Predicting Fraud with Autoencoders and Keras

Overview

On this submit we are going to prepare an autoencoder to detect bank card fraud. We can even show how one can prepare Keras fashions within the cloud utilizing CloudML.

The idea of our mannequin would be the Kaggle Credit score Card Fraud Detection dataset, which was collected throughout a analysis collaboration of Worldline and the Machine Studying Group of ULB (Université Libre de Bruxelles) on huge information mining and fraud detection.

The dataset incorporates bank card transactions by European cardholders remodeled a two day interval in September 2013. There are 492 frauds out of 284,807 transactions. The dataset is very unbalanced, the constructive class (frauds) account for under 0.172% of all transactions.

Studying the info

After downloading the info from Kaggle, you’ll be able to learn it in to R with read_csv():

library(readr)
df <- read_csv("data-raw/creditcard.csv", col_types = checklist(Time = col_number()))

The enter variables include solely numerical values that are the results of a PCA transformation. In an effort to protect confidentiality, no extra details about the unique options was offered. The options V1, …, V28 have been obtained with PCA. There are nonetheless 2 options (Time and Quantity) that weren’t reworked.
Time is the seconds elapsed between every transaction and the primary transaction within the dataset. Quantity is the transaction quantity and might be used for cost-sensitive studying. The Class variable takes worth 1 in case of fraud and 0 in any other case.

Autoencoders

Since solely 0.172% of the observations are frauds, we’ve a extremely unbalanced classification drawback. With this type of drawback, conventional classification approaches normally don’t work very properly as a result of we’ve solely a really small pattern of the rarer class.

An autoencoder is a neural community that’s used to be taught a illustration (encoding) for a set of knowledge, usually for the aim of dimensionality discount. For this drawback we are going to prepare an autoencoder to encode non-fraud observations from our coaching set. Since frauds are speculated to have a distinct distribution then regular transactions, we anticipate that our autoencoder can have greater reconstruction errors on frauds then on regular transactions. Which means that we are able to use the reconstruction error as a amount that signifies if a transaction is fraudulent or not.

If you wish to be taught extra about autoencoders, a great start line is that this video from Larochelle on YouTube and Chapter 14 from the Deep Studying ebook by Goodfellow et al.

Visualization

For an autoencoder to work properly we’ve a robust preliminary assumption: that the distribution of variables for regular transactions is completely different from the distribution for fraudulent ones. Let’s make some plots to confirm this. Variables have been reworked to a [0,1] interval for plotting.

We are able to see that distributions of variables for fraudulent transactions are very completely different then from regular ones, apart from the Time variable, which appears to have the very same distribution.

Preprocessing

Earlier than the modeling steps we have to do some preprocessing. We are going to cut up the dataset into prepare and check units after which we are going to Min-max normalize our information (that is performed as a result of neural networks work a lot better with small enter values). We can even take away the Time variable because it has the very same distribution for regular and fraudulent transactions.

Primarily based on the Time variable we are going to use the primary 200,000 observations for coaching and the remainder for testing. That is good apply as a result of when utilizing the mannequin we wish to predict future frauds based mostly on transactions that occurred earlier than.

Now let’s work on normalization of inputs. We created 2 capabilities to assist us. The primary one will get descriptive statistics in regards to the dataset which might be used for scaling. Then we’ve a operate to carry out the min-max scaling. It’s necessary to notice that we utilized the identical normalization constants for coaching and check units.

library(purrr)

#' Will get descriptive statistics for each variable within the dataset.
get_desc <- operate(x) {
  map(x, ~checklist(
    min = min(.x),
    max = max(.x),
    imply = imply(.x),
    sd = sd(.x)
  ))
} 

#' Given a dataset and normalization constants it would create a min-max normalized
#' model of the dataset.
normalization_minmax <- operate(x, desc) {
  map2_dfc(x, desc, ~(.x - .y$min)/(.y$max - .y$min))
}

Now let’s create normalized variations of our datasets. We additionally reworked our information frames to matrices since that is the format anticipated by Keras.

We are going to now outline our mannequin in Keras, a symmetric autoencoder with 4 dense layers.

library(keras)
mannequin <- keras_model_sequential()
mannequin %>%
  layer_dense(items = 15, activation = "tanh", input_shape = ncol(x_train)) %>%
  layer_dense(items = 10, activation = "tanh") %>%
  layer_dense(items = 15, activation = "tanh") %>%
  layer_dense(items = ncol(x_train))

abstract(mannequin)

___________________________________________________________________________________
Layer (sort)                         Output Form                     Param #      
===================================================================================
dense_1 (Dense)                      (None, 15)                       450          
___________________________________________________________________________________
dense_2 (Dense)                      (None, 10)                       160          
___________________________________________________________________________________
dense_3 (Dense)                      (None, 15)                       165          
___________________________________________________________________________________
dense_4 (Dense)                      (None, 29)                       464          
===================================================================================
Complete params: 1,239
Trainable params: 1,239
Non-trainable params: 0
___________________________________________________________________________________

We are going to then compile our mannequin, utilizing the imply squared error loss and the Adam optimizer for coaching.

mannequin %>% compile(
  loss = "mean_squared_error", 
  optimizer = "adam"
)

Coaching the mannequin

We are able to now prepare our mannequin utilizing the match() operate. Coaching the mannequin is fairly quick (~ 14s per epoch on my laptop computer). We are going to solely feed to our mannequin the observations of regular (non-fraudulent) transactions.

