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Forecasting the magnitude of the largest expected earthquake

R. ShcherbakovDepartment of Earth Sciences, University of Western Ontario, London, ON, N6A 5B7, Canada. [email protected]Jiancang ZhuangInstitute of Statistical Mathematics, 10-3 Midori-Cho, Tachikawa-Shi, Tokyo, 190-8562, JapanGert ZöllerInstitute of Mathematics, University of Potsdam, 14476, Potsdam-Golm, GermanyYosihiko OgataInstitute of Statistical Mathematics, 10-3 Midori-Cho, Tachikawa-Shi, Tokyo, 190-8562, Japan
2019en
ABI

Abstract

The majority of earthquakes occur unexpectedly and can trigger subsequent sequences of events that can culminate in more powerful earthquakes. This self-exciting nature of seismicity generates complex clustering of earthquakes in space and time. Therefore, the problem of constraining the magnitude of the largest expected earthquake during a future time interval is of critical importance in mitigating earthquake hazard. We address this problem by developing a methodology to compute the probabilities for such extreme earthquakes to be above certain magnitudes. We combine the Bayesian methods with the extreme value theory and assume that the occurrence of earthquakes can be described by the Epidemic Type Aftershock Sequence process. We analyze in detail the application of this methodology to the 2016 Kumamoto, Japan, earthquake sequence. We are able to estimate retrospectively the probabilities of having large subsequent earthquakes during several stages of the evolution of this sequence.

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