Detecting Periodicity of a General Stationary Time Series via AR(2)-Model Fitting

Abstract

Estimating the periodicity of a stationary time series via fitting a second order stationary autoregressive (AR(2)) model has been initiated by the seminal paper of Yule(1927).. We investigate properties of this procedure when applied to a general stationary processes possessing a spectral density with a dominant peak at some frequency λ0∈(0,π). We show that if the peak of the spectral density is sharp enough (in a way to be specified) then the AR(2) model, which best (in mean square sense) approximates the underlying process, correctly identifies the frequency λ0. To investigate consistency properties of the AR(2) based estimator of λ0, a near to pole framework is adopted. Triangular arrays of stationary stochastic processes are considered that possess a spectral density the peak of which at λ0 becomes more pronounced as the sample size n of the observed time series increases to infinity. It is shown in this set up, that the AR(2) based estimator achieves a rate of convergence which is larger than the parametric n-1/2 rate and which can be arbitrarily close to n-2/3, the best rate that can be achieved by this estimator.

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