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The purpose of this vignette is to show you how to use XGBoost to discover and understand your own dataset better.
This vignette is not about predicting anything (see XGBoost presentation). We will explain how to use XGBoost to highlight the link between the features of your data and the outcome.
Package loading:
require(xgboost)
require(Matrix)
require(data.table)
if (!require('vcd')) {
install.packages('vcd')
}
data.table::setDTthreads(2)
VCD package is used for one of its embedded dataset only.
XGBoost manages only numeric
vectors.
What to do when you have categorical data?
A categorical variable has a fixed number of different values. For instance, if a variable called Colour can have only one of these three values, red, blue or green, then Colour is a categorical variable.
In R, a categorical variable is called
factor
.Type
?factor
in the console for more information.
To answer the question above we will convert categorical
variables to numeric
one.
In this Vignette we will see how to transform a dense
data.frame
(dense = few zeroes in the matrix) with
categorical variables to a very sparse matrix
(sparse = lots of zero in the matrix) of numeric
features.
The method we are going to see is usually called one-hot encoding.
The first step is to load Arthritis
dataset in memory
and wrap it with data.table
package.
data.table
is 100% compliant with Rdata.frame
but its syntax is more consistent and its performance for large dataset is best in class (dplyr
from R andPandas
from Python included). Some parts of XGBoost R package usedata.table
.
The first thing we want to do is to have a look to the first few
lines of the data.table
:
## ID Treatment Sex Age Improved
## <int> <fctr> <fctr> <int> <ord>
## 1: 57 Treated Male 27 Some
## 2: 46 Treated Male 29 None
## 3: 77 Treated Male 30 None
## 4: 17 Treated Male 32 Marked
## 5: 36 Treated Male 46 Marked
## 6: 23 Treated Male 58 Marked
Now we will check the format of each column.
## Classes 'data.table' and 'data.frame': 84 obs. of 5 variables:
## $ ID : int 57 46 77 17 36 23 75 39 33 55 ...
## $ Treatment: Factor w/ 2 levels "Placebo","Treated": 2 2 2 2 2 2 2 2 2 2 ...
## $ Sex : Factor w/ 2 levels "Female","Male": 2 2 2 2 2 2 2 2 2 2 ...
## $ Age : int 27 29 30 32 46 58 59 59 63 63 ...
## $ Improved : Ord.factor w/ 3 levels "None"<"Some"<..: 2 1 1 3 3 3 1 3 1 1 ...
## - attr(*, ".internal.selfref")=<externalptr>
2 columns have factor
type, one has ordinal
type.
ordinal
variable :
- can take a limited number of values (like
factor
) ;- these values are ordered (unlike
factor
). Here these ordered values are:Marked > Some > None
We will add some new categorical features to see if it helps.
For the first feature we create groups of age by rounding the real age.
Note that we transform it to factor
so the algorithm
treat these age groups as independent values.
Therefore, 20 is not closer to 30 than 60. To make it short, the distance between ages is lost in this transformation.
## ID Treatment Sex Age Improved AgeDiscret
## <int> <fctr> <fctr> <int> <ord> <fctr>
## 1: 57 Treated Male 27 Some 3
## 2: 46 Treated Male 29 None 3
## 3: 77 Treated Male 30 None 3
## 4: 17 Treated Male 32 Marked 3
## 5: 36 Treated Male 46 Marked 5
## 6: 23 Treated Male 58 Marked 6
Following is an even stronger simplification of the real age with an arbitrary split at 30 years old. We choose this value based on nothing. We will see later if simplifying the information based on arbitrary values is a good strategy (you may already have an idea of how well it will work…).
## ID Treatment Sex Age Improved AgeDiscret AgeCat
## <int> <fctr> <fctr> <int> <ord> <fctr> <fctr>
## 1: 57 Treated Male 27 Some 3 Young
## 2: 46 Treated Male 29 None 3 Young
## 3: 77 Treated Male 30 None 3 Young
## 4: 17 Treated Male 32 Marked 3 Old
## 5: 36 Treated Male 46 Marked 5 Old
## 6: 23 Treated Male 58 Marked 6 Old
Next step, we will transform the categorical data to dummy variables. Several encoding methods exist, e.g., one-hot encoding is a common approach. We will use the dummy contrast coding which is popular because it produces “full rank” encoding (also see this blog post by Max Kuhn).
The purpose is to transform each value of each categorical
feature into a binary feature {0, 1}
.
For example, the column Treatment
will be replaced by
two columns, TreatmentPlacebo
, and
TreatmentTreated
. Each of them will be binary.
Therefore, an observation which has the value Placebo
in
column Treatment
before the transformation will have after
the transformation the value 1
in the new column
TreatmentPlacebo
and the value 0
in the new
column TreatmentTreated
. The column
TreatmentPlacebo
will disappear during the contrast
encoding, as it would be absorbed into a common constant intercept
column.
Column Improved
is excluded because it will be our
label
column, the one we want to predict.
