The convergence properties of the empirical characteristic process $Y_n(t) = n^{1/2}(c_n(t) - c(t))$ are investigated. The finite-dimensional distributions of $Y_n$ converge to those of a complex Gaussian process $Y$. First the continuity properties of $Y$ are discussed. A class of counterexamples is presented, showing that if the underlying distribution has low logarithmic moments then $Y$ is almost surely discontinuous, and hence $Y_n$ cannot converge weakly. When the underlying distribution has high enough moments then $Y_n$ is strongly approximated by suitable sequences of Gaussian processes with specified rate-functions. The approximation is based on that of Komlos, Major and Tusnady for the empirical process. Convergence speeds for the distribution of functionals of $Y_n$ are derived. A Strassen-type log log law is established for $Y_n$, and supremum-functionals on the appropriate set of limit points are explicitly computed. The technique throughout uses results from the theory of the sample function behaviour of Gaussian processes.
Publié le : 1981-02-14
Classification:
Empirical characteristic process,
stochastic integral,
continuity of a Gaussian process,
theorems of Dudley,
Fernique,
Jain and Marcus,
weak convergence,
strong approximation,
Komlos-Major-Tusnady theorem,
Fernique inequality,
convergence rates,
Strassen-type log log law,
Fernique-Marcus-Shepp theorem,
60F05,
60F15,
60E05,
60G17,
62G99
@article{1176994513,
author = {Csorgo, Sandor},
title = {Limit Behaviour of the Empirical Characteristic Function},
journal = {Ann. Probab.},
volume = {9},
number = {6},
year = {1981},
pages = { 130-144},
language = {en},
url = {http://dml.mathdoc.fr/item/1176994513}
}
Csorgo, Sandor. Limit Behaviour of the Empirical Characteristic Function. Ann. Probab., Tome 9 (1981) no. 6, pp. 130-144. http://gdmltest.u-ga.fr/item/1176994513/