Statial
29 October 2024
Contents
1 Installation
# Install the package from Bioconductor
if (!requireNamespace("BiocManager", quietly = TRUE)) {
install.packages("BiocManager")
}
BiocManager::install("Statial")2 Load packages
# Loading required packages
library(Statial)
library(spicyR)
library(ClassifyR)
library(lisaClust)
library(dplyr)
library(SingleCellExperiment)
library(ggplot2)
library(ggsurvfit)
library(survival)
library(tibble)
library(treekoR)
theme_set(theme_classic())
nCores <- 13 Overview
There are over 37 trillion cells in the human body, each taking up different forms and functions. The behaviour of these cells can be described by canonical characteristics, but their functions can also dynamically change based on their environmental context. Understanding the interplay between cells is key to understanding their mechanisms of action and how they contribute to human disease. Statial is a suite of functions to quantify the spatial relationships between cell types. This guide will provide a step-by-step overview of some key functions within Statial.
4 Loading example data
To illustrate the functionality of Statial we will use a multiplexed ion beam imaging by time-of-flight (MIBI-TOF) dataset profiling tissue from triple-negative breast cancer patients\(^1\) by Keren et al., 2018. This dataset simultaneously quantifies in situ expression of 36 proteins in 34 immune rich patients. Note: The data contains some “uninformative” probes and the original cohort included 41 patients.
These images are stored in a SingleCellExperiment object called kerenSCE. This object contains 57811 cells across 10 images and includes information on cell type and patient survival.
Note: The original dataset was reduced down from 41 images to 10 images for the purposes of this vignette, due to size restrictions.
# Load breast cancer
data("kerenSCE")
kerenSCE
#> class: SingleCellExperiment
#> dim: 48 57811
#> metadata(0):
#> assays(1): intensities
#> rownames(48): Na Si ... Ta Au
#> rowData names(0):
#> colnames(57811): 1 2 ... 171281 171282
#> colData names(8): x y ... Survival_days_capped Censored
#> reducedDimNames(0):
#> mainExpName: NULL
#> altExpNames(0):5 Kontextual: Context aware spatial relationships
Kontextual is a method for performing inference on cell localisation which explicitly defines the contexts in which spatial relationships between cells can be identified and interpreted. These contexts may represent landmarks, spatial domains, or groups of functionally similar cells which are consistent across regions. By modelling spatial relationships between cells relative to these contexts, Kontextual produces robust spatial quantifications that are not confounded by biases such as the choice of region to image and the tissue structure present in the images.
In this example we demonstrate how cell type hierarchies can be used as a means to derive appropriate “contexts” for the evaluation of cell localisation. We then demonstrate the types of conclusions which Kontextual enables.
5.1 Using cell type hierarchies to define a “context”
A cell type hierarchy may be used to define the “context” in which cell type relationships are evaluated within. A cell type hierarchy defines how cell types are functionally related to one another. The bottom of the hierarchy represents homogeneous populations of a cell type (child), the cell populations at the nodes of the hierarchy represent broader parent populations with shared generalised function. For example CD4 T cells may be considered a child population to the Immune parent population.
There are two ways to define the cell type hierarchy. First, they can be defined based on our biological understanding of the cell types. We can represent this by creating a named list containing the names of each parent and the associated vector of child cell types.
Note: The all vector must be created to include cell types which do not have a parent e.g. the undefined cell type in this data set.
# Examine all cell types in image
unique(kerenSCE$cellType)
#> [1] "Keratin_Tumour" "CD3_Cell" "B" "CD4_Cell"
#> [5] "Dc/Mono" "Unidentified" "Macrophages" "CD8_Cell"
#> [9] "other immune" "Endothelial" "Mono/Neu" "Mesenchymal"
#> [13] "Neutrophils" "NK" "Tumour" "DC"
#> [17] "Tregs"
# Named list of parents and their child cell types
biologicalHierarchy = list(
"tumour" = c("Keratin_Tumour", "Tumour"),
"tcells" = c("CD3_Cell", "CD4_Cell", "CD8_Cell", "Tregs"),
"myeloid" = c("Dc/Mono", "DC", "Mono/Neu", "Macrophages", "Neutrophils"),
"tissue" = c("Endothelial", "Mesenchymal")
)
# Adding more broader immune parent populationse
biologicalHierarchy$immune = c(biologicalHierarchy$bcells,
biologicalHierarchy$tcells,
biologicalHierarchy$myeloid,
"NK", "other immune", "B")
# Creating a vector for all cellTypes
all <- unique(kerenSCE$cellType)Alternatively, you can use the treeKor bioconductor package treekoR to define these hierarchies in a data driven way.
Note: These parent populations may not be accurate as we are using a small subset of the data.
