The term machine learning refers to a family of computational methods for analyzing multivariate datasets. Each data point has a vector of features in a shared feature space, and may have a class label from some fixed finite set.
Supervised learning refers to processes that help articulate rules that map feature vectors to class labels. The class labels are known and function as supervisory information to guide rule construction. Unsupervised learning refers to processes that discover structure in collections of feature vectors. Typically the structure consists of a grouping of objects into clusters.
This practical introduction to machine learning will begin with a survey of a low-dimensional dataset to fix concepts, and will then address problems coming from genomic data analysis, using RNA expression and chromatin state data.
Some basic points to consider at the start:
Distinguish predictive modeling from inference on model parameters. Typical work in epidemiology focuses on estimation of relative risks, and random samples are not required. Typical work with machine learning tools targets estimation (and minimization) of the misclassification rate. Representative samples are required for this task.
“Two cultures”: model fitters vs. algorithmic predictors. If statistical models are correct, parameter estimation based on the mass of data can yield optimal discriminators (e.g., LDA). Algorithmic discriminators tend to prefer to identify boundary cases and downweight the mass of data (e.g., boosting, svm).
Different learning tools have different capabilities. There is little a priori guidance on matching learning algorithms to aspects of problems. While it is convenient to sift through a variety of approaches, one must pay a price for the model search.
Data and model/learner visualization are important, but visualization of higher dimensional data structures is hard. Dynamic graphics can help; look at ggobi and Rggobi for this.
These notes provide very little mathematical background on the methods; see for example Ripley (Pattern recognition and neural networks, 1995), Duda, Hart, Stork (Pattern classification), Hastie, Tibshirani and Friedman (2003, Elements of statistical learning) for copious background.
The following steps bring the crabs data into scope and illustrate aspects of its structure.
library("MASS")
data("crabs")
dim(crabs)
## [1] 200 8
crabs[1:4,]
## sp sex index FL RW CL CW BD
## 1 B M 1 8.1 6.7 16.1 19.0 7.0
## 2 B M 2 8.8 7.7 18.1 20.8 7.4
## 3 B M 3 9.2 7.8 19.0 22.4 7.7
## 4 B M 4 9.6 7.9 20.1 23.1 8.2
table(crabs$sex)
##
## F M
## 100 100
The plot is shown in Figure 1.
We will regard these data as providing five quantitative features (FL, RW, CL, CW, BD)1 You may consult the manual page of {crabs} for an explanation of these abbreviations. and a pair of class labels (sex, sp=species). We may regard this as a four class problem, or as two two class problems.
Our first problem does not involve any computations. If you want to write R code to solve the problem, do so, but use prose first.
A simple approach to prediction involves logistic regression.
m1 = glm(sp~RW, data=crabs, family=binomial)
summary(m1)
##
## Call:
## glm(formula = sp ~ RW, family = binomial, data = crabs)
##
## Coefficients:
## Estimate Std. Error z value Pr(>|z|)
## (Intercept) -3.44908 0.82210 -4.195 2.72e-05 ***
## RW 0.27080 0.06349 4.265 2.00e-05 ***
## ---
## Signif. codes: 0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1
##
## (Dispersion parameter for binomial family taken to be 1)
##
## Null deviance: 277.26 on 199 degrees of freedom
## Residual deviance: 256.35 on 198 degrees of freedom
## AIC: 260.35
##
## Number of Fisher Scoring iterations: 4
Question 2. Write down the statistical model corresponding to the R expression above. How can we derive a classifier from this model?
Question 3. Perform the following computations. Discuss their interpretation. What are the estimated error rates of the two models? Is the second model, on the subset, better?
plot(predict(m1,type="response"), crabs$sp,)
table(predict(m1,type="response")>.5, crabs$sp)
m2 = update(m1, subset=(sex=="F"))
table(predict(m2,type="response")>.5, crabs$sp[crabs$sex=="F"])
Cross-validation is a technique that is widely used for reducing bias in the estimation of predictive accuracy. If no precautions are taken, bias can be caused by overfitting a classification algorithm to a particular dataset; the algorithm learns the classification ‘’by heart’’, but performs poorly when asked to generalise it to new, unseen examples. Briefly, in cross-validation the dataset is deterministically partitioned into a series of training and test sets. The model is built for each training set and evaluated on the test set. The accuracy measures are averaged over this series of fits. Leave-one-out cross-validation consists of N fits, with N training sets of size N-1 and N test sets of size 1.
