tricycle 1.2.1
Here we describe a package for inferring cell cycle position for a single-cell RNA-seq dataset. The theoretical justification as well as benchmarks are included in (Zheng et al. 2022). In our hands, our approach (called TriCycle) works robustly across a variety of data modalities including across species (human and mouse), cell types and assay technology (10X, Fluidigm C1); we have yet to encounter a dataset where this approach does not work. The main output is a continuous estimate of the relative time within the cell cycle, represented as a number between 0 and 2pi (which we refer to as cell cycle position). In addition to the estimation process, we include a number of convenience functions for visualizing cell cycle time and we also provide an implementation of a discrete cell cycle stage predictor.
library(tricycle)
We recommend users to start with a SingleCellExperiment object. The output will usually be the SingleCellExperiment with new info added. The functions work on matrix or SummarizedExperiment objects although the output changes, since these type of objects do not have the capability to store both the input object and the estimates.
In the package, we include a example SingleCellExperiment dataset, which is a real subset of mouse Neurosphere RNAseq of 2 samples. 200 cells from sample AX1 and AX2 were randonly sampled from the full data. This dataset is the same data as we use for constructing our cell cycle embedding.
data(neurosphere_example)
Important: Please note that the user should normalize library size before putting into the tricycle functions. The library size normalization could be done by normalizeCounts function in scater package or by calculating CPM values.
The method is based on taking a new dataset and projecting it into an embedding representing cell cycle. This embedding is constructed using a reference dataset. What is perhaps surprising is our finding that the same embedding is appropriate for all the experiments we have looked at, including across species, cell types and datasets. We are providing this embedding space as part of the package, and we do not expect users to change this embedding (although the functions in the package supports other embeddings).
The method is simple: you take a new dataset and project it into the latent space and infer cell cycle time. The key functions here are
project_cycle_space()
estimate_cycle_position()
The next step is to verify that the cell cycle time was successfully predicted. This involves looking at a number of useful plots. This involves a number of useful visualization. Note for example our use of color scheme - because cell cycle time “wraps around” the \([0,2\pi]\) interval, it is very useful to use a color palette which also “wraps around”. The relevant functions are
plot_emb_circle_space()
circle_space_legend()
fit_periodic_loess()
We also provide a separate cell cycle stage predictor, predicting 5 different
stages; estimate_Schwabe_stage()
. This predictor is a small modification of the
method proposed by (Schwabe et al. 2020). We include this function only for the purpose of convenience.
This is not part of tricycle method!
Finally we have a set of functions for creating your own reference latent space.
project_cycle_space()
will automatically project the assay with name
logcounts
into the cell cycle embedding without any other argument input. You
could specify species (default as mouse), gene IDs, gene ID type, and
AnnotationDb
object if gene mapping is needed. Refer to
man(project_cycle_space)
for details.
neurosphere_example <- project_cycle_space(neurosphere_example)
#> No custom reference projection matrix provided. The ref learned from mouse Neuroshpere data will be used.
#> The number of projection genes found in the new data is 500.
neurosphere_example
#> class: SingleCellExperiment
#> dim: 1500 400
#> metadata(0):
#> assays(2): counts logcounts
#> rownames(1500): ENSMUSG00000056763 ENSMUSG00000025925 ...
#> ENSMUSG00000044221 ENSMUSG00000040234
#> rowData names(2): Gene Accession
#> colnames(400): AX1_CTACGTCCAAACCCAT AX1_AACTCTTTCATTCACT ...
