GeneExpressionSignature 1.44.0
The GeneExpressionSignature package utilizes gene expression profiles to measure the similarity between different biological states. It provides two algorithms for similarity measurement: the GSEA algorithm which is mentioned in (Iorio et al. 2010) and the PGSEA algorithm in PGSEA package. A further description of the measurement methods based on gene expression signature can be found in Lamb (Lamb et al. 2006), Hu (Hu and Agarwal 2009) and Iorio (Iorio et al. 2010).
This manual is a brief introduction to structure, functions and usage of GeneExpressionSignature package. It shows how the biological similarity is determined through a series of calculation steps and how that information can be used for further cluster analysis.
The current version of GeneExpressionSignature can be used only with data coming from the same platform, examples are on the HG-U133A platform.
A complete analysis procedure accepts a set of gene expression profiles representing different biological states as input, and generates a similarity matrix as output. It can be divided into three steps: 1)data ranking, 2)rank merging, and 3)similarity measuring.
First, we load the package by entering the following command in your R session:
library(GeneExpressionSignature)
Gene expression profiles should be properly preprocessed before analysis as
prerequisite, including background correction, normalization and summarization.
Instead of the exact values, ranks of gene expression levels are used in the
following procedure. A ranked list of genes was obtained first by sorting the
micro-array probe-set identifiers according to the different expression
values (count or ratio). It should be noticed that there is no standard methods
for data preprocessing, and there is a function getRLs()
which takes the
method in C-MAP for data preprocessing just for reference. We can obtain ranked
lists matrix by calling getRLs()
.
Your experimental data could be used for analyzing, or users can download gene-expression profiles from the GEO database with R package GEOquery. Users can see the doc in the GEOquery for more details.
As an example, we download data from GEO database with package GEOquery. Then combined the treatment expression values to form a treatment matrix as well as the control expression values.
# If you have network access
#GSM118720 <- getGEO('GSM118720')
# GSM118721 <- getGEO('GSM118721')
if (require(GEOquery)){
#treatment gene-expression profiles
GSM118720 <- getGEO(
filename = system.file(
"extdata/GSM118720.soft",
package = "GeneExpressionSignature")
)
#control gene-expression profiles
GSM118721 <- getGEO(
filename=system.file(
"extdata/GSM118721.soft",
package = "GeneExpressionSignature")
)
#data ranking according to the different expression values
control <- as.matrix(as.numeric(Table(GSM118721)[, 2]))
treatment <- as.matrix(as.numeric(Table(GSM118720)[, 2]))
ranked_list <- getRLs(control, treatment)
}
By rank merging, multiple ranked lists are merging into a single ranked list, referred as prototype ranked list (PRL), representing certain kind of biological state. This procedure is mainly performed before similarity measuring, and applied to specific situations that occur when multiple ranked list are assigned to one single biological state with different cell types or experimental condition.
However, two different cases should be considered: 1) all ranked list with the
same biological state are treated equally important; 2) each individual ranked
lists has its own ranked weights. This package provides two commonly employed
algorithms: one utilizes the Kruskal algorithm proposed by Iorio
(Iorio et al. 2010) for the former case and another takes the average ranking
technique a simple but rather useful method. Function RankMering()
is provided
for aggregating the ranked lists into one or many PRLs according their
phenotypic data. All the things that we need to do is construct a ExpressionSet
object as input, with ranked lists as assay data and corresponding biological
states as phenotypic data.
For convenience, ranking data stored as ExpressionSet
class in eset
object
as input data, with ranked lists (obtained by calling getRLs()
) as assay data
and corresponding biological states as phenotypic data. As an example, we start
from loading cultured the exampleSet data, a subset of C-MAP
(Lamb et al. 2006) as sample data, which is a large reference catalogue of
gene expression data from cultured human cells perturbed with many chemicals
and genetic reagents. The sub dataset is composed of 50 paired gene expression
profiles involving 22283 genes. This profiles are obtained from cells treated
15 compounds respectively, the values of which already converted to rank orders.
