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Convergence of covariance and spectral density estimates for high-dimensional locally stationary processes

Danna Zhang, Wei Biao Wu

2021The Annals of Statistics36 citationsDOI

Abstract

Covariances and spectral density functions play a fundamental role in the theory of time series. There is a well-developed asymptotic theory for their estimates for low-dimensional stationary processes. For high-dimensional nonstationary processes, however, many important problems on their asymptotic behaviors are still unanswered. This paper presents a systematic asymptotic theory for the estimates of time-varying second-order statistics for a general class of high-dimensional locally stationary processes. Using the framework of functional dependence measure, we derive convergence rates of the estimates which depend on the sample size $T$, the dimension $p$, the moment condition and the dependence of the underlying processes.

Topics & Concepts

MathematicsCovarianceAsymptotic analysisSeries (stratigraphy)Stationary processStatistical physicsMoment (physics)Convergence (economics)Spectral densityApplied mathematicsDimension (graph theory)Rate of convergenceEconometricsStatisticsBiologyEconomic growthChannel (broadcasting)Pure mathematicsClassical mechanicsPhysicsPaleontologyElectrical engineeringEngineeringEconomicsStatistical Methods and InferenceFinancial Risk and Volatility ModelingBayesian Methods and Mixture Models
Convergence of covariance and spectral density estimates for high-dimensional locally stationary processes | Litcius