Spectral measure of empirical autocovariance matrices of high dimensional Gaussian stationary processes

Pub Date : 2021-10-16 DOI:10.1142/s2010326322500538
A. Bose, W. Hachem
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引用次数: 3

Abstract

Consider the empirical autocovariance matrix at a given non-zero time lag based on observations from a multivariate complex Gaussian stationary time series. The spectral analysis of these autocovariance matrices can be useful in certain statistical problems, such as those related to testing for white noise. We study the behavior of their spectral measures in the asymptotic regime where the time series dimension and the observation window length both grow to infinity, and at the same rate. Following a general framework in the field of the spectral analysis of large random non-Hermitian matrices, at first the probabilistic behavior of the small singular values of the shifted versions of the autocovariance matrix are obtained. This is then used to infer about the large sample behaviour of the empirical spectral measure of the autocovariance matrices at any lag. Matrix orthogonal polynomials on the unit circle play a crucial role in our study.
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高维高斯平稳过程经验自协方差矩阵的谱测度
考虑基于多变量复高斯平稳时间序列的观测值在给定非零时滞下的经验自协方差矩阵。这些自协方差矩阵的谱分析可以用于某些统计问题,例如与白噪声测试有关的统计问题。我们研究了它们的谱测度在时间序列维数和观测窗长都以相同速率增长到无穷大的渐近状态下的行为。根据大随机非厄米矩阵谱分析的一般框架,首先得到自协方差矩阵位移后的小奇异值的概率行为。然后用它来推断自协方差矩阵在任何滞后时的经验谱测量的大样本行为。单位圆上的矩阵正交多项式在我们的研究中起着至关重要的作用。
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