## 6 x 9 sparse Matrix of class "dgCMatrix"
## TreatmentTreated SexMale Age AgeDiscret3 AgeDiscret4 AgeDiscret5 AgeDiscret6
## 1 1 1 27 1 . . .
## 2 1 1 29 1 . . .
## 3 1 1 30 1 . . .
## 4 1 1 32 1 . . .
## 5 1 1 46 . . 1 .
## 6 1 1 58 . . . 1
## AgeDiscret7 AgeCatYoung
## 1 . 1
## 2 . 1
## 3 . 1
## 4 . .
## 5 . .
## 6 . .
Formula
Improved ~ .
used above means transform all categorical features but columnImproved
to binary values. The-1
column selection removes the intercept column which is full of1
(this column is generated by the conversion). For more information, you can type?sparse.model.matrix
in the console.
Create the output numeric
vector (not as a sparse
Matrix
):
Y
vector to 0
;Y
to 1
for rows where
Improved == Marked
is TRUE
;Y
vector.The code below is very usual. For more information, you can look at
the documentation of xgboost
function (or at the vignette
XGBoost
presentation).
bst <- xgboost(data = sparse_matrix, label = output_vector, max_depth = 4,
eta = 1, nthread = 2, nrounds = 10,objective = "binary:logistic")
## [1] train-logloss:0.485466
## [2] train-logloss:0.438534
## [3] train-logloss:0.412250
## [4] train-logloss:0.395828
## [5] train-logloss:0.384264
## [6] train-logloss:0.374028
## [7] train-logloss:0.365005
## [8] train-logloss:0.351233
## [9] train-logloss:0.341678
## [10] train-logloss:0.334465
You can see some train-error: 0.XXXXX
lines followed by
a number. It decreases. Each line shows how well the model explains your
data. Lower is better.
A small value for training error may be a symptom of overfitting, meaning the model will not accurately predict the future values.
Here you can see the numbers decrease until line 7 and then increase.
It probably means we are overfitting. To fix that I should reduce the number of rounds to
nrounds = 4
. I will let things like that because I don’t really care for the purpose of this example :-)
Remember, each binary column corresponds to a single value of one of categorical features.
## Feature Gain Cover Frequency
## <char> <num> <num> <num>
## 1: Age 0.622031769 0.67251696 0.67241379
## 2: TreatmentTreated 0.285750540 0.11916651 0.10344828
## 3: SexMale 0.048744022 0.04522028 0.08620690
## 4: AgeDiscret6 0.016604639 0.04784639 0.05172414
## 5: AgeDiscret3 0.016373781 0.08028951 0.05172414
## 6: AgeDiscret4 0.009270557 0.02858801 0.01724138
The column
Gain
provide the information we are looking for.As you can see, features are classified by
Gain
.
Gain
is the improvement in accuracy brought by a feature
to the branches it is on. The idea is that before adding a new split on
a feature X to the branch there was some wrongly classified elements,
after adding the split on this feature, there are two new branches, and
each of these branch is more accurate (one branch saying if your
observation is on this branch then it should be classified as
1
, and the other branch saying the exact opposite).
Cover
measures the relative quantity of observations
concerned by a feature.
Frequency
is a simpler way to measure the
Gain
. It just counts the number of times a feature is used
in all generated trees. You should not use it (unless you know why you
want to use it).
We can go deeper in the analysis of the model. In the
data.table
above, we have discovered which features counts
to predict if the illness will go or not. But we don’t yet know the role
of these features. For instance, one of the question we may want to
answer would be: does receiving a placebo treatment helps to recover
from the illness?
One simple solution is to count the co-occurrences of a feature and a class of the classification.
For that purpose we will execute the same function as above but using
two more parameters, data
and label
.
importanceRaw <- xgb.importance(feature_names = colnames(sparse_matrix), model = bst, data = sparse_matrix, label = output_vector)
## Warning in xgb.importance(feature_names = colnames(sparse_matrix), model = bst,
## : xgb.importance: parameters 'data', 'label' and 'target' are deprecated
# Cleaning for better display
importanceClean <- importanceRaw[,`:=`(Cover=NULL, Frequency=NULL)]
head(importanceClean)
## Feature Gain
## <char> <num>
## 1: Age 0.622031769
## 2: TreatmentTreated 0.285750540
## 3: SexMale 0.048744022
## 4: AgeDiscret6 0.016604639
## 5: AgeDiscret3 0.016373781
## 6: AgeDiscret4 0.009270557
In the table above we have removed two not needed columns and select only the first lines.
First thing you notice is the new column Split
. It is
the split applied to the feature on a branch of one of the tree. Each
split is present, therefore a feature can appear several times in this
table. Here we can see the feature Age
is used several
times with different splits.
How the split is applied to count the co-occurrences? It is always
<
. For instance, in the second line, we measure the
number of persons under 61.5 years with the illness gone after the
treatment.
