Sequential Change Detection by Optimal Weighted ℓ Divergence

We present a new non-parametric statistic, called the weighed ℓ2} divergence, based on empirical distributions for sequential change detection. We start by constructing the weighed ℓ2 divergence as a fundamental building block for two-sample tests and change detection. The proposed statistic is proved to attain the optimal sample complexity in the offline setting. We then study the sequential change detection using the weighed ℓ2 divergence and characterize the fundamental performance metrics, including the average run length (ARL) and the expected detection delay (EDD). We also present practical algorithms to find the optimal projection to handle high-dimensional data and the optimal weights, which is critical to quick detection since, in such settings, there are not many post-change samples. Simulation results and real data examples are provided to validate the good performance of the proposed method. © 2020 IEEE.