data(exampleSet)
show(exampleSet)
#> ExpressionSet (storageMode: lockedEnvironment)
#> assayData: 22283 features, 50 samples
#> element names: exprs
#> protocolData: none
#> phenoData
#> sampleNames: 1 2 ... 50 (50 total)
#> varLabels: state
#> varMetadata: labelDescription
#> featureData: none
#> experimentData: use 'experimentData(object)'
#> Annotation:
exprs(exampleSet)[c(1:10), c(1:3)]
#> 1 2 3
#> 1 11264 14408 13919
#> 2 12746 12365 3080
#> 3 8267 5630 13060
#> 4 2193 16694 16084
#> 5 9556 6044 8294
#> 6 279 5120 4826
#> 7 15381 10225 10883
#> 8 9452 10777 13359
#> 9 6149 6213 6800
#> 10 4943 12760 3444
levels(as(phenoData(exampleSet), "data.frame")[, 1])
#> [1] "alsterpaullone" "azacitidine" "camptothecin" "chrysin"
#> [5] "daunorubicin" "doxorubicin" "ellipticine" "etacrynic_acid"
#> [9] "fisetin" "harmine" "luteolin" "mitoxantrone"
#> [13] "parthenolide" "staurosporine" "thiostrepton"
Rank merging process will generate a mergingSet of 15 PRLs from 50 paired expression profiles with each PRL corresponding one of 15 compounds respectively.
MergingSet <- RankMerging(exampleSet, "Spearman", weighted = TRUE)
show(MergingSet)
#> ExpressionSet (storageMode: lockedEnvironment)
#> assayData: 22283 features, 15 samples
#> element names: exprs
#> protocolData: none
#> phenoData
#> sampleNames: alsterpaullone azacitidine ... thiostrepton (15 total)
#> varLabels: state
#> varMetadata: labelDescription
#> featureData: none
#> experimentData: use 'experimentData(object)'
#> Annotation:
One single combined PRL for a state was obtained after rank merging procedure.
These PRLs are used to measure the similarity of the gene signature across
different biological states by scoring functions ScoreGSEA()
and
ScorePGSEA()
. Not all the genes are involved in similarity measuring, but
only a subset of genes called gene signature whose combined expression pattern
is uniquely characteristic of the biological state. Generally the genes used as
gene signatures in the similarity scoring procedure are predefined by priori
knowledge. Iorio (Iorio et al. 2010) proposed an “optimal signature”
approach by taking the most up-regulated genes and the most down-regulated
genes as gene signature.The size of gene signatures need to be considered, which
is taken as another parameter besides the PRLs in similarity measuring. In most
cases, the default size of gene signature is 250 for genome-wide expression
profile.
Suppose N
is the number of PRLs (also same as the number of biological states),
an N x N
distance matrix is generated by similarity measurement. For mergingSet,
we will get a 15 x 15
matrix corresponding to the similarity distances
between these compounds.
ds <- ScoreGSEA(MergingSet, 250, "avg")
ds[1:5, 1:5]
#> alsterpaullone azacitidine camptothecin chrysin daunorubicin
#> alsterpaullone 0.0000000 0.6176992 0.4669311 0.6896005 0.5288110
#> azacitidine 0.6176992 0.0000000 0.6125031 0.8515960 0.6413233
#> camptothecin 0.4669311 0.6125031 0.0000000 0.7897938 0.5372661
#> chrysin 0.6896005 0.8515960 0.7897938 0.0000000 0.7443612
#> daunorubicin 0.5288110 0.6413233 0.5372661 0.7443612 0.0000000
As we mentioned above, four algorithms implemented as functions getRLs()
,
RankMerging()
, ScoreGSEA()
, and ScorePGSEA()
, one is for data
preprocessing, one called Iorio algorithm is for rank merging, the other two
algorithms called GSEA and PGSEA are for similarity measuring. Moreover,
function SignatureDistance()
is provided to serve as a single entry and easy
access point to rank merging and similarity measuring, which runs through the
including rank merging and scoring, and is recommended to use in most cases.
Data ranking is not integration into this function for no standard methods for
data preprocessing and gene-expression data types is uncertain. Furthermore,
there is no effective method to integrate data from different platforms.
Function getRLs()
which takes the method in C-MAP for data preprocessing just
for reference.
