A Novel l0-Constrained Gaussian Graphical Model for Anomaly Localization

We consider the problem of anomaly localization in a sensor network for multivariate time-series data by computing anomaly scores for each variable separately. To estimate the sparse Gaussian graphical models (GGMs) learned from different sliding windows of the dataset, we propose a new model wherein we constrain sparsity directly through L0 constraint and apply an additional L2 regularization in the objective. We then introduce a proximal gradient algorithm to efficiently solve this difficult nonconvex problem. Numerical evidence is provided to show the benefits of using our model and method over the usual convex relaxations for learning sparse GGMs using a real dataset.

[1]  Spiros Papadimitriou,et al.  Computing Correlation Anomaly Scores Using Stochastic Nearest Neighbors , 2007, Seventh IEEE International Conference on Data Mining (ICDM 2007).

[2]  Xindong Wu,et al.  Mining distribution change in stock order streams , 2010, 2010 IEEE 26th International Conference on Data Engineering (ICDE 2010).

[3]  Deborah Estrin,et al.  A wireless sensor network For structural monitoring , 2004, SenSys '04.

[4]  Christophe Diot,et al.  Diagnosing network-wide traffic anomalies , 2004, SIGCOMM.

[5]  William W. Hager,et al.  Projection algorithms for nonconvex minimization with application to sparse principal component analysis , 2014, Journal of Global Optimization.

[6]  Hongliang Fei,et al.  A Family of Joint Sparse PCA Algorithms for Anomaly Localization in Network Data Streams , 2013, IEEE Transactions on Knowledge and Data Engineering.

[7]  H. Zou,et al.  Regularization and variable selection via the elastic net , 2005 .

[8]  J. Borwein,et al.  Two-Point Step Size Gradient Methods , 1988 .

[9]  Sencun Zhu,et al.  SVATS: A Sensor-Network-Based Vehicle Anti-Theft System , 2008, IEEE INFOCOM 2008 - The 27th Conference on Computer Communications.

[10]  Yong Zhang,et al.  Sparse Approximation via Penalty Decomposition Methods , 2012, SIAM J. Optim..

[11]  Naoki Abe,et al.  Proximity-Based Anomaly Detection Using Sparse Structure Learning , 2009, SDM.

[12]  Xiao-Tong Yuan,et al.  Gradient Hard Thresholding Pursuit for Sparsity-Constrained Optimization , 2013, ICML.