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Before we get started with the specifics of example data sets and using the R package, it is worth understanding at a broad level what the problem this package aims to solve is and how it goes about doing it. Of course, the best way of doing this is by reading the pre-print, it’s not long I promise. But if you can’t be bothered doing that or just want a refresher, I’ll try and recap the main points.
In droplet based, single cell RNA-seq experiments, there is always a certain amount of background mRNAs present in the dilution that gets distributed into the droplets with cells and sequenced along with them. The net effect of this is to produce a background contamination that represents expression not from the cell contained within a droplet, but the solution that contained the cells.
This collection of cell free mRNAs floating in the input solution (henceforth referred to as “the soup”) is created from cells in the input solution being lysed. Because of this, the soup looks different for each input solution and strongly resembles the expression pattern obtained by summing all the individual cells.
The aim of this package is to provide a way to estimate the composition of this soup, what fraction of UMIs are derived from the soup in each droplet and produce a corrected count table with the soup based expression removed.
The method to do this consists of three parts:
In previous versions of SoupX, the estimation of the contamination
fraction (step 2) was the part that caused the most difficulty for the
user. The contamination fraction is parametrised as rho
in
the code, with rho=0
meaning no contamination and
rho=1
meaning 100% of UMIs in a droplet are soup.
From version 1.3.0 onwards, an automated routine for estimating the
contamination fraction is provided, which should be suitable is most
circumstances. However, this vignette will still spend a lot of effort
explaining how to calculate the contamination fraction “manually”. This
is because there are still circumstances where manually estimating
rho
is preferable or the only option and it is important to
understanding how the method works and how it can fail.
While it is possible to run SoupX without clustering information, you will get far better results if some basic clustering is provided. Therefore, it is strongly recommended that you provide some clustering information to SoupX. If you are using 10X data mapped with cellranger, the default clustering produced by cellranger is automatically loaded and used. The results are not strongly sensitive to the clustering used. Seurat with default parameters will also yield similar results.
If you have some 10X data which has been mapped with cellranger, the typical SoupX work flow would be.
install.packages("SoupX")
library(SoupX)
# Load data and estimate soup profile
= load10X("Path/to/cellranger/outs/folder/")
sc # Estimate rho
= autoEstCont(sc)
sc # Clean the data
= adjustCounts(sc) out
which would produce a new matrix that has had the contaminating reads
removed. This can then be used in any downstream analysis in place of
the original matrix. Note that by default adjustCounts
will
return non-integer counts. If you require integers for downstream
processing either pass out through round
or set
roundToInt=TRUE
when running adjustCounts
.
You install this package like any other R package. The simplest way is to use the CRAN version by running,
install.packages("SoupX")
If you want to use the latest experimental features, you can install
the development version from github using the devtools
install_github
function as follows:
::install_github("constantAmateur/SoupX", ref = "devel") devtools
Once installed, you can load the package in the usual way,
library(SoupX)
## This version of 'bslib' is designed to work with 'shiny' >= 1.6.0.
## Please upgrade via install.packages('shiny').
Like every other single cell tool out there, we are going to use one of the 10X PBMC data sets to demonstrate how to use this package. Specifically, we will use this PBMC dataset. The starting point is to download the raw and filtered cellranger output and extract them to a temporary folder as follows.
= tempdir(check = TRUE)
tmpDir download.file("https://cf.10xgenomics.com/samples/cell-exp/2.1.0/pbmc4k/pbmc4k_raw_gene_bc_matrices.tar.gz",
destfile = file.path(tmpDir, "tod.tar.gz"))
download.file("https://cf.10xgenomics.com/samples/cell-exp/2.1.0/pbmc4k/pbmc4k_filtered_gene_bc_matrices.tar.gz",
destfile = file.path(tmpDir, "toc.tar.gz"))
untar(file.path(tmpDir, "tod.tar.gz"), exdir = tmpDir)
untar(file.path(tmpDir, "toc.tar.gz"), exdir = tmpDir)
SoupX comes with a convenience function for loading 10X data processed using cellranger. If you downloaded the data as above you can use it to get started by running,
= load10X(tmpDir) sc
This will load the 10X data into a SoupChannel
object.
