AbstractIn this paper, we consider sequences of vector martingale differences of increasing dimension. We show that the Kantorovich distance from the distribution of the k(n)-dimensional average of n martingale differences to the corresponding Gaussian distribution satisfies certain inequalities. As a consequence, if the growth of k(n) is not too fast, then the Kantorovich distance converges to zero. Two applications of this result are presented. The first is a precise proof of the asymptotic distribution of the multivariate portmanteau statistic applied to the residuals of an autoregressive model and the second is a proof of the asymptotic normality of the estimates of a finite autoregressive model when the process is an AR(∞) and the orde...
International audienceIn this paper, we give rates of convergence for minimal distances between line...
International audienceWe study the convergence rates in the law of large numbers for arrays of marti...
AbstractA functional central limit theorem is obtained for martingales which are not uniformly asymp...
AbstractIn this paper, we consider sequences of vector martingale differences of increasing dimensio...
Multivariate versions of the law of large numbers and the central limit theorem for martingales are ...
AbstractIn this paper, we give rates of convergence for minimal distances between linear statistics ...
AbstractThis paper is concerned with large-O error estimates concerning convergence in distribution ...
Bounds are found on the accuracy of the Gaussian approximation of discreet time martingales with val...
Uniform bounds on the departure from normality under various conditions of martingales and near mart...
AbstractIn this paper a form of the Lindeberg condition appropriate for martingale differences is us...
In this paper, we give rates of convergence, for minimal distances and for the uniform distance, bet...
This works aims at deriving asymptotic results for some distances between the distribution function ...
AbstractBased on the martingale version of the Skorokhod embedding Heyde and Brown (1970) establishe...
We present a new version of the Central Limit Theorem for multivariate martingales
AbstractPhillips and Magdalinos (2007) [1] gave the asymptotic theory for autoregressive time series...
International audienceIn this paper, we give rates of convergence for minimal distances between line...
International audienceWe study the convergence rates in the law of large numbers for arrays of marti...
AbstractA functional central limit theorem is obtained for martingales which are not uniformly asymp...
AbstractIn this paper, we consider sequences of vector martingale differences of increasing dimensio...
Multivariate versions of the law of large numbers and the central limit theorem for martingales are ...
AbstractIn this paper, we give rates of convergence for minimal distances between linear statistics ...
AbstractThis paper is concerned with large-O error estimates concerning convergence in distribution ...
Bounds are found on the accuracy of the Gaussian approximation of discreet time martingales with val...
Uniform bounds on the departure from normality under various conditions of martingales and near mart...
AbstractIn this paper a form of the Lindeberg condition appropriate for martingale differences is us...
In this paper, we give rates of convergence, for minimal distances and for the uniform distance, bet...
This works aims at deriving asymptotic results for some distances between the distribution function ...
AbstractBased on the martingale version of the Skorokhod embedding Heyde and Brown (1970) establishe...
We present a new version of the Central Limit Theorem for multivariate martingales
AbstractPhillips and Magdalinos (2007) [1] gave the asymptotic theory for autoregressive time series...
International audienceIn this paper, we give rates of convergence for minimal distances between line...
International audienceWe study the convergence rates in the law of large numbers for arrays of marti...
AbstractA functional central limit theorem is obtained for martingales which are not uniformly asymp...