SignatureDistance(
exampleSet,
SignatureLength = 250,
MergingDistance = "Spearman",
ScoringMethod = "GSEA",
ScoringDistance = "avg",
weighted = TRUE
)
#> alsterpaullone azacitidine camptothecin chrysin daunorubicin
#> alsterpaullone 0.0000000 0.6176992 0.4669311 0.6896005 0.5288110
#> azacitidine 0.6176992 0.0000000 0.6125031 0.8515960 0.6413233
#> camptothecin 0.4669311 0.6125031 0.0000000 0.7897938 0.5372661
#> chrysin 0.6896005 0.8515960 0.7897938 0.0000000 0.7443612
#> daunorubicin 0.5288110 0.6413233 0.5372661 0.7443612 0.0000000
#> doxorubicin 0.4449537 0.6223770 0.5590938 0.8152383 0.4805674
#> ellipticine 0.6147176 0.6958627 0.6060621 0.8399921 0.6013995
#> etacrynic_acid 0.9546259 0.9625380 0.9150898 0.8846840 0.9174653
#> fisetin 0.6191321 0.7401457 0.7258576 0.9056164 0.7204894
#> harmine 0.7381854 0.9011707 0.8082408 0.6264392 0.7486181
#> luteolin 0.6601723 0.8357249 0.6559045 0.4627429 0.6882700
#> mitoxantrone 0.5351687 0.6326825 0.6586904 0.8367069 0.5450045
#> parthenolide 0.9183664 0.8581793 0.8943531 0.8865647 0.8487120
#> staurosporine 0.6984201 0.6982204 0.7120952 0.9037265 0.7625792
#> thiostrepton 0.9258501 0.8624173 0.8523135 0.9235488 0.8449146
#> doxorubicin ellipticine etacrynic_acid fisetin harmine
#> alsterpaullone 0.4449537 0.6147176 0.9546259 0.6191321 0.7381854
#> azacitidine 0.6223770 0.6958627 0.9625380 0.7401457 0.9011707
#> camptothecin 0.5590938 0.6060621 0.9150898 0.7258576 0.8082408
#> chrysin 0.8152383 0.8399921 0.8846840 0.9056164 0.6264392
#> daunorubicin 0.4805674 0.6013995 0.9174653 0.7204894 0.7486181
#> doxorubicin 0.0000000 0.5737439 0.9590589 0.6130763 0.8146797
#> ellipticine 0.5737439 0.0000000 0.9130729 0.8065379 0.6967980
#> etacrynic_acid 0.9590589 0.9130729 0.0000000 0.9558315 0.9745611
#> fisetin 0.6130763 0.8065379 0.9558315 0.0000000 0.9077328
#> harmine 0.8146797 0.6967980 0.9745611 0.9077328 0.0000000
#> luteolin 0.7326149 0.7415050 0.8413584 0.8872799 0.5954765
#> mitoxantrone 0.4266442 0.6073227 0.9880406 0.7107602 0.8455741
#> parthenolide 0.9058101 0.8260994 0.6586242 0.9955009 0.9361217
#> staurosporine 0.6729108 0.7785568 0.9677592 0.7667645 0.9525701
#> thiostrepton 0.8801426 0.8887309 0.7367122 0.9806517 0.9818760
#> luteolin mitoxantrone parthenolide staurosporine thiostrepton
#> alsterpaullone 0.6601723 0.5351687 0.9183664 0.6984201 0.9258501
#> azacitidine 0.8357249 0.6326825 0.8581793 0.6982204 0.8624173
#> camptothecin 0.6559045 0.6586904 0.8943531 0.7120952 0.8523135
#> chrysin 0.4627429 0.8367069 0.8865647 0.9037265 0.9235488
#> daunorubicin 0.6882700 0.5450045 0.8487120 0.7625792 0.8449146
#> doxorubicin 0.7326149 0.4266442 0.9058101 0.6729108 0.8801426
#> ellipticine 0.7415050 0.6073227 0.8260994 0.7785568 0.8887309
#> etacrynic_acid 0.8413584 0.9880406 0.6586242 0.9677592 0.7367122
#> fisetin 0.8872799 0.7107602 0.9955009 0.7667645 0.9806517
#> harmine 0.5954765 0.8455741 0.9361217 0.9525701 0.9818760
#> luteolin 0.0000000 0.7964905 0.8139365 0.9017486 0.8642047
#> mitoxantrone 0.7964905 0.0000000 0.9181195 0.7469812 0.8984673
#> parthenolide 0.8139365 0.9181195 0.0000000 0.9864220 0.6180173
#> staurosporine 0.9017486 0.7469812 0.9864220 0.0000000 0.9521839
#> thiostrepton 0.8642047 0.8984673 0.6180173 0.9521839 0.0000000
The Iorio’s rank merging algorithm utilizes Kruskal algorithm (Cormen, Leiserson, and Rivest 1990) to merge the ranked lists which corresponding to a same biological state. The distance of these ranked lists must be calculated first, a measure of the distance between two ranked lists is computed using “Spearman” algorithm or “Kendall tau” algorithm. It should be noticed that rank merging with Kendall tau distance is time consuming, so we recommend selecting the “Spearman” distance. Next, merge the two or more ranked lists with the same biological state using “Borda merging” algorithm.