# Calculate hierarchy using treekoR
kerenTree <- treekoR::getClusterTree(t(assay(kerenSCE, "intensities")),
kerenSCE$cellType,
hierarchy_method="hopach",
hopach_K = 1)
# Convert treekoR result to a name list of parents and children.
treekorParents = getParentPhylo(kerenTree)
treekorParents
#> $parent_1
#> [1] "Dc/Mono" "Macrophages" "NK"
#>
#> $parent_2
#> [1] "CD3_Cell" "B" "CD4_Cell" "CD8_Cell" "Tregs"
#>
#> $parent_3
#> [1] "Endothelial" "Mesenchymal" "DC"
#>
#> $parent_4
#> [1] "Unidentified" "other immune" "Mono/Neu" "Neutrophils" "Tumour"5.2 Application on triple negative breast cancer image.
Here we examine an image highlighted in the Keren et al. 2018 manuscript where accounting for context information enables new conclusions. In image 6 of the Keren et al. dataset, we can see that p53+ tumour cells and immune cells are dispersed i.e. these two cell types are not mixing. However we can also see that p53+ tumour cells appear much more localised to immune cells relative to the tumour context (tumour cells and p53+ tumour cells).
# Lets define a new cell type vector
kerenSCE$cellTypeNew <- kerenSCE$cellType
# Select for all cells that express higher than baseline level of p53
p53Pos <- assay(kerenSCE)["p53", ] > -0.300460
# Find p53+ tumour cells
kerenSCE$cellTypeNew[kerenSCE$cellType %in% biologicalHierarchy$tumour] <- "Tumour"
kerenSCE$cellTypeNew[p53Pos & kerenSCE$cellType %in% biologicalHierarchy$tumour] <- "p53_Tumour"
# Group all immune cells under the name "Immune"
kerenSCE$cellTypeNew[kerenSCE$cellType %in% biologicalHierarchy$immune] <- "Immune"
# Plot image 6
kerenSCE |>
colData() |>
as.data.frame() |>
filter(imageID == "6") |>
filter(cellTypeNew %in% c("Immune", "Tumour", "p53_Tumour")) |>
arrange(cellTypeNew) |>
ggplot(aes(x = x, y = y, color = cellTypeNew)) +
geom_point(size = 1) +
scale_colour_manual(values = c("Immune" = "#505050", "p53_Tumour" = "#64BC46", "Tumour" = "#D6D6D6")) +
guides(colour = guide_legend(title = "Cell types", override.aes = list(size = 3)))
Kontextual accepts a SingleCellExperiment object, a single image, or list of images from a SingleCellExperiment object, which gets passed into the cells argument. The two cell types which will be evaluated are specified in the to and from arguments. A parent population must also be specified in the parent argument, note the parent cell population must include the to cell type. The argument r will specify the radius which the cell relationship will be evaluated on. Kontextual supports parallel processing, the number of cores can be specified using the cores argument. Kontextual can take a single value or multiple values for each argument and will test all combinations of the arguments specified.
We can calculate these relationships across all images for a single radius (r = 100). Small radii will examine local spatial relationships, whereas larger radii will examine global spatial relationships.
p53_Kontextual <- Kontextual(
cells = kerenSCE,
r = 100,
from = "Immune",
to = "p53_Tumour",
parent = c("p53_Tumour", "Tumour"),
cellType = "cellTypeNew"
)
p53_Kontextual
#> imageID test original kontextual r inhomL
#> 1 1 Immune__p53_Tumour -16.212016 -1.6815952 100 FALSE
#> 2 14 Immune__p53_Tumour -14.671281 -4.2879138 100 FALSE
#> 3 18 Immune__p53_Tumour -1.953366 0.5795853 100 FALSE
#> 4 21 Immune__p53_Tumour -14.300802 -7.1425133 100 FALSE
#> 5 29 Immune__p53_Tumour -20.728463 -7.0172785 100 FALSE
#> 6 3 Immune__p53_Tumour 1.719549 44.5060581 100 FALSE
#> 7 32 Immune__p53_Tumour -18.174569 -10.8972277 100 FALSE
#> 8 35 Immune__p53_Tumour -75.980619 -66.2395276 100 FALSE
#> 9 5 Immune__p53_Tumour NA NA 100 FALSE
#> 10 6 Immune__p53_Tumour -24.897348 -1.2724241 100 FALSEThe kontextCurve function plots the L-function value and Kontextual values over a range of radii. If the points lie above the red line (expected pattern) then localisation is indicated for that radius, if the points lie below the red line then dispersion is indicated.
As seen in the following plot the L-function produces negative values over a range of radii, indicating that p53+ tumour cells and immune cells are dispersed from one another. However by taking into account the tumour context, Kontextual shows positive values over some radii, indicating localisation between p53+ tumour cells and immune cells.
curves <- kontextCurve(
cells = kerenSCE,
from = "Immune",
to = "p53_Tumour",
parent = c("p53_Tumour", "Tumour"),
rs = seq(50, 510, 50),
image = "6",
cellType = "cellTypeNew",
cores = nCores
)
kontextPlot(curves)
Alternatively all pairwise cell relationships and their corresponding parent in the dataset can be tested. A data frame with all pairwise combinations can be creating using the parentCombinations function. This function takes in a vector of all the cells, as well as the named list of parents and children created earlier in the parentList argument. As shown below the output is a data frame specifying the to, from, and parent arguments for Kontextual.
