https://orcid.org/0000-0002-1560-2405
References
- Andrieu, C., A. Doucet, and R. Holenstein. 2010. Particle markov chain Monte Carlo methods. Journal of the Royal Statistical Society Series B: Statistical Methodology 72 (3):269–342. doi:10.1111/j.1467-9868.2009.00736.x.
- Cadena, J., G. Korkmaz, C. J. Kuhlman, A. Marathe, N. Ramakrishnan, and A. Vullikanti. 2015. Forecasting social unrest using activity cascades. PloS One 10 (6):e0128879. doi:10.1371/journal.pone.0128879.
- Cappé, O., E. Moulines, and T. Rydén. 2009. Inference in hidden markov models. In Proceedings of EUSFLAT Conference, pp. 14–16.
- Chen, Z. 2013. An overview of bayesian methods for neural spike train analysis. Computational Intelligence and Neuroscience 2013:1–17. doi:10.1155/2013/251905.
- Chen, Z., and E. N. Brown. 2013. State space model. Scholarpedia 8 (3):30868. doi:10.4249/scholarpedia.30868.
- Chen, J., and A. K. Gupta. 1997. Testing and locating variance changepoints with application to stock prices. Journal of the American Statistical Association 92 (438):739–47. doi:10.1080/01621459.1997.10474026.
- Chen, J., and A. K. Gupta. 2011. Parametric statistical change point analysis: With applications to genetics, medicine, and finance. New York, NY: Springer.
- Chen, X., X. Kang, R. Jin, and X. Deng. 2023. Bayesian Sparse regression for mixed multi-responses with application to runtime metrics prediction in fog manufacturing. Technometrics 65 (2):206–19. doi:10.1080/00401706.2022.2134928.
- Chen, R., and J. S. Liu. 2000. Mixture Kalman filters. Journal of the Royal Statistical Society Series B: Statistical Methodology 62 (3):493–508. doi:10.1111/1467-9868.00246.
- de Leon, A. R., and B. Wu. 2011. Copula-based regression models for a bivariate mixed discrete and continuous outcome. Statistics in Medicine 30 (2):175–85. doi:10.1002/sim.4087.
- Deng, X., and R. Jin. 2015. QQ Models: Joint modeling for quantitative and qualitative quality responses in manufacturing systems. Technometrics 57 (3):320–31. doi:10.1080/00401706.2015.1029079.
- Doucet, A., S. Godsill, and C. Andrieu. 2000. On sequential Monte Carlo sampling methods for Bayesian filtering. Statistics and Computing 10 (3):197–208. doi:10.1023/A:1008935410038.
- Doucet, A., N. J. Gordon, and V. Kroshnamurthy. 2001. Particle filters for state estimation of jump Markov linear systems. IEEE Transactions on Signal Processing 49 (3):613–24. doi:10.1109/78.905890.
- Eckley, I., P. Fearnhead, and R. Killick. 2011. Analysis of changepoint models. In Bayesian Time Series Models, ed. D. Barber, A. Cemgil, and S. Chiappa, 205–24. Cambridge: Cambridge University Press. doi:10.1017/CBO9780511984679.011.
- Erdman, C., and J. W. Emerson. 2008. A fast Bayesian change point analysis for the segmentation of microarray data. Bioinformatics (Oxford, England) 24 (19):2143–8. doi:10.1093/bioinformatics/btn404.
- Fearnhead, P., and P. Clifford. 2003. On-line inference for hidden Markov models via particle filters. Journal of the Royal Statistical Society Series B: Statistical Methodology 65 (4):887–99. doi:10.1111/1467-9868.00421.
- Fearnhead, P. 1998. Sequential Monte Carlo methods in filter theory. PhD thesis., University of Oxford.
- Frühwirth-Schnatter, S. 2006. Finite mixture and Markov switching models. New York, NY: Springer.
- Gao, Z., Z. Shang, P. Du, and J. L. Robertson. 2019. Variance change point detection under a smoothly-changing mean trend with application to liver procurement. Journal of the American Statistical Association 114 (526):773–81. doi:10.1080/01621459.2018.1442341.
- Ge, X., and P. Smyth. 2000. Segmental semi-Markov models for change-point detection with applications to semiconductor manufacturing. Tech. rep., University of California at Irvine, March.
- Gelman, A., J. B. Carlin, H. S. Stern, and D. B. Rubin. 1995. Bayesian data analysis. Boca Raton, FL: Chapman and Hall/CRC.
- Gupta, A., and J. Chen. 1996. Detecting changes of mean in multidimensional normal sequences with applications to literature and geology. Computational Statistics 11:211–21.
- Hinkley, D. V., and E. A. Hinkley. 1970. Inference about the change-point in a sequence of binomial variables. Biometrika 57 (3):477–88. doi:10.1093/biomet/57.3.477.
- Kalman, R. E. 1960. A new approach to linear filtering and prediction problems. Journal of Basic Engineering 82 (1):35–45. doi:10.1115/1.3662552.