According to the “Kruskal” algorithm method (Cormen, Leiserson, and Rivest 1990), this rank merging algorithm searches for the two ranked lists with the smallest Spearman’s Footrule distance first, and then merges them using the Borda Merging method, obtaining a new ranked list. Finally, the new list replaces the two unmerged lists. This process won’t terminate until only one list remains.
For convenience, users can directly obtain a PRL for each state by the function
RankMerging()
, which uses “Sprearman”, “BordaMerging”, and “Kruskal”
algorithms to aggregate the ranked lists obtained with the same biological
state. For instance, we will merge the sample data which with 50 samples into
15 samples.
MergingSet <- RankMerging(exampleSet, "Spearman", weighted = TRUE)
show(MergingSet)
#> ExpressionSet (storageMode: lockedEnvironment)
#> assayData: 22283 features, 15 samples
#> element names: exprs
#> protocolData: none
#> phenoData
#> sampleNames: alsterpaullone azacitidine ... thiostrepton (15 total)
#> varLabels: state
#> varMetadata: labelDescription
#> featureData: none
#> experimentData: use 'experimentData(object)'
#> Annotation:
A simple but rather useful method for this problem is the average ranking technique. The technique is a two step process when we are under the assumption that importance is equally weighted for each ranked list. First step is to calculate average rank for each ranked list and then the second step is to construct their final rankings.
Once ranked lists with same biological states are merged to one single PRL, Gene Set Enrichment Analysis (GSEA) and Parametric Gene Set Enrichment Analysis (PGSEA) are adopted to measure the similarity among these PRLs.
GSEA algorithm (Subramanian et al. 2005) is a nonparametric, rank-based method for
similarity measuring to determine whether a priori defined set of genes shows
statistically significant, concordant differences between two biological states,
whereas PGSEA algorithm is a modified gene set enrichment analysis method based
on a parametric statistical analysis model. Both of these two functions gives
the corresponding p value, function ScoreGSEA()
calcutes the empirical p
values from Monte Carlo Procedures (North, Curtis, and Sham 2002).
ds <- ScoreGSEA(MergingSet,250,"avg")
ds[1:5,1:5]
#> alsterpaullone azacitidine camptothecin chrysin daunorubicin
#> alsterpaullone 0.0000000 0.6176992 0.4669311 0.6896005 0.5288110
#> azacitidine 0.6176992 0.0000000 0.6125031 0.8515960 0.6413233
#> camptothecin 0.4669311 0.6125031 0.0000000 0.7897938 0.5372661
#> chrysin 0.6896005 0.8515960 0.7897938 0.0000000 0.7443612
#> daunorubicin 0.5288110 0.6413233 0.5372661 0.7443612 0.0000000
ds <- ScorePGSEA(MergingSet,250,"avg")
ds[1:5,1:5]
#> alsterpaullone azacitidine camptothecin chrysin daunorubicin
#> alsterpaullone 0.0000000 0.5477505 0.4136914 0.6340643 0.4182223
#> azacitidine 0.5477505 0.0000000 0.5646674 0.8402056 0.5478599
#> camptothecin 0.4136914 0.5646674 0.0000000 0.7438953 0.4305080
#> chrysin 0.6340643 0.8402056 0.7438953 0.0000000 0.7067854
#> daunorubicin 0.4182223 0.5478599 0.4305080 0.7067854 0.0000000
To illustrate how to use GeneExpressionSignature in analysis of gene expression signatures, affinity propagation clustering can be used to group these biological states by the similarity of gene signature. Affinity propagation cluster algorithm iteratively searches for optimal clustering by maximizing an objective function called net similarity. Here, we use function in apcluster package to classify the 15 biological states into 3 groups. In this step, R package apcluster should also be installed on your computer.
