note that if it is of interest to obtain the Entrez Gene IDs that the significant CpGs are mapped to, the getMappedEntrezIDs function can be called.

9.2 Region level analysis

We have extended gometh and gsameth to perform gene set testing following a region analysis. The region gene set testing function analogues are goregion and gsaregion. Instead of inputting significant CpGs, a ranged object as typically outputted from region finding software is used. The CpGs overlapping the significant differentially methylated regions (DMRs) are extracted and the same statistical framework in gometh and gsameth is applied to test for enrichment of gene sets. We find that genes that have more CpGs measuring methylation are more likely to be called as differentially methylated regions, and hence it is important to take into account this bias when performing gene set testing.

To demonstrate goregion and gsaregion we will perform a region analysis on the cancer dataset using the DMRcate package.

library(DMRcate)
## Warning: replacing previous import 'matrixStats::rowMedians' by
## 'Biobase::rowMedians' when loading 'DSS'
## Warning: replacing previous import 'matrixStats::anyMissing' by
## 'Biobase::anyMissing' when loading 'DSS'

First, the matrix of M-values is annotated with the relevant annotation information about the probes such as their genomic position, gene annotation, etc. By default, this is done using the ilmn12.hg19 annotation. The limma pipeline is then used for differential methylation analysis to calculate moderated t-statistics.

myAnnotation <- cpg.annotate(object = M, datatype = "array", what = "M", 
                             arraytype = c("450K"), 
                             analysis.type = "differential", design = design, 
                             coef = 4)
## Your contrast returned 23435 individually significant probes. We recommend the default setting of pcutoff in dmrcate().

Next we can use the dmrcate function to combine the CpGs to identify differentially methylated regions. We can use the extractRanges function to extract a GRanges object with the genomic location and the relevant statistics associated with each DMR. This object can then be used as input to goregion and gsaregion.

DMRs <- dmrcate(myAnnotation, lambda=1000, C=2)
## Fitting chr1...
## Fitting chr2...
## Fitting chr3...
## Fitting chr4...
## Fitting chr5...
## Fitting chr6...
## Fitting chr7...
## Fitting chr8...
## Fitting chr9...
## Fitting chr10...
## Fitting chr11...
## Fitting chr12...
## Fitting chr13...
## Fitting chr14...
## Fitting chr15...
## Fitting chr16...
## Fitting chr17...
## Fitting chr18...
## Fitting chr19...
## Fitting chr20...
## Fitting chr21...
## Fitting chr22...
## Fitting chrX...
## Fitting chrY...
## Demarcating regions...
## Done!
results.ranges <- extractRanges(DMRs)
## snapshotDate(): 2022-04-19
## see ?DMRcatedata and browseVignettes('DMRcatedata') for documentation
## loading from cache
results.ranges
## GRanges object with 2578 ranges and 8 metadata columns:
##          seqnames              ranges strand |   no.cpgs min_smoothed_fdr
##             <Rle>           <IRanges>  <Rle> | <integer>        <numeric>
##      [1]     chr6 133561224-133564066      * |        50      0.00000e+00
##      [2]     chr6   33130696-33139083      * |        81     8.99544e-116
##      [3]    chr13   78491982-78494462      * |        50      0.00000e+00
##      [4]    chr16   51183363-51188129      * |        39     1.93611e-226
##      [5]     chr3   62353312-62360893      * |        40     2.69265e-141
##      ...      ...                 ...    ... .       ...              ...
##   [2574]     chr2   20865651-20866414      * |        12      6.43715e-53
##   [2575]     chr7     4175030-4175200      * |         2      1.53976e-25
##   [2576]     chr1   91300559-91301204      * |         2      5.26415e-27
##   [2577]     chr6   29855636-29856682      * |        28      9.01591e-47
##   [2578]     chr8   76319838-76319964      * |         2      6.60221e-26
##             Stouffer     HMFDR      Fisher     maxdiff    meandiff
##            <numeric> <numeric>   <numeric>   <numeric>   <numeric>
##      [1] 3.15705e-25 0.0410900 4.02486e-20    0.653903    0.362511
##      [2] 4.60005e-27 0.0725663 1.48443e-18   -0.383081   -0.199979
##      [3] 2.67205e-23 0.0466604 3.67335e-18    0.548184    0.323927
##      [4] 2.84509e-23 0.0444541 3.74830e-17    0.565576    0.315255
##      [5] 3.41752e-23 0.0448639 7.31253e-17    0.567152    0.285499
##      ...         ...       ...         ...         ...         ...
##   [2574]    0.601862  0.139908    0.432221  0.38739914  0.06109482
##   [2575]    0.560317  0.292250    0.441000 -0.20036591 -0.09735211
##   [2576]    0.856410  0.487978    0.681486  0.08841506  0.04428119
##   [2577]    0.966982  0.171206    0.739728  0.28665553  0.04184157
##   [2578]    0.733543  0.669802    0.808451 -0.00970045 -0.00873155
##          overlapping.genes
##                <character>
##      [1]              EYA4
##      [2]           COL11A2
##      [3] RNF219-AS1, EDNRB
##      [4] AC009166.5, SALL1
##      [5]  PTPRG-AS1, FEZF2
##      ...               ...
##   [2574]              <NA>
##   [2575]              SDK1
##   [2576]      RP4-665J23.1
##   [2577]     HLA-H, HCG4P7
##   [2578]              <NA>
##   -------
##   seqinfo: 23 sequences from an unspecified genome; no seqlengths