Note: the output of getPhyloParent may also be using the in the parentList argument, for example if you wanted to use the treekoR defined hierarchy instead.
# Get all relationships between cell types and their parents
parentDf <- parentCombinations(
all = all,
parentList = biologicalHierarchy
)5.3 Calculating all pairwise relationships
Rather than specifying to, from, and parent in Kontextual, the output from parentCombinations can be inputed into Kontextual using the parentDf argument, to examine all pairwise relationships in the dataset. This chunk will take a significant amount of time to run, for demonstration the results have been saved and are loaded in.
# Running Kontextual on all relationships across all images.
kerenKontextual <- Kontextual(
cells = kerenSCE,
parentDf = parentDf,
r = 100,
cores = nCores
)For every pairwise relationship (named accordingly: from__to__parent) Kontextual outputs the L-function values (original) and the Kontextual value. The relationships where the L-function and Kontextual disagree (e.g. one metric is positive and the other is negative) represent relationships where adding context information results in different conclusions on the spatial relationship between the two cell types.
data("kerenKontextual")
head(kerenKontextual, 10)
#> imageID test original kontextual r inhomL
#> 1 1 Keratin_Tumour__B__immune -32.547645 -20.8129718 100 FALSE
#> 2 14 Keratin_Tumour__B__immune NA NA 100 FALSE
#> 3 18 Keratin_Tumour__B__immune -2.879684 -0.4266132 100 FALSE
#> 4 21 Keratin_Tumour__B__immune NA NA 100 FALSE
#> 5 29 Keratin_Tumour__B__immune NA NA 100 FALSE
#> 6 3 Keratin_Tumour__B__immune -36.175444 -15.4940620 100 FALSE
#> 7 32 Keratin_Tumour__B__immune -43.187880 -40.6868426 100 FALSE
#> 8 35 Keratin_Tumour__B__immune -66.782273 -46.2862443 100 FALSE
#> 9 5 Keratin_Tumour__B__immune -68.676955 -46.3064625 100 FALSE
#> 10 6 Keratin_Tumour__B__immune -31.393046 -0.4636465 100 FALSE5.4 Associating the relationships with survival outcomes.
To examine whether the features obtained from Statial are associated with patient outcomes or groupings, we can use the spicy function from the spicyR package. spicy requires the SingleCellExperiment object being used to contain a column called survival.
# add survival column to kerenSCE
kerenSCE$event = 1 - kerenSCE$Censored
kerenSCE$survival = Surv(kerenSCE$Survival_days_capped, kerenSCE$event)In addition to this, the Kontextual results must be converted from a data.frame to a wide matrix, this can be done using prepMatrix. Note, to extract the original L-function values, specify column = "original" in prepMatrix.
# Converting Kontextual result into data matrix
kontextMat <- prepMatrix(kerenKontextual)
# Ensuring rownames of kontextMat match up with the image IDs of the SCE object
kontextMat <- kontextMat[kerenSCE$imageID |> unique(), ]
# Replace NAs with 0
kontextMat[is.na(kontextMat)] <- 0Finally, both the SingleCellExperiment object and the Kontextual matrix are passed into the spicy function, with condition = "survival". The resulting coefficients and p values can be obtained by accessing the survivalResults name.
Note: You can specify additional covariates and include a subject id for mixed effects survival modelling, see \code{ for more information.
# Running survival analysis
survivalResults = spicy(cells = kerenSCE,
alternateResult = kontextMat,
condition = "survival",
weights = TRUE)
head(survivalResults$survivalResults, 10)
#> # A tibble: 10 × 4
#> test coef se.coef p.value
#> <chr> <dbl> <dbl> <dbl>
#> 1 DC__NK__immune -0.209 283. 2.95e-178
#> 2 NK__DC__immune -0.209 285. 3.81e-176
#> 3 NK__DC__myeloid -0.209 285. 3.81e-176
#> 4 NK__Tumour__tumour -0.204 233. 1.20e-151
#> 5 Tumour__NK__immune -0.232 303. 1.68e-127
#> 6 CD4_Cell__Tumour__tumour -0.189 188. 8.17e-125
#> 7 other immune__Tumour__tumour -1.84 387. 4.79e-100
#> 8 Tumour__CD4_Cell__immune -0.271 306. 9.86e- 87
#> 9 Tumour__CD3_Cell__immune -0.709 264. 2.35e- 73
#> 10 other immune__DC__immune -1.39 396. 1.77e- 67The survival results can also be visualised using the signifPlot function.
signifPlot(survivalResults)
As we can see from the results DC__NK__immune is the one of the most significant pairwise relationship which contributes to patient survival. That is the relationship between dendritic cells and natural killer cells, relative to the parent population of immune cells. We can see that there is a negative coefficient associated with this relationship, which tells us an increase in localisation of these cell types relative to immune cells leads to better survival outcomes for patients.