We are going to use callback_model_checkpoint() as a way to save our mannequin after every epoch. By passing the argument save_best_only = TRUE we are going to carry on disk solely the epoch with smallest loss worth on the check set.
We can even use callback_early_stopping() to cease coaching if the validation loss stops reducing for five epochs.

checkpoint <- callback_model_checkpoint(
  filepath = "mannequin.hdf5", 
  save_best_only = TRUE, 
  interval = 1,
  verbose = 1
)

early_stopping <- callback_early_stopping(endurance = 5)

mannequin %>% match(
  x = x_train[y_train == 0,], 
  y = x_train[y_train == 0,], 
  epochs = 100, 
  batch_size = 32,
  validation_data = checklist(x_test[y_test == 0,], x_test[y_test == 0,]), 
  callbacks = checklist(checkpoint, early_stopping)
)

Practice on 199615 samples, validate on 84700 samples
Epoch 1/100
199615/199615 [==============================] - 17s 83us/step - loss: 0.0036 - val_loss: 6.8522e-04d from inf to 0.00069, saving mannequin to mannequin.hdf5
Epoch 2/100
199615/199615 [==============================] - 17s 86us/step - loss: 4.7817e-04 - val_loss: 4.7266e-04d from 0.00069 to 0.00047, saving mannequin to mannequin.hdf5
Epoch 3/100
199615/199615 [==============================] - 19s 94us/step - loss: 3.7753e-04 - val_loss: 4.2430e-04d from 0.00047 to 0.00042, saving mannequin to mannequin.hdf5
Epoch 4/100
199615/199615 [==============================] - 19s 94us/step - loss: 3.3937e-04 - val_loss: 4.0299e-04d from 0.00042 to 0.00040, saving mannequin to mannequin.hdf5
Epoch 5/100
199615/199615 [==============================] - 19s 94us/step - loss: 3.2259e-04 - val_loss: 4.0852e-04 enhance
Epoch 6/100
199615/199615 [==============================] - 18s 91us/step - loss: 3.1668e-04 - val_loss: 4.0746e-04 enhance
...

After coaching we are able to get the ultimate loss for the check set by utilizing the consider() fucntion.

loss <- consider(mannequin, x = x_test[y_test == 0,], y = x_test[y_test == 0,])
loss

        loss 
0.0003534254 

Tuning with CloudML

We could possibly get higher outcomes by tuning our mannequin hyperparameters. We are able to tune, for instance, the normalization operate, the educational fee, the activation capabilities and the dimensions of hidden layers. CloudML makes use of Bayesian optimization to tune hyperparameters of fashions as described in this weblog submit.

We are able to use the cloudml package deal to tune our mannequin, however first we have to put together our venture by making a coaching flag for every hyperparameter and a tuning.yml file that can inform CloudML what parameters we wish to tune and the way.

The complete script used for coaching on CloudML might be discovered at https://github.com/dfalbel/fraud-autoencoder-example. Crucial modifications to the code have been including the coaching flags:

FLAGS <- flags(
  flag_string("normalization", "minmax", "Certainly one of minmax, zscore"),
  flag_string("activation", "relu", "Certainly one of relu, selu, tanh, sigmoid"),
  flag_numeric("learning_rate", 0.001, "Optimizer Studying Price"),
  flag_integer("hidden_size", 15, "The hidden layer measurement")
)

We then used the FLAGS variable contained in the script to drive the hyperparameters of the mannequin, for instance:

mannequin %>% compile(
  optimizer = optimizer_adam(lr = FLAGS$learning_rate), 
  loss = 'mean_squared_error',
)

We additionally created a tuning.yml file describing how hyperparameters ought to be various throughout coaching, in addition to what metric we needed to optimize (on this case it was the validation loss: val_loss).

tuning.yml

trainingInput:
  scaleTier: CUSTOM
  masterType: standard_gpu
  hyperparameters:
    objective: MINIMIZE
    hyperparameterMetricTag: val_loss
    maxTrials: 10
    maxParallelTrials: 5
    params:
      - parameterName: normalization
        sort: CATEGORICAL
        categoricalValues: [zscore, minmax]
      - parameterName: activation
        sort: CATEGORICAL
        categoricalValues: [relu, selu, tanh, sigmoid]
      - parameterName: learning_rate
        sort: DOUBLE
        minValue: 0.000001
        maxValue: 0.1
        scaleType: UNIT_LOG_SCALE
      - parameterName: hidden_size
        sort: INTEGER
        minValue: 5
        maxValue: 50
        scaleType: UNIT_LINEAR_SCALE

We describe the kind of machine we wish to use (on this case a standard_gpu occasion), the metric we wish to reduce whereas tuning, and the the utmost variety of trials (i.e. variety of mixtures of hyperparameters we wish to check). We then specify how we wish to differ every hyperparameter throughout tuning.

