Abstract
We propose an extension to Hawkes processes by treating the levels of self-excitation as a stochastic differential equation. Our new point process allows better approximation in application domains where events and intensities accelerate each other with correlated levels of contagion. We generalize a recent algorithm for simulating draws from Hawkes processes whose levels of excitation are stochastic processes, and propose a hybrid Markov chain Monte Carlo approach for model fitting. Our sampling procedure scales linearly with the number of required events and does not require stationarity of the point process. A modular inference procedure consisting of a combination between Gibbs and Metropolis Hastings steps is put forward. We recover expectation maximization as a special case. Our general approach is illustrated for contagion following geometric Brownian motion and exponential Langevin dynamics.
Original language | English |
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Title of host publication | 33rd International Conference on Machine Learning, ICML 2016 |
Editors | M F Balcan and K Q Weinberger |
Place of Publication | Stroudsburg, USA |
Publisher | International Machine Learning Society |
ISBN (Print) | 9781510829008 |
Publication status | Published - 2016 |
Event | 33rd International Conference on Machine Learning, ICML 2016 - New York City, New York, USA Duration: 1 Jan 2016 → … |
Conference
Conference | 33rd International Conference on Machine Learning, ICML 2016 |
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Period | 1/01/16 → … |
Other | June 19-24 2016 |