FCBF : Fast Correlation Based Filter for Feature Selection
Tiago Lubiana
2019-10-29
Introduction
The FCBF package is a R implementation of an algorithm developed by Yu and Liu, 2003 : Feature Selection for High-Dimensional Data: A Fast Correlation-Based Filter Solution.
The algorithm described in the article and implemented here uses the idea of “predominant correlation”. It selects features in a classifier-independent manner, selecting features with high correlation with the target variable, but little correlation with other variables. Notably, the correlation used here is not the classical Pearson or Spearman correlations, but Symmetrical Uncertainty (SU).
The symmetrical uncertainty is based on information theory, drawing from the concepts of Shannon entropy and information gain. A detailed description is outside the scope of this vignette, but these details are described comprehensively in the Yu and Liu, 2003.
Initially, the algorithm selects features correlated above a given threshold by SU with the class variable. After this initial filtering, it detects predominant correlations of features with the class. The definition is that, for a predominant feature “X”, no other feature is more correlated to “X” than “X”" is to the class.
The features more correlated with X than with the class are then tested, and either X, or any other feature from this correlation group, emerges as the predominant correlation feature. Once more, the detailed description is available in Yu and Liu, 2003.
Usage
Discretizing gene expression
The first step to use FCBF is to install FCBF and load the sample data. Expression data from single macrophages is used as an example of how to apply the method to expression data.
library("FCBF")
library(SummarizedExperiment)
#> Loading required package: GenomicRanges
#> Loading required package: stats4
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# load expression data
data(scDengue)
exprs <- SummarizedExperiment::assay(scDengue,'logcounts')
#> Loading required package: SingleCellExperiment
head(exprs[,1:4])
#> 1001700604_A13 1001700604_A16 1001700604_A20
#> ENSG00000000003 6.593133 5.817558 6.985514
#> ENSG00000000419 4.284856 0.000000 5.252389
#> ENSG00000000457 0.000000 4.252808 1.135761
#> ENSG00000000460 0.000000 0.000000 1.135761
#> ENSG00000000971 0.000000 0.000000 0.000000
#> ENSG00000001036 6.071789 7.353848 8.072563
#> 1001700604_C21
#> ENSG00000000003 6.736407
#> ENSG00000000419 5.579961
#> ENSG00000000457 0.000000
#> ENSG00000000460 0.000000
#> ENSG00000000971 0.000000
#> ENSG00000001036 7.361245This normalized single cell expression can be used in machine learning (ML) models to obtain classifiers for dengue x control macrophage. One of the ideas behind the ML approach to RNA-Seq data is to use features that are important for classification as biomarkers, for experimental characterization and inference of involved pathways. Overfitting and extensive computational time are, thus big problems that feature selection intends to help.
For the feature selection approach implemented here, the gene expression has to be discretized, as the entropy concept behind the symmetrical uncertainty is built upon discrete classes.
There is no consensus of the optimal way of discretizing gene expression, and this is even more true to single cell RNA-Seq. The function simply gets the range of expression (min to max) for each gene and assigns the first third the label of “low” and, to the other two, the label of “high”. In this way, all the zeros and low expression values are assigned the label “low” in a gene-dependent manner.
Notably, this step is only done for variable selection. When you fit machine learning models with those variables, you can still use the original, continuous, numeric, features.
# discretize expression data
discrete_expression <- as.data.frame(discretize_exprs(exprs))
head(discrete_expression[,1:4])
#> V1 V2 V3 V4
#> ENSG00000000003 high high high high
#> ENSG00000000419 high low high high
#> ENSG00000000457 low high low low
#> ENSG00000000460 low low low low
#> ENSG00000000971 low low low low
#> ENSG00000001036 high high high highSelecting features
The filter approaches as FCBF do not target a specific machine learning model. However, they are supervised approaches, requiring you to give a target variable as input. In this case, we have two classes: dengue infected and not infected macrophages.
#load annotation data
infection <- SummarizedExperiment::colData(scDengue)
# get the class variable
#(note, the order of the samples is the same as in the exprs file)
target <- infection$infectionHaving a class variable and a discrete, categorical feature table, we can run the function fcbf. The code as follows would run for a minute or two and generate an error.
# you only need to run that if you want to see the error for yourself
# fcbf_features <- fcbf(discrete_expression, target, verbose = TRUE)As you can see, we get an error.
That is because the built-in threshold for the SU, 0.25, is too high for this data set. You can use the function to decide for yourself which threshold is the best. In this way you can see the distribution of correlations (as calculated from symmetrical uncertainty) for each variable with the target classes.