The association between DC__NK__immune and survival can also be visualised on a Kaplan-Meier curve. First, we extract survival data from the SingleCellExperiment object and create a survival vector.
# Extracting survival data
survData <- kerenSCE |>
colData() |>
data.frame() |>
select(imageID, survival) |>
unique()
# Creating survival vector
kerenSurv <- survData$survival
names(kerenSurv) <- survData$imageID
kerenSurv
#> 1 3 5 6 14 18 21 29 32 35
#> 2612 3130+ 1683+ 2275+ 4145+ 5063+ 635 1319 1568+ 2759+Next, we extract the Kontextual values of this relationship across all images. We then determine if dendritic and natural killer cells are relatively attracted or avoiding in each image by comparing the Kontextual value in each image to the median Kontextual value.
Finally, we plot a Kaplan-Meier curve using the ggsurvfit package. As shown below, when dendritic and natural killer cells are more localised to one another relative to the immune cell population, patients tend to have better survival outcomes.
# Selecting most significant relationship
survRelationship <- kontextMat[["DC__NK__immune"]]
survRelationship <- ifelse(survRelationship > median(survRelationship), "Localised", "Dispersed")
# Plotting Kaplan-Meier curve
survfit2(kerenSurv ~ survRelationship) |>
ggsurvfit() +
ggtitle("DC__NK__immune")
6 SpatioMark: Identifying continuous changes in cell state
Changes in cell states can be analytically framed as the change in abundance of a gene or protein within a particular cell type. We can use marker expression to identify and quantify evidence of cell interactions that catalyse cell state changes. This approach measures how protein markers in a cell change with spatial proximity and abundance to other cell types. The methods utilised here will thereby provide a framework to explore how the dynamic behaviour of cells are altered by the agents they are surrounded by.
6.1 Continuous cell state changes within a single image
The first step in analysing these changes is to calculate the spatial proximity (getDistances) and abundance (getAbundances) of each cell to every cell type. These values will then be stored in the reducedDims slot of the SingleCellExperiment object under the names distances and abundances respectively.
kerenSCE <- getDistances(kerenSCE,
maxDist = 200,
nCores = 1
)
kerenSCE <- getAbundances(kerenSCE,
r = 200,
nCores = 1
)First, let’s examine the same effect observed earlier with Kontextual - the localisation between p53-positive keratin/tumour cells and macrophages in the context of total keratin/tumour cells for image 6 of the Keren et al. dataset.
Statial provides two main functions to assess this relationship - calcStateChanges and plotStateChanges. We can use calcStateChanges to examine the relationship between 2 cell types for 1 marker in a specific image. In this case, we’re examining the relationship between keratin/tumour cells (from = Keratin_Tumour) and macrophages (to = "Macrophages") for the marker p53 (marker = "p53") in image = "6". We can appreciate that the fdr statistic for this relationship is significant, with a negative tvalue, indicating that the expression of p53 in keratin/tumour cells decreases as distance from macrophages increases.
stateChanges <- calcStateChanges(
cells = kerenSCE,
type = "distances",
image = "6",
from = "Keratin_Tumour",
to = "Macrophages",
marker = "p53",
nCores = 1
)
stateChanges
#> imageID primaryCellType otherCellType marker coef tval
#> 1 6 Keratin_Tumour Macrophages p53 -0.001402178 -7.010113
#> pval fdr
#> 1 2.868257e-12 2.868257e-12Statial also provides a convenient function for visualising this interaction - plotStateChanges. Here, again we can specify image = 6 and our main cell types of interest, keratin/tumour cells and macrophages, and our marker p53, in the same format as calcStateChanges.
Through this analysis, we can observe that keratin/tumour cells closer to a group of macrophages tend to have higher expression of p53, as observed in the first graph. This relationship is quantified with the second graph, showing an overall decrease of p53 expression in keratin/tumour cells as distance to macrophages increase.