We can visualise the top DMR using the DMR.plot function:

cols <- c(2,4)[group]
names(cols) <-group
beta <- getBeta(mSet)
par(mfrow=c(1,1))
DMR.plot(ranges=results.ranges, dmr=2, CpGs=beta, phen.col=cols, 
         what="Beta", arraytype="450K", genome="hg19")
## snapshotDate(): 2022-04-19
## see ?DMRcatedata and browseVignettes('DMRcatedata') for documentation
## loading from cache
## require("Gviz")
## Warning in updateObjectFromSlots(object, ..., verbose = verbose): dropping
## slot(s) 'columns' from object = 'GeneRegionTrack'
Top DMR from DMRcate.

Figure 9: Top DMR from DMRcate

Now that we have performed our region analysis, we can use goregion and gsaregion to perform gene set testing. Setting plot.bias to TRUE, we can see strong probe number bias in the data. This can be interpretted that a gene is more likely to have a DMR called if it has more CpGs measuring methylation.

gst.region <- goregion(results.ranges, all.cpg=rownames(M), 
                       collection="GO", array.type="450K", plot.bias=TRUE)
## All input CpGs are used for testing.
Probe number bias for DMRs in the cancer dataset.

Figure 10: Probe number bias for DMRs in the cancer dataset

topGSA(gst.region, n=10)
##            ONTOLOGY
## GO:0007399       BP
## GO:0003700       MF
## GO:0048731       BP
## GO:0000981       MF
## GO:0007275       BP
## GO:0048699       BP
## GO:0030182       BP
## GO:0000977       MF
## GO:0048856       BP
## GO:0022008       BP
##                                                                                       TERM
## GO:0007399                                                      nervous system development
## GO:0003700                                       DNA-binding transcription factor activity
## GO:0048731                                                              system development
## GO:0000981           DNA-binding transcription factor activity, RNA polymerase II-specific
## GO:0007275                                              multicellular organism development
## GO:0048699                                                           generation of neurons
## GO:0030182                                                          neuron differentiation
## GO:0000977 RNA polymerase II transcription regulatory region sequence-specific DNA binding
## GO:0048856                                                anatomical structure development
## GO:0022008                                                                    neurogenesis
##               N  DE         P.DE          FDR
## GO:0007399 2383 508 3.183790e-36 7.258723e-32
## GO:0003700 1369 302 3.303717e-32 2.522644e-28
## GO:0048731 4281 728 3.319414e-32 2.522644e-28
## GO:0000981 1324 294 2.886103e-31 1.645007e-27
## GO:0007275 4736 771 2.282007e-29 1.040549e-25
## GO:0048699 1412 338 4.599552e-29 1.747753e-25
## GO:0030182 1344 326 7.174197e-29 2.336636e-25
## GO:0000977 1374 292 6.935226e-28 1.976453e-24
## GO:0048856 5693 865 1.686953e-27 4.273426e-24
## GO:0022008 1618 365 4.035680e-27 9.200948e-24

