For multivariate stationary time series many important properties, such as partial correlation, graphical models and autoregressive representations are encoded in the inverse of its spectral density matrix. This is not true for nonstationary time series, where the pertinent information lies in the inverse infinite dimensional covariance matrix operator associated with the multivariate time series. This necessitates the study of the covariance of a multivariate nonstationary time series and its relationship to its inverse. We show that if the rows/columns of the infinite dimensional covariance matrix decay at a certain rate then the rate (up to a factor) transfers to the rows/columns of the inverse covariance matrix. This is used to obtain a nonstationary autoregressive representation of the time series and a Baxter-type bound between the parameters of the autoregressive infinite representation and the corresponding finite autoregressive projection. The aforementioned results lay the foundation for the subsequent analysis of locally stationary time series. In particular, we show that smoothness properties on the covariance matrix transfer to (i) the inverse covariance (ii) the parameters of the vector autoregressive representation and (iii) the partial covariances. All results are set up in such a way that the constants involved depend only on the eigenvalue of the covariance matrix and can be applied in the high-dimensional settings with non-diverging eigenvalues.
翻译:对于多变量固定时间序列来说,许多重要属性,例如部分相关性、图形模型和自动递增表示式等,都以光谱密度矩阵反面的形式编码。对于非静止时间序列来说,情况并非如此,因为有关信息存在于与多变量时间序列相关的反面的天体共变异矩阵运算符中。这就需要研究多变量非静止时间序列的共变性及其与其反向的关系。我们表明,如果无限尺寸共变矩阵的行/栏以一定速度衰变,那么,向反常变矩阵的行/栏转移的速率(最高为一个系数)。对于非静止时间序列而言,有关的信息不为反常的天体共变异矩阵运算运算运算符,而对于多变量的多变异性非常态序列及其与其反向关系的研究则需要研究。上述结果为随后对本地固定时间序列进行分析奠定了基础。特别是,我们表明,向(i)不易变异性矩阵向反常态矩阵转移的值(i)不相异性矩阵转移的值是整个矢量的常态常态常态结果。