You possibly can be taught extra in regards to the tuning.yml file on the Tensorflow for R documentation and at Google’s official documentation on CloudML.

Now we’re able to ship the job to Google CloudML. We are able to do that by working:

library(cloudml)
cloudml_train("prepare.R", config = "tuning.yml")

The cloudml package deal takes care of importing the dataset and putting in any R package deal dependencies required to run the script on CloudML. In case you are utilizing RStudio v1.1 or greater, it would additionally can help you monitor your job in a background terminal. It’s also possible to monitor your job utilizing the Google Cloud Console.

After the job is completed we are able to gather the job outcomes with:

This may copy the information from the job with one of the best val_loss efficiency on CloudML to your native system and open a report summarizing the coaching run.

Since we used a callback to avoid wasting mannequin checkpoints throughout coaching, the mannequin file was additionally copied from Google CloudML. Recordsdata created throughout coaching are copied to the “runs” subdirectory of the working listing from which cloudml_train() known as. You possibly can decide this listing for the latest run with:

[1] runs/cloudml_2018_01_23_221244595-03

It’s also possible to checklist all earlier runs and their validation losses with:

ls_runs(order = metric_val_loss, reducing = FALSE)

                    run_dir metric_loss metric_val_loss
1 runs/2017-12-09T21-01-11Z      0.2577          0.1482
2 runs/2017-12-09T21-00-11Z      0.2655          0.1505
3 runs/2017-12-09T19-59-44Z      0.2597          0.1402
4 runs/2017-12-09T19-56-48Z      0.2610          0.1459

Use View(ls_runs()) to view all columns

In our case the job downloaded from CloudML was saved to runs/cloudml_2018_01_23_221244595-03/, so the saved mannequin file is accessible at runs/cloudml_2018_01_23_221244595-03/mannequin.hdf5. We are able to now use our tuned mannequin to make predictions.

Making predictions

Now that we skilled and tuned our mannequin we’re able to generate predictions with our autoencoder. We have an interest within the MSE for every remark and we anticipate that observations of fraudulent transactions can have greater MSE’s.

First, let’s load our mannequin.

mannequin <- load_model_hdf5("runs/cloudml_2018_01_23_221244595-03/mannequin.hdf5", 
                         compile = FALSE)

Now let’s calculate the MSE for the coaching and check set observations.

pred_train <- predict(mannequin, x_train)
mse_train <- apply((x_train - pred_train)^2, 1, sum)

pred_test <- predict(mannequin, x_test)
mse_test <- apply((x_test - pred_test)^2, 1, sum)

A very good measure of mannequin efficiency in extremely unbalanced datasets is the Space Underneath the ROC Curve (AUC). AUC has a pleasant interpretation for this drawback, it’s the chance {that a} fraudulent transaction can have greater MSE then a traditional one. We are able to calculate this utilizing the Metrics package deal, which implements all kinds of frequent machine studying mannequin efficiency metrics.

[1] 0.9546814
[1] 0.9403554

To make use of the mannequin in apply for making predictions we have to discover a threshold (ok) for the MSE, then if if (MSE > ok) we contemplate that transaction a fraud (in any other case we contemplate it regular). To outline this worth it’s helpful to take a look at precision and recall whereas various the edge (ok).

possible_k <- seq(0, 0.5, size.out = 100)
precision <- sapply(possible_k, operate(ok) {
  predicted_class <- as.numeric(mse_test > ok)
  sum(predicted_class == 1 & y_test == 1)/sum(predicted_class)
})

qplot(possible_k, precision, geom = "line") 
  + labs(x = "Threshold", y = "Precision")

recall <- sapply(possible_k, operate(ok) {
  predicted_class <- as.numeric(mse_test > ok)
  sum(predicted_class == 1 & y_test == 1)/sum(y_test)
})
qplot(possible_k, recall, geom = "line") 
  + labs(x = "Threshold", y = "Recall")

A very good start line could be to decide on the edge with most precision however we may additionally base our determination on how a lot cash we’d lose from fraudulent transactions.

Suppose every guide verification of fraud prices us $1 but when we don’t confirm a transaction and it’s a fraud we are going to lose this transaction quantity. Let’s discover for every threshold worth how a lot cash we might lose.

cost_per_verification <- 1

lost_money <- sapply(possible_k, operate(ok) {
  predicted_class <- as.numeric(mse_test > ok)
  sum(cost_per_verification * predicted_class + (predicted_class == 0) * y_test * df_test$Quantity) 
})

qplot(possible_k, lost_money, geom = "line") + labs(x = "Threshold", y = "Misplaced Cash")

We are able to discover one of the best threshold on this case with:

[1] 0.005050505

If we would have liked to manually confirm all frauds, it might value us ~$13,000. Utilizing our mannequin we are able to scale back this to ~$2,500.