# binary classification using the ionosphere data

#### 2019-11-29

The following examples illustrate the functionality of the KernelKnn package for classification tasks. I’ll make use of the ionosphere data set,

data(ionosphere, package = 'KernelKnn')

apply(ionosphere, 2, function(x) length(unique(x)))
##    V1    V2    V3    V4    V5    V6    V7    V8    V9   V10   V11   V12
##     2     1   219   269   204   259   231   260   244   267   246   269
##   V13   V14   V15   V16   V17   V18   V19   V20   V21   V22   V23   V24
##   238   266   234   270   254   280   254   266   248   265   248   264
##   V25   V26   V27   V28   V29   V30   V31   V32   V33   V34 class
##   256   273   256   281   244   266   243   263   245   263     2
# the second column will be removed as it has a single unique value

ionosphere = ionosphere[, -2]

When using an algorithm where the ouput depends on distance calculation (as is the case in k-nearest-neighbors) it is recommended to first scale the data,

# recommended is to scale the data

X = scale(ionosphere[, -ncol(ionosphere)])
y = ionosphere[, ncol(ionosphere)]

important note : In classification, both functions KernelKnn and KernelKnnCV accept a numeric vector as a response variable (here y) and the unique values of the labels should begin from 1. This is important otherwise the internal functions do not work. Furthermore, both functions (by default) return predictions in form of probabilities, which can be converted to labels by using either a threshold (if binary classification) or the maximum value of each column (if multiclass classification).

# labels should be numeric and begin from 1:Inf

y = c(1:length(unique(y)))[ match(ionosphere$class, sort(unique(ionosphere$class))) ]

# random split of data in train and test

spl_train = sample(1:length(y), round(length(y) * 0.75))
spl_test = setdiff(1:length(y), spl_train)
str(spl_train)
##  int [1:263] 152 100 134 277 322 64 305 167 11 177 ...
str(spl_test)
##  int [1:88] 1 5 14 15 16 20 21 28 29 32 ...
# evaluation metric

acc = function (y_true, preds) {

out = table(y_true, max.col(preds, ties.method = "random"))

acc = sum(diag(out))/sum(out)

acc
}

## The KernelKnn function

The KernelKnn function takes a number of arguments. To read details for each one of the arguments type ?KernelKnn::KernelKnn in the console.

A simple k-nearest-neighbors can be run with weights_function = NULL and the parameter ‘regression’ should be set to FALSE. In classification the Levels parameter takes the unique values of the response variable,

library(KernelKnn)

preds_TEST = KernelKnn(X[spl_train, ], TEST_data = X[spl_test, ], y[spl_train], k = 5 ,

method = 'euclidean', weights_function = NULL, regression = F,

Levels = unique(y))
head(preds_TEST)
##      class_1 class_2
## [1,]     0.2     0.8
## [2,]     0.2     0.8
## [3,]     0.0     1.0
## [4,]     0.0     1.0
## [5,]     0.6     0.4
## [6,]     0.2     0.8

There are two ways to use a kernel in the KernelKnn function. The first option is to choose one of the existing kernels (uniform, triangular, epanechnikov, biweight, triweight, tricube, gaussian, cosine, logistic, silverman, inverse, gaussianSimple, exponential). Here, I use the canberra metric and the tricube kernel because they give optimal results (according to my RandomSearchR package),

preds_TEST_tric = KernelKnn(X[spl_train, ], TEST_data = X[spl_test, ], y[spl_train], k = 10 ,

method = 'canberra', weights_function = 'tricube', regression = F,

Levels = unique(y))
head(preds_TEST_tric)
##           [,1]         [,2]
## [1,] 0.0000000 1.0000000000
## [2,] 0.0000000 1.0000000000
## [3,] 0.5635877 0.4364123451
## [4,] 0.1441363 0.8558636754
## [5,] 0.9995187 0.0004813259
## [6,] 0.8994787 0.1005212960

The second option is to give a self defined kernel function. Here, I’ll pick the density function of the normal distribution with mean = 0.0 and standard deviation = 1.0 (the data are scaled to have mean zero and unit variance),

norm_kernel = function(W) {

W = dnorm(W, mean = 0, sd = 1.0)

W = W / rowSums(W)

return(W)
}

preds_TEST_norm = KernelKnn(X[spl_train, ], TEST_data = X[spl_test, ], y[spl_train], k = 10 ,

method = 'canberra', weights_function = norm_kernel, regression = F,

Levels = unique(y))
head(preds_TEST_norm)
##           [,1]       [,2]
## [1,] 0.0000000 1.00000000
## [2,] 0.0000000 1.00000000
## [3,] 0.4334149 0.56658510
## [4,] 0.1869283 0.81307169
## [5,] 0.9138637 0.08613632
## [6,] 0.8989750 0.10102495

The computations can be speed up by using the parameter threads (multiple cores can be run in parallel). There is also the option to exclude extrema (minimum and maximum distances) during the calculation of the k-nearest-neighbor distances using extrema = TRUE. The bandwidth of the existing kernels can be tuned using the h parameter.