This is just a list with some special properties, storing all the
information associated with a single 10X channel. A
SoupChannel
object can also be created manually by
supplying a table of droplets and a table of counts. Assuming you have
followed the above code to download the PBMC data, you could manually
construct a SoupChannel
by running,
= Seurat::Read10X(file.path(tmpDir, "filtered_gene_bc_matrices", "GRCh38"))
toc = Seurat::Read10X(file.path(tmpDir, "raw_gene_bc_matrices", "GRCh38"))
tod = SoupChannel(tod, toc) sc
To avoid downloading or including large data files, this vignette
will use a pre-loaded and processed object PBMC_sc
.
data(PBMC_sc)
= PBMC_sc
sc sc
## Channel with 33694 genes and 2170 cells
Having loaded our data, the first thing to do is to estimate what the
expression profile of the soup looks like. This is actually done for us
automatically by the object construction function
SoupChannel
called by load10X
. Usually, the
default estimation is fine, but it can be done explicitly by setting
calcSoupProfile=FALSE
as follows
= SoupChannel(tod, toc, calcSoupProfile = FALSE)
sc = estimateSoup(sc) sc
Note that we cannot perform this operation using our pre-saved
PBMC_sc
data as the table of droplets is dropped once the
soup profile has been generated to save memory. Generally, we don’t need
the full table of droplets once we have determined what the soup looks
like.
Usually the only reason to not have estimateSoup
run
automatically is if you want to change the default parameters or have
some other way of calculating the soup profile. One case where you may
want to do the latter is if you only have the table of counts available
and not the empty droplets. In this case you can proceed by running
library(Matrix)
= sc$toc
toc = SoupChannel(toc, toc, calcSoupProfile = FALSE)
scNoDrops # Calculate soup profile
= data.frame(row.names = rownames(toc), est = rowSums(toc)/sum(toc), counts = rowSums(toc))
soupProf = setSoupProfile(scNoDrops, soupProf) scNoDrops
In this case the setSoupProfile
command is used instead
of estimateSoup
and directly adds the custom estimation of
the soup profile to the SoupChannel
object. Note that we
have loaded the Matrix
library to help us manipulate the
sparse matrix toc
.
We have some extra meta data that it is essential we include in our
SoupChannel
object. In general you can add any meta data by
providing a data.frame
with row names equal to the column
names of the toc
when building the SoupChannel
object.
However, there are some bits of meta data that are so essential that they have their own special loading functions. The most essential is clustering information. Without it, SoupX will still work, but you won’t be able to automatically estimate the contamination fraction and the correction step will be far less effective. Metadata associated with our PBMC dataset is also bundled with SoupX. We can use it to add clustering data by running,
data(PBMC_metaData)
= setClusters(sc, setNames(PBMC_metaData$Cluster, rownames(PBMC_metaData))) sc
It can also be very useful to be able to visualise our data by providing some kind of dimension reduction for the data. We can do this by running,
= setDR(sc, PBMC_metaData[colnames(sc$toc), c("RD1", "RD2")]) sc
This is usually not needed when using the load10X
function as the cellranger produced values are automatically loaded.
It is often the case that really what you want is to get a rough sense of whether the expression of a gene (or group of genes) in a set of cells is derived from the soup or not. At this stage we already have enough information to do just this. Before proceeding, we will briefly discuss how to do this.
Let’s start by getting a general overview of our PBMC data by plotting it with the provided annotation.
library(ggplot2)
= PBMC_metaData[colnames(sc$toc), ]
dd = aggregate(cbind(RD1, RD2) ~ Annotation, data = dd, FUN = mean)
mids = ggplot(dd, aes(RD1, RD2)) + geom_point(aes(colour = Annotation), size = 0.2) +
gg geom_label(data = mids, aes(label = Annotation)) + ggtitle("PBMC 4k Annotation") +
guides(colour = guide_legend(override.aes = list(size = 1)))
plot(gg)
SoupX does not have any of its own functions for generating tSNE (or
any other reduced dimension) co-ordinates, so it is up to us to generate
them using something else. In this case I have run Seurat in a standard way and
produced a tSNE map of the data (see ?PBMC
).