#> AX2_CGAGAAGCACTACAGT AX2_CATATTCGTCTGCGGT
#> colData names(2): TotalUMIs sample
#> reducedDimNames(1): tricycleEmbedding
#> mainExpName: NULL
#> altExpNames(0):
The projected cell cycle space will be stored in reducedDims with name “tricycleEmbedding” (you could set other embedding name.).
library(ggplot2)
library(scattermore)
library(scater)
scater::plotReducedDim(neurosphere_example, dimred = "tricycleEmbedding") +
labs(x = "Projected PC1", y = "Projected PC2") +
ggtitle(sprintf("Projected cell cycle space (n=%d)",
ncol(neurosphere_example))) +
theme_bw(base_size = 14)
Once the new data has been projected into the cell cycle embedding, cell cycle
position is estimated using estimate_cycle_position()
. If the data has not
been projected, this function will do the projection for you. Assuming a
SingleCellExperiment as input, the cell cycle position will be addded to the
colData
of the object, with the name tricyclePosition
.
neurosphere_example <- estimate_cycle_position(neurosphere_example)
names(colData(neurosphere_example))
#> [1] "TotalUMIs" "sample" "tricyclePosition"
The estimated cell cycle position is bound between 0 and 2pi. Note that we strive to get high resolution of cell cycle state, and we think the continuous position is more appropriate when describing the cell cycle. However, to help users understand the position variable, we also note that users can approximately relate 0.5pi to be the start of S stage, pi to be the start of G2M stage, 1.5pi to be the middle of M stage, and 1.75pi-0.25pi to be G1/G0 stage.
We have two ways of (quickly) assessing whether TriCycle works. They are
Plotting the projection of the data into the cell cycle embedding is shown above. Our observation is that deeper sequenced data will have a more clearly ellipsoid pattern with an empty interior. As sequencing depth decreases, the radius of the ellipsoid decreases until the empty interior disappears. So the absence of an interior does not mean the method does not work.
It is more important to inspect a couple of genes as a function of cell cycle
position. We tend to use Top2a which is highly expressed and therefore
“plottable” in every dataset. Other candidates are for example Smc2. To plot
this data, we provide a convenient function fit_periodic_loess()
to fit a
loess line between the cyclic variable \(\theta\) and other response variables.
This fitting is done by making theta.v
3 periods
(c(theta.v - 2 * pi, theta.v, theta.v + 2 * pi))
and repeating y
3 times.
Only the fitted values corresponding to original theta.v
will be returned.
In this example, we show how well the expression of the cell cycle marker gene
Top2a change along \(\theta\).
top2a.idx <- which(rowData(neurosphere_example)$Gene == 'Top2a')
fit.l <- fit_periodic_loess(neurosphere_example$tricyclePosition,
assay(neurosphere_example, 'logcounts')[top2a.idx,],
plot = TRUE,
x_lab = "Cell cycle position \u03b8", y_lab = "log2(Top2a)",
fig.title = paste0("Expression of Top2a along \u03b8 (n=",
ncol(neurosphere_example), ")"))
names(fit.l)
#> [1] "fitted" "residual" "pred.df" "loess.o" "rsquared" "fig"
fit.l$fig + theme_bw(base_size = 14)
For Top2a we expect peak expression around \(\pi\).
This method was proposed by Schwabe et al. (2020). We did small modifications to
reduce NA
assignments. But on average, the performance is quite similar to the
original implementation in Revelio
package. In brief, we calculate the z-scores of highly expressed stage
specific cell cycle marker genes, and assgin the cell to the stage with the
greatest z-score.
neurosphere_example <- estimate_Schwabe_stage(neurosphere_example,
gname.type = 'ENSEMBL',
species = 'mouse')
#> This function is a re-implementation of Schwabe et al. 2020. If you want to use tricycle method, please run estimate_cycle_position!
#> No gname input. Rownames of x will be used.
#>
#> No AnnotationDb desginated. org.Mm.eg.db will be used to map Mouse ENSEMBL id to gene SYMBOL.
#> Batch 1 phase G1.S gene:50
#> Batch 1 phase S gene:43
#> Batch 1 phase G2 gene:61
#> Batch 1 phase G2.M gene:67
#> Batch 1 phase M.G1 gene:30
scater::plotReducedDim(neurosphere_example, dimred = "tricycleEmbedding",
colour_by = "CCStage") +
labs(x = "Projected PC1", y = "Projected PC2",
title = paste0("Projected cell cycle space (n=", ncol(neurosphere_example), ")")) +
theme_bw(base_size = 14)
Another useful function is plot_ccposition_den, which computes kernel density of \(\theta\) conditioned on a phenotype using von Mises distribution. The ouput figures are provided in two flavors, polar coordinates and Cartesian coordinates. This could be useful when comparing different cell types, treatments, or just stages. (Because we use a very small dataset here as example, we set the bandwith, i.e. the concentration parameter of the von Mises distribution as 10 to get a smooth line.)