These results allow us to essentially arrive at the same result as Kontextual, which calculated a localisation between p53+ keratin/tumour cells and macrophages in the wider context of keratin/tumour cells.
p <- plotStateChanges(
cells = kerenSCE,
type = "distances",
image = "6",
from = "Keratin_Tumour",
to = "Macrophages",
marker = "p53",
size = 1,
shape = 19,
interactive = FALSE,
plotModelFit = FALSE,
method = "lm"
)
p
#> $image
#>
#> $scatter
6.2 Continuous cell state changes across all images
Beyond looking at single cell-to-cell interactions for a single image, we can also look at all interactions across all images. The calcStateChanges function provided by Statial can be expanded for this exact purpose - by not specifying cell types, a marker, or an image, calcStateChanges will examine the most significant correlations between distance and marker expression across the entire dataset. Here, we’ve filtered out the most significant interactions to only include those found within image 6 of the Keren et al. dataset.
stateChanges <- calcStateChanges(
cells = kerenSCE,
type = "distances",
nCores = 1,
minCells = 100
)
stateChanges |>
filter(imageID == 6) |>
head(n = 10)
#> imageID primaryCellType otherCellType marker coef tval
#> 1 6 Keratin_Tumour Unidentified Na 0.004218419 25.03039
#> 2 6 Keratin_Tumour Macrophages HLA_Class_1 -0.003823497 -24.69629
#> 3 6 Keratin_Tumour CD4_Cell HLA_Class_1 -0.003582774 -23.87797
#> 4 6 Keratin_Tumour Unidentified Beta.catenin 0.005893120 23.41953
#> 5 6 Keratin_Tumour CD8_Cell HLA_Class_1 -0.003154544 -23.13804
#> 6 6 Keratin_Tumour Dc/Mono HLA_Class_1 -0.003353834 -22.98944
#> 7 6 Keratin_Tumour CD3_Cell HLA_Class_1 -0.003123446 -22.63197
#> 8 6 Keratin_Tumour Tumour HLA_Class_1 0.003684079 21.94265
#> 9 6 Keratin_Tumour CD4_Cell Fe -0.003457338 -21.43550
#> 10 6 Keratin_Tumour CD4_Cell phospho.S6 -0.002892457 -20.50767
#> pval fdr
#> 1 6.971648e-127 1.176442e-123
#> 2 7.814253e-124 1.236215e-120
#> 3 1.745242e-116 2.208779e-113
#> 4 1.917245e-112 2.257178e-109
#> 5 5.444541e-110 5.991836e-107
#> 6 1.053130e-108 1.110701e-105
#> 7 1.237988e-105 1.205229e-102
#> 8 8.188258e-100 7.025803e-97
#> 9 1.287478e-95 9.727951e-93
#> 10 3.928912e-88 2.583081e-85In image 6, the majority of the top 10 most significant interactions occur between keratin/tumour cells and an immune population, and many of these interactions appear to involve the HLA class I ligand.
We can examine some of these interactions further with the plotStateChanges function. Taking a closer examination of the relationship between macrophages and keratin/tumour HLA class I expression, the plot below shows us a clear visual correlation - as macrophage density increases, keratin/tumour cells increase their expression HLA class I.
Biologically, HLA Class I is a ligand which exists on all nucleated cells, tasked with presenting internal cell antigens for recognition by the immune system, marking aberrant cells for destruction by either CD8+ T cells or NK cells.
p <- plotStateChanges(
cells = kerenSCE,
type = "distances",
image = "6",
from = "Keratin_Tumour",
to = "Macrophages",
marker = "HLA_Class_1",
size = 1,
shape = 19,
interactive = FALSE,
plotModelFit = FALSE,
method = "lm"
)
p
#> $image
#>
#> $scatter
Next, let’s take a look at the top 10 most significant results across all images.
stateChanges |> head(n = 10)
#> imageID primaryCellType otherCellType marker coef tval
#> 8674 35 CD4_Cell B CD20 -0.029185750 -40.57355
#> 8770 35 CD4_Cell Dc/Mono CD20 0.019125946 40.53436
#> 1819 35 B Dc/Mono phospho.S6 0.005282065 40.41385
#> 8779 35 CD4_Cell Dc/Mono phospho.S6 0.004033218 34.72882
#> 1813 35 B Dc/Mono HLA.DR 0.011120703 34.15344
#> 1971 35 B other immune P 0.011182182 34.14375
#> 8626 35 CD4_Cell CD3_Cell CD20 0.016349492 33.91901
#> 1816 35 B Dc/Mono H3K9ac 0.005096632 33.99856
#> 2011 35 B other immune phospho.S6 0.005986586 33.66466
#> 1818 35 B Dc/Mono H3K27me3 0.006980810 33.22740
#> pval fdr
#> 8674 7.019343e-282 3.553472e-277
#> 8770 1.891267e-281 4.787176e-277
#> 1819 5.306590e-278 8.954694e-274
#> 8779 4.519947e-219 5.720445e-215
#> 1813 8.401034e-212 8.505879e-208
#> 1971 1.056403e-211 8.913225e-208
#> 8626 1.219488e-210 8.819335e-207
#> 1816 3.266533e-210 2.067062e-206
#> 2011 8.545691e-207 4.806856e-203
#> 1818 2.438769e-202 1.234603e-198Immediately, we can appreciate that a couple of these interactions are not biologically plausible. One of the most significant interactions occurs between B cells and CD4 T cells in image 35, where CD4 T cells are found to increase in CD20 expression when in close proximity to B cells. Biologically, CD20 is a highly specific ligand for B cells, and under healthy circumstances are usually not expressed in T cells.