Seems like 0.05 is something reasonable for this dataset. This changes, of course, the number of features selected. A lower threshold will explore more features, but they will have less relation to the target variable. Let’s run it again with the new threshold.
fcbf_features <- fcbf(discrete_expression, target, thresh = 0.05, verbose = TRUE)
#> Calculating symmetrical uncertainties
#> [1] "Number of prospective features = 480"
#> Round 1
#> [1] "first_prime round ( |s_prime| = 480 )"
#> 0.116359 0.1036008 Removed feature 4589
#> 0.1078977 0.0913877 Removed feature 4660
#> 0.09176242 0.08438722 Removed feature 13222
#> 0.1220288 0.08068918 Removed feature 12449
#> 0.09276006 0.06876466 Removed feature 14910
#> 0.1851523 0.06876466 Removed feature 15070
#> 0.1048565 0.06867071 Removed feature 16243
#> 0.07358359 0.06754892 Removed feature 19112
#> 0.08096923 0.06635711 Removed feature 9474
#> 0.1072117 0.06384414 Removed feature 10497
#> 0.067275 0.0612623 Removed feature 9432
#> 0.08445816 0.05977561 Removed feature 3507
#> 0.06196816 0.05910465 Removed feature 4610
#> 0.06196816 0.05910465 Removed feature 16938
#> 0.06789637 0.05674172 Removed feature 7259
#> 0.06789637 0.05674172 Removed feature 12038
#> 0.06358669 0.05642788 Removed feature 3057
#> 0.06358669 0.05642788 Removed feature 9071
#> 0.06358669 0.05642788 Removed feature 9847
#> 0.06358669 0.05642788 Removed feature 9976
#> 0.06358669 0.05642788 Removed feature 10086
#> 0.1523932 0.05642788 Removed feature 11857
#> 0.06358669 0.05642788 Removed feature 12112
#> 0.06358669 0.05642788 Removed feature 12532
#> 0.06358669 0.05642788 Removed feature 13198
#> 0.06358669 0.05642788 Removed feature 14447
#> 0.1523932 0.05642788 Removed feature 14637
#> 0.06358669 0.05642788 Removed feature 15391
#> 0.06358669 0.05642788 Removed feature 16796
#> 0.06358669 0.05642788 Removed feature 17632
#> 0.06358669 0.05642788 Removed feature 18092
#> 0.06358669 0.05642788 Removed feature 19417
#> 0.05962547 0.05612361 Removed feature 11874
#> 0.07056926 0.05503376 Removed feature 369
#> 0.05986576 0.05486082 Removed feature 2910
#> 0.05707103 0.05404904 Removed feature 2157
#> 0.07959675 0.05285584 Removed feature 1952
#> 0.07268261 0.05105315 Removed feature 10540
#> 0.07268261 0.05105315 Removed feature 18376
#> Round 2
#> [1] "first_prime round ( |s_prime| = 441 )"
#> 0.1016254 0.09228038 Removed feature 5281
#> 0.08635973 0.08436036 Removed feature 5541
#> 0.08369102 0.07648799 Removed feature 11833
#> 0.08600332 0.06876466 Removed feature 7039
#> 0.08600332 0.06876466 Removed feature 13004
#> 0.08600332 0.06876466 Removed feature 15741
#> 0.079347 0.05768739 Removed feature 11683
#> 0.1174576 0.05766186 Removed feature 10584
#> 0.119875 0.05642788 Removed feature 17794
#> 0.05855997 0.05503376 Removed feature 962
#> 0.06775217 0.05285584 Removed feature 208
#> 0.06799014 0.05247049 Removed feature 3598
#> 0.06799014 0.05247049 Removed feature 17181
#> 0.06019224 0.05127485 Removed feature 4234
#> 0.05252438 0.05127485 Removed feature 8068
#> 0.06019224 0.05127485 Removed feature 12460
#> Round 3
#> [1] "first_prime round ( |s_prime| = 425 )"
#> 0.1464177 0.07016844 Removed feature 4964
#> 0.0936669 0.06876466 Removed feature 2447
#> 0.0936669 0.06876466 Removed feature 12895
#> 0.0936669 0.06876466 Removed feature 16146
#> 0.0936669 0.06876466 Removed feature 17758
#> 0.06843692 0.0612623 Removed feature 4649
#> 0.0996089 0.05941037 Removed feature 4555
#> 0.0674636 0.05941037 Removed feature 17784
#> 0.1283218 0.05766186 Removed feature 17773
#> 0.1291887 0.05642788 Removed feature 4281
#> 0.1291887 0.05642788 Removed feature 10770
#> 0.1291887 0.05642788 Removed feature 13930
#> 0.1291887 0.05642788 Removed feature 17544
#> 0.07216736 0.05434007 Removed feature 7207
#> 0.05746292 0.05404904 Removed feature 7600
#> 0.07951287 0.05250286 Removed feature 13777
#> 0.07951287 0.05250286 Removed feature 18169
#> 0.06479171 0.05247049 Removed feature 6523
#> 0.05741666 0.05127485 Removed feature 12437
