This paper quantifies the asymptotic behavior of sample arc lengths in a multivariate time series. Arc length is a natural measure of the fluctuations in a data series and can be used to quantify volatility. The idea is that processes with larger sample arc lengths exhibit larger fluctuations and hence suggest greater volatility. Here, a Gaussian functional central limit theorem for sample arc lengths is proven under finite second moment conditions. With equally spaced observations, the theory is shown to apply when the first differences of the series obey many of the popular stationary time series models in today's literature, including autoregressive moving-average, generalized autoregressive conditional heteroscedastic, and stochastic volatility model classes. A cumulative sum statistic is introduced to identify series regimes of differing volatilities. Our applications consider log prices of asset series. Specifically, the results are used to detect nonstationary periods of stock prices. Copyright (c) 2014 John Wiley & Sons, Ltd.
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机译:本文量化了多元时间序列中样本弧长的渐近行为。弧长是数据系列中波动的自然度量,可用于量化波动性。想法是,具有较大样本电弧长度的过程会显示较大的波动,因此建议较大的波动性。在此,在有限的第二矩条件下证明了样本弧长的高斯泛函中心极限定理。通过等距观察,可以证明该理论适用于该序列的第一个差异服从当今文献中许多流行的平稳时间序列模型,包括自回归移动平均,广义自回归条件异方差和随机波动率模型类别。引入累积总和统计量来识别不同波动率的系列制度。我们的应用程序考虑资产系列的对数价格。具体而言,结果用于检测股票价格的非平稳时期。版权所有(c)2014 John Wiley&Sons,Ltd.
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