Could this potentially be an artefact of calcStateChanges? We can examine the image through the plotStateChanges function, where we indeed observe a strong increase in CD20 expression in T cells nearby B cell populations.
p <- plotStateChanges(
cells = kerenSCE,
type = "distances",
image = "35",
from = "CD4_Cell",
to = "B",
marker = "CD20",
size = 1,
shape = 19,
interactive = FALSE,
plotModelFit = FALSE,
method = "lm"
)
p
#> $image
#>
#> $scatter
So why are T cells expressing CD20? This brings us to a key problem of cell segmentation - contamination.
6.3 Contamination (Lateral marker spill over)
Contamination, or lateral marker spill over is an issue that results in a cell’s marker expressions being wrongly attributed to another adjacent cell. This issue arises from incorrect segmentation where components of one cell are wrongly determined as belonging to another cell. Alternatively, this issue can arise when antibodies used to tag and measure marker expressions don’t latch on properly to a cell of interest, thereby resulting in residual markers being wrongly assigned as belonging to a cell near the intended target cell. It is important that we either correct or account for this incorrect attribution of markers in our modelling process. This is critical in understanding whether significant cell-cell interactions detected are an artefact of technical measurement errors driven by spill over or are real biological changes that represent a shift in a cell’s state.
To circumvent this problem, Statial provides a function that predicts the probability that a cell is any particular cell type - calcContamination. calcContamination returns a dataframe of probabilities demarcating the chance of a cell being any particular cell type. This dataframe is stored under contaminations in the reducedDim slot of the SingleCellExperiment object. It also provides the rfMainCellProb column, which provides the probability that a cell is indeed the cell type it has been designated. E.g. For a cell designated as CD8, rfMainCellProb could give a 80% chance that the cell is indeed CD8, due to contamination.
We can then introduce these probabilities as covariates into our linear model by setting contamination = TRUE as a parameter in our calcStateChanges function. However, this is not a perfect solution for the issue of contamination. As we can see, despite factoring in contamination into our linear model, the correlation between B cell density and CD20 expression in CD4 T cells remains one of the most significant interactions in our model.
kerenSCE <- calcContamination(kerenSCE)
stateChangesCorrected <- calcStateChanges(
cells = kerenSCE,
type = "distances",
nCores = 1,
minCells = 100,
contamination = TRUE
)
stateChangesCorrected |> head(n = 20)
#> imageID primaryCellType otherCellType marker coef tval
#> 8674 35 CD4_Cell B CD20 -0.024591332 -34.92898
#> 8770 35 CD4_Cell Dc/Mono CD20 0.015756172 33.40340
#> 1819 35 B Dc/Mono phospho.S6 0.004282060 29.64226
#> 29188 3 Keratin_Tumour DC Ca -0.014264271 -29.94940
#> 8779 35 CD4_Cell Dc/Mono phospho.S6 0.003516401 29.06326
#> 8626 35 CD4_Cell CD3_Cell CD20 0.013274257 28.62303
#> 8629 35 CD4_Cell CD3_Cell HLA.DR 0.010008302 28.14119
#> 1669 35 B CD3_Cell HLA.DR 0.008842121 25.22235
#> 27641 21 Keratin_Tumour DC Pan.Keratin -0.005916008 -24.55209
#> 8763 35 CD4_Cell Dc/Mono CSF.1R 0.008580093 25.00903
#> 2011 35 B other immune phospho.S6 0.004617914 25.04611
#> 31825 6 Keratin_Tumour Unidentified Na 0.004221158 24.69088
#> 1813 35 B Dc/Mono HLA.DR 0.008783325 24.98773
#> 1971 35 B other immune P 0.007682044 24.02835
#> 8635 35 CD4_Cell CD3_Cell phospho.S6 0.002844040 23.91882
#> 2008 35 B other immune H3K9ac 0.004756252 23.84249
#> 1675 35 B CD3_Cell phospho.S6 0.003589818 23.71578
#> 29186 3 Keratin_Tumour DC Si -0.005844566 -23.85627
#> 1816 35 B Dc/Mono H3K9ac 0.003782100 23.19716
#> 31774 6 Keratin_Tumour CD4_Cell HLA_Class_1 -0.003241798 -22.47875
#> pval fdr
#> 8674 5.919431e-221 2.996653e-216
#> 8770 3.956080e-205 1.001363e-200
#> 1819 1.202364e-166 2.028949e-162
#> 29188 6.092051e-166 7.710100e-162
#> 8779 7.473499e-162 7.566768e-158
#> 8626 1.247190e-157 1.052296e-153
#> 8629 4.764395e-153 3.445611e-149
#> 1669 8.869100e-126 5.612366e-122
#> 27641 2.318788e-125 1.304292e-121
#> 8763 2.338837e-124 1.184013e-120
#> 2011 3.151924e-124 1.450573e-120
#> 31825 9.738986e-124 3.992602e-120
#> 1813 1.025281e-123 3.992602e-120
#> 1971 2.099973e-115 7.593503e-112
#> 8635 7.391159e-115 2.494467e-111
#> 2008 8.104160e-114 2.564156e-110
#> 1675 9.676536e-113 2.881559e-109
#> 29186 3.149812e-112 8.858671e-109
#> 1816 2.267063e-108 6.040410e-105
#> 31774 2.697964e-104 6.829087e-101However, this does not mean factoring in contamination into our linear model was ineffective.
