A measure of stationarity in locally stationary processes with applications to testing
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Date
2010-08-03
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Abstract
In this paper we investigate the problem of measuring deviations from stationarity in locally stationary time series. Our approach is based on a direct estimate of the L²-distance between the spectral density of the locally stationary process and its best approximation by a spectral density of
a stationary process. An explicit expression of the minimal distance is derived, which depends only on integrals of the spectral density of the stationary process and its square. These integrals can be
estimated directly without estimating the spectral density, and as a consequence, the estimation of
the measure of stationarity does not require the specification of smoothing parameters. We show
weak convergence of an appropriately standardized version of the statistic to a standard normal
distribution. The results are used to construct confidence intervals for the measure of stationarity
and to develop a new test for the hypothesis of stationarity which does not require regularization.
Finally, we investigate the finite sample properties of the resulting confidence intervals and tests
by means of a small simulation study and illustrate the methodology in three data examples. AMS subject classification: 62M10, 62M15, 62G10
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Keywords
Goodness-of-fit test, Integrated periodogram, L²-distance, Locally stationary process, Non stationary process, Spectral density