#> 0.08673095 0.05105315 Removed feature 10964
#> 0.08673095 0.05105315 Removed feature 11169
#> Round 4
#> [1] "first_prime round ( |s_prime| = 404 )"
#> 0.08948074 0.07149493 Removed feature 14142
#> 0.07532123 0.07088179 Removed feature 2574
#> 0.07304717 0.06876466 Removed feature 2706
#> 0.07304717 0.06876466 Removed feature 3289
#> 0.07304717 0.06876466 Removed feature 5964
#> 0.07304717 0.06876466 Removed feature 5973
#> 0.07304717 0.06876466 Removed feature 8808
#> 0.1695358 0.06876466 Removed feature 14141
#> 0.07304717 0.06876466 Removed feature 15571
#> 0.07304717 0.06876466 Removed feature 15751
#> 0.1279643 0.06754892 Removed feature 15481
#> 0.07508596 0.06669289 Removed feature 1803
#> 0.06977783 0.06666784 Removed feature 12761
#> 0.06043125 0.05891998 Removed feature 4210
#> 0.06510715 0.05873235 Removed feature 5835
#> 0.07608747 0.05768739 Removed feature 8122
#> 0.07748155 0.05766186 Removed feature 3166
#> 0.09765531 0.05642788 Removed feature 8181
#> 0.09765531 0.05642788 Removed feature 9883
#> 0.09765531 0.05642788 Removed feature 9936
#> 0.09765531 0.05642788 Removed feature 17987
#> 0.09765531 0.05642788 Removed feature 18968
#> 0.07917611 0.05293989 Removed feature 11048
#> 0.06951454 0.05070877 Removed feature 2269
#> Round 5
#> [1] "first_prime round ( |s_prime| = 380 )"
#> 0.1109944 0.09228038 Removed feature 13522
#> 0.1356017 0.08068918 Removed feature 10652
#> 0.07892493 0.06885652 Removed feature 636
#> 0.07304717 0.06876466 Removed feature 8044
#> 0.07304717 0.06876466 Removed feature 16005
#> 0.07304717 0.06876466 Removed feature 16048
#> 0.06863258 0.06378771 Removed feature 12031
#> 0.06798671 0.05977865 Removed feature 1138
#> 0.06291829 0.05977561 Removed feature 5016
#> 0.07533398 0.05891998 Removed feature 6999
#> 0.06510715 0.05873235 Removed feature 2266
#> 0.07608747 0.05768739 Removed feature 10268
#> 0.07748155 0.05766186 Removed feature 14405
#> 0.09765531 0.05642788 Removed feature 11739
#> 0.09765531 0.05642788 Removed feature 14317
#> 0.09765531 0.05642788 Removed feature 16344
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#> 0.09765531 0.05642788 Removed feature 17878
#> 0.06275961 0.05612361 Removed feature 10515
#> 0.1429983 0.05127485 Removed feature 4404
#> 0.06951454 0.05070877 Removed feature 8141
#> Round 6
#> [1] "first_prime round ( |s_prime| = 359 )"
#> 0.1041843 0.09734421 Removed feature 1703
#> 0.0914452 0.08296017 Removed feature 1190
#> 0.08315278 0.07746361 Removed feature 820
#> 0.09358797 0.07149493 Removed feature 928
#> 0.07221848 0.06876466 Removed feature 8581
#> 0.09807764 0.06378771 Removed feature 75
#> 0.1283984 0.0614712 Removed feature 2942
#> 0.1041843 0.0612623 Removed feature 15850
#> 0.1205219 0.05766186 Removed feature 15594
#> 0.1092189 0.05766186 Removed feature 16416
#> 0.05925563 0.05642788 Removed feature 4291
#> 0.05925563 0.05642788 Removed feature 8052
#> 0.05925563 0.05642788 Removed feature 16773
#> 0.05925563 0.05642788 Removed feature 16916
#> 0.05925563 0.05642788 Removed feature 18381
#> 0.06604838 0.05404904 Removed feature 6382
#> 0.05657706 0.05404904 Removed feature 17549
#> 0.06089232 0.05285584 Removed feature 5339
#> 0.05417052 0.05267052 Removed feature 3965
#> Round 7
#> [1] "first_prime round ( |s_prime| = 340 )"
#> 0.1212837 0.06876466 Removed feature 18759
#> 0.07532123 0.06754892 Removed feature 8298
#> 0.09958094 0.05642788 Removed feature 3553
#> 0.09958094 0.05642788 Removed feature 13640
#> 0.09958094 0.05642788 Removed feature 17320
#> 0.06357042 0.05434007 Removed feature 6628
#> 0.07052858 0.05127485 Removed feature 6355
#> Round 8
#> [1] "first_prime round ( |s_prime| = 333 )"
#> 0.1159096 0.08068918 Removed feature 13343
#> 0.09232719 0.0789382 Removed feature 1258
#> 0.08302952 0.06732315 Removed feature 4823
#> 0.1084441 0.06732315 Removed feature 10115
#> 0.07472244 0.0612623 Removed feature 10825
#> 0.07022355 0.05929839 Removed feature 1740
#> 0.07870591 0.05910465 Removed feature 5481
#> 0.1037059 0.05486082 Removed feature 2776