We can also test for enrichment of KEGG pathways:

gst.region.kegg <- goregion(results.ranges, all.cpg=rownames(M), 
                       collection="KEGG", array.type="450K")
## All input CpGs are used for testing.
topGSA(gst.region.kegg, n=10)
##                                           Description   N DE         P.DE
## path:hsa04080 Neuroactive ligand-receptor interaction 356 81 8.993529e-15
## path:hsa04020               Calcium signaling pathway 238 60 1.860050e-07
## path:hsa04514                 Cell adhesion molecules 142 38 7.723759e-06
## path:hsa04950    Maturity onset diabetes of the young  26 12 2.112279e-05
## path:hsa04024                  cAMP signaling pathway 221 46 1.682694e-04
## path:hsa04713                   Circadian entrainment  97 27 4.679485e-04
## path:hsa04970                      Salivary secretion  92 21 5.532730e-04
## path:hsa04742                      Taste transduction  85 17 1.420660e-03
## path:hsa04725                     Cholinergic synapse 112 28 1.904958e-03
## path:hsa04911                       Insulin secretion  86 22 2.170932e-03
##                        FDR
## path:hsa04080 3.120755e-12
## path:hsa04020 3.227187e-05
## path:hsa04514 8.933814e-04
## path:hsa04950 1.832402e-03
## path:hsa04024 1.167789e-02
## path:hsa04713 2.706302e-02
## path:hsa04970 2.742653e-02
## path:hsa04742 6.162111e-02
## path:hsa04725 6.963479e-02
## path:hsa04911 6.963479e-02

What is interesting is that although very similar pathways are highly ranked compared to the CpG level analysis, gene set testing on the regions is more powerful i.e. the p-values are more significant. In experiments where there are tens of thousands of significant CpGs from a CpG level analysis, we recommend that a good quality region analysis can be a more powerful approach for gene set enrichment analysis.

We can also perform gene set testing on the Hallmark gene sets using gsaregion:

gsa.region <- gsaregion(results.ranges, all.cpg=rownames(M), 
                        collection=hallmark)
## All input CpGs are used for testing.
topGSA(gsa.region, n=10)
##                                              N DE        P.DE        FDR
## HALLMARK_EPITHELIAL_MESENCHYMAL_TRANSITION 199 41 0.001365651 0.06828255
## HALLMARK_PANCREAS_BETA_CELLS                40 11 0.002820772 0.07051931
## HALLMARK_KRAS_SIGNALING_DN                 200 33 0.005903935 0.09839891
## HALLMARK_SPERMATOGENESIS                   135 22 0.012042512 0.15053140
## HALLMARK_APICAL_JUNCTION                   199 34 0.043532458 0.43532458
## HALLMARK_MYOGENESIS                        200 34 0.067379978 0.55590916
## HALLMARK_KRAS_SIGNALING_UP                 198 28 0.077827283 0.55590916
## HALLMARK_ANGIOGENESIS                       36  7 0.107818388 0.67386492
## HALLMARK_APICAL_SURFACE                     44  7 0.287658034 1.00000000
## HALLMARK_INFLAMMATORY_RESPONSE             200 20 0.312780391 1.00000000

Note that the DMR analysis can be further refined by imposing a \(\Delta\beta\) value cut-off and changing various parameters. Please refer to the DMRcate package vignette for more details on how to do this.