Suppose that we are interested in the expression of the gene
IGKC, a key component immunoglobulins (i.e., antibodies) highly
expressed by B-cells. We can quickly visualise which cells express
IGKC by extracting the counts for it from the
SoupChannel
object.
$IGKC = sc$toc["IGKC", ]
dd= ggplot(dd, aes(RD1, RD2)) + geom_point(aes(colour = IGKC > 0))
gg plot(gg)
Wow! We know from prior annotation that the cells in the cluster at the bottom are B-cells so should express IGKC. But the cluster on the right is a T-cell population. Taken at face value, we appear to have identified a scattered population of T-cells that are producing antibodies! Start preparing the nature paper!
Before we get too carried away though, perhaps it’s worth checking if
the expression of IGKC in these scattered cells is more than we
would expect by chance from the soup. To really answer this properly, we
need to know how much contamination is present in each cell, which will
be the focus of the next sections. But we can get a rough idea just by
calculating how many counts we would expect for IGKC in each
cell, by assuming that cell contained nothing but soup. The function
soupMarkerMap
allows you to visualise the ratio of observed
counts for a gene (or set of genes) to this expectation value. Let’s try
it out,
= plotMarkerMap(sc, "IGKC")
gg plot(gg)
There is no need to pass the tSNE coordinates to this function as we
stored them in the sc
object when we ran setDR
above. Looking at the resulting plot, we see that the cells in the
B-cell cluster have a reddish colour, indicating that they are expressed
far more than we would expect by chance, even if the cell was nothing
but background. Our paradigm changing, antibody producing T-cells do not
fare so well. They all have a decidedly bluish hue, indicating that is
completely plausible that the expression of IGKC in these cells
is due to contamination from the soup. Those cells that are shown as
dots have zero expression for IGKC.
We have made these plots assuming each droplet contains nothing but background contamination, which is obviously not true. Nevertheless, this can still be a useful quick and easy sanity check to perform.
Probably the most difficult part of using SoupX is accurately
estimating the level of background contamination (represented as
rho
) in each channel. There are two ways to do this: using
the automatic autoEstCont
method, or manually providing a
list of “non expressed genes”. This vignette will demonstrate both
methods, but we anticipate that the automatic method will be used in
most circumstances. Before that we will describe the idea that underpins
both approaches; identifying genes that are not expressed by some cells
in our data and the expression that we observe for these genes in these
cells must be due to contamination.
This is the most challenging part of the method to understand and we have included a lot of detail here. But successfully applying SoupX does not depend on understanding all these details. The key thing to understand is that the contamination fraction estimate is the fraction of your data that will be discarded. If this value is set too low, your “corrected” data will potentially still be highly contaminated. If you set it too high, you will discard real data, although there are good reasons to want to do this at times (see section below). If the contamination fraction is in the right ball park, SoupX will remove most of the contamination. It will generally not matter if this number if off by a few percent.
Note that all modes of determining the contamination fraction add an
entry titled fit
to the SoupChannel
object
which contains details of how the final estimate was reached.
It is worth considering simply manually fixing the contamination fraction at a certain value. This seems like a bad thing to do intuitively, but there are actually good reasons you might want to. When the contamination fraction is set too high, true expression will be removed from your data. However, this is done in such a way that the counts that are most specific to a subset of cells (i.e., good marker genes) will be the absolute last thing to be removed. Because of this, it can be a sensible thing to set a high contamination fraction for a set of experiments and be confident that the vast majority of the contamination has been removed.
Even when you have a good estimate of the contamination fraction, you may want to set the value used artificially higher. SoupX has been designed to be conservative in the sense that it errs on the side of retaining true expression at the cost of letting some contamination to creep through. Our tests show that a well estimated contamination fraction will remove 80-90% of the contamination (i.e. the soup is reduced by an order of magnitude). For most applications this is sufficient. However, in cases where complete removal of contamination is essential, it can be worthwhile to increase the contamination fraction used by SoupX to remove a greater portion of the contamination.
Our experiments indicate that adding 5% extra removes 90-95% of the soup, 10% gets rid of 95-98% and 20% removes 99% or more.
