Geodesic
On the Bickel–Rosenblatt test of goodness-of-fit for the residuals of autoregressive processes
ESAIM: Probability and Statistics, Tome 23 (2019), pp. 464-491.

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We investigate in this paper a Bickel–Rosenblatt test of goodness-of-fit for the density of the noise in an autoregressive model. Since the seminal work of Bickel and Rosenblatt, it is well-known that the integrated squared error of the Parzen–Rosenblatt density estimator, once correctly renormalized, is asymptotically Gaussian for independent and identically distributed (i.i.d.) sequences. We show that the result still holds when the statistic is built from the residuals of general stable and explosive autoregressive processes. In the univariate unstable case, we prove that the result holds when the unit root is located at − 1 whereas we give further results when the unit root is located at 1. In particular, we establish that except for some particular asymmetric kernels leading to a non-Gaussian limiting distribution and a slower convergence, the statistic has the same order of magnitude. We also study some common unstable cases, like the integrated seasonal process. Finally, we build a goodness-of-fit Bickel–Rosenblatt test for the true density of the noise together with its empirical properties on the basis of a simulation study.

Reçu le :
Accepté le :
DOI : 10.1051/ps/2018016
Classification : 62M10, 62F03, 62F12, 62G08
Keywords: Autoregressive process, Bickel–Rosenblatt statistic, goodness-of-fit, hypothesis testing, nonparametric estimation, Parzen–Rosenblatt density estimator, residual process

Lagnoux, Agnès 1 ; Nguyen, Thi Mong Ngoc 1 ; Proïa, Frédéric 1

1 
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     title = {On the {Bickel{\textendash}Rosenblatt} test of goodness-of-fit for the residuals of autoregressive processes},
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Lagnoux, Agnès; Nguyen, Thi Mong Ngoc; Proïa, Frédéric. On the Bickel–Rosenblatt test of goodness-of-fit for the residuals of autoregressive processes. ESAIM: Probability and Statistics, Tome 23 (2019), pp. 464-491. doi : 10.1051/ps/2018016. http://geodesic.mathdoc.fr/articles/10.1051/ps/2018016/

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