First let us use MLearn from the MLInterfaces package to fit a single logistic model. MLearn requires you to specify an index set for training. We use c(1:30, 51:80) to choose a training set of size 60, balanced between two species (because we know the ordering of records). This procedure also requires you to specify a probability threshold for classification. We use a typical default of 0.5. If the predicted probability of being “O” exceeds 0.5, we classify to “O”, otherwise to “B”.
library(MLInterfaces)
fcrabs = crabs[crabs$sex == "F", ]
ml1 = MLearn( sp~RW, fcrabs,glmI.logistic(thresh=.5), c(1:30, 51:80), family=binomial)
ml1
## MLInterfaces classification output container
## The call was:
## MLearn(formula = sp ~ RW, data = fcrabs, .method = glmI.logistic(thresh = 0.5),
## trainInd = c(1:30, 51:80), family = binomial)
## Predicted outcome distribution for test set:
## O
## 40
## Summary of scores on test set (use testScores() method for details):
## Min. 1st Qu. Median Mean 3rd Qu. Max.
## 0.7553 0.8861 0.9803 0.9355 0.9917 0.9997
confuMat(ml1)
## predicted
## given B O
## B 0 20
## O 0 20
Question 4. What does the report on ml1 tell you about predictions with this model? Can you reconcile this with the results in model m2? [Hint – non-randomness of the selection of the training set is a problem.]
Question 5. Modify the MLearn call to obtain a predictor that is more successful on the test set.
Now we will illustrate cross-validation. First, we scramble the order of records in the ExpressionSet so that sequentially formed groups are approximately random samples.
set.seed(123)
sfcrabs = fcrabs[ sample(nrow(fcrabs)), ]
We invoke the MLearn method in two ways – first specifying a training index set, then specifying a five-fold cross-validation.
sml1 = MLearn( sp~RW, sfcrabs, glmI.logistic(thresh=.5),c(1:30, 51:80),family=binomial)
confuMat(sml1)
## predicted
## given B O
## B 15 6
## O 8 11
smx1 = MLearn( sp~RW, sfcrabs, glmI.logistic(thresh=.5),xvalSpec("LOG", 5, function(data, clab, iternum) {which(rep(1:5, each=20) == iternum) }), family=binomial)
confuMat(smx1)
## predicted
## given B O
## B 36 14
## O 14 36
pairs(crabs[,-c(1:3)], col=ifelse(crabs$sp=="B", "blue", "orange"))
Principal components analysis transforms the multivariate data X into a new coordinate system. If the original variables are X1, . . . , Xp, then the variables in the new representation are denoted PC1, . . . , PCp. These new variables have the properties that PC1 is the linear combination of the X1, . . . , Xp having maximal variance, PC2 is the variance-maximizing linear combination of residuals of X after projecting into the hyperplane normal to PC1, and so on. If most of the variation in Xn×p can be captured in a low dimensional linear subspace of the space spanned by the columns of X, then the scatterplots of the first few principal components give a good representation of the structure in the data.
Formally, we can compute the PC using the singular value decomposition of X, in which X = U DV2, where Un×p and Vp×p are orthonormal, and D is a diagonal matrix of \(p\) nonnegative singular values. The principal components transformation is XV = UD, and if D is structured so that Dii ≥ Djj whenever i > j, then column i of XV is PCi. Note also that Dii = √n − 1 sd(PCi).
pc1 = prcomp( crabs[,-c(1:3)] )
pairs(pc1$x, col=ifelse(crabs$sp=="B", "blue", "orange"))
The plot is shown in Figure 3.
