September 2024 Bayesian hidden Markov models for latent variable labeling assignments in conflict research: Application to the role ceasefires play in conflict dynamics
Jonathan P. Williams, Gudmund H. Hermansen, Håvard Strand, Govinda Clayton, Håvard Mokleiv Nygård
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Ann. Appl. Stat. 18(3): 2034-2061 (September 2024). DOI: 10.1214/23-AOAS1869

Abstract

A crucial challenge for solving problems in conflict research is in leveraging the semisupervised nature of the data that arise. Observed response data, such as counts of battle deaths over time, indicate latent processes of interest, such as intensity and duration of conflicts, but defining and labeling instances of these unobserved processes requires nuance and imprecision. The availability of such labels, however, would make it possible to study the effect of intervention-related predictors—such as ceasefires—directly on conflict dynamics (e.g., latent intensity) rather than through an intermediate proxy, like observed counts of battle deaths. Motivated by this problem and the new availability of the ETH-PRIO Civil Conflict Ceasefires data set, we propose a Bayesian autoregressive (AR) hidden Markov model (HMM) framework as a sufficiently flexible machine learning approach for semisupervised regime labeling with uncertainty quantification. We motivate our approach by illustrating the way it can be used to study the role that ceasefires play in shaping conflict dynamics. This ceasefires data set is the first systematic and globally comprehensive data on ceasefires, and our work is the first to analyze this new data and to explore the effect of ceasefires on conflict dynamics in a comprehensive and cross-country manner.

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Jonathan P. Williams. Gudmund H. Hermansen. Håvard Strand. Govinda Clayton. Håvard Mokleiv Nygård. "Bayesian hidden Markov models for latent variable labeling assignments in conflict research: Application to the role ceasefires play in conflict dynamics." Ann. Appl. Stat. 18 (3) 2034 - 2061, September 2024. https://doi.org/10.1214/23-AOAS1869

Information

Received: 1 February 2023; Revised: 1 December 2023; Published: September 2024
First available in Project Euclid: 5 August 2024

Digital Object Identifier: 10.1214/23-AOAS1869

Keywords: count-valued time series , discrete-time Markov process , discrete-valued time series , multistate model , state space model

Rights: Copyright © 2024 Institute of Mathematical Statistics

Vol.18 • No. 3 • September 2024
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