Explicitly setting the contamination fraction can be done by running,
= setContaminationFraction(sc, 0.2) sc
to set the contamination fraction to 20% for all cells.
To estimate the contamination fraction, we need a set of genes that we know are not expressed in a set of cells, so by measuring how much expression we observe we can infer the contamination fraction. That is, we need a set of genes that we know are not expressed by cells of a certain type, so that in these cells the only source of expression is the soup. The difficulty is in identifying these sets of genes and the cells in which they can be assumed to be not expressed.
Note that the purpose of this set of genes is to estimate the contamination fraction and nothing else. These genes play no special role in the actual removal of background associated counts. They are categorically not a list of genes to be removed or anything of that sort.
Furthermore, if no good set of genes can be provided, and/or the automatic method fails, it is reasonable to consider setting the contamination fraction manually to something and seeing how your results are effected. A contamination rate of around 0.1 is appropriate for many datasets, but of course every experiment is different.
To make this concrete, let us consider an example. The genes HBB,HBA2 are both haemoglobin genes and so should only be expressed in red blood cells and nowhere else. IGKC is an antibody gene produced only by B cells. Suppose we’re estimating the contamination then using two sets of genes: HB genes (HBB and HBA2) and IG genes (IGKC). Let’s now look at what happens in a few hypothetical cells:
Cell 1 - Is a red blood cell so expresses HBB and HBA2, but should not express IGKC. For this cell we want to use IGKC to estimate the contamination fraction but not HBB,HBA2.
Cell 2 - Is a B-Cell so should express IGKC, but not HBB or HBA2. For this cell we want to use HBB and HBA2 to estimate the contamination fraction, but not IGKC.
Cell 3 - Is an endothelial cell, so should not express any of HBB,HBA2 or IGKC. So we want to use all three to estimate the contamination fraction.
Basically we are trying to identify in each cell, a set of genes we know the cell does not express so we can estimate the contamination fraction using the expression we do see.
Now obviously the method doesn’t know anything about the biology and we haven’t told it what’s a B cell, a RBC or anything else. There is nothing stopping you supplying that information if you do have it and that will of course give the best results.
But absent this information, the trick is to use the expression level of these genes in each cell to identify when not to use a gene to estimate the contamination fraction. This is why the best genes for estimating the contamination fraction are those that are highly expressed in the cells that do use them (like HB or IG genes). Then we can be confident that observing a low level of expression of a set of genes in a cell is due to background contamination, not a low level of mRNA production by the cell.
Given a set of genes that we suspect may be useful, the function
plotMarkerDistribution
can be used to visualise how this
gene’s expression is distributed across cells. To continue our
example:
Cell 1 - The measured expression of HBB and HBA2 is
10 times what we’d expect if the droplet was filled with soup, so the
method will not use either of these genes to calculate rho
.
On the other hand IGKC is about .05 times the value we’d get
for pure soup, so that is used.
Cell 2 - HBB/HBA2 have values around .05 times the
soup. IGKC is off the charts at 100 times what we’d expect in
the soup. So the method concludes that this cell is expressing
IGKC and so uses only HBB/HBA2 to estimate
rho
.
Cell 3 - All three are at around .05, so all are used to estimate
rho
.
To prevent accidentally including cells that genuinely express one of the estimation genes, SoupX will by default exclude any cluster where even one gene has evidence that it expresses a gene. So in the example above, SoupX would not use HB genes to estimate the contamination rate in Cell 1, or any of the cells belonging to the same cluster as Cell 1. This very conservative behaviour is to prevent over-estimation of the contamination fraction.
Clustering is beyond the scope of SoupX, so must be supplied by the user. For 10X data mapped using cellranger, SoupX will automatically pull the graph based clustering produced by cellranger and use that by default.
As indicated above, to get a more accurate estimate, groups with a
similar biological function are grouped together so they’re either used
or excluded as a group. This is why the parameter
nonExpressedGeneList
is given as a list. Each entry in the
list is a group of genes that are grouped biologically. So in our
example we would set it like:
= list(HB = c("HBB", "HBA2"), IG = c("IGKC")) nonExpressedGeneList
in this example we’d probably want to include other IG genes and Haemoglobin genes even through they’re not particularly highly expressed in general, as they should correlate biologically. That is,
= list(HB = c("HBB", "HBA2"), IG = c("IGKC", "IGHG1", "IGHG3")) nonExpressedGeneList
or something similar.