plot_ccposition_den(neurosphere_example$tricyclePosition,
neurosphere_example$sample, 'sample',
bw = 10, fig.title = "Kernel density of \u03b8") +
theme_bw(base_size = 14)
plot_ccposition_den(neurosphere_example$tricyclePosition,
neurosphere_example$sample, 'sample', type = "circular",
bw = 10, fig.title = "Kernel density of \u03b8") +
theme_bw(base_size = 14)
To visualize the cell cycle position \(\theta\) on any embedding, we need to carefully choose a cyclic color palette. Thus, we include such functions to plot any embedding of SingleCellExperiment object with cyclic variables. A companion helper function to create the cyclic legend is also available.
library(cowplot)
p <- plot_emb_circle_scale(neurosphere_example, dimred = 1,
point.size = 3.5, point.alpha = 0.9) +
theme_bw(base_size = 14)
legend <- circle_scale_legend(text.size = 5, alpha = 0.9)
#> Warning: `guides(<scale> = FALSE)` is deprecated. Please use `guides(<scale> =
#> "none")` instead.
plot_grid(p, legend, ncol = 2, rel_widths = c(1, 0.4))
#> Warning: It is deprecated to specify `guide = FALSE` to remove a guide. Please
#> use `guide = "none"` instead.
We plot our our projection embedding. In practice, user could use other embedding, such as UMAP or t-SNE and get informative representations too.
Users could make their own reference by doing PCA on the cell cycle genes, and use the learned rotation matrix as the reference matrix in other functions. Here is an example, we just use run_pca_cc_genes function to extract Gene Ontology cell cycle genes (GO:0007049) and run PCA. By projecting the data itself with the learned reference, the projections are equivalent to direct PCA results. But you could use this newly learned reference to project other datasets.
set.seed(100)
gocc_sce.o <- run_pca_cc_genes(neurosphere_example,
exprs_values = "logcounts", species = "mouse")
#> No AnnotationDb desginated. org.Mm.eg.db will be used to map Mouse ENSEMBL id to gene SYMBOL.
#> No gname input. Rownames of sce.o will be used.
#> 'select()' returned 1:many mapping between keys and columns
#> 600 out of 2856 Gene Ontology cell cycle genes found in your data.
new.ref <- attr(reducedDim(gocc_sce.o, 'PCA'), 'rotation')[, seq_len(2)]
head(new.ref)
#> PC1 PC2
#> ENSMUSG00000040204 0.22733838 -0.16220417
#> ENSMUSG00000023067 -0.02955209 0.17127302
#> ENSMUSG00000007872 -0.01948882 0.03154002
#> ENSMUSG00000001403 0.19105449 0.20713576
#> ENSMUSG00000060860 0.04279655 0.07512125
#> ENSMUSG00000020914 0.20025859 -0.02323478
new_sce <- estimate_cycle_position(neurosphere_example, ref.m = new.ref,
dimred = 'tricycleEmbedding2')
#> The designated dimred do not exist in the SingleCellExperiment or in altexp. project_cycle_space will be run to calculate embedding tricycleEmbedding2
#> The number of projection genes found in the new data is 500.
Note: If user wants to calculate correlation between two cyclic variables, such as cell cycle position, traditional pearson’s correlation coefficient won’t consider the cyclic nature. Users could use (absolute) circular correlation values instead. (The signs of PC1 and PC2 are not deterministic when re-learning the reference by performing PCA. If the PC1 is flipped, there will be a \(\pi\) shift. So does PC2. If the user fixes the reference, there won’t be any flipping. But considering the variations around \(0\) or \(2\pi\), circular correlation should still be used instead of pearson’s correlation coefficient.)
