AbstractBahadur-Kiefer approximations for generalized quantile processes as defined in Einmahl and Mason (1992) are given which generalize results for the classical one-dimensional quantile processes. An as application we consider the special case of the volume process of minimum volume sets in classes C of subsets of the d-dimensional Euclidean space. Minimum volume sets can be used as estimators of level sets of a density and might be useful in cluster analysis. The volume of minimum volume sets itself can be used for robust estimation of scale. Consistency results and rates of convergence for minimum volume sets are given. Rates of convergence of minimum volume sets can be used to obtain Bahadur-Kiefer approximations for the correspondin...
Given n independent random vectors with common density f on Rd, we study the weak convergence of thr...
In recent literature the authors have introduced a Delta formalism, á la Dirac, for the description ...
The scope of this paper is to offer an overview of the main results obtained by the authors in recen...
Minimum volume sets in classes C of subsets of the d-dimensionalEuclidean space can be used as estim...
Given a probability measure P and a reference measure µ, one is often interested in the minimum µ-me...
For random vectors taking values in $\mathbb{R}^d$ we introduce a notion of multivariate quantiles d...
AbstractSummarizing the whole support of a random variable into minimum volume sets of its probabili...
We define the quantile set of order α ∈ [1/2, 1) associated to a law P on R d to be the collection o...
Given a probability measure P and a reference measure µ, one is often interested in the minimum µ-me...
Motivated by interval/region prediction in nonlinear time series, we propose a minimum volume predic...
AbstractWe deal with quantile processes based on intermediate order statistics. Using an approximati...
AbstractWe consider a conditional empirical distribution of the form Fn(C∣x)=∑nt=1ωn(Xt−x)I{Yt∈C} in...
We deal with quantile processes based on intermediate order statistics. Using an approximation of th...
Motivated by interval/region prediction in nonlinear timeseries, we propose a minimum volume predict...
Given n independent random vectors with common density f on Rd, we study the weak convergence of thr...
Given n independent random vectors with common density f on Rd, we study the weak convergence of thr...
In recent literature the authors have introduced a Delta formalism, á la Dirac, for the description ...
The scope of this paper is to offer an overview of the main results obtained by the authors in recen...
Minimum volume sets in classes C of subsets of the d-dimensionalEuclidean space can be used as estim...
Given a probability measure P and a reference measure µ, one is often interested in the minimum µ-me...
For random vectors taking values in $\mathbb{R}^d$ we introduce a notion of multivariate quantiles d...
AbstractSummarizing the whole support of a random variable into minimum volume sets of its probabili...
We define the quantile set of order α ∈ [1/2, 1) associated to a law P on R d to be the collection o...
Given a probability measure P and a reference measure µ, one is often interested in the minimum µ-me...
Motivated by interval/region prediction in nonlinear time series, we propose a minimum volume predic...
AbstractWe deal with quantile processes based on intermediate order statistics. Using an approximati...
AbstractWe consider a conditional empirical distribution of the form Fn(C∣x)=∑nt=1ωn(Xt−x)I{Yt∈C} in...
We deal with quantile processes based on intermediate order statistics. Using an approximation of th...
Motivated by interval/region prediction in nonlinear timeseries, we propose a minimum volume predict...
Given n independent random vectors with common density f on Rd, we study the weak convergence of thr...
Given n independent random vectors with common density f on Rd, we study the weak convergence of thr...
In recent literature the authors have introduced a Delta formalism, á la Dirac, for the description ...
The scope of this paper is to offer an overview of the main results obtained by the authors in recen...