#> 0.1117818 0.053266 Removed feature 13913
#> 0.0535809 0.05127485 Removed feature 7790
#> Round 9
#> [1] "first_prime round ( |s_prime| = 323 )"
#> 0.09832649 0.06876466 Removed feature 2421
#> 0.09832649 0.06876466 Removed feature 11971
#> 0.06414081 0.06378771 Removed feature 18562
#> 0.06153282 0.0612623 Removed feature 16022
#> 0.05940665 0.05711994 Removed feature 5219
#> 0.1281063 0.05642788 Removed feature 10461
#> 0.2783288 0.05642788 Removed feature 12847
#> 0.1281063 0.05642788 Removed feature 12873
#> 0.1281063 0.05642788 Removed feature 14245
#> 0.1281063 0.05642788 Removed feature 14280
#> 0.1281063 0.05642788 Removed feature 14976
#> 0.07010613 0.05250286 Removed feature 8549
#> 0.07010613 0.05250286 Removed feature 11510
#> Round 10
#> [1] "first_prime round ( |s_prime| = 310 )"
#> 0.1770307 0.08068918 Removed feature 6596
#> 0.1770307 0.08068918 Removed feature 12741
#> 0.0802048 0.07746361 Removed feature 9489
#> 0.1301207 0.0760732 Removed feature 10846
#> 0.1097144 0.07016844 Removed feature 10050
#> 0.08023478 0.07000017 Removed feature 4559
#> 0.07333801 0.06885652 Removed feature 19195
#> 0.09832649 0.06876466 Removed feature 2874
#> 0.09832649 0.06876466 Removed feature 5071
#> 0.09832649 0.06876466 Removed feature 13898
#> 0.2176082 0.06876466 Removed feature 16727
#> 0.09832649 0.06876466 Removed feature 17677
#> 0.1448846 0.0629054 Removed feature 727
#> 0.07849356 0.0614712 Removed feature 11414
#> 0.06153282 0.0612623 Removed feature 2213
#> 0.06153282 0.0612623 Removed feature 8736
#> 0.0679099 0.05887071 Removed feature 6546
#> 0.1068115 0.05766186 Removed feature 18552
#> 0.1281063 0.05642788 Removed feature 5934
#> 0.1281063 0.05642788 Removed feature 8785
#> 0.1281063 0.05642788 Removed feature 9405
#> 0.1281063 0.05642788 Removed feature 12341
#> 0.1281063 0.05642788 Removed feature 15078
#> 0.1281063 0.05642788 Removed feature 17685
#> 0.2783288 0.05642788 Removed feature 18017
#> 0.07010613 0.05250286 Removed feature 7891
#> 0.07010613 0.05250286 Removed feature 9203
#> 0.07010613 0.05250286 Removed feature 10498
#> 0.07010613 0.05250286 Removed feature 13893
#> Round 11
#> [1] "first_prime round ( |s_prime| = 281 )"
#> 0.09832649 0.06876466 Removed feature 3693
#> 0.09832649 0.06876466 Removed feature 11135
#> 0.06414081 0.06378771 Removed feature 294
#> 0.1998421 0.0612623 Removed feature 8367
#> 0.1068115 0.05766186 Removed feature 5789
#> 0.1281063 0.05642788 Removed feature 13638
#> 0.1281063 0.05642788 Removed feature 16663
#> 0.05792393 0.05070877 Removed feature 10481
#> Round 12
#> [1] "first_prime round ( |s_prime| = 273 )"
#> 0.09164748 0.08068918 Removed feature 16983
#> 0.1149158 0.07866886 Removed feature 5046
#> 0.08512585 0.07016844 Removed feature 7579
#> 0.08512585 0.07016844 Removed feature 9136
#> 0.09184859 0.06669289 Removed feature 2719
#> 0.05910377 0.05766186 Removed feature 6023
#> 0.1214145 0.05642788 Removed feature 13355
#> 0.07432117 0.05612361 Removed feature 7174
#> 0.05655515 0.05285584 Removed feature 3751
#> 0.09261883 0.05267052 Removed feature 13685
#> 0.0822624 0.05250286 Removed feature 4497
#> 0.05389997 0.05127485 Removed feature 16919
#> Round 13
#> [1] "first_prime round ( |s_prime| = 261 )"
#> 0.09865448 0.08068918 Removed feature 14418
#> 0.07605952 0.07395098 Removed feature 7469
#> 0.06895511 0.05642788 Removed feature 1173
#> 0.06895511 0.05642788 Removed feature 8851
#> 0.06895511 0.05642788 Removed feature 9061
#> 0.06895511 0.05642788 Removed feature 11345
#> 0.06895511 0.05642788 Removed feature 12030
#> 0.06895511 0.05642788 Removed feature 15471
#> 0.06895511 0.05642788 Removed feature 17217
#> 0.07581339 0.05105315 Removed feature 319
#> Round 14
#> [1] "first_prime round ( |s_prime| = 251 )"
#> 0.08375407 0.08068918 Removed feature 15610
#> 0.1379635 0.06876466 Removed feature 14267
#> 0.09031493 0.0673556 Removed feature 16641
#> 0.1095175 0.05977561 Removed feature 35
#> 0.06228837 0.05766186 Removed feature 19013
#> 0.1133433 0.05642788 Removed feature 16145