Whilst our correction attempts do not rectify every relationship which arises due to contamination, we show that a significant portion of these relationships are rectified. We can show this by plotting a ROC curve of true positives against false positives. In general, cell type specific markers such as CD4, CD8, and CD20 should not change in cells they are not specific to. Therefore, relationships detected to be significant involving these cell type markers are likely false positives and will be treated as such for the purposes of evaluation. Meanwhile, cell state markers are predominantly likely to be true positives.
Plotting the relationship between false positives and true positives, we’d expect the contamination correction to be greatest in the relationships with the top 100 lowest p values, where we indeed see more true positives than false positives with contamination correction.
cellTypeMarkers <- c("CD3", "CD4", "CD8", "CD56", "CD11c", "CD68", "CD45", "CD20")
values <- c("blue", "red")
names(values) <- c("None", "Corrected")
df <- rbind(
data.frame(TP = cumsum(stateChanges$marker %in% cellTypeMarkers), FP = cumsum(!stateChanges$marker %in% cellTypeMarkers), type = "None"),
data.frame(TP = cumsum(stateChangesCorrected$marker %in% cellTypeMarkers), FP = cumsum(!stateChangesCorrected$marker %in% cellTypeMarkers), type = "Corrected")
)
ggplot(df, aes(x = TP, y = FP, colour = type)) +
geom_line() +
labs(y = "Cell state marker", x = "Cell type marker") +
scale_colour_manual(values = values)
Here, we zoom in on the ROC curve where the top 100 lowest p values occur, where we indeed see more true positives than false positives with contamination correction.
ggplot(df, aes(x = TP, y = FP, colour = type)) +
geom_line() +
xlim(0, 100) +
ylim(0, 1000) +
labs(y = "Cell state marker", x = "Cell type marker") +
scale_colour_manual(values = values)
6.4 Associate continuous state changes with survival outcomes
Similiar to Kontextual, we can run a similar survival analysis using our state changes results. Here, prepMatrix extracts the coefficients, or the coef column of stateChanges by default. To use the t values instead, specify column = "tval" in the prepMatrix function.
# Preparing features for Statial
stateMat <- prepMatrix(stateChanges)
# Ensuring rownames of stateMat match up with rownames of the survival vector
stateMat <- stateMat[names(kerenSurv), ]
# Remove some very small values
stateMat <- stateMat[, colMeans(abs(stateMat) > 0.0001) > .8]
survivalResults <- colTest(stateMat, kerenSurv, type = "survival")
head(survivalResults)
#> coef se.coef pval adjPval
#> Keratin_Tumour__CD8_Cell__Vimentin 48000 3800 0.000 0.00
#> Keratin_Tumour__Dc/Mono__SMA 700 380 0.065 0.95
#> Keratin_Tumour__other immune__Ki67 1600 880 0.065 0.95
#> Macrophages__CD4_Cell__H3K27me3 1100 600 0.070 0.95
#> Macrophages__CD8_Cell__Ca 960 540 0.077 0.95
#> Macrophages__Keratin_Tumour__P -170 99 0.079 0.95
#> cluster
#> Keratin_Tumour__CD8_Cell__Vimentin Keratin_Tumour__CD8_Cell__Vimentin
#> Keratin_Tumour__Dc/Mono__SMA Keratin_Tumour__Dc/Mono__SMA
#> Keratin_Tumour__other immune__Ki67 Keratin_Tumour__other immune__Ki67
#> Macrophages__CD4_Cell__H3K27me3 Macrophages__CD4_Cell__H3K27me3
#> Macrophages__CD8_Cell__Ca Macrophages__CD8_Cell__Ca
#> Macrophages__Keratin_Tumour__P Macrophages__Keratin_Tumour__PFor our state changes results, Keratin_Tumour__CD4_Cell__Keratin6 is the most significant pairwise relationship which contributes to patient survival. That is, the relationship between HLA class I expression in keratin/tumour cells and their spatial proximity to mesenchymal cells. As there is a negative coeffcient associated with this relationship, which tells us that higher HLA class I expression in keratin/tumour cells nearby mesenchymal cell populations lead to poorer survival outcomes for patients.