The two other new columns are RealCover
and
RealCover %
. In the first column it measures the number of
observations in the dataset where the split is respected and the label
marked as 1
. The second column is the percentage of the
whole population that RealCover
represents.
Therefore, according to our findings, getting a placebo doesn’t seem to help but being younger than 61 years may help (seems logic).
You may wonder how to interpret the
< 1.00001
on the first line. Basically, in a sparseMatrix
, there is no0
, therefore, looking for one hot-encoded categorical observations validating the rule< 1.00001
is like just looking for1
for this feature.
All these things are nice, but it would be even better to plot the results.
Feature have automatically been divided in 2 clusters: the interesting features… and the others.
Depending of the dataset and the learning parameters you may have more than two clusters. Default value is to limit them to
10
, but you can increase this limit. Look at the function documentation for more information.
According to the plot above, the most important features in this dataset to predict if the treatment will work are :
Let’s check some Chi2 between each of these features and the label.
Higher Chi2 means better correlation.
##
## Pearson's Chi-squared test
##
## data: df$Age and output_vector
## X-squared = 35.475, df = 35, p-value = 0.4458
Pearson correlation between Age and illness disappearing is 35.48.
##
## Pearson's Chi-squared test
##
## data: df$AgeDiscret and output_vector
## X-squared = 8.2554, df = 5, p-value = 0.1427
Our first simplification of Age gives a Pearson correlation is 8.26.
##
## Pearson's Chi-squared test with Yates' continuity correction
##
## data: df$AgeCat and output_vector
## X-squared = 2.3571, df = 1, p-value = 0.1247
The perfectly random split I did between young and old at 30 years old have a low correlation of 2.36. It’s a result we may expect as may be in my mind > 30 years is being old (I am 32 and starting feeling old, this may explain that), but for the illness we are studying, the age to be vulnerable is not the same.
Morality: don’t let your gut lower the quality of your model.
In data science expression, there is the word science :-)
As you can see, in general destroying information by simplifying it won’t improve your model. Chi2 just demonstrates that.
But in more complex cases, creating a new feature based on existing one which makes link with the outcome more obvious may help the algorithm and improve the model.
The case studied here is not enough complex to show that. Check Kaggle website for some challenging datasets. However it’s almost always worse when you add some arbitrary rules.
Moreover, you can notice that even if we have added some not useful new features highly correlated with other features, the boosting tree algorithm have been able to choose the best one, which in this case is the Age.
Linear model may not be that smart in this scenario.
As you may know, Random Forests algorithm is cousin with boosting and both are part of the ensemble learning family.
Both trains several decision trees for one dataset. The main
difference is that in Random Forests, trees are independent and in
boosting, the tree N+1
focus its learning on the loss
(<=> what has not been well modeled by the tree
N
).
This difference have an impact on a corner case in feature importance analysis: the correlated features.
Imagine two features perfectly correlated, feature A
and
feature B
. For one specific tree, if the algorithm needs
one of them, it will choose randomly (true in both boosting and Random
Forests).
However, in Random Forests this random choice will be done for each
tree, because each tree is independent from the others. Therefore,
approximatively, depending of your parameters, 50% of the trees will
choose feature A
and the other 50% will choose feature
B
. So the importance of the information contained
in A
and B
(which is the same, because they
are perfectly correlated) is diluted in A
and
B
. So you won’t easily know this information is important
to predict what you want to predict! It is even worse when you have 10
correlated features…
In boosting, when a specific link between feature and outcome have
been learned by the algorithm, it will try to not refocus on it (in
theory it is what happens, reality is not always that simple).
Therefore, all the importance will be on feature A
or on
feature B
(but not both). You will know that one feature
have an important role in the link between the observations and the
label. It is still up to you to search for the correlated features to
the one detected as important if you need to know all of them.
If you want to try Random Forests algorithm, you can tweak XGBoost parameters!
For instance, to compute a model with 1000 trees, with a 0.5 factor on sampling rows and columns:
data(agaricus.train, package='xgboost')
data(agaricus.test, package='xgboost')
train <- agaricus.train
test <- agaricus.test
#Random Forest - 1000 trees
bst <- xgboost(
data = train$data,
label = train$label,
max_depth = 4,
num_parallel_tree = 1000,
subsample = 0.5,
colsample_bytree = 0.5,
nrounds = 1,
objective = "binary:logistic",
nthread = 2
)
## [1] train-logloss:0.455938
#Boosting - 3 rounds
bst <- xgboost(
data = train$data,
label = train$label,
max_depth = 4,
nrounds = 3,
objective = "binary:logistic",
nthread = 2
)
## [1] train-logloss:0.444882
## [2] train-logloss:0.302428
## [3] train-logloss:0.212847
Note that the parameter
round
is set to1
.
Random Forests is a trademark of Leo Breiman and Adele Cutler and is licensed exclusively to Salford Systems for the commercial release of the software.
These binaries (installable software) and packages are in development.
They may not be fully stable and should be used with caution. We make no claims about them.