#> 0.07908767 0.05250286 Removed feature 16341
#> 0.05294781 0.05200404 Removed feature 9384
#> Round 15
#> [1] "first_prime round ( |s_prime| = 243 )"
#> 0.1074551 0.07737111 Removed feature 17916
#> 0.07240253 0.06669289 Removed feature 2465
#> 0.07448309 0.06669289 Removed feature 10376
#> 0.1158529 0.0612623 Removed feature 8418
#> 0.09124396 0.05766186 Removed feature 7705
#> 0.09728506 0.05642788 Removed feature 9890
#> 0.09728506 0.05642788 Removed feature 18380
#> 0.08836744 0.05105315 Removed feature 1866
#> 0.059257 0.05105315 Removed feature 9967
#> 0.08836744 0.05105315 Removed feature 10031
#> Round 16
#> [1] "first_prime round ( |s_prime| = 233 )"
#> 0.08344447 0.06378771 Removed feature 6558
#> 0.06556622 0.05766186 Removed feature 9849
#> 0.1061068 0.05642788 Removed feature 1924
#> 0.1061068 0.05642788 Removed feature 17718
#> Round 17
#> [1] "first_prime round ( |s_prime| = 229 )"
#> 0.2057366 0.08068918 Removed feature 18817
#> 0.2011996 0.07920144 Removed feature 8691
#> 0.1158938 0.06876466 Removed feature 8271
#> 0.1158938 0.06876466 Removed feature 14426
#> 0.1158938 0.06876466 Removed feature 14428
#> 0.1491991 0.05642788 Removed feature 17961
#> 0.05809932 0.05434007 Removed feature 117
#> 0.1128649 0.053266 Removed feature 4876
#> Round 18
#> [1] "first_prime round ( |s_prime| = 221 )"
#> 0.09271287 0.08068918 Removed feature 4735
#> 0.09271287 0.08068918 Removed feature 17964
#> 0.1109944 0.06754892 Removed feature 17907
#> 0.1045017 0.05929839 Removed feature 1029
#> 0.08177214 0.05929839 Removed feature 8409
#> 0.1491991 0.05642788 Removed feature 4976
#> 0.1491991 0.05642788 Removed feature 14803
#> 0.05809932 0.05434007 Removed feature 18718
#> 0.07321866 0.05247049 Removed feature 10014
#> Round 19
#> [1] "first_prime round ( |s_prime| = 212 )"
#> 0.09271287 0.08068918 Removed feature 1315
#> 0.09271287 0.08068918 Removed feature 14463
#> 0.09271287 0.08068918 Removed feature 16059
#> 0.1158938 0.06876466 Removed feature 9979
#> 0.1158938 0.06876466 Removed feature 14547
#> 0.05451909 0.05070877 Removed feature 1096
#> Round 20
#> [1] "first_prime round ( |s_prime| = 206 )"
#> 0.1727603 0.09228038 Removed feature 16734
#> 0.09564927 0.09132275 Removed feature 12737
#> 0.09336457 0.07578735 Removed feature 1994
#> 0.1158938 0.06876466 Removed feature 11088
#> 0.1158938 0.06876466 Removed feature 12749
#> 0.06771635 0.05977561 Removed feature 12352
#> 0.1491991 0.05642788 Removed feature 6974
#> 0.09336457 0.05127485 Removed feature 922
#> Round 21
#> [1] "first_prime round ( |s_prime| = 198 )"
#> 0.2057366 0.08068918 Removed feature 15195
#> 0.0798408 0.06689538 Removed feature 3468
#> 0.06771635 0.05977561 Removed feature 2381
#> 0.1491991 0.05642788 Removed feature 15164
#> 0.1491991 0.05642788 Removed feature 17463
#> 0.06073535 0.05105315 Removed feature 15270
#> Round 22
#> [1] "first_prime round ( |s_prime| = 192 )"
#> 0.0803601 0.07109842 Removed feature 5365
#> 0.09564927 0.06885652 Removed feature 7462
#> 0.1158938 0.06876466 Removed feature 16832
#> 0.1158938 0.06876466 Removed feature 17553
#> 0.1491991 0.05642788 Removed feature 9806
#> 0.1491991 0.05642788 Removed feature 9943
#> Round 23
#> [1] "first_prime round ( |s_prime| = 186 )"
#> 0.06073877 0.05642788 Removed feature 6170
#> 0.06073877 0.05642788 Removed feature 6246
#> 0.06073877 0.05642788 Removed feature 7210
#> 0.06073877 0.05642788 Removed feature 8511
#> 0.06073877 0.05642788 Removed feature 9162
#> 0.06073877 0.05642788 Removed feature 17032
#> 0.06073877 0.05642788 Removed feature 19296
#> Round 24
#> [1] "first_prime round ( |s_prime| = 179 )"
#> 0.1025482 0.07385816 Removed feature 4634
#> 0.1015873 0.06664218 Removed feature 4574
#> 0.08181748 0.05766186 Removed feature 4313
#> 0.08103563 0.05642788 Removed feature 9952
#> 0.08103563 0.05642788 Removed feature 14966
#> 0.08103563 0.05642788 Removed feature 15425
#> Round 25
#> [1] "first_prime round ( |s_prime| = 173 )"
#> 0.08103563 0.05642788 Removed feature 12970
