TY - JOUR
T1 - Bayesian inference for stable Lévy–driven stochastic differential equations with high-frequency data
AU - Jasra, Ajay
AU - Kamatani, Kengo
AU - Masuda, Hiroki
N1 - Funding Information:
This research was supported by the Japan Science and Technology Agency Core Research for Evolutional Science and Technology Program under Grant JPMJCR14D7. The work of A. Jasra was additionally supported by the Ministry of Education AcRF tier 2 Grant R-155-000-161-112, and the work of K. Kamatani was additionally supported by Japan Society for the Promotion of Science Grant-in-Aid for Scientific Research (KAKENHI) Grant JP16K00046. We thank two referees and the associate editor for their comments that have greatly enhanced this paper.
Publisher Copyright:
© 2018 Board of the Foundation of the Scandinavian Journal of Statistics
PY - 2019/6
Y1 - 2019/6
N2 - In this paper, we consider parametric Bayesian inference for stochastic differential equations driven by a pure-jump stable Lévy process, which is observed at high frequency. In most cases of practical interest, the likelihood function is not available; hence, we use a quasi-likelihood and place an associated prior on the unknown parameters. It is shown under regularity conditions that there is a Bernstein–von Mises theorem associated to the posterior. We then develop a Markov chain Monte Carlo algorithm for Bayesian inference, and assisted with theoretical results, we show how to scale Metropolis–Hastings proposals when the frequency of the data grows, in order to prevent the acceptance ratio from going to zero in the large data limit. Our algorithm is presented on numerical examples that help verify our theoretical findings.
AB - In this paper, we consider parametric Bayesian inference for stochastic differential equations driven by a pure-jump stable Lévy process, which is observed at high frequency. In most cases of practical interest, the likelihood function is not available; hence, we use a quasi-likelihood and place an associated prior on the unknown parameters. It is shown under regularity conditions that there is a Bernstein–von Mises theorem associated to the posterior. We then develop a Markov chain Monte Carlo algorithm for Bayesian inference, and assisted with theoretical results, we show how to scale Metropolis–Hastings proposals when the frequency of the data grows, in order to prevent the acceptance ratio from going to zero in the large data limit. Our algorithm is presented on numerical examples that help verify our theoretical findings.
UR - http://www.scopus.com/inward/record.url?scp=85056771384&partnerID=8YFLogxK
UR - http://www.scopus.com/inward/citedby.url?scp=85056771384&partnerID=8YFLogxK
U2 - 10.1111/sjos.12362
DO - 10.1111/sjos.12362
M3 - Article
AN - SCOPUS:85056771384
SN - 0303-6898
VL - 46
SP - 545
EP - 574
JO - Scandinavian Journal of Statistics
JF - Scandinavian Journal of Statistics
IS - 2
ER -