10 Session information

sessionInfo()

R version 4.2.0 RC (2022-04-19 r82224) Platform: x86_64-pc-linux-gnu (64-bit) Running under: Ubuntu 20.04.4 LTS

Matrix products: default BLAS: /home/biocbuild/bbs-3.15-bioc/R/lib/libRblas.so LAPACK: /home/biocbuild/bbs-3.15-bioc/R/lib/libRlapack.so

locale: [1] LC_CTYPE=en_US.UTF-8 LC_NUMERIC=C
[3] LC_TIME=en_GB LC_COLLATE=C
[5] LC_MONETARY=en_US.UTF-8 LC_MESSAGES=en_US.UTF-8
[7] LC_PAPER=en_US.UTF-8 LC_NAME=C
[9] LC_ADDRESS=C LC_TELEPHONE=C
[11] LC_MEASUREMENT=en_US.UTF-8 LC_IDENTIFICATION=C

attached base packages: [1] grid parallel stats4 stats graphics grDevices utils
[8] datasets methods base

other attached packages: [1] Gviz_1.40.0
[2] DMRcatedata_2.13.0
[3] ExperimentHub_2.4.0
[4] AnnotationHub_3.4.0
[5] BiocFileCache_2.4.0
[6] dbplyr_2.1.1
[7] DMRcate_2.10.0
[8] edgeR_3.38.0
[9] tweeDEseqCountData_1.33.0
[10] minfiData_0.41.0
[11] IlluminaHumanMethylation450kmanifest_0.4.0
[12] limma_3.52.0
[13] missMethyl_1.30.0
[14] IlluminaHumanMethylationEPICanno.ilm10b4.hg19_0.6.0 [15] IlluminaHumanMethylation450kanno.ilmn12.hg19_0.6.1 [16] minfi_1.42.0
[17] bumphunter_1.38.0
[18] locfit_1.5-9.5
[19] iterators_1.0.14
[20] foreach_1.5.2
[21] Biostrings_2.64.0
[22] XVector_0.36.0
[23] SummarizedExperiment_1.26.0
[24] Biobase_2.56.0
[25] MatrixGenerics_1.8.0
[26] matrixStats_0.62.0
[27] GenomicRanges_1.48.0
[28] GenomeInfoDb_1.32.0
[29] IRanges_2.30.0
[30] S4Vectors_0.34.0
[31] BiocGenerics_0.42.0
[32] BiocStyle_2.24.0

