Detecting Mutual Excitations in Non-Stationary Hawkes Processes

Abstract

We consider the problem of learning the network of mutual excitations (i.e., the dependency graph) in a non-stationary, multivariate Hawkes process. We consider a general setting where baseline rates at each node are time-varying and delay kernels are not shift-invariant. Our main results show that if the dependency graph of an n-variate Hawkes process is sparse (i.e., it has a maximum degree that is bounded with respect to n), our algorithm accurately reconstructs it from data after observing the Hawkes process for T = polylog(n) time, with high probability. Our algorithm is computationally efficient, and provably succeeds in learning dependencies even if only a subset of time series are observed and event times are not precisely known.