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Sparse Identification and Estimation of Large-Scale Vector AutoRegressive Moving Averages.

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|June 22, 2023
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Summary
This summary is machine-generated.

This study introduces a new optimization method for Vector AutoRegressive Moving Average (VARMA) models, addressing identifiability issues. The approach uses convex optimization to find the simplest model, making VARMA more practical for time series analysis.

Keywords:
ForecastingIdentifiabilityMultivariate Time SeriesSparse EstimationVARMA

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Area of Science:

  • Statistics
  • Econometrics
  • Machine Learning

Background:

  • Vector AutoRegressive Moving Average (VARMA) models are crucial for multivariate time series analysis.
  • Identifiability challenges have historically limited VARMA model adoption in favor of simpler Vector AutoRegressive (VAR) models.
  • Existing methods often struggle with the complexity and interpretability of VARMA models.

Purpose of the Study:

  • To develop a novel optimization-based approach for VARMA model identification.
  • To bridge the gap between theoretical VARMA models and practical time series analysis.
  • To enhance the parsimony and efficiency of VARMA model estimation.

Main Methods:

  • Utilized convex optimization to identify the most parsimonious parameterization among equivalent data-generating models.
  • Employed a user-specified strongly convex penalty to quantify model simplicity.
  • Developed an efficiently computable estimator based on the chosen penalty.

Main Results:

  • Established consistency of the proposed estimators in a double-asymptotic regime.
  • Provided non-asymptotic error bounds covering both model specification and parameter estimation.
  • Demonstrated the method's advantage over traditional VAR approaches using three real-world datasets.

Conclusions:

  • The proposed optimization-based method effectively addresses VARMA identifiability issues.
  • This approach offers a more practical and parsimonious alternative to existing time series models.
  • The findings have implications for large-scale time series algorithms and penalized regression analysis.