The biplot, Figure 4, shows the data in PC space and also shows the relative contributions of the original variables in composing the transformation.
biplot(pc1, choices=2:3, col=c("#80808080", "red"))
A familiar technique for displaying multivariate data in high-throughput biology is called the heatmap. In this display, samples are clustered as columns, and features as rows. The clustering technique used by default is R hclust. This procedure builds a clustering tree for the data as follows. Distances are computed between each pair of feature vectors for all N observations. The two closest pair is joined and regarded as a new object, so there are N-1 objects (clusters) at this point. This process is repeated until 1 cluster is formed; the clustering tree shows the process by which clusters are created via this agglomeration process.
The most crucial choice when applying this method is the initial choice of the distance metric between the features.
Once clusters are being formed, there are several ways to measure distances between them, based on the initial between-feature distances. Single-linkage clustering takes the distance between two clusters to be the shortest distance between any two members of the different clusters; average linkage averages all the distances between members; complete-linkage uses hte maximum distance between any two members of the different clusters. Other methods are also available in hclust.
Figure 5 shows cluster trees for samples and features. The default color choice is not great, thus we specify own using the col argument. A tiled display at the top, defined via the argument ColSideColors shows the species codes for the samples. An important choice to be made when calling heatmap is the value of the argument scale, whose default setting is to scale the rows, but not the columns.
X = data.matrix(crabs[,-c(1:3)])
heatmap(t(X), ColSideColors=ifelse(crabs$sp=="O", "orange", "blue"), col =
colorRampPalette(c("blue", "white", "red"))(255))
Typically clustering is done in the absence of labels – it is an example of unsupervised machine learning. We can ask whether the clustering provided is a ‘good’ one using the measurement of a quantity called the silhouette. This is defined in R documentation as follows:
For each observation i, the _silhouette width_ s(i) is defined as
follows:
Put a(i) = average dissimilarity between i and all other points
of the cluster to which i belongs (if i is the _only_ observation
in its cluster, s(i) := 0 without further calculations). For all
_other_ clusters C, put d(i,C) = average dissimilarity of i to all
observations of C. The smallest of these d(i,C) is b(i) := min_C
d(i,C), and can be seen as the dissimilarity between i and its
"neighbor" cluster, i.e., the nearest one to which it does _not_
belong. Finally,
s(i) := ( b(i) - a(i) ) / max( a(i), b(i) ).
We can compute the silhouette for any partition of a dataset, and can use the hierarchical clustering result to define a partition as follows:
cl = hclust(dist(X))
tr = cutree(cl,2)
table(tr)
## tr
## 1 2
## 105 95
library(cluster)
sil = silhouette( tr, dist(X) )
plot(sil)
Question 8. In the preceding, we have used default dist
, and
default clustering algorithm for the heatmap. Investigate the impact
of altering the choice of distance and clustering method on the
clustering performance, both in relation to capacity to recover
groups defined by species and in relation to the silhouette
distribution.
Question 9. The PCA shows that the data configuration in PC2 and PC3 is at least bifurcated. Apply hierarchical and K-means clustering to the two-dimensional data in this subspace, and compare results with respect to capturing the species \(\times\) gender labels, and with respect to silhouette values. For example, load the exprs slot of crES [see just below for the definition of this structure] with the PCA reexpression of the features, call the result pcrES, and then:
> ff = kmeansB(pcrES[2:3,], k=4)
> table(ff@clustIndices, crES$spsex)
In this section we will examine procedures for polychotomous prediction. We want to be able to use the measurements to predict both species and sex of the crab. Again we would like to use the MLInterfaces infrastructure, so an ExpressionSet container will be useful.
feat2 = t(data.matrix(crabs[, -c(1:3)]))
pd2 =new("AnnotatedDataFrame", crabs[,1:2])
crES = new("ExpressionSet",exprs=feat2, phenoData=pd2)
crES$spsex = paste(crES$sp,crES$sex, sep=":")
table(crES$spsex)
##
## B:F B:M O:F O:M
## 50 50 50 50
We will permute the samples so that simple selections for training set indices are random samples.