# Selecting the most significant relationship
survRelationship <- stateMat[["Keratin_Tumour__CD4_Cell__Keratin6"]]
survRelationship <- ifelse(survRelationship > median(survRelationship), "Higher expression in close cells", "Lower expression in close cells")
# Plotting Kaplan-Meier curve
survfit2(kerenSurv ~ survRelationship) |>
ggsurvfit() +
add_pvalue() +
ggtitle("Keratin_Tumour__CD4_Cell__Keratin6")
7 Region analysis using lisaClust
Next we can cluster areas with similar spatial interactions to identify regions using lisaClust. Here we set k = 5 to identify 5 regions.
set.seed(51773)
# Preparing features for lisaClust
kerenSCE <- lisaClust::lisaClust(kerenSCE, k = 5)The regions identified by licaClust can be visualised using the hatchingPlot function.
# Use hatching to visualise regions and cell types.
lisaClust::hatchingPlot(kerenSCE,
useImages = "5",
line.spacing = 41, # spacing of lines
nbp = 100 # smoothness of lines
)
8 Marker Means
Statial provides functionality to identify the average marker expression of a given cell type in a given region, using the getMarkerMeans function. Similar to the analysis above, these features can also be used for survival analysis.
cellTypeRegionMeans <- getMarkerMeans(kerenSCE,
imageID = "imageID",
cellType = "cellType",
region = "region"
)
survivalResults <- colTest(cellTypeRegionMeans[names(kerenSurv), ], kerenSurv, type = "survival")
head(survivalResults)
#> coef se.coef pval adjPval
#> IDO__CD4_Cell__region_4 -140 9.2 0.0e+00 0.0e+00
#> CD20__DC__region_3 -6800 200.0 0.0e+00 0.0e+00
#> p53__CD4_Cell__region_5 -980 160.0 8.7e-10 1.1e-06
#> Lag3__Keratin_Tumour__region_4 -5500 950.0 8.7e-09 7.4e-06
#> CD45RO__Endothelial__region_4 -150 27.0 9.5e-09 7.4e-06
#> CD31__Mono/Neu__region_4 -570 110.0 1.6e-07 1.0e-04
#> cluster
#> IDO__CD4_Cell__region_4 IDO__CD4_Cell__region_4
#> CD20__DC__region_3 CD20__DC__region_3
#> p53__CD4_Cell__region_5 p53__CD4_Cell__region_5
#> Lag3__Keratin_Tumour__region_4 Lag3__Keratin_Tumour__region_4
#> CD45RO__Endothelial__region_4 CD45RO__Endothelial__region_4
#> CD31__Mono/Neu__region_4 CD31__Mono/Neu__region_49 Patient classification
Finally we demonstrate how we can use ClassifyR to perform patient classification with the features generated from Statial. In addition to the kontextual, state changes, and marker means values, we also calculate cell type proportions and region proportions using the getProp function in spicyR. Here we perform 3 fold cross validation with 10 repeats, using a CoxPH model for survival classification, feature selection is also performed by selecting the top 10 features per fold using a CoxPH model.
# Calculate cell type and region proportions
cellTypeProp <- getProp(kerenSCE,
feature = "cellType",
imageID = "imageID"
)
regionProp <- getProp(kerenSCE,
feature = "region",
imageID = "imageID"
)
# Combine all the features into a list for classification
featureList <- list(
states = stateMat,
kontextual = kontextMat,
regionMarkerMeans = cellTypeRegionMeans,
cellTypeProp = cellTypeProp,
regionProp = regionProp
)
# Ensure the rownames of the features match the order of the survival vector
featureList <- lapply(featureList, function(x) x[names(kerenSurv), ])
set.seed(51773)
kerenCV <- crossValidate(
measurements = featureList,
outcome = kerenSurv,
classifier = "CoxPH",
selectionMethod = "CoxPH",
nFolds = 5,
nFeatures = 10,
nRepeats = 20,
nCores = 1
)Here, we use the performancePlot function to assess the C-index from each repeat of the 3-fold cross-validation. We can see the resulting C-indexes are very variable due to the dataset only containing 10 images.
# Calculate AUC for each cross-validation repeat and plot.
performancePlot(kerenCV,
characteristicsList = list(x = "Assay Name")
) +
theme(axis.text.x = element_text(angle = 45, vjust = 1, hjust = 1))
10 References
Appendix
Keren, L., Bosse, M., Marquez, D., Angoshtari, R., Jain, S., Varma, S., Yang, S. R., Kurian, A., Van Valen, D., West, R., Bendall, S. C., & Angelo, M. (2018). A Structured Tumor-Immune Microenvironment in Triple Negative Breast Cancer Revealed by Multiplexed Ion Beam Imaging. Cell, 174(6), 1373-1387.e1319. (DOI)
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#> tzcode source: system (glibc)
#>
#> attached base packages:
#> [1] stats4 stats graphics grDevices utils datasets methods
#> [8] base
#>
#> other attached packages:
#> [1] treekoR_1.14.0 tibble_3.2.1
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