Convergence of non-linear functionals of smoothed empirical processes and kernel density estimates |
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| Authors: | Corinne Berzin José León Joaquín Ortega |
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| Affiliation: | 1. Université Pierre Mendés-France , Grenoble, France E-mail: Corinne.Berzin@upmf-grenoble.fr;2. Universidad Central de Venezuela , Caracas, Venezuela E-mail: jleon@euler.ciens.ucv.ve;3. Instituto Venezolano de Investigaciones Científicas and U.C.V. , Caracas, Venezuela |
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| Abstract: | ![]()
We consider regularizations by convolution of the empirical process and study the asymptotic behaviour of non-linear functionals of this process. Using a result for the same type of non-linear functionals of the Brownian bridge, shown in a previous paper [4], and a strong approximation theorem, we prove several results for the p-deviation in estimation of the derivatives of the density. We also study the asymptotic behaviour of the number of crossings of the smoothed empirical process defined by Yukich [17] and of a modified version of the Kullback deviation. |
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| Keywords: | Non-linear Functionals Empirical Process Kernel Density Estimation Crossings Kullback-Leibler Deviation Regularization By Convolution |
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