#> 0.0535809 0.05127485 Removed feature 18558
#> Round 26
#> [1] "first_prime round ( |s_prime| = 171 )"
#> 0.0936669 0.06876466 Removed feature 8250
#> 0.08985756 0.06664218 Removed feature 9410
#> 0.05988121 0.05887071 Removed feature 6960
#> 0.05741666 0.05127485 Removed feature 1762
#> Round 27
#> [1] "first_prime round ( |s_prime| = 167 )"
#> 0.07668951 0.05642788 Removed feature 766
#> 0.07668951 0.05642788 Removed feature 17098
#> Round 28
#> [1] "first_prime round ( |s_prime| = 165 )"
#> 0.07271102 0.07149493 Removed feature 6522
#> 0.06391487 0.05766186 Removed feature 17470
#> Round 29
#> [1] "first_prime round ( |s_prime| = 163 )"
#> 0.06858315 0.05887071 Removed feature 12500
#> 0.05738385 0.05250286 Removed feature 3871
#> Round 30
#> [1] "first_prime round ( |s_prime| = 161 )"
#> 0.1229451 0.0789382 Removed feature 1725
#> 0.08139068 0.07737111 Removed feature 8055
#> 0.07846352 0.0673556 Removed feature 5931
#> 0.0882765 0.05642788 Removed feature 2020
#> 0.0882765 0.05642788 Removed feature 16492
#> 0.06469703 0.053266 Removed feature 6944
#> Round 31
#> [1] "first_prime round ( |s_prime| = 155 )"
#> 0.07650454 0.07109842 Removed feature 2654
#> 0.1298068 0.06732315 Removed feature 6683
#> 0.1050428 0.05127485 Removed feature 3135
#> Round 32
#> [1] "first_prime round ( |s_prime| = 152 )"
#> 0.06265073 0.05674172 Removed feature 6367
#> 0.1027618 0.05642788 Removed feature 7089
#> 0.1027618 0.05642788 Removed feature 11458
#> Round 33
#> [1] "first_prime round ( |s_prime| = 149 )"
#> 0.0767168 0.07000017 Removed feature 4583
#> 0.1015687 0.06876466 Removed feature 1321
#> 0.07986731 0.05766186 Removed feature 18725
#> 0.08334674 0.05642788 Removed feature 14252
#> 0.1019399 0.05250286 Removed feature 1977
#> Round 34
#> [1] "first_prime round ( |s_prime| = 144 )"
#> 0.06736833 0.06144617 Removed feature 8575
#> 0.1053812 0.05960901 Removed feature 5186
#> 0.07067511 0.05910465 Removed feature 17357
#> Round 35
#> [1] "first_prime round ( |s_prime| = 141 )"
#> 0.2430549 0.08068918 Removed feature 4815
#> 0.1506183 0.06732315 Removed feature 10700
#> 0.08475162 0.05200404 Removed feature 4269
#> Round 36
#> [1] "first_prime round ( |s_prime| = 138 )"
#> 0.1122558 0.08068918 Removed feature 18152
#> 0.089582 0.05977561 Removed feature 15780
#> 0.1764942 0.05642788 Removed feature 17690
#> Round 37
#> [1] "first_prime round ( |s_prime| = 135 )"
#> 0.1071212 0.05250286 Removed feature 468
#> Round 38
#> [1] "first_prime round ( |s_prime| = 134 )"
#> 0.1122558 0.08068918 Removed feature 10830
#> Round 39
#> [1] "first_prime round ( |s_prime| = 133 )"
#> 0.089582 0.05977561 Removed feature 7949
#> Round 40
#> [1] "first_prime round ( |s_prime| = 132 )"
#> 0.07874919 0.07362505 Removed feature 9130
#> 0.09599254 0.0612623 Removed feature 10444
#> 0.06576629 0.05766186 Removed feature 361
#> 0.06576629 0.05766186 Removed feature 3578
#> 0.06576629 0.05766186 Removed feature 5263
#> 0.07838161 0.05434007 Removed feature 1973
#> Round 41
#> [1] "first_prime round ( |s_prime| = 126 )"
#> 0.1386618 0.06876466 Removed feature 16346
#> 0.3697696 0.05642788 Removed feature 5500
#> Round 42
#> [1] "first_prime round ( |s_prime| = 124 )"
#> 0.06187408 0.05941037 Removed feature 3866
#> 0.1192056 0.05127485 Removed feature 18101
#> Round 43
#> [1] "first_prime round ( |s_prime| = 122 )"
#> 0.1386618 0.06876466 Removed feature 13107
#> 0.1764942 0.05642788 Removed feature 4204
#> 0.1071212 0.05250286 Removed feature 4300
#> 0.1071212 0.05250286 Removed feature 12645
#> Round 44
#> [1] "first_prime round ( |s_prime| = 118 )"
#> 0.1023116 0.06876466 Removed feature 16354
#> 0.1396706 0.05642788 Removed feature 5250
#> 0.1396706 0.05642788 Removed feature 11516
#> 0.1396706 0.05642788 Removed feature 13874
#> Round 45
#> [1] "first_prime round ( |s_prime| = 114 )"
#> 0.1515627 0.06876466 Removed feature 6164
#> 0.1515627 0.06876466 Removed feature 11933
#> 0.07872253 0.05960901 Removed feature 11301
#> 0.08632725 0.05642788 Removed feature 2878
