Add to ORKGIn the random censorship from the right model, strong and weak limit theorems for Bahadur-Kiefer type processes based on the product-limit estimator are established. The main theorm is sharp and may be considered as a final result as far as this type of research is concerned. As a consequence of this theorem a sharp uniform Bahadur representation for product-limit quantiles is obtained.Bahadur representation empirical and quantile processes limit theorems product-limit random censorship
AbstractIn this paper, a representation due to Major and Rejtö for the Kaplan-Meier estimator is app...
Let X be a d-variate random vector that is completely observed, and let Y be a random variable that ...
Suppose that we observe bivariate data (Xi, Yi) only when Yi ≤ Xi (left truncation). Denote with F t...
AbstractIn the random censorship from the right model, strong and weak limit theorems for Bahadur-Ki...
AbstractIn the random censorship from the right model, we prove a strong approximation result for th...
The smooth PL quantile estimator is proposed and the analog of Bahadur-Kiefer type process is constr...
AbstractThe quantile process of the product-limit estimator (PL-quantile process) in the random cens...
In the random censorship from the right model. the asymptotics of Bahadur-Kiefer process based on sm...
Necessary and sufficient conditions for weak and strong convergence are derived for the weighted ver...
The product-limit estimator is shown to be a strongly uniformly consistent estimator of the distribu...
We prove functional limit laws for the increment functions of empirical processes based upon randoml...
A short proof of the lower bound in the strong version of the famous Theorem 1A in Kiefer (1970) on ...
We derive asymptotic confidence bands for the quantile function F1 in the random censorship model. A...
AbstractIn this paper we consider the TJW product-limit estimatorFn(x) of an unknown distribution fu...
In the paper, the empirical process in informative model of random censorship from both sides is inv...
AbstractIn this paper, a representation due to Major and Rejtö for the Kaplan-Meier estimator is app...
Let X be a d-variate random vector that is completely observed, and let Y be a random variable that ...
Suppose that we observe bivariate data (Xi, Yi) only when Yi ≤ Xi (left truncation). Denote with F t...
AbstractIn the random censorship from the right model, strong and weak limit theorems for Bahadur-Ki...
AbstractIn the random censorship from the right model, we prove a strong approximation result for th...
The smooth PL quantile estimator is proposed and the analog of Bahadur-Kiefer type process is constr...
AbstractThe quantile process of the product-limit estimator (PL-quantile process) in the random cens...
In the random censorship from the right model. the asymptotics of Bahadur-Kiefer process based on sm...
Necessary and sufficient conditions for weak and strong convergence are derived for the weighted ver...
The product-limit estimator is shown to be a strongly uniformly consistent estimator of the distribu...
We prove functional limit laws for the increment functions of empirical processes based upon randoml...
A short proof of the lower bound in the strong version of the famous Theorem 1A in Kiefer (1970) on ...
We derive asymptotic confidence bands for the quantile function F1 in the random censorship model. A...
AbstractIn this paper we consider the TJW product-limit estimatorFn(x) of an unknown distribution fu...
In the paper, the empirical process in informative model of random censorship from both sides is inv...
AbstractIn this paper, a representation due to Major and Rejtö for the Kaplan-Meier estimator is app...
Let X be a d-variate random vector that is completely observed, and let Y be a random variable that ...
Suppose that we observe bivariate data (Xi, Yi) only when Yi ≤ Xi (left truncation). Denote with F t...