set.seed(1234)
crES = crES[ , sample(1:200, size=200, replace=FALSE)]
A classic procedure is recursive partitioning.
library(rpart)
tr1 = MLearn(spsex~., crES, rpartI, 1:140)
## [1] "spsex"
tr1
## MLInterfaces classification output container
## The call was:
## MLearn(formula = spsex ~ ., data = crES, .method = rpartI, trainInd = 1:140)
## Predicted outcome distribution for test set:
##
## B:F B:M O:F O:M
## 15 20 12 13
## Summary of scores on test set (use testScores() method for details):
## B:F B:M O:F O:M
## 0.1847013 0.3631000 0.2205201 0.2316786
confuMat(tr1)
## predicted
## given B:F B:M O:F O:M
## B:F 11 2 5 0
## B:M 4 11 0 4
## O:F 0 3 7 3
## O:M 0 4 0 6
The actual tree is
plot(RObject(tr1))
text(RObject(tr1))
This procedure includes a diagnostic tool called the cost-complexity plot:
plotcp(RObject(tr1))
A generalization of recursive partitioning is obtained by creating a collection of trees by bootstrap-sampling cases and randomly sampling from features available for splitting at nodes.
set.seed(124)
library(randomForest)
crES$spsex = factor(crES$spsex) # needed 3/2020 as fails with 'do regression?' error
rf1 = MLearn(spsex~., crES, randomForestI, 1:140 )
## [1] "spsex"
rf1
## MLInterfaces classification output container
## The call was:
## MLearn(formula = spsex ~ ., data = crES, .method = randomForestI,
## trainInd = 1:140)
## Predicted outcome distribution for test set:
##
## B:F B:M O:F O:M
## 14 21 12 13
## Summary of scores on test set (use testScores() method for details):
## B:F B:M O:F O:M
## 0.2479667 0.3208333 0.2184333 0.2127667
cm = confuMat(rf1)
cm
## predicted
## given B:F B:M O:F O:M
## B:F 13 2 2 1
## B:M 1 14 1 3
## O:F 0 2 9 2
## O:M 0 3 0 7
The single split error rate is estimated at 28%.
ld1 = MLearn(spsex~., crES, ldaI, 1:140 )
## [1] "spsex"
ld1
## MLInterfaces classification output container
## The call was:
## MLearn(formula = spsex ~ ., data = crES, .method = ldaI, trainInd = 1:140)
## Predicted outcome distribution for test set:
##
## B:F B:M O:F O:M
## 19 18 12 11
confuMat(ld1)
## predicted
## given B:F B:M O:F O:M
## B:F 17 1 0 0
## B:M 2 17 0 0
## O:F 0 0 12 1
## O:M 0 0 0 10
xvld = MLearn( spsex~., crES, ldaI, xvalSpec("LOG", 5,balKfold.xvspec(5)))
## [1] "spsex"
confuMat(xvld)
## predicted
## given B:F B:M O:F O:M
## B:F 49 1 0 0
## B:M 5 45 0 0
## O:F 0 0 46 4
## O:M 0 0 0 50
nn1 = MLearn(spsex~., crES, nnetI, 1:140, size=3, decay=.1)
## [1] "spsex"
## # weights: 34
## initial value 210.549773
## iter 10 value 192.102775
## iter 20 value 147.838019
## iter 30 value 122.446145
## iter 40 value 42.634063
## iter 50 value 33.156533
## iter 60 value 32.631597
## iter 70 value 32.587472
## iter 80 value 32.584864
## final value 32.584303
## converged
nn1
## MLInterfaces classification output container
## The call was:
## MLearn(formula = spsex ~ ., data = crES, .method = nnetI, trainInd = 1:140,
## size = 3, decay = 0.1)
## Predicted outcome distribution for test set:
##
## B:F B:M O:F O:M
## 18 19 12 11
## Summary of scores on test set (use testScores() method for details):
## B:F B:M O:F O:M
## 0.2948541 0.3078294 0.2091575 0.1881590
RObject(nn1)
## a 5-3-4 network with 34 weights
## inputs: FL RW CL CW BD
## output(s): spsex
## options were - softmax modelling decay=0.1
confuMat(nn1)