#> 0.08632725 0.05642788 Removed feature 4654
#> 0.08632725 0.05642788 Removed feature 15038
#> 0.08632725 0.05642788 Removed feature 19081
#> 0.08632725 0.05642788 Removed feature 19375
#> Round 46
#> [1] "first_prime round ( |s_prime| = 106 )"
#> 0.1091643 0.06876466 Removed feature 15158
#> 0.075678 0.05642788 Removed feature 10618
#> Round 47
#> [1] "first_prime round ( |s_prime| = 104 )"
#> 0.06341664 0.05319117 Removed feature 6917
#> 0.05534072 0.05250286 Removed feature 14110
#> Round 48
#> [1] "first_prime round ( |s_prime| = 102 )"
#> Round 49
#> [1] "first_prime round ( |s_prime| = 102 )"
#> 0.08710054 0.0612623 Removed feature 6554
#> 0.1464177 0.05910465 Removed feature 12184
#> 0.06168498 0.05642788 Removed feature 3995
#> Round 50
#> [1] "first_prime round ( |s_prime| = 99 )"
#> Round 51
#> [1] "first_prime round ( |s_prime| = 99 )"
#> 0.05928048 0.05642788 Removed feature 4493
#> 0.05928048 0.05642788 Removed feature 7778
#> 0.05928048 0.05642788 Removed feature 8412
#> 0.2132579 0.05642788 Removed feature 9649
#> 0.05928048 0.05642788 Removed feature 11364
#> 0.05928048 0.05642788 Removed feature 12608
#> 0.05928048 0.05642788 Removed feature 13936
#> 0.05928048 0.05642788 Removed feature 14702
#> 0.2132579 0.05642788 Removed feature 16211
#> 0.05928048 0.05642788 Removed feature 18222
#> Round 52
#> [1] "first_prime round ( |s_prime| = 89 )"
#> 0.05928048 0.05642788 Removed feature 1306
#> 0.05928048 0.05642788 Removed feature 2952
#> 0.05928048 0.05642788 Removed feature 13928
#> 0.2132579 0.05642788 Removed feature 15679
#> Round 53
#> [1] "first_prime round ( |s_prime| = 85 )"
#> 0.1693599 0.06876466 Removed feature 17351
#> 0.05928048 0.05642788 Removed feature 17654
#> 0.05583755 0.05250286 Removed feature 14225
#> 0.1023116 0.05105315 Removed feature 2920
#> Round 54
#> [1] "first_prime round ( |s_prime| = 81 )"
#> 0.05928048 0.05642788 Removed feature 10387
#> 0.05928048 0.05642788 Removed feature 15165
#> 0.05928048 0.05642788 Removed feature 19055
#> 0.1363759 0.05250286 Removed feature 8048
#> Round 55
#> [1] "first_prime round ( |s_prime| = 77 )"
#> 0.05928048 0.05642788 Removed feature 15582
#> 0.06551585 0.05200404 Removed feature 6403
#> Round 56
#> [1] "first_prime round ( |s_prime| = 75 )"
#> 0.07765524 0.05766186 Removed feature 9997
#> Round 57
#> [1] "first_prime round ( |s_prime| = 74 )"
#> Round 58
#> [1] "first_prime round ( |s_prime| = 74 )"
#> Round 59
#> [1] "first_prime round ( |s_prime| = 74 )"
#> Round 60
#> [1] "first_prime round ( |s_prime| = 74 )"
#> Round 61
#> [1] "first_prime round ( |s_prime| = 74 )"
#> Round 62
#> [1] "first_prime round ( |s_prime| = 74 )"
#> Round 63
#> [1] "first_prime round ( |s_prime| = 74 )"
#> Round 64
#> [1] "first_prime round ( |s_prime| = 74 )"
#> Round 65
#> [1] "first_prime round ( |s_prime| = 74 )"
#> 0.07214759 0.05267052 Removed feature 13105
#> Round 66
#> [1] "first_prime round ( |s_prime| = 73 )"
#> 0.2657888 0.05642788 Removed feature 5093
#> 0.07767568 0.05642788 Removed feature 16642
#> Round 67
#> [1] "first_prime round ( |s_prime| = 71 )"
#> Round 68
#> [1] "first_prime round ( |s_prime| = 71 )"
#> 0.07767568 0.05642788 Removed feature 18224
#> Round 69
#> [1] "first_prime round ( |s_prime| = 70 )"
#> Round 70
#> [1] "first_prime round ( |s_prime| = 70 )"In the end, this process has selected a very low number of variables in comparison with the original dataset. Now we should see if they are really useful for classification. First, we will get a ‘mini feature table’, just with the selected variables and a table for comparison, with the 100 most variable genes
mini_single_cell_dengue_exprs <- exprs[fcbf_features$index,]
vars <- sort(apply(exprs, 1, var, na.rm = TRUE), decreasing = TRUE)
data_top_100_vars <- exprs[names(vars)[1:100], ]The top 100 most variable is a quick-and-dirty unsupervised feature selection. Nevertheless, we can use it to see if the genes selected are really better at classification tasks. With the packages ‘caret’ and ‘mlbench’ we can check if that is true.
