Changepoint detection in non-exchangeable data

• Published in: Statistics and computing Vol. 32; no. 6
• Main Authors: Hallgren, Karl L., Heard, Nicholas A., Adams, Niall M.
• Format: Journal Article
• Language: English
• Published: New York Springer US 01.12.2022; Springer Nature B.V
• Subjects: Algorithms; Artificial Intelligence; Change detection; Computer networks; Computer Science; Markov chains; Mathematical models; Original Paper; Parameters; Probability and Statistics in Computer Science; Segments; Statistical Theory and Methods; Statistics and Computing/Statistics Programs; Changepoint detection; Reversible jump MCMC; Dependent data
• ISSN: 0960-3174; 1573-1375
• DOI: 10.1007/s11222-022-10176-1

Changepoint models typically assume the data within each segment are independent and identically distributed conditional on some parameters that change across segments. This construction may be inadequate when data are subject to local correlation patterns, often resulting in many more changepoints fitted than preferable. This article proposes a Bayesian changepoint model that relaxes the assumption of exchangeability within segments. The proposed model supposes data within a segment are m -dependent for some unknown m ⩾ 0 that may vary between segments, resulting in a model suitable for detecting clear discontinuities in data that are subject to different local temporal correlations. The approach is suited to both continuous and discrete data. A novel reversible jump Markov chain Monte Carlo algorithm is proposed to sample from the model; in particular, a detailed analysis of the parameter space is exploited to build proposals for the orders of dependence. Two applications demonstrate the benefits of the proposed model: computer network monitoring via change detection in count data, and segmentation of financial time series.