A Wavelet Whittle estimator of the memory parameter of a non-stationary Gaussian time series

Abstract

We consider a time series X=\Xk, k∈Z\ with memory parameter d∈R. This time series is either stationary or can be made stationary after differencing a finite number of times. We study the "Local Whittle Wavelet Estimator" of the memory parameter d. This is a wavelet-based semiparametric pseudo-likelihood maximum method estimator. The estimator may depend on a given finite range of scales or on a range which becomes infinite with the sample size. We show that the estimator is consistent and rate optimal if X is a linear process and is asymptotically normal if X is Gaussian.

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