#first transpose the tables and make datasets as caret likes them
dataset_fcbf <- cbind(as.data.frame(t(mini_single_cell_dengue_exprs)),target_variable = target)
dataset_100_var <- cbind(as.data.frame(t(data_top_100_vars)),target_variable = target)
library('caret')
#> Loading required package: lattice
#> Loading required package: ggplot2
library('mlbench')
control <- trainControl(method="cv", number=5, classProbs=TRUE, summaryFunction=twoClassSummary)In the code above we created a plan to test the classifiers by 5-fold cross validation. Any classifier can be used, but for illustration, here we will use the very popular radial svm. As metric for comparison we will use the area-under-the-curve (AUC) of the receiver operating characteristic (ROC) curve :
svm_fcbf <-
train(target_variable ~ .,
metric="ROC",
data = dataset_fcbf,
method = "svmRadial",
trControl = control)
svm_top_100_var <-
train(target_variable ~ .,
metric="ROC",
data = dataset_100_var,
method = "svmRadial",
trControl = control)
svm_fcbf_results <- svm_fcbf$results[svm_fcbf$results$ROC == max(svm_fcbf$results$ROC),]
svm_top_100_var_results <- svm_top_100_var$results[svm_top_100_var$results$ROC == max(svm_top_100_var$results$ROC),]
cat(paste0("For top 100 var: \n",
"ROC = ", svm_top_100_var_results$ROC, "\n",
"Sensitivity = ", svm_top_100_var_results$Sens, "\n",
"Specificity = ", svm_top_100_var_results$Spec, "\n\n",
"For FCBF: \n",
"ROC = ", svm_fcbf_results$ROC, "\n",
"Sensitivity = ", svm_fcbf_results$Sens, "\n",
"Specificity = ", svm_fcbf_results$Spec))
#> For top 100 var:
#> ROC = 0.626388888888889
#> Sensitivity = 0.55
#> Specificity = 0.583333333333333
#>
#> For FCBF:
#> ROC = 1
#> Sensitivity = 1
#> Specificity = 0.966666666666667 For top 100 var:
#> ROC = 0.626388888888889
#> Sensitivity = 0.55
#> Specificity = 0.583333333333333
#>
#> For FCBF:
#> ROC = 1
#> Sensitivity = 1
#> Specificity = 1As we can see, the selected variables gave rise to a better SVM model than selecting the top 100 variables (as measured by the area under the curve of the receiver-operating characteristic curve. Notably, running the svm radial with the full exprs set gives an error of the sort : Error: protect(): “protection stack overflow”.
The multiplicity of infection (MOI) of the cells was relatively low (1 virus/cell), so it is expected that some cells were not infected. Thus, due to this overlap o f healthy cells in both groups, the groups are probably non-separable. In any case, FCBF seems to do a reasonably good job at selecting variables.
Final remarks
Even though tools are available for feature selection in packages such as FSelector (https://cran.r-project.org/web/packages/FSelector/FSelector.pdf), up to date, there were no easy implementations in R for FCBF. The article describing FCBF has more than 1800 citations, but almost none from the biomedical community.
We expect that by carefully implementing and documenting FCBF in R, this package might improve usage of filter-based feature selection approaches that aim at reducing redundancy among selected features. Other tools similar to FCBF are available in Weka (https://www.cs.waikato.ac.nz/ml/weka/) and Python/scikit learn (http://featureselection.asu.edu/). A recent good review, for those interested in going deeper, is the following ref:
Li, J., Cheng, K., Wang, S., Morstatter, F., Trevino, R. P., Tang, J., & Liu, H. (2017). Feature selection: A data perspective. ACM Computing Surveys (CSUR), 50(6), 94.
We note that other techniques based on predominant correlation might be better depending on the dataset and the objectives. FCBF provides a interpretable and robust option, with results that are generally good.
The application of filter-based feature selections for big data analysis in the biomedical sciences can have not only a direct effect in classification efficiency but might lead to interesting biological interpretations and possible quick identification of biomarkers.