A useful approach for analysing multiple time series is via characterising their spectral density matrix as the frequency domain analog of the covariance matrix. When the dimension of the time series is large compared to their length, regularisation based methods can overcome the curse of dimensionality, but the existing ones lack theoretical justification. This paper develops the first non-asymptotic result for characterising the difference between the sample and population versions of the spectral density matrix, allowing one to justify a range of high-dimensional models for analysing time series. As a concrete example, we apply this result to establish the convergence of the smoothed periodogram estimators and sparse estimators of the in...
Spectral Analysis of Multivariate Time Series has been an active field of methodological and applied...
We propose a new estimator of high-dimensional spectral density matrices, called ALgebraic Spectral ...
Due to the increasing availability of massive spatio-temporal data sets, modeling high dimensional d...
AbstractIn this paper on developing shrinkage for spectral analysis of multivariate time series of h...
In this paper we investigate the performance of periodogram based estimators of the spectral density...
Spectral analysis of biological processes poses a wide variety of complications. Statistical learnin...
In this paper on developing shrinkage for spectral analysis of multivariate time series of high dime...
In spectral analysis of high dimensional multivariate time series, it is crucial to obtain an estima...
Time series data obtained from neurophysiological signals is often high-dimensional and the length o...
Sample auto-covariance matrix plays a crucial role in high dimensional times series analysis. In thi...
Nowadays, a large amount of data is available in nearly every area of science and business. Informa...
We analyse the properties of nonparametric spectral estimates when applied to long memory and trendi...
Time series data obtained from neurophysiological signals is often high-dimensional and the length o...
Time series data obtained from neurophysiological signals is of- ten high-dimensional and the length...
Time series data obtained from neurophysiological signals is often high-dimensional and the length o...
Spectral Analysis of Multivariate Time Series has been an active field of methodological and applied...
We propose a new estimator of high-dimensional spectral density matrices, called ALgebraic Spectral ...
Due to the increasing availability of massive spatio-temporal data sets, modeling high dimensional d...
AbstractIn this paper on developing shrinkage for spectral analysis of multivariate time series of h...
In this paper we investigate the performance of periodogram based estimators of the spectral density...
Spectral analysis of biological processes poses a wide variety of complications. Statistical learnin...
In this paper on developing shrinkage for spectral analysis of multivariate time series of high dime...
In spectral analysis of high dimensional multivariate time series, it is crucial to obtain an estima...
Time series data obtained from neurophysiological signals is often high-dimensional and the length o...
Sample auto-covariance matrix plays a crucial role in high dimensional times series analysis. In thi...
Nowadays, a large amount of data is available in nearly every area of science and business. Informa...
We analyse the properties of nonparametric spectral estimates when applied to long memory and trendi...
Time series data obtained from neurophysiological signals is often high-dimensional and the length o...
Time series data obtained from neurophysiological signals is of- ten high-dimensional and the length...
Time series data obtained from neurophysiological signals is often high-dimensional and the length o...
Spectral Analysis of Multivariate Time Series has been an active field of methodological and applied...
We propose a new estimator of high-dimensional spectral density matrices, called ALgebraic Spectral ...
Due to the increasing availability of massive spatio-temporal data sets, modeling high dimensional d...