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Bayesian Retrospective Multiple‐Changepoint Identification

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  • D. A. Stephens

Abstract

Changepoint identification is important in many data analysis problems, such as industrial control and medical diagnosis–given a data sequence, we wish to make inference about the location of one or more points of the sequence at which there is a change in the model or parameters driving the system. For long data sequences, however, analysis (especially in the multiple‐changepoint case) can become computationally prohibitive, and for complex non‐linear models analytical and conventional numerical techniques are infeasible. We discuss the use of a sampling‐based technique, the Gibbs sampler, in multiple‐changepoint problems and demonstrate how it can be used to reduce the computational load involved considerably. Also, often it is reasonable to presume that the data model itself is continuous with respect to time, i.e. continuous at the changepoints. This necessitates a continuous parameter representation of the changepoint problem, which also leads to computational difficulties. We demonstrate how inferences can be made readily in such problems by using the Gibbs sampler. We study three examples: A simple discrete two‐changepoint problem based on a binomial data model; a continuous switching linear regression problem; a continuous, non‐linear, multiple‐changepoint problem.

Suggested Citation

  • D. A. Stephens, 1994. "Bayesian Retrospective Multiple‐Changepoint Identification," Journal of the Royal Statistical Society Series C, Royal Statistical Society, vol. 43(1), pages 159-178, March.
    • Handle: RePEc:bla:jorssc:v:43:y:1994:i:1:p:159-178
    DOI: 10.2307/2986119
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    Cited by:

    1. Ardia, David & Dufays, Arnaud & Ordás Criado, Carlos, 2023. "Linking Frequentist and Bayesian Change-Point Methods," MPRA Paper 119486, University Library of Munich, Germany.
    2. Giuseppe Nuti, 2019. "An Efficient Algorithm for Bayesian Nearest Neighbours," Methodology and Computing in Applied Probability, Springer, vol. 21(4), pages 1251-1258, December.
    3. D Briand & A V Huzurbazar, 2008. "Bayesian reliability applications of a combined lifecycle failure distribution," Journal of Risk and Reliability, , vol. 222(4), pages 713-720, December.
    4. Lu Shaochuan, 2020. "Bayesian multiple changepoints detection for Markov jump processes," Computational Statistics, Springer, vol. 35(3), pages 1501-1523, September.
    5. Simon C. Smith, 2020. "Equity premium prediction and structural breaks," International Journal of Finance & Economics, John Wiley & Sons, Ltd., vol. 25(3), pages 412-429, July.
    6. Adam Check & Jeremy Piger, 2021. "Structural Breaks in U.S. Macroeconomic Time Series: A Bayesian Model Averaging Approach," Journal of Money, Credit and Banking, Blackwell Publishing, vol. 53(8), pages 1999-2036, December.
    7. Santitissadeekorn, Naratip & Lloyd, David J.B. & Short, Martin B. & Delahaies, Sylvain, 2020. "Approximate filtering of conditional intensity process for Poisson count data: Application to urban crime," Computational Statistics & Data Analysis, Elsevier, vol. 144(C).
    8. repec:cup:judgdm:v:13:y:2018:i:6:p:622-635 is not listed on IDEAS
    9. Chiara Lattanzi & Manuele Leonelli, 2019. "A changepoint approach for the identification of financial extreme regimes," Papers 1902.09205, arXiv.org.
    10. Seong W. Kim & Sabina Shahin & Hon Keung Tony Ng & Jinheum Kim, 2021. "Binary segmentation procedures using the bivariate binomial distribution for detecting streakiness in sports data," Computational Statistics, Springer, vol. 36(3), pages 1821-1843, September.
    11. Lindeløv, Jonas Kristoffer, 2020. "mcp: An R Package for Regression With Multiple Change Points," OSF Preprints fzqxv, Center for Open Science.
    12. Arnaud Dufays & Zhuo Li & Jeroen V.K. Rombouts & Yong Song, 2021. "Sparse change‐point VAR models," Journal of Applied Econometrics, John Wiley & Sons, Ltd., vol. 36(6), pages 703-727, September.
    13. Michael D. Lee, 2018. "Bayesian methods for analyzing true-and-error models," Judgment and Decision Making, Society for Judgment and Decision Making, vol. 13(6), pages 622-635, November.
    14. Ospina-Forero, Luis & Granados, Oscar M., 2023. "A network analysis of the structure and dynamics of FX derivatives markets," Physica A: Statistical Mechanics and its Applications, Elsevier, vol. 615(C).

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