Optimization of the generalized covariance estimator in noncausal processes

IF 1.6 2区 数学 Q2 COMPUTER SCIENCE, THEORY & METHODS Statistics and Computing Pub Date : 2024-05-31 DOI:10.1007/s11222-024-10437-1
Gianluca Cubadda, Francesco Giancaterini, Alain Hecq, Joann Jasiak
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Abstract

This paper investigates the performance of routinely used optimization algorithms in application to the Generalized Covariance estimator (GCov) for univariate and multivariate mixed causal and noncausal models. The GCov is a semi-parametric estimator with an objective function based on nonlinear autocovariances to identify causal and noncausal orders. When the number and type of nonlinear autocovariances included in the objective function are insufficient/inadequate, or the error density is too close to the Gaussian, identification issues can arise. These issues result in local minima in the objective function, which correspond to parameter values associated with incorrect causal and noncausal orders. Then, depending on the starting point and the optimization algorithm employed, the algorithm can converge to a local minimum. The paper proposes the Simulated Annealing (SA) optimization algorithm as an alternative to conventional numerical optimization methods. The results demonstrate that SA performs well in its application to mixed causal and noncausal models, successfully eliminating the effects of local minima. The proposed approach is illustrated by an empirical study of a bivariate series of commodity prices.

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非因果过程中广义协方差估计器的优化
本文研究了常规优化算法在单变量和多变量混合因果和非因果模型的广义协方差估计器(GCov)应用中的性能。GCov 是一种半参数估计器,其目标函数基于非线性自变量,用于识别因果和非因果阶次。当目标函数中包含的非线性自变量的数量和类型不足/不充分,或误差密度过于接近高斯时,就会出现识别问题。这些问题会导致目标函数出现局部极小值,而局部极小值与不正确的因果和非因果阶次相关的参数值相对应。然后,根据起点和所采用的优化算法,算法会收敛到局部最小值。本文提出了模拟退火(SA)优化算法,以替代传统的数值优化方法。结果表明,SA 在应用于混合因果和非因果模型时表现良好,成功消除了局部最小值的影响。通过对商品价格二元序列的实证研究,对所提出的方法进行了说明。
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来源期刊
Statistics and Computing
Statistics and Computing 数学-计算机:理论方法
CiteScore
3.20
自引率
4.50%
发文量
93
审稿时长
6-12 weeks
期刊介绍: Statistics and Computing is a bi-monthly refereed journal which publishes papers covering the range of the interface between the statistical and computing sciences. In particular, it addresses the use of statistical concepts in computing science, for example in machine learning, computer vision and data analytics, as well as the use of computers in data modelling, prediction and analysis. Specific topics which are covered include: techniques for evaluating analytically intractable problems such as bootstrap resampling, Markov chain Monte Carlo, sequential Monte Carlo, approximate Bayesian computation, search and optimization methods, stochastic simulation and Monte Carlo, graphics, computer environments, statistical approaches to software errors, information retrieval, machine learning, statistics of databases and database technology, huge data sets and big data analytics, computer algebra, graphical models, image processing, tomography, inverse problems and uncertainty quantification. In addition, the journal contains original research reports, authoritative review papers, discussed papers, and occasional special issues on particular topics or carrying proceedings of relevant conferences. Statistics and Computing also publishes book review and software review sections.
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