loaded via a namespace (and not attached): [1] utf8_1.2.2 R.utils_2.11.0
[3] tidyselect_1.1.2 RSQLite_2.2.12
[5] AnnotationDbi_1.58.0 htmlwidgets_1.5.4
[7] BiocParallel_1.30.0 munsell_0.5.0
[9] codetools_0.2-18 preprocessCore_1.58.0
[11] statmod_1.4.36 withr_2.5.0
[13] colorspace_2.0-3 filelock_1.0.2
[15] highr_0.9 knitr_1.38
[17] rstudioapi_0.13 GenomeInfoDbData_1.2.8
[19] bit64_4.0.5 rhdf5_2.40.0
[21] vctrs_0.4.1 generics_0.1.2
[23] xfun_0.30 biovizBase_1.44.0
[25] R6_2.5.1 illuminaio_0.38.0
[27] AnnotationFilter_1.20.0 bitops_1.0-7
[29] rhdf5filters_1.8.0 cachem_1.0.6
[31] reshape_0.8.9 DelayedArray_0.22.0
[33] assertthat_0.2.1 promises_1.2.0.1
[35] bsseq_1.32.0 BiocIO_1.6.0
[37] scales_1.2.0 nnet_7.3-17
[39] gtable_0.3.0 ensembldb_2.20.0
[41] rlang_1.0.2 genefilter_1.78.0
[43] splines_4.2.0 lazyeval_0.2.2
[45] rtracklayer_1.56.0 DSS_2.44.0
[47] GEOquery_2.64.0 dichromat_2.0-0
[49] checkmate_2.1.0 BiocManager_1.30.17
[51] yaml_2.3.5 GenomicFeatures_1.48.0
[53] backports_1.4.1 httpuv_1.6.5
[55] Hmisc_4.7-0 tools_4.2.0
[57] bookdown_0.26 nor1mix_1.3-0
[59] ggplot2_3.3.5 ellipsis_0.3.2
[61] jquerylib_0.1.4 RColorBrewer_1.1-3
[63] siggenes_1.70.0 Rcpp_1.0.8.3
[65] plyr_1.8.7 base64enc_0.1-3
[67] sparseMatrixStats_1.8.0 progress_1.2.2
[69] zlibbioc_1.42.0 purrr_0.3.4
[71] RCurl_1.98-1.6 BiasedUrn_1.07
[73] prettyunits_1.1.1 rpart_4.1.16
[75] openssl_2.0.0 cluster_2.1.3
[77] magrittr_2.0.3 data.table_1.14.2
[79] magick_2.7.3 ProtGenerics_1.28.0
[81] mime_0.12 hms_1.1.1
[83] evaluate_0.15 xtable_1.8-4
[85] XML_3.99-0.9 jpeg_0.1-9
[87] readxl_1.4.0 mclust_5.4.9
[89] gridExtra_2.3 compiler_4.2.0
[91] biomaRt_2.52.0 tibble_3.1.6
[93] crayon_1.5.1 R.oo_1.24.0
[95] htmltools_0.5.2 later_1.3.0
[97] tzdb_0.3.0 Formula_1.2-4
[99] tidyr_1.2.0 DBI_1.1.2
[101] MASS_7.3-57 rappdirs_0.3.3
[103] Matrix_1.4-1 readr_2.1.2
[105] permute_0.9-7 cli_3.3.0
[107] R.methodsS3_1.8.1 quadprog_1.5-8
[109] pkgconfig_2.0.3 GenomicAlignments_1.32.0
[111] foreign_0.8-82 xml2_1.3.3
[113] annotate_1.74.0 bslib_0.3.1
[115] rngtools_1.5.2 multtest_2.52.0
[117] beanplot_1.3.1 ruv_0.9.7.1
[119] doRNG_1.8.2 scrime_1.3.5
[121] VariantAnnotation_1.42.0 stringr_1.4.0
[123] digest_0.6.29 cellranger_1.1.0
[125] rmarkdown_2.14 base64_2.0
[127] htmlTable_2.4.0 DelayedMatrixStats_1.18.0
[129] restfulr_0.0.13 curl_4.3.2
[131] shiny_1.7.1 gtools_3.9.2
[133] Rsamtools_2.12.0 rjson_0.2.21
[135] lifecycle_1.0.1 nlme_3.1-157
[137] jsonlite_1.8.0 Rhdf5lib_1.18.0
[139] askpass_1.1 BSgenome_1.64.0
[141] fansi_1.0.3 pillar_1.7.0
[143] lattice_0.20-45 KEGGREST_1.36.0
[145] fastmap_1.1.0 httr_1.4.2
[147] survival_3.3-1 GO.db_3.15.0
[149] interactiveDisplayBase_1.34.0 glue_1.6.2
[151] png_0.1-7 BiocVersion_3.15.2
[153] bit_4.0.4 stringi_1.7.6
[155] sass_0.4.1 HDF5Array_1.24.0
[157] blob_1.2.3 org.Hs.eg.db_3.15.0
[159] latticeExtra_0.6-29 memoise_2.0.1
[161] dplyr_1.0.8

References

Aryee, Martin J, Andrew E Jaffe, Hector Corrada-Bravo, Christine Ladd-Acosta, Andrew P Feinberg, Kasper D Hansen, and Rafael a Irizarry. 2014. “Minfi: a flexible and comprehensive Bioconductor package for the analysis of Infinium DNA methylation microarrays.” Bioinformatics (Oxford, England) 30 (10): 1363–9. https://doi.org/10.1093/bioinformatics/btu049.

Bibikova, Marina, Bret Barnes, Chan Tsan, Vincent Ho, Brandy Klotzle, Jennie M Le, David Delano, et al. 2011. “High density DNA methylation array with single CpG site resolution.” Genomics 98 (4): 288–95. https://doi.org/10.1016/j.ygeno.2011.07.007.