## predicted
## given B:F B:M O:F O:M
## B:F 17 1 0 0
## B:M 1 18 0 0
## O:F 0 0 12 1
## O:M 0 0 0 10
xvnnBAD = MLearn( spsex~., crES, nnetI, xvalSpec("LOG", 5, function(data, clab,iternum) which( rep(1:5,each=40) == iternum ) ), size=3,decay=.1 )
## [1] "spsex"
## # weights: 34
## initial value 59.944660
## iter 10 value 52.383742
## iter 20 value 52.328922
## iter 30 value 36.162023
## iter 40 value 18.424810
## iter 50 value 16.742739
## iter 60 value 16.666492
## iter 70 value 16.531701
## iter 80 value 16.348753
## iter 90 value 16.341980
## iter 100 value 16.341716
## final value 16.341716
## stopped after 100 iterations
## # weights: 34
## initial value 60.559984
## iter 10 value 55.332627
## iter 20 value 54.471313
## iter 30 value 37.129183
## iter 40 value 18.743630
## iter 50 value 18.343335
## iter 60 value 18.341766
## iter 70 value 18.340791
## final value 18.340126
## converged
## # weights: 34
## initial value 58.388107
## iter 10 value 50.025755
## iter 20 value 34.567868
## iter 30 value 25.393417
## iter 40 value 19.119780
## iter 50 value 18.479760
## iter 60 value 18.457200
## iter 70 value 18.455017
## iter 70 value 18.455017
## final value 18.455017
## converged
## # weights: 34
## initial value 56.312404
## iter 10 value 54.231832
## iter 20 value 38.578144
## iter 30 value 21.749309
## iter 40 value 19.433643
## iter 50 value 18.175293
## iter 60 value 18.027653
## iter 70 value 18.022584
## iter 80 value 18.021740
## final value 18.021733
## converged
## # weights: 34
## initial value 66.222486
## iter 10 value 51.932804
## iter 20 value 42.369662
## iter 30 value 36.429562
## iter 40 value 23.026644
## iter 50 value 17.763455
## iter 60 value 17.626915
## iter 70 value 17.609194
## iter 80 value 17.608039
## iter 90 value 17.607812
## final value 17.607805
## converged
xvnnGOOD = MLearn( spsex~., crES, nnetI, xvalSpec("LOG", 5,balKfold.xvspec(5) ), size=3, decay=.1 )
## [1] "spsex"
## # weights: 34
## initial value 236.655971
## iter 10 value 221.577281
## iter 20 value 193.401577
## iter 30 value 109.642510
## iter 40 value 87.837208
## iter 50 value 53.337845
## iter 60 value 40.015235
## iter 70 value 39.529689
## iter 80 value 39.508922
## iter 90 value 39.485591
## iter 100 value 39.205868
## final value 39.205868
## stopped after 100 iterations
## # weights: 34
## initial value 278.638252
## iter 10 value 221.728674
## iter 20 value 180.982892
## iter 30 value 156.111919
## iter 40 value 123.000370
## iter 50 value 55.242191
## iter 60 value 34.086648
## iter 70 value 32.937901
## iter 80 value 32.792157
## iter 90 value 32.765436
## final value 32.763993
## converged
## # weights: 34
## initial value 235.827834
## iter 10 value 185.584490
## iter 20 value 137.388611
## iter 30 value 126.312306
## iter 40 value 83.167721
## iter 50 value 39.525854
## iter 60 value 34.327764
## iter 70 value 33.226308
## iter 80 value 32.262021
## iter 90 value 32.208223
## final value 32.208198
## converged
## # weights: 34
## initial value 246.161602
## iter 10 value 221.701021
## iter 20 value 152.075319
## iter 30 value 125.184824
## iter 40 value 122.328179
## iter 50 value 108.784116
## iter 60 value 69.806462
## iter 70 value 59.034110
## iter 80 value 46.754185
## iter 90 value 36.519916
## iter 100 value 35.531868
## final value 35.531868
## stopped after 100 iterations
## # weights: 34
## initial value 235.690522
## iter 10 value 221.074899
## iter 20 value 142.146905
## iter 30 value 122.632468
## iter 40 value 51.504304
## iter 50 value 35.382372
## iter 60 value 33.506367
## iter 70 value 32.601047
## iter 80 value 32.447009
## iter 90 value 32.407399
## final value 32.405065
## converged
confuMat(xvnnBAD)
