AbstractWe consider the local empirical process indexed by sets, a substantial generalization of the well-studied uniform tail empirical process. We show that the weak limit of weighted versions of this process is Poisson under certain conditions, whereas it is Gaussian in other situations. Our main theorems provide many new results as well as a unified approach to a number of asymptotic distributional results for weighted empirical processes, which up to now appeared to be isolated facts. Our results have applications in ‘local’ statistical procedures; we will, in particular, show their usefulness in multivariate extreme value theory
In this paper we analyze the asymptotic properties of the popular distribution tail index estimator ...
AbstractNecessary and sufficient conditions for weak convergence and strong (functional) limit theor...
AbstractThe asymptotics for the number of times the empirical distribution function crosses the true...
We consider the local empirical process indexed by sets, a greatly generalized version of the well-s...
International audienceGiven an observation of the uniform empirical process alpha(n) its functional ...
The aim of the present paper is to clarify the rôle of extreme order statistics in general statistic...
AbstractWe obtain limit theorems for sup |αn(t,s)|(tλsμG(t)L(s)), where αn is the bivariate uniform ...
AbstractWe prove the weak convergence of the empirical process of c(n)-close pairs. The limit is alw...
The aim of the present paper is to clarify the rôle of extreme order statistics in general statistic...
The aim of the present paper is to clarify the role of extreme order statistics in general statistic...
this paper we extend the notion of the local empirical process to allow us to include kernel regress...
In this paper we derive some fundamental properties of locally dependent time series of order m(n), ...
AbstractThe empirical characteristic function process with estimated parameters is approximated by a...
The tail empirical process is defined to be for each n ¿ N, wn(t) = (n/kn)1/2an(tkn/n), 0 = t = 1, w...
AbstractSufficient conditions are found for the weak convergence of a weighted empirical process {(ν...
In this paper we analyze the asymptotic properties of the popular distribution tail index estimator ...
AbstractNecessary and sufficient conditions for weak convergence and strong (functional) limit theor...
AbstractThe asymptotics for the number of times the empirical distribution function crosses the true...
We consider the local empirical process indexed by sets, a greatly generalized version of the well-s...
International audienceGiven an observation of the uniform empirical process alpha(n) its functional ...
The aim of the present paper is to clarify the rôle of extreme order statistics in general statistic...
AbstractWe obtain limit theorems for sup |αn(t,s)|(tλsμG(t)L(s)), where αn is the bivariate uniform ...
AbstractWe prove the weak convergence of the empirical process of c(n)-close pairs. The limit is alw...
The aim of the present paper is to clarify the rôle of extreme order statistics in general statistic...
The aim of the present paper is to clarify the role of extreme order statistics in general statistic...
this paper we extend the notion of the local empirical process to allow us to include kernel regress...
In this paper we derive some fundamental properties of locally dependent time series of order m(n), ...
AbstractThe empirical characteristic function process with estimated parameters is approximated by a...
The tail empirical process is defined to be for each n ¿ N, wn(t) = (n/kn)1/2an(tkn/n), 0 = t = 1, w...
AbstractSufficient conditions are found for the weak convergence of a weighted empirical process {(ν...
In this paper we analyze the asymptotic properties of the popular distribution tail index estimator ...
AbstractNecessary and sufficient conditions for weak convergence and strong (functional) limit theor...
AbstractThe asymptotics for the number of times the empirical distribution function crosses the true...