# DAGMM Tensorflow implementation Deep Autoencoding Gaussian Mixture Model. This implementation is based on the paper **Deep Autoencoding Gaussian Mixture Model for Unsupervised Anomaly Detection** [[Bo Zong et al (2018)]](https://openreview.net/pdf?id=BJJLHbb0-) this is UNOFFICIAL implementation. # Requirements - python 3 - Tensorflow - Numpy - sklearn # Usage instructions To use DAGMM model, you need to create "DAGMM" object. At initialize, you have to specify next 4 variables at least. - ``comp_hiddens`` : list of int - sizes of hidden layers of compression network - For example, if the sizes are ``[n1, n2]``, structure of compression network is: ``input_size -> n1 -> n2 -> n1 -> input_sizes`` - ``comp_activation`` : function - activation function of compression network - ``est_hiddens`` : list of int - sizes of hidden layers of estimation network. - The last element of this list is assigned as n_comp. - For example, if the sizes are ``[n1, n2]``, structure of estimation network is: ``input_size -> n1 -> n2 (= n_comp)`` - ``est_activation`` : function - activation function of estimation network Then you fit the training data, and predict to get energies (anomaly score). It looks like the model interface of scikit-learn. For more details, please check out [dagmm/dagmm.py](dagmm/dagmm.py) docstrings. # Example ## Small Example ``` python import tensorflow as tf from dagmm import DAGMM # Initialize model = DAGMM( comp_hiddens=[32,16,2], comp_activation=tf.nn.tanh, est_hiddens=[16.8], est_activation=tf.nn.tanh, est_dropout_ratio=0.25 ) # Fit the training data to model model.fit(x_train) # Evaluate energies # (the more the energy is, the more it is anomary) energy = model.predict(x_test) # Save fitted model to the directory model.save("./fitted_model") # Restore saved model from dicrectory model.restore("./fitted_model") ``` ## Jupyter Notebook Example You can use [jupyter notebook example](Example_DAGMM.ipynb). This example uses random samples of mixture of gaussian. # Notes ## GMM Implementation The equation to calculate "energy" for each sample in the original paper uses direct expression of multivariate gaussian distribution which has covariance matrix inversion, but it is impossible sometimes because of singularity. Instead, this implementation uses cholesky decomposition of covariance matrix. (this is based on [GMM code in Tensorflow code](https://github.com/tensorflow/tensorflow/blob/master/tensorflow/contrib/factorization/python/ops/gmm_ops.py)) In ``DAGMM.fit()``, it generates and stores triangular matrix of cholesky decomposition of covariance matrix, and it is used in ``DAGMM.predict()``, In addition to it, small perturbation (1e-3) is added to diagonal elements of covariance matrix for more numerical stability (it is same as Tensorflow GMM implementation, and [another author of DAGMM](https://github.com/danieltan07/dagmm) also points it out)