Please use this identifier to cite or link to this item: https://doi.org/10.1214/10-STS345
Title: Feature matching in time series modeling
Authors: Xia, Y. 
Tong, H.
Keywords: ACF
Bayesian statistics
Black-box models
Blowflies
Box's dictum
Calibration
Catch-all approach
Data mining
Ecological populations
Epidemiology
Feature consistency
Feature matching
Least squares estimation
Maximum likelihood
Measles
Measurement errors
Misspecified models
Model averaging
Multi-step-ahead prediction
Nonlinear time series
Observation errors
Optimal parameter
Periodicity
Population models
Sea levels
Short time series
SIR epidemiological model
Skeleton
Substantive models
Sunspots
Threshold autoregressive models,Whittle's likelihood
XT-likelihood
Issue Date: 2011
Citation: Xia, Y., Tong, H. (2011). Feature matching in time series modeling. Statistical Science 26 (1) : 21-46. ScholarBank@NUS Repository. https://doi.org/10.1214/10-STS345
Abstract: Using a time series model to mimic an observed time series has a long history. However, with regard to this objective, conventional estimation methods for discrete-time dynamical models are frequently found to be wanting. In fact, they are characteristically misguided in at least two respects: (i) assuming that there is a true model; (ii) evaluating the efficacy of the estimation as if the postulated model is true. There are numerous examples of models, when fitted by conventional methods, that fail to capture some of the most basic global features of the data, such as cycles with good matching periods, singularities of spectral density functions (especially at the origin) and others. We argue that the shortcomings need not always be due to the model formulation but the inadequacy of the conventional fitting methods. After all, all models are wrong, but some are useful if they are fitted properly. The practical issue becomes one of how to best fit the model to data. Thus, in the absence of a true model, we prefer an alternative approach to conventional model fitting that typically involves one-step-ahead prediction errors. Our primary aim is to match the joint probability distribution of the observable time series, including long-term features of the dynamics that underpin the data, such as cycles, long memory and others, rather than shortterm prediction. For want of a better name, we call this specific aim feature matching. The challenges of model misspecification, measurement errors and the scarcity of data are forever present in real time series modeling. In this paper, by synthesizing earlier attempts into an extended-likelihood, we develop a systematic approach to empirical time series analysis to address these challenges and to aim at achieving better feature matching. Rigorous proofs are included but relegated to the Appendix. Numerical results, based on both simulations and real data, suggest that the proposed catch-all approach has several advantages over the conventional methods, especially when the time series is short or with strong cyclical fluctuations. We conclude with listing directions that require further development.
Source Title: Statistical Science
URI: http://scholarbank.nus.edu.sg/handle/10635/105150
ISSN: 08834237
DOI: 10.1214/10-STS345
Appears in Collections:Staff Publications

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