Some almost sure representations are obtained for the TJW product-limit estimator of a distribution function when the data are subject to random left-truncation and right-censorship. These results extend the theorems of Stute (1993) which were obtained for purely truncated data.Statistics & ProbabilitySCI(E)31ARTICLE4381-3872
Under random truncation, a pair of independent random variables X and Y is observable only if X is l...
In left truncation and right censoring models one observes i.i.d. samples from the triplet (T, Z, de...
Abstract: In many applications involving follow-up studies, individuals ' lifetimes may be subj...
AbstractIn this paper we consider the TJW product-limit estimatorFn(x) of an unknown distribution fu...
It is shown that the product limit estimator Fn of a continuous distribution function F based on the...
Let X be a d-variate random vector that is completely observed, and let Y be a random variable that ...
The problem of estimating the distribution of a lifetime when data may be leftor right censored is c...
For left truncated and right censored model. let F-n be the product-limit estimate and phi a nonnega...
It is shown that the product limit estimator F-n of a continuous distribution function F based on th...
AbstractA strong i.i.d. representation is obtained for the product-limit estimator of the survival f...
Let T, C and V denote the lifetime, censoring and truncation variables, respectively. Assume that (C...
The product-limit estimator under left truncation and right censoring was first proposed and shown t...
Abstract. The problem of estimating the distribution of a lifetime when data may be left or right ce...
For the model with both left truncation and right censoring, suppose all the distributions are conti...
Estimation in the linear regression model Y = beta'Z + epsilon is considered for the left trunc...
Under random truncation, a pair of independent random variables X and Y is observable only if X is l...
In left truncation and right censoring models one observes i.i.d. samples from the triplet (T, Z, de...
Abstract: In many applications involving follow-up studies, individuals ' lifetimes may be subj...
AbstractIn this paper we consider the TJW product-limit estimatorFn(x) of an unknown distribution fu...
It is shown that the product limit estimator Fn of a continuous distribution function F based on the...
Let X be a d-variate random vector that is completely observed, and let Y be a random variable that ...
The problem of estimating the distribution of a lifetime when data may be leftor right censored is c...
For left truncated and right censored model. let F-n be the product-limit estimate and phi a nonnega...
It is shown that the product limit estimator F-n of a continuous distribution function F based on th...
AbstractA strong i.i.d. representation is obtained for the product-limit estimator of the survival f...
Let T, C and V denote the lifetime, censoring and truncation variables, respectively. Assume that (C...
The product-limit estimator under left truncation and right censoring was first proposed and shown t...
Abstract. The problem of estimating the distribution of a lifetime when data may be left or right ce...
For the model with both left truncation and right censoring, suppose all the distributions are conti...
Estimation in the linear regression model Y = beta'Z + epsilon is considered for the left trunc...
Under random truncation, a pair of independent random variables X and Y is observable only if X is l...
In left truncation and right censoring models one observes i.i.d. samples from the triplet (T, Z, de...
Abstract: In many applications involving follow-up studies, individuals ' lifetimes may be subj...
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