K-nearest-neigbor calculations in the KernelKnn function can be accomplished using the following distance metrics : euclidean, manhattan, chebyshev, canberra, braycurtis, minkowski (by default the order ‘p’ of the minkowski parameter equals k), hamming, mahalanobis, pearson_correlation, simple_matching_coefficient, jaccard_coefficient and Rao_coefficient. The last four are similarity measures and are appropriate for binary data [0,1].

I employed my RandomSearchR package to find the optimal parameters for the KernelKnn function and the following two pairs of parameters give an optimal accuracy,

k method kernel
10 canberra tricube
9 canberra epanechnikov

## The KernelKnnCV function

I’ll use the KernelKnnCV function to calculate the accuracy using 5-fold cross-validation for the previous mentioned parameter pairs,

fit_cv_pair1 = KernelKnnCV(X, y, k = 10 , folds = 5, method = 'canberra',

weights_function = 'tricube', regression = F,

Levels = unique(y), threads = 5, seed_num = 5)
str(fit_cv_pair1)
## List of 2
##  $preds:List of 5 ## ..$ : num [1:71, 1:2] 0.00648 0.25323 1 0.97341 0.92031 ...
##   ..$: num [1:70, 1:2] 0 0 0 0 0.999 ... ## ..$ : num [1:70, 1:2] 0.353 0 0.17 0.212 0.266 ...
##   ..$: num [1:70, 1:2] 0 0 0 0 0 ... ## ..$ : num [1:70, 1:2] 0.989 0 1 0 0 ...
##  $folds:List of 5 ## ..$ fold_1: int [1:71] 5 26 233 243 30 41 237 229 19 11 ...
##   ..$fold_2: int [1:70] 262 89 257 67 58 266 253 85 275 268 ... ## ..$ fold_3: int [1:70] 127 128 295 287 134 288 130 277 125 101 ...
##   ..$fold_4: int [1:70] 313 301 317 318 316 142 175 157 146 147 ... ## ..$ fold_5: int [1:70] 195 326 225 332 342 347 206 219 218 214 ...
fit_cv_pair2 = KernelKnnCV(X, y, k = 9 , folds = 5,method = 'canberra',

weights_function = 'epanechnikov', regression = F,

Levels = unique(y), threads = 5, seed_num = 5)
str(fit_cv_pair2)
## List of 2
##  $preds:List of 5 ## ..$ : num [1:71, 1:2] 0.0224 0.255 1 0.9601 0.8876 ...
##   ..$: num [1:70, 1:2] 0 0 0 0 0.998 ... ## ..$ : num [1:70, 1:2] 0.36 0 0.164 0.185 0.202 ...
##   ..$: num [1:70, 1:2] 0 0 0 0 0 ... ## ..$ : num [1:70, 1:2] 0.912 0 1 0 0 ...
##  $folds:List of 5 ## ..$ fold_1: int [1:71] 5 26 233 243 30 41 237 229 19 11 ...
##   ..$fold_2: int [1:70] 262 89 257 67 58 266 253 85 275 268 ... ## ..$ fold_3: int [1:70] 127 128 295 287 134 288 130 277 125 101 ...
##   ..$fold_4: int [1:70] 313 301 317 318 316 142 175 157 146 147 ... ## ..$ fold_5: int [1:70] 195 326 225 332 342 347 206 219 218 214 ...