Dedeurwaerder, Sarah, Matthieu Defrance, and Emilie Calonne. 2011. “Evaluation of the Infinium Methylation 450K technology.” Epigenomics 3 (6): 771–84. http://www.futuremedicine.com/doi/abs/10.2217/epi.11.105.

Gagnon-Bartsch, Johann A, Laurent Jacob, and Terence P Speed. 2013. Removing Unwanted Variation from High Dimensional Data with Negative Controls. Berkeley: Tech. Rep. 820, Department of Statistics, University of California.

Gagnon-Bartsch, Johann a, and Terence P Speed. 2012. “Using control genes to correct for unwanted variation in microarray data.” Biostatistics (Oxford, England) 13 (3): 539–52. https://doi.org/10.1093/biostatistics/kxr034.

Geeleher, Paul, Lori Hartnett, Laurance J Egan, Aaron Golden, Raja Affendi Raja Ali, and Cathal Seoighe. 2013. “Gene-set analysis is severely biased when applied to genome-wide methylation data.” Bioinformatics (Oxford, England) 29 (15): 1851–7. https://doi.org/10.1093/bioinformatics/btt311.

Hansen, Kasper Daniel, Winston Timp, Héctor Corrada Bravo, Sarven Sabunciyan, Benjamin Langmead, Oliver G McDonald, Bo Wen, et al. 2011. “Increased methylation variation in epigenetic domains across cancer types.” Nature Genetics 43 (8): 768–75. https://doi.org/10.1038/ng.865.

Law, Charity W, Yunshun Chen, Wei Shi, and Gordon K Smyth. 2014. “voom: Precision weights unlock linear model analysis tools for RNA-seq read counts.” Genome Biology 15 (2): R29. https://doi.org/10.1186/gb-2014-15-2-r29.

Maksimovic, Jovana, Johann A Gagnon-Bartsch, Terence P Speed, and Alicia Oshlack. 2015. “Removing unwanted variation in a differential methylation analysis of Illumina HumanMethylation450 array data.” Nucleic Acids Research, May, gkv526. https://doi.org/10.1093/nar/gkv526.

Maksimovic, Jovana, Lavinia Gordon, and Alicia Oshlack. 2012. “SWAN: Subset-quantile within array normalization for illumina infinium HumanMethylation450 BeadChips.” Genome Biology 13 (6): R44. https://doi.org/10.1186/gb-2012-13-6-r44.

Maksimovic, Jovana, Alicia Oshlack, and Belinda Phipson. 2020. “Gene set enrichment analysis for genome-wide DNA methylation data.” bioRxiv. https://doi.org/10.1101/2020.08.24.265702.

Phipson, Belinda, Jovana Maksimovic, and Alicia Oshlack. 2016. “missMethyl: an R package for analyzing data from Illumina’s HumanMethylation450 platform.” Bioinformatics (Oxford, England) 32 (2): 286–88. https://doi.org/10.1093/bioinformatics/btv560.

Phipson, Belinda, and Alicia Oshlack. 2014. “DiffVar: a new method for detecting differential variability with application to methylation in cancer and aging.” Genome Biology 15 (9): 465. https://doi.org/10.1186/s13059-014-0465-4.

Pickrell, Joseph K., John C. Marioni, Athma A. Pai, Jacob F. Degner, Barbara E. Engelhardt, Everlyne Nkadori, Jean-Baptiste Veyrieras, Matthew Stephens, Yoav Gilad, and Jonathan K. Pritchard. 2010. “Understanding mechanisms underlying human gene expression variation with RNA sequencing.” Nature 464 (7289): 768–72. https://doi.org/10.1038/nature08872.

Smyth, G. K. 2005. “limma: Linear Models for Microarray Data.” In Bioinformatics and Computational Biology Solutions Using R and Bioconductor, 397–420. New York: Springer-Verlag. https://doi.org/10.1007/0-387-29362-0_23.

Young, Matthew D, Matthew J Wakefield, Gordon K Smyth, and Alicia Oshlack. 2010. “Gene ontology analysis for RNA-seq: accounting for selection bias.” Genome Biology 11 (2): R14. https://doi.org/10.1186/gb-2010-11-2-r14.