## predicted
## given B:F B:M O:F O:M
## B:F 49 1 0 0
## B:M 5 45 0 0
## O:F 0 0 46 4
## O:M 0 0 3 47
confuMat(xvnnGOOD)
## predicted
## given B:F B:M O:F O:M
## B:F 49 1 0 0
## B:M 4 46 0 0
## O:F 0 0 49 1
## O:M 0 0 0 50
sv1 = MLearn(spsex~., crES, svmI, 1:140)
## [1] "spsex"
sv1
## MLInterfaces classification output container
## The call was:
## MLearn(formula = spsex ~ ., data = crES, .method = svmI, trainInd = 1:140)
## Predicted outcome distribution for test set:
##
## B:F B:M O:F O:M
## 23 16 12 9
## Summary of scores on test set (use testScores() method for details):
## B:M B:F O:M O:F
## 0.2474892 0.3082105 0.1902935 0.2540068
RObject(sv1)
##
## Call:
## svm(formula = formula, data = data, probability = probability)
##
##
## Parameters:
## SVM-Type: C-classification
## SVM-Kernel: radial
## cost: 1
##
## Number of Support Vectors: 129
confuMat(sv1)
## predicted
## given B:F B:M O:F O:M
## B:F 16 0 2 0
## B:M 5 13 0 1
## O:F 2 1 10 0
## O:M 0 2 0 8
xvsv = MLearn( spsex~., crES,svmI, xvalSpec("LOG", 5, balKfold.xvspec(5)))
## [1] "spsex"
confuMat(xvsv)
## predicted
## given B:F B:M O:F O:M
## B:F 45 0 5 0
## B:M 12 34 0 4
## O:F 9 0 40 1
## O:M 4 0 0 46
Here we will concentrate on ALL: acute lymphocytic leukemia, B-cell type.
We will identify expression patterns that discriminate individuals with BCR/ABL fusion in B-cell leukemia.
library("ALL")
data("ALL")
bALL = ALL[, substr(ALL$BT,1,1) == "B"]
fus = bALL[, bALL$mol.biol %in% c("BCR/ABL", "NEG")]
fus$mol.biol = factor(fus$mol.biol)
fus
## ExpressionSet (storageMode: lockedEnvironment)
## assayData: 12625 features, 79 samples
## element names: exprs
## protocolData: none
## phenoData
## sampleNames: 01005 01010 ... 84004 (79 total)
## varLabels: cod diagnosis ... date last seen (21 total)
## varMetadata: labelDescription
## featureData: none
## experimentData: use 'experimentData(object)'
## pubMedIds: 14684422 16243790
## Annotation: hgu95av2
We can nonspecifically filter to 300 genes (to save computing time) with largest measures of robust variation across all samples:
mads = apply(exprs(fus),1,mad)
fusk = fus[ mads > sort(mads,decr=TRUE)[300], ]
fcol =ifelse(fusk$mol.biol=="NEG", "green", "red")
For exploratory data analysis, a heatmap is customary.
heatmap(exprs(fusk), ColSideColors=fcol)
Principal components and a biplot may be more revealing. How many principal components are likely to be important?
PCg = prcomp(t(exprs(fusk)))
plot(PCg)
pairs(PCg$x[,1:5],col=fcol,pch=19)
biplot(PCg)
Question 13. Consider the following code
chkT = function (x, eset=fusk) {
t.test(exprs(eset)[x, eset$mol.b == "NEG"], exprs(eset)[x, eset$mol.b ==
"BCR/ABL"]) }
Use it in conjunction with the biplot to interpret expression patterns of genes that appear to be important in defining the PCs.
