在多元时间序列中使用切片反平均差降维

IF 0.7 4区数学 Q3 STATISTICS & PROBABILITY

Stat Pub Date : 2024-07-13 DOI:10.1002/sta4.709

Hector Haffenden, Andreas Artemiou

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引用次数: 0

摘要

根据多变量时间序列降维算法的最新发展，我们在这项工作中提出了对切片反均值差算法（一种以前在标准多元回归设置中提出的算法）进行调整，以开发一种适合多变量时间序列降维的算法。结果表明，与以前提出的多变量时间序列降维算法相比，名为时间序列切片反均值差（TSIMD）的算法能够使用较少的重要对来识别重要方向和重要滞后。我们通过大量实验证明了我们的算法具有竞争力的性能。

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Using sliced inverse mean difference for dimension reduction in multivariate time series

Following recent developments of dimension reduction algorithms for a multivariate time series, we propose in this work the adaptation of sliced inverse mean difference algorithm, an algorithm which was previously proposed in a standard multiple regression setting, to develop an algorithm appropriate to perform dimension reduction for a multivariate time series. The resulting algorithm called time series sliced inverse mean difference (TSIMD) is shown to be able to identify important directions and important lags using less significant pairs than previously proposed algorithms for dimension reduction in multivariate time series. We demonstrate the competitive performance of our algorithms through a number of experiments.

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来源期刊

Stat Decision Sciences-Statistics, Probability and Uncertainty

CiteScore

1.10

自引率

0.00%

发文量

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