cor(neurosphere_example$tricyclePosition, new_sce$tricyclePosition)
#> [1] -0.317373
CircStats::circ.cor(neurosphere_example$tricyclePosition, new_sce$tricyclePosition)
#> r
#> 1 0.9639901
qplot(x = neurosphere_example$tricyclePosition,y = new_sce$tricyclePosition) +
labs(x = "Original \u03b8", y = "New \u03b8",
title = paste0("Comparison of two \u03b8 (n=", ncol(neurosphere_example), ")")) +
theme_bw(base_size = 14)
This section introduce how to make a new reference using dataset with batch effects. It is only recommended for expert users who identifies batch effects in their data and want to use that data to build a custom reference. In theory, the users could use other methods to remove batch effect. Here, we use Seurat, which is used to construct our Neurosphere reference (Zheng et al. (2022)), as an example. (The code in this section is not evaluated.)
# suppose we have a count matrix containing all cells across batches; we first subset the matrix to GO cell cycle genes
library(org.Mm.eg.db)
library(AnnotationDbi)
cc.genes <- AnnotationDbi::select(org.Mm.eg.db, keytype = "GOALL",
keys = "GO:0007049",
columns = "ENSEMBL")[, "ENSEMBL"]
count_cc.m <- count.m[ensembl.ids %in% cc.genes, ] # ensembl.ids is the ensembl.ids for each row of count.m
# we then construct a Seurat object using the subset matrix and set the batch variable
library(Seurat)
seurat.o <- CreateSeuratObject(counts = count_cc.m)
seurat.o[["batch"]] <- batch.v
# make a Seurat list and normalize for each batch separately
# variable features definition is required for FindIntegrationAnchors function
seurat.list <- lapply(SplitObject(seurat.o, split.by = "batch"),
function(x) FindVariableFeatures(NormalizeData(x)))
# find anchors and merge data
seurat.anchors <- FindIntegrationAnchors(object.list = seurat.list)
seurat.integrated <- IntegrateData(anchorset = seurat.anchors)
corrected.m <- seurat.integrated@assays$integrated@data
# run PCA on the batch effects corrected matrix and get the rotaions scores for the top 2 PCs
pca.m <- scater::calculatePCA(corrected.m, ntop = 500)
new.ref <- attr(pca.m, 'rotation')[, seq_len(2)]
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In the package, we provide a reference, learned from the full dataset of the mouse Neurosphere RNAseq. The reference gives weights of 500 cell cycle genes and their IDs. Although learned from mouse, it is applicable to human data as well, with the gene mapped by gene symbols.
data(neuroRef)
head(neuroRef)
#> pc1.rot pc2.rot ensembl symbol SYMBOL
#> ENSMUSG00000040204.6 -0.1989885 0.11245580 ENSMUSG00000040204 Pclaf PCLAF
#> ENSMUSG00000020914.17 -0.1878494 0.04252486 ENSMUSG00000020914 Top2a TOP2A
#> ENSMUSG00000060860.8 -0.0567803 -0.07531686 ENSMUSG00000060860 Ube2s UBE2S
#> ENSMUSG00000001403.13 -0.1662416 -0.15992459 ENSMUSG00000001403 Ube2c UBE2C
#> ENSMUSG00000026605.14 -0.1721841 -0.11416861 ENSMUSG00000026605 Cenpf CENPF
#> ENSMUSG00000029177.9 -0.1357597 -0.19290262 ENSMUSG00000029177 Cenpa CENPA
Schwabe, Daniel, Sara Formichetti, Jan Philipp Junker, Martin Falcke, and Nikolaus Rajewsky. 2020. “The Transcriptome Dynamics of Single Cells During the Cell Cycle.” Molecular Systems Biology 16 (11): e9946. https://doi.org/10.15252/msb.20209946.
Zheng, Shijie C., Genevieve Stein-O’Brien, Jonathan J. Augustin, Jared Slosberg, Giovanni A. Carosso, Briana Winer, Gloria Shin, Hans T. Bjornsson, Loyal A. Goff, and Kasper D. Hansen. 2022. “Universal Prediction of Cell Cycle Position Using Transfer Learning.” Genome Biology 23: 41. https://doi.org/10.1186/s13059-021-02581-y.