Estimating the contamination fraction using the automated is as simple as running:
= autoEstCont(sc) sc
## 786 genes passed tf-idf cut-off and 401 soup quantile filter. Taking the top 100.
## Using 854 independent estimates of rho.
## Estimated global rho of 0.06
This will produce a mysterious looking plot with two distributions
and a red line. To understand this plot, we need to understand a little
bit about what autoEstCont
is doing. The basic idea is that
it tries to aggregate evidence from many plausible estimators of
rho
and assigns the true contamination fraction to the one
that occurs the most often. The reason this works is that incorrect
estimates should have no preferred value, while true estimates should
cluster around the same value. The solid curve shows something like the
frequency of different estimates of rho
, with a red line
indicating its peak, which gives the estimate of rho
. If
you are using the default values for priorRho
and
priorRhoStdDev
(which you probably should be) you can
ignore the dashed line.
For those wanting a more detailed explanation, here is what happens.
First the function tries to identify genes that are very specific to one
cluster of cells (using quickMarkers
). The determination of
how specific is “very specific” is based on the gene’s tf-idf value for
the cluster it is specific to. See the quickMarkers
help or
this
for an explanation of what this means. The default of
tfidfMin=1
demands that genes by reasonably specific, so if
you are getting a low number of genes for estimation you can consider
decreasing this value. This list is further reduced by keeping only
genes that are “highly expressed” in the soup (as these give more
accurate estimates of rho
), where highly expressed is
controlled by soupQuantile
. The default value sounds
strict, but in practice many genes with tf-idf over 1 tend to pass
it.
Each of these genes is used to independently estimate
rho
in the usual way. That is, the clusters for which the
gene can be confidently said to not be expressed (as determined by
estimateNonExpressingCells
) are used to estimate
rho
. We could then just create a histogram of these
estimates and pick the most common value. This would work reasonably
well, but we can do better by considering that each estimate has
uncertainty associated with it. So instead we calculate the posterior
distribution of the contamination fraction for each gene/cluster pair
and determine the best estimate of rho
by finding the peak
of the average across all these distributions. This is what is shown as
the solid curve in the above plot.
The posterior distribution is calculated using a Poisson likelihood
with a gamma distribution prior, parametrised by its mean
priorRho
and standard deviation
priorRhoStdDev
. The dotted line in the above plot shows the
prior distribution. The default parameters have been calibrated to be
fairly non-specific with a slight preference towards values of rho in
the 0% to 10% range which is most commonly seen for fresh (i.e. not
nuclear) single cell experiments.
The default values place only a very weak constraint, as can be seen by setting a uniform prior
= autoEstCont(sc, priorRhoStdDev = 0.3) sc
## 786 genes passed tf-idf cut-off and 401 soup quantile filter. Taking the top 100.
## Using 854 independent estimates of rho.
## Estimated global rho of 0.06
which gives the same answer up to two significant figures. Of course you can break things if you start setting strong, badly motivated priors, so please don’t do this.
The alternative to the automatic method is to manually specify which sets of genes to use to estimate the contamination fraction. These genes need to be such that we are as certain they will not be expressed in each cell. See the section above on “Genes to estimate the contamination fraction” for an example which may make this clearer.
For some experiments, such as solid tissue studies where red cell lysis buffer has been used, it is obvious what genes to use for this purpose. In the case of bloody solid tissue, haemoglobin genes will be a ubiquitous contaminant and are not actually produced by any cell other than red blood cells in most contexts. If this is the case, you can skip the next section and proceed straight to estimating contamination.