if (require(apcluster)){
library(apcluster)
clusterResult <- apcluster(1 - ds)
show(clusterResult)
}
#> Loading required package: apcluster
#>
#> Attaching package: 'apcluster'
#> The following object is masked from 'package:stats':
#>
#> heatmap
#>
#> APResult object
#>
#> Number of samples = 15
#> Number of iterations = 122
#> Input preference = 0.2561047
#> Sum of similarities = 6.432731
#> Sum of preferences = 0.768314
#> Net similarity = 7.201045
#> Number of clusters = 3
#>
#> Exemplars:
#> doxorubicin luteolin parthenolide
#> Clusters:
#> Cluster 1, exemplar doxorubicin:
#> alsterpaullone azacitidine camptothecin daunorubicin doxorubicin
#> ellipticine fisetin mitoxantrone staurosporine
#> Cluster 2, exemplar luteolin:
#> chrysin harmine luteolin
#> Cluster 3, exemplar parthenolide:
#> etacrynic_acid parthenolide thiostrepton
Cytoscape is used to visualize the result of clustering. In the network, nodes denotes different compounds (cell states treated with different compounds), and the edge means the similarity distance between these two compounds is lower than a threshold, which is 0.68 here. Different colors denote different groups, as the classification of compounds. We note that the largest group is numbered 9 nodes, and the other two consist of 3 nodes for each group.
sessionInfo()
#> R version 4.2.1 (2022-06-23)
#> Platform: x86_64-pc-linux-gnu (64-bit)
#> Running under: Ubuntu 20.04.5 LTS
#>
#> Matrix products: default
#> BLAS: /home/biocbuild/bbs-3.16-bioc/R/lib/libRblas.so
#> LAPACK: /home/biocbuild/bbs-3.16-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] stats graphics grDevices utils datasets methods base
#>
#> other attached packages:
#> [1] apcluster_1.4.10 GEOquery_2.66.0
#> [3] Biobase_2.58.0 BiocGenerics_0.44.0
#> [5] GeneExpressionSignature_1.44.0 BiocStyle_2.26.0
#>
#> loaded via a namespace (and not attached):
#> [1] Rcpp_1.0.9 highr_0.9 bslib_0.4.0
#> [4] compiler_4.2.1 pillar_1.8.1 BiocManager_1.30.19
#> [7] jquerylib_0.1.4 tools_4.2.1 digest_0.6.30
#> [10] lattice_0.20-45 jsonlite_1.8.3 evaluate_0.17
#> [13] lifecycle_1.0.3 tibble_3.1.8 pkgconfig_2.0.3
#> [16] rlang_1.0.6 Matrix_1.5-1 DBI_1.1.3
#> [19] cli_3.4.1 yaml_2.3.6 xfun_0.34
#> [22] fastmap_1.1.0 xml2_1.3.3 dplyr_1.0.10
#> [25] stringr_1.4.1 knitr_1.40 hms_1.1.2
#> [28] generics_0.1.3 sass_0.4.2 vctrs_0.5.0
#> [31] grid_4.2.1 tidyselect_1.2.0 glue_1.6.2
#> [34] data.table_1.14.4 R6_2.5.1 fansi_1.0.3
#> [37] rmarkdown_2.17 bookdown_0.29 limma_3.54.0
#> [40] purrr_0.3.5 tidyr_1.2.1 tzdb_0.3.0
#> [43] readr_2.1.3 magrittr_2.0.3 ellipsis_0.3.2
#> [46] htmltools_0.5.3 assertthat_0.2.1 utf8_1.2.2
#> [49] stringi_1.7.8 cachem_1.0.6
Cormen, T.T., C.E. Leiserson, and R.L. Rivest. 1990. “Introduction to Algorithms.”
Hu, G., and P. Agarwal. 2009. “Human Disease-Drug Network Based on Genomic Expression Profiles.” PLoS One 4 (8): e6536.
Iorio, F., R. Bosotti, E. Scacheri, V. Belcastro, P. Mithbaokar, R. Ferriero, L. Murino, et al. 2010. “Discovery of Drug Mode of Action and Drug Repositioning from Transcriptional Responses.” Proceedings of the National Academy of Sciences 107 (33): 14621.
Lamb, J., E.D. Crawford, D. Peck, J.W. Modell, I.C. Blat, M.J. Wrobel, J. Lerner, et al. 2006. “The Connectivity Map: Using Gene-Expression Signatures to Connect Small Molecules, Genes, and Disease.” Science 313 (5795): 1929.
North, BV, D. Curtis, and PC Sham. 2002. “A Note on the Calculation of Empirical P Values from Monte Carlo Procedures.” American Journal of Human Genetics 71 (2): 439.
Subramanian, A., P. Tamayo, V.K. Mootha, S. Mukherjee, B.L. Ebert, M.A. Gillette, A. Paulovich, et al. 2005. “Gene Set Enrichment Analysis: A Knowledge-Based Approach for Interpreting Genome-Wide Expression Profiles.” Proceedings of the National Academy of Sciences of the United States of America 102 (43): 15545.