Each cross-validated object returns a list of length 2 ( the first sublist includes the predictions for each fold whereas the second gives the indices of the folds)

acc_pair1 = unlist(lapply(1:length(fit_cv_pair1$preds), function(x) acc(y[fit_cv_pair1$folds[[x]]],

fit_cv_pair1$preds[[x]]))) acc_pair1 ## [1] 0.9154930 0.9142857 0.9142857 0.9285714 0.9571429 cat('accurcay for params_pair1 is :', mean(acc_pair1), '\n') ## accurcay for params_pair1 is : 0.9259557 acc_pair2 = unlist(lapply(1:length(fit_cv_pair2$preds),

function(x) acc(y[fit_cv_pair2$folds[[x]]], fit_cv_pair2$preds[[x]])))
acc_pair2
## [1] 0.9014085 0.9142857 0.9000000 0.9142857 0.9571429
cat('accuracy for params_pair2 is :', mean(acc_pair2), '\n')
## accuracy for params_pair2 is : 0.9174245

In the KernelKnn package there is also the option to combine kernels (adding or multiplying) from the existing ones. For instance, if I want to multiply the tricube with the gaussian kernel, then I’ll give the following character string to the weights_function, “tricube_gaussian_MULT”. On the other hand, If I want to add the same kernels then the weights_function will be “tricube_gaussian_ADD”. I experimented with my RandomSearchR package combining the different kernels and the following two parameter settings gave optimal results,

k method kernel
16 canberra biweight_triweight_gaussian_MULT
5 canberra triangular_triweight_MULT

fit_cv_pair1 = KernelKnnCV(X, y, k = 16, folds = 5, method = 'canberra',

weights_function = 'biweight_triweight_gaussian_MULT',

regression = F, Levels = unique(y), threads = 5,

seed_num = 5)
str(fit_cv_pair1)
## List of 2
##  $preds:List of 5 ## ..$ : num [1:71, 1:2] 0.0015 0.1516 1 0.9763 0.9674 ...
##   ..$: num [1:70, 1:2] 0 0 0 0 0.999 ... ## ..$ : num [1:70, 1:2] 0.249 0 0.113 0.252 0.27 ...
##   ..$: num [1:70, 1:2] 0 0 0 0 0 ... ## ..$ : num [1:70, 1:2] 0.991 0 1 0 0 ...
##  $folds:List of 5 ## ..$ fold_1: int [1:71] 5 26 233 243 30 41 237 229 19 11 ...
##   ..$fold_2: int [1:70] 262 89 257 67 58 266 253 85 275 268 ... ## ..$ fold_3: int [1:70] 127 128 295 287 134 288 130 277 125 101 ...
##   ..$fold_4: int [1:70] 313 301 317 318 316 142 175 157 146 147 ... ## ..$ fold_5: int [1:70] 195 326 225 332 342 347 206 219 218 214 ...
fit_cv_pair2 = KernelKnnCV(X, y, k = 5, folds = 5, method = 'canberra',

weights_function = 'triangular_triweight_MULT',

regression = F, Levels = unique(y), threads = 5,

seed_num = 5)
str(fit_cv_pair2)
## List of 2
##  $preds:List of 5 ## ..$ : num [1:71, 1:2] 0 0.0273 1 1 1 ...
##   ..$: num [1:70, 1:2] 0 0 0 0 1 ... ## ..$ : num [1:70, 1:2] 0.1161 0 0.0105 0.307 0.022 ...
##   ..$: num [1:70, 1:2] 0 0 0 0 0 ... ## ..$ : num [1:70, 1:2] 1 0 1 0 0 ...
##  $folds:List of 5 ## ..$ fold_1: int [1:71] 5 26 233 243 30 41 237 229 19 11 ...
##   ..$fold_2: int [1:70] 262 89 257 67 58 266 253 85 275 268 ... ## ..$ fold_3: int [1:70] 127 128 295 287 134 288 130 277 125 101 ...
##   ..$fold_4: int [1:70] 313 301 317 318 316 142 175 157 146 147 ... ## ..$ fold_5: int [1:70] 195 326 225 332 342 347 206 219 218 214 ...

acc_pair1 = unlist(lapply(1:length(fit_cv_pair1$preds), function(x) acc(y[fit_cv_pair1$folds[[x]]],

fit_cv_pair1$preds[[x]]))) acc_pair1 ## [1] 0.9014085 0.9142857 0.9285714 0.9285714 0.9571429 cat('accuracy for params_pair1 is :', mean(acc_pair1), '\n') ## accuracy for params_pair1 is : 0.925996 acc_pair2 = unlist(lapply(1:length(fit_cv_pair2$preds),

function(x) acc(y[fit_cv_pair2$folds[[x]]], fit_cv_pair2$preds[[x]])))
acc_pair2
## [1] 0.9014085 0.9285714 0.9285714 0.9142857 0.9714286
cat('accuracy for params_pair2 is :', mean(acc_pair2), '\n')
## accuracy for params_pair2 is : 0.9288531