However, some times it is not obvious in advance which genes are highly specific to just one population of cells. This is the case with our PBMC data, which is not a solid tissue biopsy and so it is not clear which gene sets to use to estimate the contamination. In general it is up to the user to pick sensible genes, but there are a few things that can be done to aid in this selection process. Firstly, the genes that are the most useful are those expressed most highly in the background. We can check which genes these are by running:
head(sc$soupProfile[order(sc$soupProfile$est, decreasing = TRUE), ], n = 20)
## est counts
## MALAT1 0.032491616 88000
## B2M 0.019416325 52587
## TMSB4X 0.016583278 44914
## EEF1A1 0.012944217 35058
## RPL21 0.010354856 28045
## RPS27 0.010097877 27349
## RPL13 0.009351309 25327
## RPL13A 0.008643877 23411
## RPL10 0.008105920 21954
## RPLP1 0.007909124 21421
## RPL34 0.007891401 21373
## RPS12 0.007672083 20779
## RPS18 0.007560208 20476
## RPS3A 0.007439842 20150
## RPL32 0.007433934 20134
## RPS6 0.007406612 20060
## RPS27A 0.007243415 19618
## RPS2 0.007188770 19470
## RPL41 0.006997143 18951
## RPL11 0.006277897 17003
Unfortunately most of the most highly expressed genes in this case are ubiquitously expressed (RPL/RPS genes or mitochondrial genes). So we need some further criteria to aid our selection process.
The function plotMarkerDistribution
is used to visualise
the distribution of expression (relative to what would be expected were
each cell pure background) across all cells in the data set. When no
geneset is provided, the function will try and guess which genes might
be useful.
plotMarkerDistribution(sc)
## No gene lists provided, attempting to find and plot cluster marker genes.
## Found 786 marker genes
## Warning: Removed 31674 rows containing non-finite values (stat_ydensity).
## Warning: Removed 2199 rows containing missing values (geom_point).
The plot shows the distribution of log10 ratios of observed counts to
expected if the cell contained nothing but soup. A guess at which cells
definitely express each gene is made and the background contamination is
calculated. The red line shows the global estimate (i.e., assuming the
same contamination fraction for all cells) of the contamination fraction
using just that gene. This “guessing” is done using the
quickMarkers
function to find marker genes of each cluster
(see “Automatic method” section). As such, it will fail if no clusters
have been provided.
Note that this is a heuristic set of genes that is intended to help develop your biological intuition. It absolutely must not be used to automatically select a set of genes to estimate the background contamination fraction. For this reason, the function will not return a list of genes. If you select the top N genes from this list and use those to estimate the contamination, you will over-estimate the contamination fraction!
Note too that the decision of what genes to use to estimate the contamination must be made on a channel by channel basis. We will find that B-cell specific genes are useful for estimating the contamination in this channel. If we had another channel with only T-cells, these markers would be of no use.
Looking at this plot, we observe that there are two immunoglobulin genes from the constant region (IGKC and IGHM) present and they give a consistent estimate of the contamination fraction of around 10% (-1 on the log10 scale). As we know that it is reasonable to assume that immunoglobulin genes are expressed only in B-cells, we will decide to use their expression in non B-cells to estimate the contamination fraction.
But there’s no reason to just use the genes quickMarkers
flagged for us. So let’s define a list of all the constant
immunoglobulin genes,
= c("IGHA1", "IGHA2", "IGHG1", "IGHG2", "IGHG3", "IGHG4", "IGHD", "IGHE",
igGenes "IGHM", "IGLC1", "IGLC2", "IGLC3", "IGLC4", "IGLC5", "IGLC6", "IGLC7", "IGKC")
it doesn’t matter if some of these are not expressed in our data, they will then just not contribute to the estimate.
Having decided on a set of genes with which to estimate the contamination, we next need to decide which cells genuinely express these genes and should not be used for estimating the contamination, and which do not and should. This is done as follows,
= estimateNonExpressingCells(sc, nonExpressedGeneList = list(IG = igGenes),
useToEst clusters = FALSE)
## No clusters found or supplied, using every cell as its own cluster.
Which produces a matrix indicating which cells (rows) should use
which sets of genes (columns) to estimate the contamination. You will
notice that the function returned a warning about cluster information
not being provided. As discussed above, SoupX tries to be conservative
and prevents estimation both from cells with high expression of a gene
set (igGenes
in this case) and any cell that falls in the
same cluster. When no clustering information is given, it cannot do this
so defaults to just excluding those cells that are obviously not
suitable. We can visualise which cells have been marked to use for
estimation,
plotMarkerMap(sc, geneSet = igGenes, useToEst = useToEst)
You’ll notice that above we set clusters=FALSE
which
stops SoupX from using clustering information. We provided this
information earlier when we ran setClusters
. Let’s see how
things change if we let clustering information be used.