Diagonal LDA has a good reputation. Let’s try it first, followed by neural net and random forests. We will not attend to tuning the latter two, defaults or guesses for key parameters are used.
dld1 = MLearn( mol.biol~., fusk, dldaI, 1:40 )
## [1] "mol.biol"
dld1
## MLInterfaces classification output container
## The call was:
## MLearn(formula = mol.biol ~ ., data = fusk, .method = dldaI,
## trainInd = 1:40)
## Predicted outcome distribution for test set:
##
## BCR/ABL NEG
## 27 12
confuMat(dld1)
## predicted
## given BCR/ABL NEG
## BCR/ABL 15 1
## NEG 12 11
nnALL = MLearn( mol.biol~., fusk, nnetI, 1:40, size=5, decay=.01, MaxNWts=2000 )
## [1] "mol.biol"
## # weights: 1506
## initial value 32.454087
## iter 10 value 27.625693
## iter 20 value 14.433671
## iter 30 value 11.781962
## iter 40 value 8.806493
## iter 50 value 6.903445
## iter 60 value 1.663919
## iter 70 value 1.362786
## iter 80 value 1.352153
## iter 90 value 1.230728
## iter 100 value 0.875583
## final value 0.875583
## stopped after 100 iterations
confuMat(nnALL)
## predicted
## given BCR/ABL NEG
## BCR/ABL 14 2
## NEG 10 13
rfALL = MLearn(
mol.biol~., fusk, randomForestI, 1:40 )
## [1] "mol.biol"
rfALL
## MLInterfaces classification output container
## The call was:
## MLearn(formula = mol.biol ~ ., data = fusk, .method = randomForestI,
## trainInd = 1:40)
## Predicted outcome distribution for test set:
##
## BCR/ABL NEG
## 25 14
## Summary of scores on test set (use testScores() method for details):
## BCR/ABL NEG
## 0.536 0.464
confuMat(rfALL)
## predicted
## given BCR/ABL NEG
## BCR/ABL 15 1
## NEG 10 13
None of these are extremely impressive, but the problem may just be very hard.
Question 14. We can assess the predictive capacity of a set of genes by restricting the ExpressionSet to that set and using the best classifier appropriate to the problem. We can also assess the incremental effect of combining gene sets, relative to using them separately.
One collection of gene sets that is straightforward to use and interpret is provided by the keggorthology package (see also GSEABase). Here’s how we can define the ExpressionSets for genes annotated by KEGG to Environmental (Genetic) Information Processing:
library(keggorthology)
data(KOgraph)
adj(KOgraph,nodes(KOgraph)[1])
## $KO.Feb10root
## [1] "Metabolism"
## [2] "Genetic Information Processing"
## [3] "Environmental Information Processing"
## [4] "Cellular Processes"
## [5] "Organismal Systems"
## [6] "Human Diseases"
EIP = getKOprobes("Environmental Information Processing")
GIP = getKOprobes("Genetic Information Processing")
length(intersect(EIP, GIP))
## [1] 44
EIPi = setdiff(EIP, GIP)
GIP = setdiff(GIP, EIP)
EIP = EIPi
Efusk = fusk[ featureNames(fusk) %in% EIP, ]
Gfusk = fusk[ featureNames(fusk) %in% EIP, ]
Obtain and assess the predictive capacity of the genes annotated to "Cell Growth and Death".