- Kang, L., X. Kang, X. Deng, and R. Jin. 2018. A Bayesian hierarchical model for quantitative and qualitative responses. Journal of Quality Technology 50 (3):290–308. doi:10.1080/00224065.2018.1489042.
- Kang, X., S. Ranganathan, L. Kang, J. Gohlke, and X. Deng. 2021. Bayesian auxiliary variable model for birth records data with qualitative and quantitative responses. Journal of Statistical Computation and Simulation 91 (16):3283–303. doi:10.1080/00949655.2021.1926459.
- Li, J., F. Tsung, and C. Zou. 2013. Directional change-point detection for process control with multivariate categorical data. Naval Research Logistics (NRL) 60 (2):160–73. doi:10.1002/nav.21525.
- Lio, P., and M. Vannucci. 2000. Wavelet change-point prediction of transmembrane proteins. Bioinformatics (Oxford, England) 16 (4):376–82. doi:10.1093/bioinformatics/16.4.376.
- Müller, H.-G., and D. Siegmund. 1994. Change-point problems. Hayward, CA: Institute of Mathematical Statistics.
- Ning, X., and F. Tsung. 2012. A density-based statistical process control scheme for high-dimensional and mixed-type observations. IIE Transactions 44 (4):301–11. doi:10.1080/0740817X.2011.587863.
- O’brien, S. P. 2010. Crisis early warning and decision support: Contemporary approaches and thoughts on future research. International Studies Review 12 (1):87–104. doi:10.1111/j.1468-2486.2009.00914.x.
- Page, E. 1954. Continuous inspection schemes. Biometrika 41 (1–2):100–15. doi:10.1093/biomet/41.1-2.100.
- Qiu, P. 2008. Distribution-free multivariate process control based on log-linear modeling. IIE Transactions 40 (7):664–77. doi:10.1080/07408170701744843.
- Ramakrishnan, N., P. Butler, S. Muthiah, N. Self, R. Khandpur, P. Saraf, W. Wang, J. Cadena, A. Vullikanti, and G. Korkmaz. 2014. ’Beating the news’ with EMBERS: Forecasting civil unrest using open source indicators. In Proceedings of the 20th ACM SIGKDD International Conference on Knowledge Discovery and Data Mining, ACM, 1799–808.
- Ramakrishnan, N., C.-T. Lu, M. Marathe, A. Marathe, A. Vullikanti, S. Eubank, M. Roan, J. S. Brownstein, K. Summers, L. Getoor, et al. 2015. Model-based forecasting of significant societal events. IEEE Intelligent Systems 30 (5):86–90. doi:10.1109/MIS.2015.74.
- Roberts, G. O., A. Gelman, and W. R. Gilks. 1997. Weak convergence and optimal scaling of random walk Metropolis algorithms. The Annals of Applied Probability 7 (1):110–20. doi:10.1214/aoap/1034625254.
- Shiryaev, A. N. 1963. On optimum methods in quickest detection problems. Theory of Probability & Its Applications 8 (1):22–46. doi:10.1137/1108002.
- Spokoiny, V. 2009. Multiscale local change point detection with applications to value-at-risk. The Annals of Statistics 37 (3):1405–36. doi:10.1214/08-AOS612.
- Truong, C., L. Oudre, and N. Vayatis. 2020. Selective review of offline change point detection methods. Signal Processing 167:107299. doi:10.1016/j.sigpro.2019.107299.
- Whiteley, N., C. Andrieu, and A. Doucet. 2010. Efficient Bayesian inference for switching state-space models using discrete particle Markov chain Monte Carlo methods. Tech. Rep. 10:04, Bristol Statistics Research Report.
- Wikipedia. 2015. September 2012 cacerolazo in Argentina—Wikipedia, The Free Encyclopedia. Accessed December 21, 2015. https://en.wikipedia.org/w/index.php?title=September_2012_cacerolazo_in_Argentina&oldid=696215834, [Online].
- Wikipedia. 2016a. 2013 protests in Brazil—Wikipedia, The Free Encyclopedia. Accessed October 16, 2016. https://en.wikipedia.org/w/index.php?title=2013_protests_in_Brazil&oldid=744677098, [Online].
- Wikipedia. 2016b. 2014-16 Venezuelan protests—Wikipedia, The Free Encyclopedia. Accessed September 27, 2016. https://en.wikipedia.org/w/index.php?title=2014\%E2\%80\%9316\_Venezuelan_protests&oldid=741406311. [Online].
- Xie, L., S. Zou, Y. Xie, and V. V. Veeravalli. 2021. Sequential (quickest) change detection: Classical results and new directions. IEEE Journal on Selected Areas in Information Theory 2 (2):494–514. doi:10.1109/JSAIT.2021.3072962.
- Young, Y. T., and L. Kuo. 2001. Bayesian binary segmentation procedure for a Poisson process with multiple changepoints. Journal of Computational and Graphical Statistics 10 (4):772–85. doi:10.1198/106186001317243449.
- Zhang, N. R., D. O. Siegmund, H. Ji, and J. Z. Li. 2010. Detecting simultaneous changepoints in multiple sequences. Biometrika 97 (3):631–45. doi:10.1093/biomet/asq025.