= estimateNonExpressingCells(sc, nonExpressedGeneList = list(IG = igGenes))
useToEst plotMarkerMap(sc, geneSet = igGenes, useToEst = useToEst)
As you can see the set of cells to be used for estimation with the
igGenes
set has decreased. In this case it makes not much
difference, but in general it is better to provide clustering and be
conservative.
It is worth noting one final thing about the specification of
nonExpressedGeneList
. It seems odd that we have specified
nonExpressedGeneList = list(IG=igGenes)
instead of just
nonExpressedGeneList = igGenes
. This is because
nonExpressedGeneList
expects sets of genes that are
biologically related and expected to be present or not present as a set
(e.g. IG genes, HB genes).
At this point all the hard work has been done. To estimate the
contamination fraction you need only pass your set of genes and which
cells in which to use those sets of genes to
calculateContaminationFraction
.
= calculateContaminationFraction(sc, list(IG = igGenes), useToEst = useToEst) sc
## Estimated global contamination fraction of 7.69%
This function will modify the metaData
table of
sc
object to add a table giving the contamination fraction
estimate. This approach gives a contamination fraction very close to the
automatic method.
head(sc$metaData)
## nUMIs clusters RD1 RD2 rho rhoLow
## GCGAGAAGTTCTGGTA 6569 2 17.189524 -1.0840559 0.07692854 0.07201939
## TGAGCCGAGACAGGCT 3594 0 -19.479848 0.2849510 0.07692854 0.07201939
## TATCTCAAGCTGGAAC 7152 2 22.135188 0.5986279 0.07692854 0.07201939
## TCAGGTATCACCCTCA 3334 5 -2.778464 -3.0432322 0.07692854 0.07201939
## CACAGTAGTATCACCA 3077 1 13.246665 12.7795112 0.07692854 0.07201939
## CGTTAGATCGTACGGC 4242 1 16.470599 10.5222708 0.07692854 0.07201939
## rhoHigh
## GCGAGAAGTTCTGGTA 0.08205567
## TGAGCCGAGACAGGCT 0.08205567
## TATCTCAAGCTGGAAC 0.08205567
## TCAGGTATCACCCTCA 0.08205567
## CACAGTAGTATCACCA 0.08205567
## CGTTAGATCGTACGGC 0.08205567
We have now calculated or set the contamination fraction for each cell and would like to use this to remove the contamination from the original count matrix. As with estimating the contamination, this procedure is made much more robust by providing clustering information. This is because there is much more power to separate true expression from contaminating expression when counts are aggregated into clusters. Furthermore, the process of redistributing corrected counts from the cluster level to individual cells automatically corrects for variation in the cell specific contamination rate (see the paper for details).
We have already loaded clustering information into our
sc
object with setClusters
, which will be used
by default. So we can just run.
= adjustCounts(sc) out
## Warning in sparseMatrix(i = out@i[w] + 1, j = out@j[w] + 1, x = out@x[w], :
## 'giveCsparse' has been deprecated; setting 'repr = "T"' for you
## Expanding counts from 12 clusters to 2170 cells.
The recommended mode of operation will produce a non-integer (although still sparse) matrix where the original counts have been corrected for background expression. See the help, code, and paper for details of how this is done.
You should not change the method parameter unless you have a strong
reason to do so. When you need integer counts for downstream analyses,
setting roundToInt=TRUE
, stochastically rounds up with
probability equal to the fraction part of the number. For example, if a
cell has 1.2 corrected counts it will be assigned a value of 1 80% of
the time and 2 20% of the time.
Before proceeding let’s have a look at what this has done. We can get a sense for what has been the most strongly decreased by looking at the fraction of cells that were non-zero now set to zero after correction.