We provide helper functions to conduct several kinds of feature selection in cross-validation, see help(fs.absT). Here we pick the top 30 features (ranked by absolute t statistic) for each cross-validation partition.
dldFS = MLearn( mol.biol~., fusk, dldaI, xvalSpec("LOG", 5, balKfold.xvspec(5), fs.absT(30) ))
## [1] "mol.biol"
dldFS
## MLInterfaces classification output container
## The call was:
## MLearn(formula = mol.biol ~ ., data = fusk, .method = dldaI,
## trainInd = xvalSpec("LOG", 5, balKfold.xvspec(5), fs.absT(30)))
## Predicted outcome distribution for test set:
##
## BCR/ABL NEG
## 42 37
## history of feature selection in cross-validation available; use fsHistory()
confuMat(dld1)
## predicted
## given BCR/ABL NEG
## BCR/ABL 15 1
## NEG 12 11
confuMat(dldFS)
## predicted
## given BCR/ABL NEG
## BCR/ABL 34 3
## NEG 8 34
sessionInfo()
## R version 4.4.1 (2024-06-14)
## Platform: x86_64-pc-linux-gnu
## Running under: Ubuntu 24.04.1 LTS
##
## Matrix products: default
## BLAS: /home/biocbuild/bbs-3.20-bioc/R/lib/libRblas.so
## LAPACK: /usr/lib/x86_64-linux-gnu/lapack/liblapack.so.3.12.0
##
## 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
##
## time zone: America/New_York
## tzcode source: system (glibc)
##
## attached base packages:
## [1] stats4 stats graphics grDevices utils datasets methods
## [8] base
##
## other attached packages:
## [1] keggorthology_2.58.0 graph_1.84.0 hgu95av2.db_3.13.0
## [4] org.Hs.eg.db_3.20.0 ALL_1.47.0 randomForest_4.7-1.2
## [7] rpart_4.1.23 lattice_0.22-6 MASS_7.3-61
## [10] gbm_2.2.2 MLInterfaces_1.86.0 cluster_2.1.6
## [13] annotate_1.84.0 XML_3.99-0.17 AnnotationDbi_1.68.0
## [16] IRanges_2.40.0 S4Vectors_0.44.0 Biobase_2.66.0
## [19] BiocGenerics_0.52.0 Rcpp_1.0.13 BiocStyle_2.34.0
##
## loaded via a namespace (and not attached):
## [1] blob_1.2.4 Biostrings_2.74.0
## [3] fastmap_1.2.0 digest_0.6.37
## [5] lifecycle_1.0.4 survival_3.7-0
## [7] KEGGREST_1.46.0 gdata_3.0.1
## [9] RSQLite_2.3.7 genefilter_1.88.0
## [11] magrittr_2.0.3 compiler_4.4.1
## [13] rlang_1.1.4 sass_0.4.9
## [15] tools_4.4.1 yaml_2.3.10
## [17] knitr_1.48 S4Arrays_1.6.0
## [19] bit_4.5.0 DelayedArray_0.32.0
## [21] abind_1.4-8 nnet_7.3-19
## [23] grid_4.4.1 xtable_1.8-4
## [25] e1071_1.7-16 ada_2.0-5
## [27] gtools_3.9.5 tinytex_0.53
## [29] SummarizedExperiment_1.36.0 cli_3.6.3
## [31] rmarkdown_2.28 crayon_1.5.3
## [33] httr_1.4.7 DBI_1.2.3
## [35] cachem_1.1.0 proxy_0.4-27
## [37] zlibbioc_1.52.0 splines_4.4.1
## [39] BiocManager_1.30.25 XVector_0.46.0
## [41] matrixStats_1.4.1 vctrs_0.6.5
## [43] Matrix_1.7-1 jsonlite_1.8.9
## [45] bookdown_0.41 bit64_4.5.2
## [47] magick_2.8.5 jquerylib_0.1.4
## [49] codetools_0.2-20 GenomeInfoDb_1.42.0
## [51] sfsmisc_1.1-19 GenomicRanges_1.58.0
## [53] UCSC.utils_1.2.0 htmltools_0.5.8.1
## [55] GenomeInfoDbData_1.2.13 R6_2.5.1
## [57] evaluate_1.0.1 highr_0.11
## [59] png_0.1-8 memoise_2.0.1
## [61] bslib_0.8.0 class_7.3-22
## [63] SparseArray_1.6.0 xfun_0.48
## [65] MatrixGenerics_1.18.0 pkgconfig_2.0.3