= rowSums(sc$toc > 0)
cntSoggy = rowSums(out > 0)
cntStrained = tail(sort((cntSoggy - cntStrained)/cntSoggy), n = 10)
mostZeroed mostZeroed
## HLA-DRA PF4 CST3 GNLY PPBP IGLC2 IGKC LYZ
## 0.3955175 0.4117647 0.4210526 0.4329897 0.4509804 0.5550239 0.5650624 0.5793991
## S100A8 S100A9
## 0.5947761 0.6151294
Notice that a number of the genes on this list are highly specific markers of one cell type or group of cells (CD74/HLA-DRA antigen presenting cells, IGKC B-cells) and others came up on our list of potential cell specific genes. Notice also the presence of the mitochondrial gene MT-ND3.
If on the other hand we focus on genes for which there is a quantitative difference,
tail(sort(rowSums(sc$toc > out)/rowSums(sc$toc > 0)), n = 20)
## S100B PRMT2 MT-ND1 MT-ND2 MT-CO1 MT-CO2 MT-ATP8
## 1 1 1 1 1 1 1
## MT-ATP6 MT-CO3 MT-ND3 MT-ND4L MT-ND4 MT-ND5 MT-ND6
## 1 1 1 1 1 1 1
## MT-CYB BX004987.4 AC011043.1 AL592183.1 AC007325.4 AC004556.1
## 1 1 1 1 1 1
we find genes associated with metabolism and translation. This is often the case as mitochondrial genes are over represented in the background compared to cells, presumably as a result of the soup being generated from distressed cells.
Way back at the start, we did a quick visualisation to look at how
the ratio of IGKC expression to pure soup was distributed. Now
that we’ve corrected our data, we can see how that compares to our
corrected data. The function plotChangeMap
can help us with
this. By default it plots the fraction of expression in each cell that
has been deemed to be soup and removed.
plotChangeMap(sc, out, "IGKC")
which shows us that the expression has been heavily decreased in the areas where it was very surprising to observe it before.
The interpretation of which cells are expressing which genes can change quite dramatically when we correct for soup contamination. You should explore this yourself by plotting a variety of different genes and seeing which change and which do not. For example, you could look at,
plotChangeMap(sc, out, "LYZ")
plotChangeMap(sc, out, "CD74")
plotChangeMap(sc, out, "IL32")
plotChangeMap(sc, out, "TRAC")
plotChangeMap(sc, out, "S100A9")
plotChangeMap(sc, out, "NKG7")
plotChangeMap(sc, out, "GNLY")
plotChangeMap(sc, out, "CD4")
plotChangeMap(sc, out, "CD8A")
In general, the changes tend to be largest for genes that are highly expressed but only in a specific context.
Of course, the next thing you’ll want to do is to load this corrected expression matrix into some downstream analysis tool and further analyse the data.
The corrected matrix can then be used for any downstream analysis in
place of the uncorrected raw matrix. If you are using 10X data and would
like to save these final counts out in the same format, you can use the
DropletUtils
write10xCounts
function like this,
:::write10xCounts("./strainedCounts", out) DropletUtils
For loading into Seurat or other R packages, there is no need to save
the output of SoupX to disk. For a single channel, you can simply run
the standard Seurat construction step on the output of
adjustCounts
. That is,
library(Seurat)
= CreateSeuratObject(out) srat
If you have multiple channels you want to process in SoupX then load
into Seurat, you need to create a combined matrix with cells from all
channels. Assuming scs
is a list named by experiment (e.g.,
scs = list(Experiment1 = scExp1,Experiment2 = scExp2)
),
this can be done by running something like:
library(Seurat)
= list()
srat for (nom in names(scs)) {
# Clean channel named 'nom'
= adjustCounts(scs[[nom]])
tmp # Add experiment name to cell barcodes to make them unique
colnames(tmp) = paste0(nom, "_", colnames(tmp))
# Store the result
= tmp
srat[[nom]]
}# Combine all count matricies into one matrix
= do.call(cbind, srat)
srat = CreateSeuratObject(srat) srat
These binaries (installable software) and packages are in development.
They may not be fully stable and should be used with caution. We make no claims about them.